TSTP Solution File: SYN454+1 by SuperZenon---0.0.1
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- Process Solution
%------------------------------------------------------------------------------
% File : SuperZenon---0.0.1
% Problem : SYN454+1 : TPTP v8.1.0. Released v2.1.0.
% Transfm : none
% Format : tptp:raw
% Command : run_super_zenon -p0 -itptp -om -max-time %d %s
% Computer : n016.cluster.edu
% Model : x86_64 x86_64
% CPU : Intel(R) Xeon(R) CPU E5-2620 v4 2.10GHz
% Memory : 8042.1875MB
% OS : Linux 3.10.0-693.el7.x86_64
% CPULimit : 300s
% WCLimit : 600s
% DateTime : Thu Jul 21 12:43:54 EDT 2022
% Result : Theorem 0.52s 0.77s
% Output : Proof 0.75s
% Verified :
% SZS Type : -
% Comments :
%------------------------------------------------------------------------------
%----WARNING: Could not form TPTP format derivation
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% 0.07/0.12 % Problem : SYN454+1 : TPTP v8.1.0. Released v2.1.0.
% 0.07/0.12 % Command : run_super_zenon -p0 -itptp -om -max-time %d %s
% 0.12/0.33 % Computer : n016.cluster.edu
% 0.12/0.33 % Model : x86_64 x86_64
% 0.12/0.33 % CPU : Intel(R) Xeon(R) CPU E5-2620 v4 @ 2.10GHz
% 0.12/0.33 % Memory : 8042.1875MB
% 0.12/0.33 % OS : Linux 3.10.0-693.el7.x86_64
% 0.12/0.33 % CPULimit : 300
% 0.12/0.33 % WCLimit : 600
% 0.12/0.33 % DateTime : Mon Jul 11 12:23:12 EDT 2022
% 0.12/0.33 % CPUTime :
% 0.52/0.77 % SZS status Theorem
% 0.52/0.77 (* PROOF-FOUND *)
% 0.52/0.77 (* BEGIN-PROOF *)
% 0.52/0.77 % SZS output start Proof
% 0.52/0.77 1. (-. (hskp14)) (hskp14) ### P-NotP
% 0.52/0.77 2. (-. (hskp1)) (hskp1) ### P-NotP
% 0.52/0.77 3. (-. (hskp3)) (hskp3) ### P-NotP
% 0.52/0.77 4. ((hskp14) \/ ((hskp1) \/ (hskp3))) (-. (hskp3)) (-. (hskp1)) (-. (hskp14)) ### DisjTree 1 2 3
% 0.52/0.77 5. (-. (ndr1_0)) (ndr1_0) ### P-NotP
% 0.52/0.77 6. (-. (c2_1 (a115))) (c2_1 (a115)) ### Axiom
% 0.52/0.77 7. (-. (c3_1 (a115))) (c3_1 (a115)) ### Axiom
% 0.52/0.77 8. (c0_1 (a115)) (-. (c0_1 (a115))) ### Axiom
% 0.52/0.77 9. ((ndr1_0) => ((c2_1 (a115)) \/ ((c3_1 (a115)) \/ (-. (c0_1 (a115)))))) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ### DisjTree 5 6 7 8
% 0.52/0.77 10. (All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) (ndr1_0) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) ### All 9
% 0.52/0.77 11. (-. (hskp12)) (hskp12) ### P-NotP
% 0.52/0.77 12. (-. (hskp5)) (hskp5) ### P-NotP
% 0.52/0.77 13. ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) (-. (hskp5)) (-. (hskp12)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ### DisjTree 10 11 12
% 0.52/0.77 14. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) (-. (hskp12)) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ### ConjTree 13
% 0.52/0.77 15. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) (-. (hskp5)) (-. (hskp12)) (-. (hskp1)) (-. (hskp3)) ((hskp14) \/ ((hskp1) \/ (hskp3))) ### Or 4 14
% 0.52/0.77 16. (-. (hskp17)) (hskp17) ### P-NotP
% 0.52/0.77 17. ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) (-. (hskp17)) (-. (hskp1)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ### DisjTree 10 2 16
% 0.52/0.77 18. (-. (hskp20)) (hskp20) ### P-NotP
% 0.52/0.77 19. (-. (hskp10)) (hskp10) ### P-NotP
% 0.52/0.77 20. ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (-. (hskp20)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ### DisjTree 10 18 19
% 0.52/0.77 21. (-. (c0_1 (a124))) (c0_1 (a124)) ### Axiom
% 0.52/0.77 22. (-. (c1_1 (a124))) (c1_1 (a124)) ### Axiom
% 0.52/0.77 23. (-. (c3_1 (a124))) (c3_1 (a124)) ### Axiom
% 0.52/0.77 24. ((ndr1_0) => ((c0_1 (a124)) \/ ((c1_1 (a124)) \/ (c3_1 (a124))))) (-. (c3_1 (a124))) (-. (c1_1 (a124))) (-. (c0_1 (a124))) (ndr1_0) ### DisjTree 5 21 22 23
% 0.52/0.77 25. (All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) (ndr1_0) (-. (c0_1 (a124))) (-. (c1_1 (a124))) (-. (c3_1 (a124))) ### All 24
% 0.52/0.77 26. (-. (c2_1 (a115))) (c2_1 (a115)) ### Axiom
% 0.52/0.77 27. (c0_1 (a115)) (-. (c0_1 (a115))) ### Axiom
% 0.52/0.77 28. (c1_1 (a115)) (-. (c1_1 (a115))) ### Axiom
% 0.52/0.77 29. ((ndr1_0) => ((c2_1 (a115)) \/ ((-. (c0_1 (a115))) \/ (-. (c1_1 (a115)))))) (c1_1 (a115)) (c0_1 (a115)) (-. (c2_1 (a115))) (ndr1_0) ### DisjTree 5 26 27 28
% 0.52/0.77 30. (All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) (ndr1_0) (-. (c2_1 (a115))) (c0_1 (a115)) (c1_1 (a115)) ### All 29
% 0.52/0.77 31. (-. (c2_1 (a115))) (c2_1 (a115)) ### Axiom
% 0.52/0.77 32. (c0_1 (a115)) (-. (c0_1 (a115))) ### Axiom
% 0.52/0.77 33. ((ndr1_0) => ((c1_1 (a115)) \/ ((c2_1 (a115)) \/ (-. (c0_1 (a115)))))) (c0_1 (a115)) (-. (c2_1 (a115))) (All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) (ndr1_0) ### DisjTree 5 30 31 32
% 0.52/0.77 34. (All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) (ndr1_0) (All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) (-. (c2_1 (a115))) (c0_1 (a115)) ### All 33
% 0.52/0.77 35. (-. (c2_1 (a133))) (c2_1 (a133)) ### Axiom
% 0.52/0.77 36. (c0_1 (a133)) (-. (c0_1 (a133))) ### Axiom
% 0.52/0.77 37. (c3_1 (a133)) (-. (c3_1 (a133))) ### Axiom
% 0.52/0.77 38. ((ndr1_0) => ((c2_1 (a133)) \/ ((-. (c0_1 (a133))) \/ (-. (c3_1 (a133)))))) (c3_1 (a133)) (c0_1 (a133)) (-. (c2_1 (a133))) (ndr1_0) ### DisjTree 5 35 36 37
% 0.52/0.77 39. (All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) (ndr1_0) (-. (c2_1 (a133))) (c0_1 (a133)) (c3_1 (a133)) ### All 38
% 0.52/0.77 40. (-. (hskp15)) (hskp15) ### P-NotP
% 0.52/0.77 41. ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (hskp15)) (c3_1 (a133)) (c0_1 (a133)) (-. (c2_1 (a133))) (c0_1 (a115)) (-. (c2_1 (a115))) (All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) (ndr1_0) ### DisjTree 34 39 40
% 0.52/0.77 42. (-. (hskp0)) (hskp0) ### P-NotP
% 0.52/0.77 43. ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) (-. (c2_1 (a115))) (c0_1 (a115)) (-. (c2_1 (a133))) (c0_1 (a133)) (c3_1 (a133)) (-. (hskp15)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c3_1 (a124))) (-. (c1_1 (a124))) (-. (c0_1 (a124))) (ndr1_0) ### DisjTree 25 41 42
% 0.52/0.77 44. ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133)))))) (ndr1_0) (-. (c0_1 (a124))) (-. (c1_1 (a124))) (-. (c3_1 (a124))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (hskp15)) (c0_1 (a115)) (-. (c2_1 (a115))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ### ConjTree 43
% 0.52/0.77 45. ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) (-. (hskp15)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c3_1 (a124))) (-. (c1_1 (a124))) (-. (c0_1 (a124))) (ndr1_0) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ### Or 20 44
% 0.52/0.77 46. ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124)))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (hskp15)) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### ConjTree 45
% 0.52/0.77 47. ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) (-. (hskp15)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (ndr1_0) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp1)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ### Or 17 46
% 0.52/0.77 48. (-. (hskp23)) (hskp23) ### P-NotP
% 0.52/0.77 49. (-. (hskp24)) (hskp24) ### P-NotP
% 0.52/0.77 50. (-. (hskp16)) (hskp16) ### P-NotP
% 0.52/0.77 51. ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp16)) (-. (hskp24)) (-. (hskp23)) ### DisjTree 48 49 50
% 0.52/0.77 52. (-. (c0_1 (a153))) (c0_1 (a153)) ### Axiom
% 0.52/0.77 53. (-. (c2_1 (a153))) (c2_1 (a153)) ### Axiom
% 0.52/0.77 54. (c1_1 (a153)) (-. (c1_1 (a153))) ### Axiom
% 0.52/0.77 55. ((ndr1_0) => ((c0_1 (a153)) \/ ((c2_1 (a153)) \/ (-. (c1_1 (a153)))))) (c1_1 (a153)) (-. (c2_1 (a153))) (-. (c0_1 (a153))) (ndr1_0) ### DisjTree 5 52 53 54
% 0.52/0.77 56. (All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) (ndr1_0) (-. (c0_1 (a153))) (-. (c2_1 (a153))) (c1_1 (a153)) ### All 55
% 0.52/0.77 57. (-. (c0_1 (a110))) (c0_1 (a110)) ### Axiom
% 0.52/0.77 58. (c2_1 (a110)) (-. (c2_1 (a110))) ### Axiom
% 0.52/0.77 59. (c3_1 (a110)) (-. (c3_1 (a110))) ### Axiom
% 0.52/0.77 60. ((ndr1_0) => ((c0_1 (a110)) \/ ((-. (c2_1 (a110))) \/ (-. (c3_1 (a110)))))) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) (ndr1_0) ### DisjTree 5 57 58 59
% 0.52/0.77 61. (All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) (ndr1_0) (-. (c0_1 (a110))) (c2_1 (a110)) (c3_1 (a110)) ### All 60
% 0.52/0.77 62. (-. (hskp7)) (hskp7) ### P-NotP
% 0.52/0.77 63. ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) (c1_1 (a153)) (-. (c2_1 (a153))) (-. (c0_1 (a153))) (ndr1_0) ### DisjTree 56 61 62
% 0.52/0.77 64. ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153)))))) (ndr1_0) (-. (c0_1 (a110))) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ### ConjTree 63
% 0.52/0.77 65. ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) (ndr1_0) (-. (hskp23)) (-. (hskp16)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ### Or 51 64
% 0.52/0.77 66. (-. (hskp29)) (hskp29) ### P-NotP
% 0.52/0.77 67. (-. (hskp11)) (hskp11) ### P-NotP
% 0.52/0.77 68. ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) (-. (hskp24)) (-. (hskp29)) ### DisjTree 66 49 67
% 0.52/0.77 69. (-. (c2_1 (a152))) (c2_1 (a152)) ### Axiom
% 0.52/0.77 70. (c0_1 (a152)) (-. (c0_1 (a152))) ### Axiom
% 0.52/0.77 71. (c1_1 (a152)) (-. (c1_1 (a152))) ### Axiom
% 0.52/0.77 72. ((ndr1_0) => ((c2_1 (a152)) \/ ((-. (c0_1 (a152))) \/ (-. (c1_1 (a152)))))) (c1_1 (a152)) (c0_1 (a152)) (-. (c2_1 (a152))) (ndr1_0) ### DisjTree 5 69 70 71
% 0.52/0.77 73. (All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) (ndr1_0) (-. (c2_1 (a152))) (c0_1 (a152)) (c1_1 (a152)) ### All 72
% 0.52/0.77 74. (-. (c2_1 (a133))) (c2_1 (a133)) ### Axiom
% 0.52/0.77 75. (c1_1 (a133)) (-. (c1_1 (a133))) ### Axiom
% 0.52/0.77 76. (c3_1 (a133)) (-. (c3_1 (a133))) ### Axiom
% 0.52/0.77 77. ((ndr1_0) => ((c2_1 (a133)) \/ ((-. (c1_1 (a133))) \/ (-. (c3_1 (a133)))))) (c3_1 (a133)) (c1_1 (a133)) (-. (c2_1 (a133))) (ndr1_0) ### DisjTree 5 74 75 76
% 0.52/0.77 78. (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) (ndr1_0) (-. (c2_1 (a133))) (c1_1 (a133)) (c3_1 (a133)) ### All 77
% 0.52/0.77 79. (-. (c2_1 (a133))) (c2_1 (a133)) ### Axiom
% 0.52/0.77 80. (c3_1 (a133)) (-. (c3_1 (a133))) ### Axiom
% 0.52/0.77 81. ((ndr1_0) => ((c1_1 (a133)) \/ ((c2_1 (a133)) \/ (-. (c3_1 (a133)))))) (c3_1 (a133)) (-. (c2_1 (a133))) (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) (ndr1_0) ### DisjTree 5 78 79 80
% 0.52/0.77 82. (All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) (ndr1_0) (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) (-. (c2_1 (a133))) (c3_1 (a133)) ### All 81
% 0.52/0.77 83. (c0_1 (a165)) (-. (c0_1 (a165))) ### Axiom
% 0.52/0.77 84. (c1_1 (a165)) (-. (c1_1 (a165))) ### Axiom
% 0.52/0.77 85. (c3_1 (a165)) (-. (c3_1 (a165))) ### Axiom
% 0.52/0.77 86. ((ndr1_0) => ((-. (c0_1 (a165))) \/ ((-. (c1_1 (a165))) \/ (-. (c3_1 (a165)))))) (c3_1 (a165)) (c1_1 (a165)) (c0_1 (a165)) (ndr1_0) ### DisjTree 5 83 84 85
% 0.52/0.77 87. (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) (ndr1_0) (c0_1 (a165)) (c1_1 (a165)) (c3_1 (a165)) ### All 86
% 0.52/0.77 88. (c1_1 (a165)) (-. (c1_1 (a165))) ### Axiom
% 0.52/0.77 89. (c2_1 (a165)) (-. (c2_1 (a165))) ### Axiom
% 0.52/0.77 90. ((ndr1_0) => ((c0_1 (a165)) \/ ((-. (c1_1 (a165))) \/ (-. (c2_1 (a165)))))) (c2_1 (a165)) (c3_1 (a165)) (c1_1 (a165)) (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) (ndr1_0) ### DisjTree 5 87 88 89
% 0.52/0.77 91. (All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) (ndr1_0) (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) (c1_1 (a165)) (c3_1 (a165)) (c2_1 (a165)) ### All 90
% 0.52/0.77 92. ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c2_1 (a165)) (c3_1 (a165)) (c1_1 (a165)) (All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) (c1_1 (a152)) (c0_1 (a152)) (-. (c2_1 (a152))) (c3_1 (a133)) (-. (c2_1 (a133))) (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) (ndr1_0) ### DisjTree 82 73 91
% 0.52/0.77 93. (-. (hskp26)) (hskp26) ### P-NotP
% 0.52/0.77 94. ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) (-. (hskp26)) (ndr1_0) (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) (-. (c2_1 (a133))) (c3_1 (a133)) (-. (c2_1 (a152))) (c0_1 (a152)) (c1_1 (a152)) (c1_1 (a165)) (c3_1 (a165)) (c2_1 (a165)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ### DisjTree 92 93 67
% 0.52/0.77 95. ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c2_1 (a165)) (c3_1 (a165)) (c1_1 (a165)) (c3_1 (a133)) (-. (c2_1 (a133))) (-. (hskp26)) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (c1_1 (a152)) (c0_1 (a152)) (-. (c2_1 (a152))) (ndr1_0) ### DisjTree 73 94 91
% 0.52/0.77 96. (c0_1 (a165)) (-. (c0_1 (a165))) ### Axiom
% 0.52/0.77 97. (c2_1 (a165)) (-. (c2_1 (a165))) ### Axiom
% 0.52/0.77 98. (c3_1 (a165)) (-. (c3_1 (a165))) ### Axiom
% 0.52/0.77 99. ((ndr1_0) => ((-. (c0_1 (a165))) \/ ((-. (c2_1 (a165))) \/ (-. (c3_1 (a165)))))) (c3_1 (a165)) (c2_1 (a165)) (c0_1 (a165)) (ndr1_0) ### DisjTree 5 96 97 98
% 0.52/0.77 100. (All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) (ndr1_0) (c0_1 (a165)) (c2_1 (a165)) (c3_1 (a165)) ### All 99
% 0.52/0.77 101. (c1_1 (a165)) (-. (c1_1 (a165))) ### Axiom
% 0.52/0.77 102. (c2_1 (a165)) (-. (c2_1 (a165))) ### Axiom
% 0.52/0.77 103. ((ndr1_0) => ((c0_1 (a165)) \/ ((-. (c1_1 (a165))) \/ (-. (c2_1 (a165)))))) (c1_1 (a165)) (c3_1 (a165)) (c2_1 (a165)) (All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) (ndr1_0) ### DisjTree 5 100 101 102
% 0.52/0.77 104. (All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) (ndr1_0) (All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) (c2_1 (a165)) (c3_1 (a165)) (c1_1 (a165)) ### All 103
% 0.52/0.77 105. ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) (-. (hskp26)) (c1_1 (a165)) (c3_1 (a165)) (c2_1 (a165)) (All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) (ndr1_0) ### DisjTree 104 93 67
% 0.52/0.77 106. ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) (-. (hskp1)) (ndr1_0) (-. (c2_1 (a152))) (c0_1 (a152)) (c1_1 (a152)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) (-. (hskp26)) (-. (c2_1 (a133))) (c3_1 (a133)) (c1_1 (a165)) (c3_1 (a165)) (c2_1 (a165)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ### DisjTree 95 105 2
% 0.52/0.77 107. ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a133)) (-. (c2_1 (a133))) (-. (hskp26)) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (c1_1 (a152)) (c0_1 (a152)) (-. (c2_1 (a152))) (ndr1_0) (-. (hskp1)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ### ConjTree 106
% 0.52/0.77 108. ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) (-. (hskp1)) (ndr1_0) (-. (c2_1 (a152))) (c0_1 (a152)) (c1_1 (a152)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp26)) (-. (c2_1 (a133))) (c3_1 (a133)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp24)) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ### Or 68 107
% 0.52/0.77 109. (c0_1 (a94)) (-. (c0_1 (a94))) ### Axiom
% 0.52/0.77 110. (c1_1 (a94)) (-. (c1_1 (a94))) ### Axiom
% 0.52/0.77 111. (c2_1 (a94)) (-. (c2_1 (a94))) ### Axiom
% 0.52/0.77 112. ((ndr1_0) => ((-. (c0_1 (a94))) \/ ((-. (c1_1 (a94))) \/ (-. (c2_1 (a94)))))) (c2_1 (a94)) (c1_1 (a94)) (c0_1 (a94)) (ndr1_0) ### DisjTree 5 109 110 111
% 0.52/0.77 113. (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))) (ndr1_0) (c0_1 (a94)) (c1_1 (a94)) (c2_1 (a94)) ### All 112
% 0.52/0.77 114. ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (c2_1 (a94)) (c1_1 (a94)) (c0_1 (a94)) (c0_1 (a133)) (ndr1_0) (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) (-. (c2_1 (a133))) (c3_1 (a133)) (-. (c2_1 (a152))) (c0_1 (a152)) (c1_1 (a152)) (c1_1 (a165)) (c3_1 (a165)) (c2_1 (a165)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ### DisjTree 92 39 113
% 0.52/0.77 115. ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c2_1 (a165)) (c3_1 (a165)) (c1_1 (a165)) (c3_1 (a133)) (-. (c2_1 (a133))) (c0_1 (a133)) (c0_1 (a94)) (c1_1 (a94)) (c2_1 (a94)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (c1_1 (a152)) (c0_1 (a152)) (-. (c2_1 (a152))) (ndr1_0) ### DisjTree 73 114 91
% 0.52/0.77 116. (ndr1_0) (-. (c2_1 (a152))) (c0_1 (a152)) (c1_1 (a152)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (c2_1 (a94)) (c1_1 (a94)) (c0_1 (a94)) (c0_1 (a133)) (-. (c2_1 (a133))) (c3_1 (a133)) (c1_1 (a165)) (c3_1 (a165)) (c2_1 (a165)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ### DisjTree 115 39 113
% 0.52/0.77 117. ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a133)) (-. (c2_1 (a133))) (c0_1 (a133)) (c0_1 (a94)) (c1_1 (a94)) (c2_1 (a94)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (c1_1 (a152)) (c0_1 (a152)) (-. (c2_1 (a152))) (ndr1_0) ### ConjTree 116
% 0.52/0.77 118. ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) (ndr1_0) (-. (c2_1 (a152))) (c0_1 (a152)) (c1_1 (a152)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (c2_1 (a94)) (c1_1 (a94)) (c0_1 (a94)) (c0_1 (a133)) (-. (c2_1 (a133))) (c3_1 (a133)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp24)) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ### Or 68 117
% 0.52/0.77 119. ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) (-. (hskp24)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a133)) (-. (c2_1 (a133))) (c0_1 (a133)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (c1_1 (a152)) (c0_1 (a152)) (-. (c2_1 (a152))) (ndr1_0) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ### ConjTree 118
% 0.52/0.77 120. ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (c0_1 (a133)) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) (-. (hskp24)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a133)) (-. (c2_1 (a133))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (c1_1 (a152)) (c0_1 (a152)) (-. (c2_1 (a152))) (ndr1_0) (-. (hskp1)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ### Or 108 119
% 0.52/0.77 121. ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) (-. (hskp1)) (ndr1_0) (-. (c2_1 (a152))) (c0_1 (a152)) (c1_1 (a152)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c2_1 (a133))) (c3_1 (a133)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) (c0_1 (a133)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ### Or 120 64
% 0.52/0.77 122. ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152)))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (c0_1 (a133)) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a133)) (-. (c2_1 (a133))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (ndr1_0) (-. (hskp1)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) (-. (c0_1 (a110))) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ### ConjTree 121
% 0.52/0.77 123. ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) (-. (hskp1)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c2_1 (a133))) (c3_1 (a133)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) (c0_1 (a133)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp16)) (ndr1_0) (-. (c0_1 (a110))) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ### Or 65 122
% 0.52/0.77 124. ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) (ndr1_0) (-. (hskp16)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp1)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ### ConjTree 123
% 0.52/0.77 125. ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) (-. (hskp1)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp16)) (-. (c0_1 (a110))) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (ndr1_0) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ### Or 20 124
% 0.52/0.78 126. (-. (c2_1 (a118))) (c2_1 (a118)) ### Axiom
% 0.52/0.78 127. (-. (c0_1 (a118))) (c0_1 (a118)) ### Axiom
% 0.52/0.78 128. (-. (c2_1 (a118))) (c2_1 (a118)) ### Axiom
% 0.52/0.78 129. (c1_1 (a118)) (-. (c1_1 (a118))) ### Axiom
% 0.52/0.78 130. ((ndr1_0) => ((c0_1 (a118)) \/ ((c2_1 (a118)) \/ (-. (c1_1 (a118)))))) (c1_1 (a118)) (-. (c2_1 (a118))) (-. (c0_1 (a118))) (ndr1_0) ### DisjTree 5 127 128 129
% 0.52/0.78 131. (All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) (ndr1_0) (-. (c0_1 (a118))) (-. (c2_1 (a118))) (c1_1 (a118)) ### All 130
% 0.52/0.78 132. (c1_1 (a118)) (-. (c1_1 (a118))) ### Axiom
% 0.52/0.78 133. ((ndr1_0) => ((c2_1 (a118)) \/ ((-. (c0_1 (a118))) \/ (-. (c1_1 (a118)))))) (c1_1 (a118)) (All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) (-. (c2_1 (a118))) (ndr1_0) ### DisjTree 5 126 131 132
% 0.52/0.78 134. (All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) (ndr1_0) (-. (c2_1 (a118))) (All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) (c1_1 (a118)) ### All 133
% 0.52/0.78 135. (-. (c2_1 (a118))) (c2_1 (a118)) ### Axiom
% 0.52/0.78 136. (-. (c0_1 (a118))) (c0_1 (a118)) ### Axiom
% 0.52/0.78 137. (-. (c3_1 (a118))) (c3_1 (a118)) ### Axiom
% 0.52/0.78 138. (c1_1 (a118)) (-. (c1_1 (a118))) ### Axiom
% 0.52/0.78 139. ((ndr1_0) => ((c0_1 (a118)) \/ ((c3_1 (a118)) \/ (-. (c1_1 (a118)))))) (c1_1 (a118)) (-. (c3_1 (a118))) (-. (c0_1 (a118))) (ndr1_0) ### DisjTree 5 136 137 138
% 0.60/0.78 140. (All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) (ndr1_0) (-. (c0_1 (a118))) (-. (c3_1 (a118))) (c1_1 (a118)) ### All 139
% 0.60/0.78 141. (c1_1 (a118)) (-. (c1_1 (a118))) ### Axiom
% 0.60/0.78 142. ((ndr1_0) => ((c2_1 (a118)) \/ ((-. (c0_1 (a118))) \/ (-. (c1_1 (a118)))))) (c1_1 (a118)) (-. (c3_1 (a118))) (All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) (-. (c2_1 (a118))) (ndr1_0) ### DisjTree 5 135 140 141
% 0.60/0.78 143. (All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) (ndr1_0) (-. (c2_1 (a118))) (All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) (-. (c3_1 (a118))) (c1_1 (a118)) ### All 142
% 0.60/0.78 144. (-. (c0_1 (a116))) (c0_1 (a116)) ### Axiom
% 0.60/0.78 145. (c2_1 (a116)) (-. (c2_1 (a116))) ### Axiom
% 0.60/0.78 146. (c3_1 (a116)) (-. (c3_1 (a116))) ### Axiom
% 0.60/0.78 147. ((ndr1_0) => ((c0_1 (a116)) \/ ((-. (c2_1 (a116))) \/ (-. (c3_1 (a116)))))) (c3_1 (a116)) (c2_1 (a116)) (-. (c0_1 (a116))) (ndr1_0) ### DisjTree 5 144 145 146
% 0.60/0.78 148. (All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) (ndr1_0) (-. (c0_1 (a116))) (c2_1 (a116)) (c3_1 (a116)) ### All 147
% 0.60/0.78 149. (c1_1 (a116)) (-. (c1_1 (a116))) ### Axiom
% 0.60/0.78 150. (c3_1 (a116)) (-. (c3_1 (a116))) ### Axiom
% 0.60/0.78 151. ((ndr1_0) => ((c2_1 (a116)) \/ ((-. (c1_1 (a116))) \/ (-. (c3_1 (a116)))))) (c1_1 (a116)) (c3_1 (a116)) (-. (c0_1 (a116))) (All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) (ndr1_0) ### DisjTree 5 148 149 150
% 0.60/0.78 152. (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) (ndr1_0) (All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) (-. (c0_1 (a116))) (c3_1 (a116)) (c1_1 (a116)) ### All 151
% 0.60/0.78 153. ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c1_1 (a116)) (c3_1 (a116)) (-. (c0_1 (a116))) (All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) (c3_1 (a133)) (c0_1 (a133)) (-. (c2_1 (a133))) (c1_1 (a118)) (-. (c3_1 (a118))) (-. (c2_1 (a118))) (ndr1_0) (All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) ### DisjTree 143 39 152
% 0.60/0.78 154. ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c3_1 (a118))) (-. (c2_1 (a133))) (c0_1 (a133)) (c3_1 (a133)) (-. (c0_1 (a116))) (c3_1 (a116)) (c1_1 (a116)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c1_1 (a118)) (-. (c2_1 (a118))) (ndr1_0) (All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) ### DisjTree 134 153 62
% 0.60/0.78 155. ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) (-. (c2_1 (a118))) (c1_1 (a118)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c1_1 (a116)) (c3_1 (a116)) (-. (c0_1 (a116))) (c3_1 (a133)) (c0_1 (a133)) (-. (c2_1 (a133))) (-. (c3_1 (a118))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (c3_1 (a124))) (-. (c1_1 (a124))) (-. (c0_1 (a124))) (ndr1_0) ### DisjTree 25 154 42
% 0.60/0.78 156. ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133)))))) (ndr1_0) (-. (c0_1 (a124))) (-. (c1_1 (a124))) (-. (c3_1 (a124))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c3_1 (a118))) (-. (c0_1 (a116))) (c3_1 (a116)) (c1_1 (a116)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c1_1 (a118)) (-. (c2_1 (a118))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ### ConjTree 155
% 0.60/0.78 157. ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) (-. (c2_1 (a118))) (c1_1 (a118)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c1_1 (a116)) (c3_1 (a116)) (-. (c0_1 (a116))) (-. (c3_1 (a118))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (c3_1 (a124))) (-. (c1_1 (a124))) (-. (c0_1 (a124))) (ndr1_0) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ### Or 20 156
% 0.60/0.78 158. ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124)))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c3_1 (a118))) (-. (c0_1 (a116))) (c3_1 (a116)) (c1_1 (a116)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c1_1 (a118)) (-. (c2_1 (a118))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### ConjTree 157
% 0.60/0.78 159. ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) (-. (c2_1 (a118))) (c1_1 (a118)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c1_1 (a116)) (c3_1 (a116)) (-. (c0_1 (a116))) (-. (c3_1 (a118))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (ndr1_0) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp1)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ### Or 17 158
% 0.60/0.78 160. ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118)))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) (-. (hskp1)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c0_1 (a116))) (c3_1 (a116)) (c1_1 (a116)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ### ConjTree 159
% 0.60/0.78 161. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c1_1 (a116)) (c3_1 (a116)) (-. (c0_1 (a116))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp1)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### Or 125 160
% 0.60/0.78 162. ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) (-. (hskp1)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (c0_1 (a110))) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (ndr1_0) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 161
% 0.60/0.78 163. ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) (-. (hskp1)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ### Or 47 162
% 0.60/0.78 164. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (ndr1_0) (-. (hskp1)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (c0_1 (a110))) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ### ConjTree 163
% 0.60/0.78 165. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) (ndr1_0) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) (-. (hskp1)) (-. (hskp3)) ((hskp14) \/ ((hskp1) \/ (hskp3))) ### Or 4 164
% 0.60/0.78 166. ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110)))))) ((hskp14) \/ ((hskp1) \/ (hskp3))) (-. (hskp3)) (-. (hskp1)) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### ConjTree 165
% 0.60/0.78 167. ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((hskp14) \/ ((hskp1) \/ (hskp3))) (-. (hskp3)) (-. (hskp1)) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### Or 15 166
% 0.60/0.78 168. (-. (hskp9)) (hskp9) ### P-NotP
% 0.60/0.78 169. (-. (hskp2)) (hskp2) ### P-NotP
% 0.60/0.78 170. ((hskp9) \/ ((hskp14) \/ (hskp2))) (-. (hskp2)) (-. (hskp14)) (-. (hskp9)) ### DisjTree 168 1 169
% 0.60/0.78 171. (-. (c0_1 (a109))) (c0_1 (a109)) ### Axiom
% 0.60/0.78 172. (-. (c3_1 (a109))) (c3_1 (a109)) ### Axiom
% 0.60/0.78 173. (c2_1 (a109)) (-. (c2_1 (a109))) ### Axiom
% 0.60/0.78 174. ((ndr1_0) => ((c0_1 (a109)) \/ ((c3_1 (a109)) \/ (-. (c2_1 (a109)))))) (c2_1 (a109)) (-. (c3_1 (a109))) (-. (c0_1 (a109))) (ndr1_0) ### DisjTree 5 171 172 173
% 0.60/0.78 175. (All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) (ndr1_0) (-. (c0_1 (a109))) (-. (c3_1 (a109))) (c2_1 (a109)) ### All 174
% 0.60/0.78 176. (-. (c0_1 (a109))) (c0_1 (a109)) ### Axiom
% 0.60/0.78 177. (-. (c1_1 (a109))) (c1_1 (a109)) ### Axiom
% 0.60/0.78 178. (-. (c3_1 (a109))) (c3_1 (a109)) ### Axiom
% 0.60/0.78 179. (c2_1 (a109)) (-. (c2_1 (a109))) ### Axiom
% 0.60/0.78 180. ((ndr1_0) => ((c1_1 (a109)) \/ ((c3_1 (a109)) \/ (-. (c2_1 (a109)))))) (c2_1 (a109)) (-. (c3_1 (a109))) (-. (c1_1 (a109))) (ndr1_0) ### DisjTree 5 177 178 179
% 0.60/0.78 181. (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) (ndr1_0) (-. (c1_1 (a109))) (-. (c3_1 (a109))) (c2_1 (a109)) ### All 180
% 0.60/0.78 182. (c2_1 (a109)) (-. (c2_1 (a109))) ### Axiom
% 0.60/0.78 183. ((ndr1_0) => ((c0_1 (a109)) \/ ((-. (c1_1 (a109))) \/ (-. (c2_1 (a109)))))) (c2_1 (a109)) (-. (c3_1 (a109))) (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) (-. (c0_1 (a109))) (ndr1_0) ### DisjTree 5 176 181 182
% 0.60/0.78 184. (All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) (ndr1_0) (-. (c0_1 (a109))) (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) (-. (c3_1 (a109))) (c2_1 (a109)) ### All 183
% 0.60/0.78 185. ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (-. (hskp10)) (All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) (c2_1 (a109)) (-. (c3_1 (a109))) (-. (c0_1 (a109))) (ndr1_0) ### DisjTree 175 184 19
% 0.60/0.78 186. (-. (c0_1 (a116))) (c0_1 (a116)) ### Axiom
% 0.60/0.78 187. (c1_1 (a116)) (-. (c1_1 (a116))) ### Axiom
% 0.60/0.78 188. (c3_1 (a116)) (-. (c3_1 (a116))) ### Axiom
% 0.60/0.78 189. ((ndr1_0) => ((c0_1 (a116)) \/ ((-. (c1_1 (a116))) \/ (-. (c3_1 (a116)))))) (c3_1 (a116)) (c1_1 (a116)) (-. (c0_1 (a116))) (ndr1_0) ### DisjTree 5 186 187 188
% 0.60/0.78 190. (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) (ndr1_0) (-. (c0_1 (a116))) (c1_1 (a116)) (c3_1 (a116)) ### All 189
% 0.60/0.78 191. ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) (c3_1 (a116)) (c1_1 (a116)) (-. (c0_1 (a116))) (-. (hskp10)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (c2_1 (a109)) (-. (c3_1 (a109))) (-. (c0_1 (a109))) (ndr1_0) ### DisjTree 175 185 190
% 0.60/0.78 192. ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116)))))) (ndr1_0) (-. (c0_1 (a109))) (-. (c3_1 (a109))) (c2_1 (a109)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (-. (hskp10)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ### ConjTree 191
% 0.60/0.78 193. ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (c2_1 (a109)) (-. (c3_1 (a109))) (-. (c0_1 (a109))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) (-. (hskp1)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ### Or 47 192
% 0.60/0.78 194. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (ndr1_0) (-. (hskp1)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) (-. (c0_1 (a109))) (-. (c3_1 (a109))) (c2_1 (a109)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ### ConjTree 193
% 0.60/0.78 195. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (c2_1 (a109)) (-. (c3_1 (a109))) (-. (c0_1 (a109))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) (-. (hskp1)) (ndr1_0) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) (-. (hskp9)) (-. (hskp2)) ((hskp9) \/ ((hskp14) \/ (hskp2))) ### Or 170 194
% 0.60/0.78 196. ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109)))))) ((hskp9) \/ ((hskp14) \/ (hskp2))) (-. (hskp2)) (-. (hskp9)) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp1)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### ConjTree 195
% 0.60/0.78 197. ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (-. (hskp9)) (-. (hskp2)) ((hskp9) \/ ((hskp14) \/ (hskp2))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) (-. (hskp5)) (-. (hskp1)) (-. (hskp3)) ((hskp14) \/ ((hskp1) \/ (hskp3))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ### Or 167 196
% 0.60/0.78 198. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) (ndr1_0) (-. (hskp12)) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ### ConjTree 13
% 0.60/0.78 199. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) (-. (hskp5)) (-. (hskp12)) (ndr1_0) (-. (hskp9)) (-. (hskp2)) ((hskp9) \/ ((hskp14) \/ (hskp2))) ### Or 170 198
% 0.60/0.78 200. (-. (c2_1 (a106))) (c2_1 (a106)) ### Axiom
% 0.60/0.78 201. (-. (c0_1 (a106))) (c0_1 (a106)) ### Axiom
% 0.60/0.78 202. (-. (c2_1 (a106))) (c2_1 (a106)) ### Axiom
% 0.60/0.78 203. (c1_1 (a106)) (-. (c1_1 (a106))) ### Axiom
% 0.60/0.78 204. ((ndr1_0) => ((c0_1 (a106)) \/ ((c2_1 (a106)) \/ (-. (c1_1 (a106)))))) (c1_1 (a106)) (-. (c2_1 (a106))) (-. (c0_1 (a106))) (ndr1_0) ### DisjTree 5 201 202 203
% 0.60/0.78 205. (All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) (ndr1_0) (-. (c0_1 (a106))) (-. (c2_1 (a106))) (c1_1 (a106)) ### All 204
% 0.60/0.78 206. (c1_1 (a106)) (-. (c1_1 (a106))) ### Axiom
% 0.60/0.78 207. ((ndr1_0) => ((c2_1 (a106)) \/ ((-. (c0_1 (a106))) \/ (-. (c1_1 (a106)))))) (c1_1 (a106)) (All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) (-. (c2_1 (a106))) (ndr1_0) ### DisjTree 5 200 205 206
% 0.60/0.78 208. (All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) (ndr1_0) (-. (c2_1 (a106))) (All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) (c1_1 (a106)) ### All 207
% 0.60/0.78 209. (-. (c2_1 (a106))) (c2_1 (a106)) ### Axiom
% 0.60/0.78 210. (c1_1 (a106)) (-. (c1_1 (a106))) ### Axiom
% 0.60/0.78 211. (c3_1 (a106)) (-. (c3_1 (a106))) ### Axiom
% 0.60/0.78 212. ((ndr1_0) => ((c2_1 (a106)) \/ ((-. (c1_1 (a106))) \/ (-. (c3_1 (a106)))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) (ndr1_0) ### DisjTree 5 209 210 211
% 0.60/0.78 213. (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) (ndr1_0) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) ### All 212
% 0.60/0.78 214. (c1_1 (a106)) (-. (c1_1 (a106))) ### Axiom
% 0.60/0.78 215. (c3_1 (a106)) (-. (c3_1 (a106))) ### Axiom
% 0.60/0.78 216. ((ndr1_0) => ((-. (c0_1 (a106))) \/ ((-. (c1_1 (a106))) \/ (-. (c3_1 (a106)))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) (All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) (ndr1_0) ### DisjTree 5 205 214 215
% 0.60/0.78 217. (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) (ndr1_0) (All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) ### All 216
% 0.60/0.78 218. ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a106)) (c1_1 (a106)) (All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) (-. (c2_1 (a106))) (ndr1_0) ### DisjTree 208 213 217
% 0.60/0.78 219. ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) (ndr1_0) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ### DisjTree 218 61 62
% 0.60/0.78 220. ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110)))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) (ndr1_0) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ### ConjTree 219
% 0.60/0.78 221. ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp9) \/ ((hskp14) \/ (hskp2))) (-. (hskp2)) (-. (hskp9)) (ndr1_0) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### Or 199 220
% 0.60/0.78 222. ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106)))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) (-. (hskp5)) (-. (hskp9)) (-. (hskp2)) ((hskp9) \/ ((hskp14) \/ (hskp2))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ### ConjTree 221
% 0.60/0.78 223. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((hskp14) \/ ((hskp1) \/ (hskp3))) (-. (hskp3)) (-. (hskp1)) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((hskp9) \/ ((hskp14) \/ (hskp2))) (-. (hskp2)) (-. (hskp9)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### Or 197 222
% 0.60/0.78 224. ((hskp14) \/ ((hskp12) \/ (hskp11))) (-. (hskp11)) (-. (hskp12)) (-. (hskp14)) ### DisjTree 1 11 67
% 0.60/0.78 225. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) (-. (hskp5)) (ndr1_0) (-. (hskp12)) (-. (hskp11)) ((hskp14) \/ ((hskp12) \/ (hskp11))) ### Or 224 198
% 0.60/0.78 226. ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110)))))) ((hskp14) \/ ((hskp1) \/ (hskp3))) (-. (hskp3)) (-. (hskp1)) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (ndr1_0) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### ConjTree 165
% 0.60/0.78 227. ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) (-. (hskp1)) (-. (hskp3)) ((hskp14) \/ ((hskp1) \/ (hskp3))) ((hskp14) \/ ((hskp12) \/ (hskp11))) (-. (hskp11)) (ndr1_0) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### Or 225 226
% 0.60/0.78 228. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (c2_1 (a109)) (-. (c3_1 (a109))) (-. (c0_1 (a109))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) (ndr1_0) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) (-. (hskp1)) (-. (hskp3)) ((hskp14) \/ ((hskp1) \/ (hskp3))) ### Or 4 194
% 0.60/0.78 229. ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109)))))) ((hskp14) \/ ((hskp1) \/ (hskp3))) (-. (hskp3)) (-. (hskp1)) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (ndr1_0) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### ConjTree 228
% 0.60/0.78 230. ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) (-. (hskp5)) (ndr1_0) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((hskp14) \/ ((hskp1) \/ (hskp3))) (-. (hskp3)) (-. (hskp1)) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ### Or 227 229
% 0.60/0.78 231. (-. (c2_1 (a106))) (c2_1 (a106)) ### Axiom
% 0.60/0.78 232. (-. (c0_1 (a106))) (c0_1 (a106)) ### Axiom
% 0.60/0.78 233. (c1_1 (a106)) (-. (c1_1 (a106))) ### Axiom
% 0.60/0.78 234. (c3_1 (a106)) (-. (c3_1 (a106))) ### Axiom
% 0.60/0.78 235. ((ndr1_0) => ((c0_1 (a106)) \/ ((-. (c1_1 (a106))) \/ (-. (c3_1 (a106)))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c0_1 (a106))) (ndr1_0) ### DisjTree 5 232 233 234
% 0.60/0.78 236. (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) (ndr1_0) (-. (c0_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) ### All 235
% 0.60/0.78 237. (c1_1 (a106)) (-. (c1_1 (a106))) ### Axiom
% 0.60/0.78 238. ((ndr1_0) => ((c2_1 (a106)) \/ ((-. (c0_1 (a106))) \/ (-. (c1_1 (a106)))))) (c3_1 (a106)) (c1_1 (a106)) (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) (-. (c2_1 (a106))) (ndr1_0) ### DisjTree 5 231 236 237
% 0.60/0.78 239. (All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) (ndr1_0) (-. (c2_1 (a106))) (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) (c1_1 (a106)) (c3_1 (a106)) ### All 238
% 0.60/0.78 240. (c1_1 (a106)) (-. (c1_1 (a106))) ### Axiom
% 0.60/0.78 241. (c3_1 (a106)) (-. (c3_1 (a106))) ### Axiom
% 0.60/0.78 242. ((ndr1_0) => ((-. (c0_1 (a106))) \/ ((-. (c1_1 (a106))) \/ (-. (c3_1 (a106)))))) (c3_1 (a106)) (c1_1 (a106)) (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) (ndr1_0) ### DisjTree 5 236 240 241
% 0.60/0.78 243. (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) (ndr1_0) (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) (c1_1 (a106)) (c3_1 (a106)) ### All 242
% 0.60/0.78 244. ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a106)) (c1_1 (a106)) (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) (-. (c2_1 (a106))) (ndr1_0) ### DisjTree 239 213 243
% 0.60/0.78 245. (-. (c1_1 (a105))) (c1_1 (a105)) ### Axiom
% 0.60/0.78 246. (-. (c1_1 (a105))) (c1_1 (a105)) ### Axiom
% 0.60/0.78 247. (c2_1 (a105)) (-. (c2_1 (a105))) ### Axiom
% 0.60/0.78 248. (c3_1 (a105)) (-. (c3_1 (a105))) ### Axiom
% 0.60/0.78 249. ((ndr1_0) => ((c1_1 (a105)) \/ ((-. (c2_1 (a105))) \/ (-. (c3_1 (a105)))))) (c3_1 (a105)) (c2_1 (a105)) (-. (c1_1 (a105))) (ndr1_0) ### DisjTree 5 246 247 248
% 0.60/0.78 250. (All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) (ndr1_0) (-. (c1_1 (a105))) (c2_1 (a105)) (c3_1 (a105)) ### All 249
% 0.60/0.78 251. (c0_1 (a105)) (-. (c0_1 (a105))) ### Axiom
% 0.60/0.78 252. ((ndr1_0) => ((c1_1 (a105)) \/ ((c3_1 (a105)) \/ (-. (c0_1 (a105)))))) (c0_1 (a105)) (c2_1 (a105)) (All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) (-. (c1_1 (a105))) (ndr1_0) ### DisjTree 5 245 250 251
% 0.60/0.78 253. (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) (ndr1_0) (-. (c1_1 (a105))) (All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) (c2_1 (a105)) (c0_1 (a105)) ### All 252
% 0.60/0.78 254. (-. (hskp13)) (hskp13) ### P-NotP
% 0.60/0.78 255. ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (-. (hskp13)) (c0_1 (a105)) (c2_1 (a105)) (-. (c1_1 (a105))) (ndr1_0) (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) ### Or 253 254
% 0.60/0.78 256. ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (-. (hskp12)) (-. (c1_1 (a105))) (c2_1 (a105)) (c0_1 (a105)) (-. (hskp13)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (ndr1_0) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ### DisjTree 244 255 11
% 0.60/0.78 257. (-. (c1_1 (a112))) (c1_1 (a112)) ### Axiom
% 0.60/0.78 258. (c0_1 (a112)) (-. (c0_1 (a112))) ### Axiom
% 0.60/0.78 259. (c3_1 (a112)) (-. (c3_1 (a112))) ### Axiom
% 0.60/0.78 260. ((ndr1_0) => ((c1_1 (a112)) \/ ((-. (c0_1 (a112))) \/ (-. (c3_1 (a112)))))) (c3_1 (a112)) (c0_1 (a112)) (-. (c1_1 (a112))) (ndr1_0) ### DisjTree 5 257 258 259
% 0.60/0.78 261. (All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) (ndr1_0) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) ### All 260
% 0.60/0.78 262. (-. (hskp8)) (hskp8) ### P-NotP
% 0.60/0.78 263. ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp8)) (-. (hskp16)) (c3_1 (a112)) (c0_1 (a112)) (-. (c1_1 (a112))) (ndr1_0) ### DisjTree 261 50 262
% 0.60/0.78 264. (-. (c2_1 (a106))) (c2_1 (a106)) ### Axiom
% 0.60/0.78 265. (-. (c0_1 (a106))) (c0_1 (a106)) ### Axiom
% 0.60/0.78 266. (-. (c2_1 (a106))) (c2_1 (a106)) ### Axiom
% 0.60/0.78 267. (c3_1 (a106)) (-. (c3_1 (a106))) ### Axiom
% 0.60/0.78 268. ((ndr1_0) => ((c0_1 (a106)) \/ ((c2_1 (a106)) \/ (-. (c3_1 (a106)))))) (c3_1 (a106)) (-. (c2_1 (a106))) (-. (c0_1 (a106))) (ndr1_0) ### DisjTree 5 265 266 267
% 0.60/0.78 269. (All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) (ndr1_0) (-. (c0_1 (a106))) (-. (c2_1 (a106))) (c3_1 (a106)) ### All 268
% 0.60/0.78 270. (c1_1 (a106)) (-. (c1_1 (a106))) ### Axiom
% 0.60/0.78 271. ((ndr1_0) => ((c2_1 (a106)) \/ ((-. (c0_1 (a106))) \/ (-. (c1_1 (a106)))))) (c1_1 (a106)) (c3_1 (a106)) (All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) (-. (c2_1 (a106))) (ndr1_0) ### DisjTree 5 264 269 270
% 0.60/0.78 272. (All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) (ndr1_0) (-. (c2_1 (a106))) (All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) (c3_1 (a106)) (c1_1 (a106)) ### All 271
% 0.60/0.78 273. (c1_1 (a106)) (-. (c1_1 (a106))) ### Axiom
% 0.60/0.78 274. (c3_1 (a106)) (-. (c3_1 (a106))) ### Axiom
% 0.60/0.78 275. ((ndr1_0) => ((-. (c0_1 (a106))) \/ ((-. (c1_1 (a106))) \/ (-. (c3_1 (a106)))))) (c1_1 (a106)) (c3_1 (a106)) (-. (c2_1 (a106))) (All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) (ndr1_0) ### DisjTree 5 269 273 274
% 0.60/0.78 276. (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) (ndr1_0) (All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) (-. (c2_1 (a106))) (c3_1 (a106)) (c1_1 (a106)) ### All 275
% 0.60/0.78 277. ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c1_1 (a106)) (c3_1 (a106)) (All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) (-. (c2_1 (a106))) (ndr1_0) ### DisjTree 272 213 276
% 0.60/0.78 278. (-. (hskp19)) (hskp19) ### P-NotP
% 0.60/0.78 279. ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) (-. (hskp5)) (-. (hskp19)) (c0_1 (a105)) (c2_1 (a105)) (-. (c1_1 (a105))) (ndr1_0) (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) ### DisjTree 253 278 12
% 0.60/0.78 280. ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (-. (hskp12)) (-. (c1_1 (a105))) (c2_1 (a105)) (c0_1 (a105)) (-. (hskp19)) (-. (hskp5)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) (c3_1 (a106)) (c1_1 (a106)) (ndr1_0) (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) ### DisjTree 243 279 11
% 0.60/0.78 281. ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) (-. (hskp8)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) (-. (hskp5)) (-. (hskp19)) (c0_1 (a105)) (c2_1 (a105)) (-. (c1_1 (a105))) (-. (hskp12)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (ndr1_0) (-. (c2_1 (a106))) (c3_1 (a106)) (c1_1 (a106)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ### DisjTree 277 280 262
% 0.60/0.78 282. (-. (c2_1 (a118))) (c2_1 (a118)) ### Axiom
% 0.60/0.78 283. (-. (c3_1 (a118))) (c3_1 (a118)) ### Axiom
% 0.60/0.78 284. (c1_1 (a118)) (-. (c1_1 (a118))) ### Axiom
% 0.60/0.78 285. ((ndr1_0) => ((c2_1 (a118)) \/ ((c3_1 (a118)) \/ (-. (c1_1 (a118)))))) (c1_1 (a118)) (-. (c3_1 (a118))) (-. (c2_1 (a118))) (ndr1_0) ### DisjTree 5 282 283 284
% 0.60/0.78 286. (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) (ndr1_0) (-. (c2_1 (a118))) (-. (c3_1 (a118))) (c1_1 (a118)) ### All 285
% 0.60/0.78 287. (-. (c3_1 (a127))) (c3_1 (a127)) ### Axiom
% 0.60/0.78 288. (-. (c1_1 (a127))) (c1_1 (a127)) ### Axiom
% 0.60/0.78 289. (-. (c3_1 (a127))) (c3_1 (a127)) ### Axiom
% 0.60/0.78 290. (c0_1 (a127)) (-. (c0_1 (a127))) ### Axiom
% 0.60/0.78 291. ((ndr1_0) => ((c1_1 (a127)) \/ ((c3_1 (a127)) \/ (-. (c0_1 (a127)))))) (c0_1 (a127)) (-. (c3_1 (a127))) (-. (c1_1 (a127))) (ndr1_0) ### DisjTree 5 288 289 290
% 0.60/0.78 292. (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) (ndr1_0) (-. (c1_1 (a127))) (-. (c3_1 (a127))) (c0_1 (a127)) ### All 291
% 0.60/0.78 293. (c2_1 (a127)) (-. (c2_1 (a127))) ### Axiom
% 0.60/0.78 294. ((ndr1_0) => ((c3_1 (a127)) \/ ((-. (c1_1 (a127))) \/ (-. (c2_1 (a127)))))) (c2_1 (a127)) (c0_1 (a127)) (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) (-. (c3_1 (a127))) (ndr1_0) ### DisjTree 5 287 292 293
% 0.60/0.78 295. (All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) (ndr1_0) (-. (c3_1 (a127))) (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) (c0_1 (a127)) (c2_1 (a127)) ### All 294
% 0.60/0.78 296. ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (hskp5)) (c2_1 (a127)) (c0_1 (a127)) (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) (-. (c3_1 (a127))) (c1_1 (a118)) (-. (c3_1 (a118))) (-. (c2_1 (a118))) (ndr1_0) ### DisjTree 286 295 12
% 0.60/0.78 297. ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (-. (hskp12)) (-. (c2_1 (a118))) (-. (c3_1 (a118))) (c1_1 (a118)) (-. (c3_1 (a127))) (c0_1 (a127)) (c2_1 (a127)) (-. (hskp5)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (c3_1 (a106)) (c1_1 (a106)) (ndr1_0) (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) ### DisjTree 243 296 11
% 0.60/0.78 298. ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) (-. (hskp8)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (hskp5)) (c2_1 (a127)) (c0_1 (a127)) (-. (c3_1 (a127))) (c1_1 (a118)) (-. (c3_1 (a118))) (-. (c2_1 (a118))) (-. (hskp12)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (ndr1_0) (-. (c2_1 (a106))) (c3_1 (a106)) (c1_1 (a106)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ### DisjTree 277 297 262
% 0.60/0.78 299. ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127)))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c1_1 (a106)) (c3_1 (a106)) (-. (c2_1 (a106))) (ndr1_0) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (-. (hskp12)) (-. (c2_1 (a118))) (-. (c3_1 (a118))) (c1_1 (a118)) (-. (hskp5)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (hskp8)) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ### ConjTree 298
% 0.60/0.78 300. ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (c1_1 (a118)) (-. (c3_1 (a118))) (-. (c2_1 (a118))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c1_1 (a106)) (c3_1 (a106)) (-. (c2_1 (a106))) (ndr1_0) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (-. (hskp12)) (-. (c1_1 (a105))) (c2_1 (a105)) (c0_1 (a105)) (-. (hskp5)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) (-. (hskp8)) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ### Or 281 299
% 0.60/0.78 301. ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118)))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) (-. (hskp8)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) (-. (hskp5)) (c0_1 (a105)) (c2_1 (a105)) (-. (c1_1 (a105))) (-. (hskp12)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (ndr1_0) (-. (c2_1 (a106))) (c3_1 (a106)) (c1_1 (a106)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ### ConjTree 300
% 0.60/0.78 302. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c1_1 (a106)) (c3_1 (a106)) (-. (c2_1 (a106))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (-. (hskp12)) (-. (c1_1 (a105))) (c2_1 (a105)) (c0_1 (a105)) (-. (hskp5)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) (ndr1_0) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (hskp8)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ### Or 263 301
% 0.60/0.78 303. ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112)))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp8)) (ndr1_0) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) (-. (hskp5)) (c0_1 (a105)) (c2_1 (a105)) (-. (c1_1 (a105))) (-. (hskp12)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (-. (c2_1 (a106))) (c3_1 (a106)) (c1_1 (a106)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 302
% 0.60/0.78 304. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (hskp5)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) (-. (hskp8)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) (ndr1_0) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c0_1 (a105)) (c2_1 (a105)) (-. (c1_1 (a105))) (-. (hskp12)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ### Or 256 303
% 0.60/0.78 305. ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (-. (c1_1 (a105))) (c2_1 (a105)) (c0_1 (a105)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (ndr1_0) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp8)) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) (-. (hskp5)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### Or 304 220
% 0.60/0.78 306. ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106)))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (hskp5)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) (-. (hskp8)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (ndr1_0) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c0_1 (a105)) (c2_1 (a105)) (-. (c1_1 (a105))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ### ConjTree 305
% 0.60/0.78 307. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (-. (c1_1 (a105))) (c2_1 (a105)) (c0_1 (a105)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp8)) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) (-. (hskp1)) (-. (hskp3)) ((hskp14) \/ ((hskp1) \/ (hskp3))) ((hskp14) \/ ((hskp12) \/ (hskp11))) (ndr1_0) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### Or 230 306
% 0.60/0.78 308. ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105)))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) (-. (hskp5)) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((hskp14) \/ ((hskp1) \/ (hskp3))) (-. (hskp3)) (-. (hskp1)) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) (-. (hskp8)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### ConjTree 307
% 0.60/0.78 309. ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp8)) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (-. (hskp2)) ((hskp9) \/ ((hskp14) \/ (hskp2))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) (-. (hskp5)) (-. (hskp1)) (-. (hskp3)) ((hskp14) \/ ((hskp1) \/ (hskp3))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### Or 223 308
% 0.60/0.78 310. (-. (c0_1 (a104))) (c0_1 (a104)) ### Axiom
% 0.60/0.78 311. (-. (c2_1 (a104))) (c2_1 (a104)) ### Axiom
% 0.60/0.78 312. (-. (c3_1 (a104))) (c3_1 (a104)) ### Axiom
% 0.60/0.78 313. ((ndr1_0) => ((c0_1 (a104)) \/ ((c2_1 (a104)) \/ (c3_1 (a104))))) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) (ndr1_0) ### DisjTree 5 310 311 312
% 0.60/0.78 314. (All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) (ndr1_0) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) ### All 313
% 0.60/0.78 315. (-. (hskp6)) (hskp6) ### P-NotP
% 0.60/0.78 316. ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (c1_1 (a118)) (-. (c2_1 (a118))) (All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) (ndr1_0) ### DisjTree 314 134 315
% 0.60/0.78 317. ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (c2_1 (a118))) (c1_1 (a118)) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (c3_1 (a124))) (-. (c1_1 (a124))) (-. (c0_1 (a124))) (ndr1_0) ### DisjTree 25 316 42
% 0.60/0.78 318. ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124)))))) (ndr1_0) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (c1_1 (a118)) (-. (c2_1 (a118))) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ### ConjTree 317
% 0.60/0.78 319. ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (c2_1 (a118))) (c1_1 (a118)) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (ndr1_0) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp1)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ### Or 17 318
% 0.60/0.78 320. ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118)))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) (-. (hskp1)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ### ConjTree 319
% 0.60/0.78 321. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp1)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### Or 125 320
% 0.60/0.78 322. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) (-. (hskp1)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (c0_1 (a110))) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (ndr1_0) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 321
% 0.60/0.78 323. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (ndr1_0) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (-. (hskp1)) (-. (hskp3)) ((hskp14) \/ ((hskp1) \/ (hskp3))) ### Or 4 322
% 0.60/0.78 324. ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110)))))) ((hskp14) \/ ((hskp1) \/ (hskp3))) (-. (hskp3)) (-. (hskp1)) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (ndr1_0) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### ConjTree 323
% 0.60/0.78 325. ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (-. (hskp1)) (-. (hskp3)) ((hskp14) \/ ((hskp1) \/ (hskp3))) ((hskp14) \/ ((hskp12) \/ (hskp11))) (-. (hskp11)) (ndr1_0) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### Or 225 324
% 0.60/0.78 326. ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) (-. (hskp5)) (ndr1_0) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((hskp14) \/ ((hskp1) \/ (hskp3))) (-. (hskp3)) (-. (hskp1)) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ### Or 325 229
% 0.60/0.78 327. ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) (ndr1_0) ### DisjTree 314 218 315
% 0.60/0.78 328. ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106)))))) (ndr1_0) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ### ConjTree 327
% 0.60/0.78 329. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (-. (hskp1)) (-. (hskp3)) ((hskp14) \/ ((hskp1) \/ (hskp3))) ((hskp14) \/ ((hskp12) \/ (hskp11))) (ndr1_0) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### Or 326 328
% 0.60/0.79 330. ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104)))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) (-. (hskp5)) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((hskp14) \/ ((hskp1) \/ (hskp3))) (-. (hskp3)) (-. (hskp1)) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### ConjTree 329
% 0.60/0.79 331. ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((hskp14) \/ ((hskp1) \/ (hskp3))) (-. (hskp3)) (-. (hskp1)) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((hskp9) \/ ((hskp14) \/ (hskp2))) (-. (hskp2)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ### Or 309 330
% 0.60/0.79 332. (-. (c1_1 (a110))) (c1_1 (a110)) ### Axiom
% 0.60/0.79 333. (c2_1 (a110)) (-. (c2_1 (a110))) ### Axiom
% 0.60/0.79 334. (c3_1 (a110)) (-. (c3_1 (a110))) ### Axiom
% 0.60/0.79 335. ((ndr1_0) => ((c1_1 (a110)) \/ ((-. (c2_1 (a110))) \/ (-. (c3_1 (a110)))))) (c3_1 (a110)) (c2_1 (a110)) (-. (c1_1 (a110))) (ndr1_0) ### DisjTree 5 332 333 334
% 0.60/0.79 336. (All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) (ndr1_0) (-. (c1_1 (a110))) (c2_1 (a110)) (c3_1 (a110)) ### All 335
% 0.60/0.79 337. (c2_1 (a110)) (-. (c2_1 (a110))) ### Axiom
% 0.60/0.79 338. (c3_1 (a110)) (-. (c3_1 (a110))) ### Axiom
% 0.60/0.79 339. ((ndr1_0) => ((-. (c1_1 (a110))) \/ ((-. (c2_1 (a110))) \/ (-. (c3_1 (a110)))))) (c3_1 (a110)) (c2_1 (a110)) (All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) (ndr1_0) ### DisjTree 5 336 337 338
% 0.60/0.79 340. (All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) (ndr1_0) (All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) (c2_1 (a110)) (c3_1 (a110)) ### All 339
% 0.60/0.79 341. (-. (hskp22)) (hskp22) ### P-NotP
% 0.60/0.79 342. ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) (-. (hskp22)) (-. (hskp9)) (c3_1 (a110)) (c2_1 (a110)) (All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) (ndr1_0) ### DisjTree 340 168 341
% 0.60/0.79 343. ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (-. (hskp13)) (ndr1_0) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp9)) (-. (hskp22)) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) ### Or 342 254
% 0.60/0.79 344. (-. (c1_1 (a149))) (c1_1 (a149)) ### Axiom
% 0.60/0.79 345. (-. (c1_1 (a149))) (c1_1 (a149)) ### Axiom
% 0.60/0.79 346. (-. (c2_1 (a149))) (c2_1 (a149)) ### Axiom
% 0.60/0.79 347. (c3_1 (a149)) (-. (c3_1 (a149))) ### Axiom
% 0.60/0.79 348. ((ndr1_0) => ((c1_1 (a149)) \/ ((c2_1 (a149)) \/ (-. (c3_1 (a149)))))) (c3_1 (a149)) (-. (c2_1 (a149))) (-. (c1_1 (a149))) (ndr1_0) ### DisjTree 5 345 346 347
% 0.60/0.79 349. (All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) (ndr1_0) (-. (c1_1 (a149))) (-. (c2_1 (a149))) (c3_1 (a149)) ### All 348
% 0.60/0.79 350. (c3_1 (a149)) (-. (c3_1 (a149))) ### Axiom
% 0.60/0.79 351. ((ndr1_0) => ((c1_1 (a149)) \/ ((-. (c2_1 (a149))) \/ (-. (c3_1 (a149)))))) (c3_1 (a149)) (All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) (-. (c1_1 (a149))) (ndr1_0) ### DisjTree 5 344 349 350
% 0.60/0.79 352. (All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) (ndr1_0) (-. (c1_1 (a149))) (All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) (c3_1 (a149)) ### All 351
% 0.60/0.79 353. ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (-. (hskp13)) (c3_1 (a149)) (All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) (-. (c1_1 (a149))) (ndr1_0) ### Or 352 254
% 0.60/0.79 354. (c0_1 (a133)) (-. (c0_1 (a133))) ### Axiom
% 0.60/0.79 355. (c3_1 (a133)) (-. (c3_1 (a133))) ### Axiom
% 0.60/0.79 356. ((ndr1_0) => ((c1_1 (a133)) \/ ((-. (c0_1 (a133))) \/ (-. (c3_1 (a133)))))) (c0_1 (a133)) (c3_1 (a133)) (-. (c2_1 (a133))) (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) (ndr1_0) ### DisjTree 5 78 354 355
% 0.60/0.79 357. (All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) (ndr1_0) (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) (-. (c2_1 (a133))) (c3_1 (a133)) (c0_1 (a133)) ### All 356
% 0.60/0.79 358. ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp8)) (-. (hskp16)) (c0_1 (a133)) (c3_1 (a133)) (-. (c2_1 (a133))) (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) (ndr1_0) ### DisjTree 357 50 262
% 0.60/0.79 359. ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c2_1 (a133))) (c3_1 (a133)) (c0_1 (a133)) (-. (hskp16)) (-. (hskp8)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (c1_1 (a149))) (c3_1 (a149)) (-. (hskp13)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c0_1 (a115)) (-. (c2_1 (a115))) (All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) (ndr1_0) ### DisjTree 34 353 358
% 0.60/0.79 360. ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) (-. (c2_1 (a115))) (c0_1 (a115)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (-. (hskp13)) (c3_1 (a149)) (-. (c1_1 (a149))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp8)) (-. (hskp16)) (c0_1 (a133)) (c3_1 (a133)) (-. (c2_1 (a133))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c3_1 (a124))) (-. (c1_1 (a124))) (-. (c0_1 (a124))) (ndr1_0) ### DisjTree 25 359 42
% 0.60/0.79 361. ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149)))))) (ndr1_0) (-. (c0_1 (a124))) (-. (c1_1 (a124))) (-. (c3_1 (a124))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c2_1 (a133))) (c3_1 (a133)) (c0_1 (a133)) (-. (hskp16)) (-. (hskp8)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp13)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c0_1 (a115)) (-. (c2_1 (a115))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ### ConjTree 360
% 0.60/0.79 362. ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) (-. (c2_1 (a115))) (c0_1 (a115)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp8)) (-. (hskp16)) (c0_1 (a133)) (c3_1 (a133)) (-. (c2_1 (a133))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c3_1 (a124))) (-. (c1_1 (a124))) (-. (c0_1 (a124))) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) (-. (hskp9)) (c3_1 (a110)) (c2_1 (a110)) (ndr1_0) (-. (hskp13)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ### Or 343 361
% 0.60/0.79 363. ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133)))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (-. (hskp13)) (ndr1_0) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp9)) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) (-. (c0_1 (a124))) (-. (c1_1 (a124))) (-. (c3_1 (a124))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp16)) (-. (hskp8)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (c0_1 (a115)) (-. (c2_1 (a115))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ### ConjTree 362
% 0.60/0.79 364. ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp8)) (-. (hskp16)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c3_1 (a124))) (-. (c1_1 (a124))) (-. (c0_1 (a124))) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) (-. (hskp9)) (c3_1 (a110)) (c2_1 (a110)) (-. (hskp13)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (ndr1_0) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ### Or 20 363
% 0.60/0.79 365. ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124)))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (-. (hskp13)) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp9)) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp16)) (-. (hskp8)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### ConjTree 364
% 0.60/0.79 366. ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp8)) (-. (hskp16)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) (-. (hskp9)) (c3_1 (a110)) (c2_1 (a110)) (-. (hskp13)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (ndr1_0) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp1)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ### Or 17 365
% 0.60/0.79 367. ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) (-. (hskp9)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (c1_1 (a118)) (-. (c3_1 (a118))) (-. (c2_1 (a118))) (ndr1_0) (All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) ### DisjTree 143 10 168
% 0.60/0.79 368. ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) (-. (c2_1 (a118))) (-. (c3_1 (a118))) (c1_1 (a118)) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp9)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) (-. (c3_1 (a124))) (-. (c1_1 (a124))) (-. (c0_1 (a124))) (ndr1_0) ### DisjTree 25 367 42
% 0.60/0.79 369. ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124)))))) (ndr1_0) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) (-. (hskp9)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (c1_1 (a118)) (-. (c3_1 (a118))) (-. (c2_1 (a118))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ### ConjTree 368
% 0.60/0.79 370. ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) (-. (c2_1 (a118))) (-. (c3_1 (a118))) (c1_1 (a118)) (-. (hskp9)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) (ndr1_0) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp1)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ### Or 17 369
% 0.60/0.79 371. ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118)))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) (-. (hskp1)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) (-. (hskp9)) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ### ConjTree 370
% 0.60/0.79 372. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) (-. (hskp1)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (-. (hskp13)) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp9)) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp8)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ### Or 366 371
% 0.60/0.79 373. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp8)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) (-. (hskp9)) (c3_1 (a110)) (c2_1 (a110)) (-. (hskp13)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (ndr1_0) (-. (hskp1)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 372
% 0.60/0.79 374. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) (-. (hskp1)) (ndr1_0) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (-. (hskp13)) (c2_1 (a110)) (c3_1 (a110)) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp8)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) (-. (hskp9)) (-. (hskp2)) ((hskp9) \/ ((hskp14) \/ (hskp2))) ### Or 170 373
% 0.60/0.79 375. ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) (-. (hskp14)) (c3_1 (a112)) (c0_1 (a112)) (-. (c1_1 (a112))) (ndr1_0) ### DisjTree 261 1 19
% 0.60/0.79 376. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) (-. (hskp9)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp1)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) (ndr1_0) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (hskp8)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ### Or 263 371
% 0.60/0.79 377. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp8)) (c3_1 (a112)) (c0_1 (a112)) (-. (c1_1 (a112))) (ndr1_0) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) (-. (hskp1)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) (-. (hskp9)) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 376
% 0.60/0.79 378. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) (-. (hskp9)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) (-. (hskp1)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) (-. (hskp8)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (ndr1_0) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ### Or 375 377
% 0.60/0.79 379. ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112)))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp8)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) (-. (hskp1)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) (-. (hskp9)) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### ConjTree 378
% 0.60/0.79 380. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((hskp9) \/ ((hskp14) \/ (hskp2))) (-. (hskp2)) (-. (hskp9)) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp8)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) (c3_1 (a110)) (c2_1 (a110)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (ndr1_0) (-. (hskp1)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### Or 374 379
% 0.60/0.79 381. ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110)))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) (-. (hskp1)) (ndr1_0) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp8)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) (-. (hskp9)) (-. (hskp2)) ((hskp9) \/ ((hskp14) \/ (hskp2))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### ConjTree 380
% 0.60/0.79 382. ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((hskp9) \/ ((hskp14) \/ (hskp2))) (-. (hskp2)) (-. (hskp9)) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp8)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp1)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) (-. (hskp11)) (ndr1_0) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### Or 225 381
% 0.60/0.79 383. ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (hskp3)) ((hskp14) \/ ((hskp1) \/ (hskp3))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) (-. (hskp5)) (ndr1_0) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) (-. (hskp1)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp8)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) (-. (hskp9)) (-. (hskp2)) ((hskp9) \/ ((hskp14) \/ (hskp2))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ### Or 382 229
% 0.60/0.79 384. (-. (c1_1 (a103))) (c1_1 (a103)) ### Axiom
% 0.60/0.79 385. (-. (c3_1 (a103))) (c3_1 (a103)) ### Axiom
% 0.60/0.79 386. (c0_1 (a103)) (-. (c0_1 (a103))) ### Axiom
% 0.60/0.79 387. ((ndr1_0) => ((c1_1 (a103)) \/ ((c3_1 (a103)) \/ (-. (c0_1 (a103)))))) (c0_1 (a103)) (-. (c3_1 (a103))) (-. (c1_1 (a103))) (ndr1_0) ### DisjTree 5 384 385 386
% 0.60/0.79 388. (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) (ndr1_0) (-. (c1_1 (a103))) (-. (c3_1 (a103))) (c0_1 (a103)) ### All 387
% 0.60/0.79 389. ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (-. (hskp12)) (c0_1 (a103)) (-. (c3_1 (a103))) (-. (c1_1 (a103))) (ndr1_0) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ### DisjTree 244 388 11
% 0.60/0.79 390. ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) (c0_1 (a103)) (-. (c3_1 (a103))) (-. (c1_1 (a103))) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) (ndr1_0) (-. (c2_1 (a106))) (c3_1 (a106)) (c1_1 (a106)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ### DisjTree 277 61 388
% 0.60/0.79 391. ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110)))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c1_1 (a106)) (c3_1 (a106)) (-. (c2_1 (a106))) (ndr1_0) (-. (c1_1 (a103))) (-. (c3_1 (a103))) (c0_1 (a103)) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ### ConjTree 390
% 0.60/0.79 392. ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) (ndr1_0) (-. (c1_1 (a103))) (-. (c3_1 (a103))) (c0_1 (a103)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ### Or 389 391
% 0.60/0.79 393. ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106)))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (c0_1 (a103)) (-. (c3_1 (a103))) (-. (c1_1 (a103))) (ndr1_0) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ### ConjTree 392
% 0.60/0.79 394. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (c1_1 (a103))) (-. (c3_1 (a103))) (c0_1 (a103)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((hskp9) \/ ((hskp14) \/ (hskp2))) (-. (hskp2)) (-. (hskp9)) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp8)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp1)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) (ndr1_0) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((hskp14) \/ ((hskp1) \/ (hskp3))) (-. (hskp3)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### Or 383 393
% 0.60/0.79 395. (-. (c1_1 (a105))) (c1_1 (a105)) ### Axiom
% 0.60/0.79 396. (c0_1 (a105)) (-. (c0_1 (a105))) ### Axiom
% 0.60/0.79 397. (c2_1 (a105)) (-. (c2_1 (a105))) ### Axiom
% 0.60/0.79 398. ((ndr1_0) => ((c1_1 (a105)) \/ ((-. (c0_1 (a105))) \/ (-. (c2_1 (a105)))))) (c2_1 (a105)) (c0_1 (a105)) (-. (c1_1 (a105))) (ndr1_0) ### DisjTree 5 395 396 397
% 0.60/0.79 399. (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50)))))) (ndr1_0) (-. (c1_1 (a105))) (c0_1 (a105)) (c2_1 (a105)) ### All 398
% 0.60/0.79 400. ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a105)) (c0_1 (a105)) (-. (c1_1 (a105))) (c0_1 (a103)) (-. (c3_1 (a103))) (-. (c1_1 (a103))) (ndr1_0) ### Or 388 399
% 0.60/0.79 401. ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105)))))) (ndr1_0) (-. (c1_1 (a103))) (-. (c3_1 (a103))) (c0_1 (a103)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ### ConjTree 400
% 0.60/0.79 402. ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (hskp3)) ((hskp14) \/ ((hskp1) \/ (hskp3))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) (-. (hskp5)) (ndr1_0) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) (-. (hskp1)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp8)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) (-. (hskp2)) ((hskp9) \/ ((hskp14) \/ (hskp2))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (c0_1 (a103)) (-. (c3_1 (a103))) (-. (c1_1 (a103))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### Or 394 401
% 0.60/0.79 403. ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (c1_1 (a153)) (-. (c2_1 (a153))) (-. (c0_1 (a153))) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) (ndr1_0) ### DisjTree 314 56 315
% 0.60/0.79 404. ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153)))))) (ndr1_0) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ### ConjTree 403
% 0.60/0.79 405. ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) (ndr1_0) (-. (hskp23)) (-. (hskp16)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ### Or 51 404
% 0.60/0.79 406. ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) (-. (hskp6)) (c1_1 (a152)) (c0_1 (a152)) (-. (c2_1 (a152))) (ndr1_0) ### DisjTree 73 315 3
% 0.60/0.79 407. ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152)))))) (ndr1_0) (-. (hskp6)) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ### ConjTree 406
% 0.60/0.79 408. ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp16)) (ndr1_0) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ### Or 405 407
% 0.60/0.79 409. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) (-. (hskp9)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp1)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) (ndr1_0) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ### Or 408 371
% 0.60/0.79 410. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) ((hskp23) \/ ((hskp24) \/ (hskp16))) (ndr1_0) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) (-. (hskp1)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) (-. (hskp9)) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 409
% 0.60/0.79 411. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) (-. (hskp9)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) (ndr1_0) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) (-. (hskp1)) (-. (hskp3)) ((hskp14) \/ ((hskp1) \/ (hskp3))) ### Or 4 410
% 0.60/0.79 412. ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c0_1 (a103)) (-. (c3_1 (a103))) (-. (c1_1 (a103))) ((hskp14) \/ ((hskp1) \/ (hskp3))) (-. (hskp3)) (-. (hskp1)) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (ndr1_0) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### Or 411 401
% 0.60/0.79 413. ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104)))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (ndr1_0) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) (-. (hskp1)) (-. (hskp3)) ((hskp14) \/ ((hskp1) \/ (hskp3))) (-. (c1_1 (a103))) (-. (c3_1 (a103))) (c0_1 (a103)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ### ConjTree 412
% 0.60/0.79 414. ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (c1_1 (a103))) (-. (c3_1 (a103))) (c0_1 (a103)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((hskp9) \/ ((hskp14) \/ (hskp2))) (-. (hskp2)) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp1)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) (ndr1_0) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((hskp14) \/ ((hskp1) \/ (hskp3))) (-. (hskp3)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ### Or 402 413
% 0.60/0.79 415. ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103)))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (hskp3)) ((hskp14) \/ ((hskp1) \/ (hskp3))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) (-. (hskp5)) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) (-. (hskp1)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) (-. (hskp2)) ((hskp9) \/ ((hskp14) \/ (hskp2))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ### ConjTree 414
% 0.60/0.79 416. ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (-. (hskp2)) ((hskp9) \/ ((hskp14) \/ (hskp2))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) (-. (hskp5)) (-. (hskp1)) (-. (hskp3)) ((hskp14) \/ ((hskp1) \/ (hskp3))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ### Or 331 415
% 0.60/0.79 417. (-. (c3_1 (a102))) (c3_1 (a102)) ### Axiom
% 0.60/0.79 418. (c1_1 (a102)) (-. (c1_1 (a102))) ### Axiom
% 0.60/0.79 419. (c2_1 (a102)) (-. (c2_1 (a102))) ### Axiom
% 0.60/0.79 420. ((ndr1_0) => ((c3_1 (a102)) \/ ((-. (c1_1 (a102))) \/ (-. (c2_1 (a102)))))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) (ndr1_0) ### DisjTree 5 417 418 419
% 0.60/0.79 421. (All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) (ndr1_0) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ### All 420
% 0.60/0.79 422. ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (hskp5)) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) (c1_1 (a118)) (-. (c3_1 (a118))) (-. (c2_1 (a118))) (ndr1_0) ### DisjTree 286 421 12
% 0.60/0.79 423. ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118)))))) (ndr1_0) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) (-. (hskp5)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ### ConjTree 422
% 0.60/0.79 424. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (hskp5)) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp1)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### Or 125 423
% 0.60/0.79 425. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) (-. (hskp1)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (c0_1 (a110))) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (ndr1_0) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) (-. (hskp5)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 424
% 0.60/0.79 426. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (hskp5)) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (ndr1_0) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (-. (hskp1)) (-. (hskp3)) ((hskp14) \/ ((hskp1) \/ (hskp3))) ### Or 4 425
% 0.60/0.79 427. ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110)))))) ((hskp14) \/ ((hskp1) \/ (hskp3))) (-. (hskp3)) (-. (hskp1)) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (ndr1_0) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) (-. (hskp5)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### ConjTree 426
% 0.60/0.79 428. ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (-. (hskp1)) (-. (hskp3)) ((hskp14) \/ ((hskp1) \/ (hskp3))) ((hskp14) \/ ((hskp12) \/ (hskp11))) (-. (hskp11)) (ndr1_0) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### Or 225 427
% 0.60/0.79 429. ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) (-. (hskp5)) (ndr1_0) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((hskp14) \/ ((hskp1) \/ (hskp3))) (-. (hskp3)) (-. (hskp1)) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ### Or 428 229
% 0.60/0.79 430. ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106)))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) (-. (hskp5)) (ndr1_0) (-. (hskp9)) (-. (hskp2)) ((hskp9) \/ ((hskp14) \/ (hskp2))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ### ConjTree 221
% 0.60/0.79 431. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((hskp9) \/ ((hskp14) \/ (hskp2))) (-. (hskp2)) (-. (hskp9)) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (-. (hskp1)) (-. (hskp3)) ((hskp14) \/ ((hskp1) \/ (hskp3))) ((hskp14) \/ ((hskp12) \/ (hskp11))) (ndr1_0) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### Or 429 430
% 0.60/0.79 432. ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) (-. (hskp11)) (ndr1_0) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### Or 225 220
% 0.60/0.79 433. (-. (c3_1 (a102))) (c3_1 (a102)) ### Axiom
% 0.60/0.79 434. (-. (c0_1 (a102))) (c0_1 (a102)) ### Axiom
% 0.60/0.79 435. (c1_1 (a102)) (-. (c1_1 (a102))) ### Axiom
% 0.60/0.79 436. (c2_1 (a102)) (-. (c2_1 (a102))) ### Axiom
% 0.60/0.79 437. ((ndr1_0) => ((c0_1 (a102)) \/ ((-. (c1_1 (a102))) \/ (-. (c2_1 (a102)))))) (c2_1 (a102)) (c1_1 (a102)) (-. (c0_1 (a102))) (ndr1_0) ### DisjTree 5 434 435 436
% 0.60/0.79 438. (All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) (ndr1_0) (-. (c0_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ### All 437
% 0.60/0.79 439. (c1_1 (a102)) (-. (c1_1 (a102))) ### Axiom
% 0.60/0.79 440. ((ndr1_0) => ((c3_1 (a102)) \/ ((-. (c0_1 (a102))) \/ (-. (c1_1 (a102)))))) (c2_1 (a102)) (c1_1 (a102)) (All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) (-. (c3_1 (a102))) (ndr1_0) ### DisjTree 5 433 438 439
% 0.60/0.79 441. (All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) (ndr1_0) (-. (c3_1 (a102))) (All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) (c1_1 (a102)) (c2_1 (a102)) ### All 440
% 0.60/0.79 442. ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (hskp16)) (c2_1 (a102)) (c1_1 (a102)) (All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) (-. (c3_1 (a102))) (c3_1 (a112)) (c0_1 (a112)) (-. (c1_1 (a112))) (ndr1_0) ### DisjTree 261 441 50
% 0.60/0.79 443. ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) (-. (hskp16)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c2_1 (a109)) (-. (c3_1 (a109))) (-. (c0_1 (a109))) (ndr1_0) ### DisjTree 175 442 244
% 0.60/0.79 444. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (hskp5)) (ndr1_0) (-. (c0_1 (a109))) (-. (c3_1 (a109))) (c2_1 (a109)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) (c3_1 (a112)) (c0_1 (a112)) (-. (c1_1 (a112))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ### Or 443 423
% 0.60/0.79 445. ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112)))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c2_1 (a109)) (-. (c3_1 (a109))) (-. (c0_1 (a109))) (ndr1_0) (-. (hskp5)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 444
% 0.60/0.79 446. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (hskp5)) (-. (c0_1 (a109))) (-. (c3_1 (a109))) (c2_1 (a109)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) (ndr1_0) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c0_1 (a105)) (c2_1 (a105)) (-. (c1_1 (a105))) (-. (hskp12)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ### Or 256 445
% 0.60/0.79 447. ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (-. (c1_1 (a105))) (c2_1 (a105)) (c0_1 (a105)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (ndr1_0) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c2_1 (a109)) (-. (c3_1 (a109))) (-. (c0_1 (a109))) (-. (hskp5)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### Or 446 220
% 0.60/0.79 448. ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109)))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (hskp5)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) (ndr1_0) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c0_1 (a105)) (c2_1 (a105)) (-. (c1_1 (a105))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ### ConjTree 447
% 0.60/0.79 449. ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (-. (c1_1 (a105))) (c2_1 (a105)) (c0_1 (a105)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) (-. (hskp5)) (ndr1_0) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ### Or 432 448
% 0.60/0.79 450. ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106)))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) (ndr1_0) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c0_1 (a105)) (c2_1 (a105)) (-. (c1_1 (a105))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### ConjTree 449
% 0.60/0.79 451. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (-. (c1_1 (a105))) (c2_1 (a105)) (c0_1 (a105)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (-. (hskp1)) (-. (hskp3)) ((hskp14) \/ ((hskp1) \/ (hskp3))) ((hskp14) \/ ((hskp12) \/ (hskp11))) (ndr1_0) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### Or 429 450
% 0.60/0.79 452. ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105)))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) (-. (hskp5)) (ndr1_0) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((hskp14) \/ ((hskp1) \/ (hskp3))) (-. (hskp3)) (-. (hskp1)) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### ConjTree 451
% 0.60/0.80 453. ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) (-. (hskp5)) (ndr1_0) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((hskp14) \/ ((hskp1) \/ (hskp3))) (-. (hskp3)) (-. (hskp1)) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) (-. (hskp2)) ((hskp9) \/ ((hskp14) \/ (hskp2))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### Or 431 452
% 0.60/0.80 454. (-. (c3_1 (a102))) (c3_1 (a102)) ### Axiom
% 0.60/0.80 455. (-. (c0_1 (a102))) (c0_1 (a102)) ### Axiom
% 0.60/0.80 456. (-. (c3_1 (a102))) (c3_1 (a102)) ### Axiom
% 0.60/0.80 457. (c2_1 (a102)) (-. (c2_1 (a102))) ### Axiom
% 0.60/0.80 458. ((ndr1_0) => ((c0_1 (a102)) \/ ((c3_1 (a102)) \/ (-. (c2_1 (a102)))))) (c2_1 (a102)) (-. (c3_1 (a102))) (-. (c0_1 (a102))) (ndr1_0) ### DisjTree 5 455 456 457
% 0.60/0.80 459. (All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) (ndr1_0) (-. (c0_1 (a102))) (-. (c3_1 (a102))) (c2_1 (a102)) ### All 458
% 0.60/0.80 460. (c1_1 (a102)) (-. (c1_1 (a102))) ### Axiom
% 0.60/0.80 461. ((ndr1_0) => ((c3_1 (a102)) \/ ((-. (c0_1 (a102))) \/ (-. (c1_1 (a102)))))) (c1_1 (a102)) (c2_1 (a102)) (All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) (-. (c3_1 (a102))) (ndr1_0) ### DisjTree 5 454 459 460
% 0.60/0.80 462. (All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) (ndr1_0) (-. (c3_1 (a102))) (All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) (c2_1 (a102)) (c1_1 (a102)) ### All 461
% 0.60/0.80 463. ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (hskp16)) (c1_1 (a102)) (c2_1 (a102)) (All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) (-. (c3_1 (a102))) (c0_1 (a133)) (c3_1 (a133)) (-. (c2_1 (a133))) (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) (ndr1_0) ### DisjTree 357 462 50
% 0.60/0.80 464. ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c2_1 (a133))) (c3_1 (a133)) (c0_1 (a133)) (-. (c3_1 (a102))) (All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) (c2_1 (a102)) (c1_1 (a102)) (-. (hskp16)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (c1_1 (a149))) (c3_1 (a149)) (-. (hskp13)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c0_1 (a115)) (-. (c2_1 (a115))) (All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) (ndr1_0) ### DisjTree 34 353 463
% 0.60/0.80 465. ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (hskp16)) (c2_1 (a102)) (c1_1 (a102)) (All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) (-. (c3_1 (a102))) (c0_1 (a133)) (c3_1 (a133)) (-. (c2_1 (a133))) (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) (ndr1_0) ### DisjTree 357 441 50
% 0.60/0.80 466. ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c2_1 (a133))) (c3_1 (a133)) (c0_1 (a133)) (-. (c3_1 (a102))) (All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) (c1_1 (a102)) (c2_1 (a102)) (-. (hskp16)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (c1_1 (a149))) (c3_1 (a149)) (-. (hskp13)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c0_1 (a115)) (-. (c2_1 (a115))) (All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) (ndr1_0) ### DisjTree 34 353 465
% 0.60/0.80 467. ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) (c3_1 (a116)) (c1_1 (a116)) (-. (c0_1 (a116))) (ndr1_0) (All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) (-. (c2_1 (a115))) (c0_1 (a115)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (-. (hskp13)) (c3_1 (a149)) (-. (c1_1 (a149))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (hskp16)) (c1_1 (a102)) (c2_1 (a102)) (-. (c3_1 (a102))) (c0_1 (a133)) (c3_1 (a133)) (-. (c2_1 (a133))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ### DisjTree 464 466 190
% 0.60/0.80 468. ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c2_1 (a133))) (c3_1 (a133)) (c0_1 (a133)) (-. (c3_1 (a102))) (c2_1 (a102)) (c1_1 (a102)) (-. (hskp16)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (c1_1 (a149))) (c3_1 (a149)) (-. (hskp13)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c0_1 (a115)) (-. (c2_1 (a115))) (-. (c0_1 (a116))) (c1_1 (a116)) (c3_1 (a116)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) (-. (c3_1 (a124))) (-. (c1_1 (a124))) (-. (c0_1 (a124))) (ndr1_0) ### DisjTree 25 467 42
% 0.60/0.80 469. ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149)))))) (ndr1_0) (-. (c0_1 (a124))) (-. (c1_1 (a124))) (-. (c3_1 (a124))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) (c3_1 (a116)) (c1_1 (a116)) (-. (c0_1 (a116))) (-. (c2_1 (a115))) (c0_1 (a115)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (-. (hskp13)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (hskp16)) (c1_1 (a102)) (c2_1 (a102)) (-. (c3_1 (a102))) (c0_1 (a133)) (c3_1 (a133)) (-. (c2_1 (a133))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ### ConjTree 468
% 0.60/0.80 470. ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c2_1 (a133))) (c3_1 (a133)) (c0_1 (a133)) (-. (c3_1 (a102))) (c2_1 (a102)) (c1_1 (a102)) (-. (hskp16)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c0_1 (a115)) (-. (c2_1 (a115))) (-. (c0_1 (a116))) (c1_1 (a116)) (c3_1 (a116)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) (-. (c3_1 (a124))) (-. (c1_1 (a124))) (-. (c0_1 (a124))) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) (-. (hskp9)) (c3_1 (a110)) (c2_1 (a110)) (ndr1_0) (-. (hskp13)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ### Or 343 469
% 0.60/0.80 471. ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133)))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (-. (hskp13)) (ndr1_0) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp9)) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) (-. (c0_1 (a124))) (-. (c1_1 (a124))) (-. (c3_1 (a124))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) (c3_1 (a116)) (c1_1 (a116)) (-. (c0_1 (a116))) (-. (c2_1 (a115))) (c0_1 (a115)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (hskp16)) (c1_1 (a102)) (c2_1 (a102)) (-. (c3_1 (a102))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ### ConjTree 470
% 0.60/0.80 472. ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c3_1 (a102))) (c2_1 (a102)) (c1_1 (a102)) (-. (hskp16)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (c0_1 (a116))) (c1_1 (a116)) (c3_1 (a116)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) (-. (c3_1 (a124))) (-. (c1_1 (a124))) (-. (c0_1 (a124))) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) (-. (hskp9)) (c3_1 (a110)) (c2_1 (a110)) (-. (hskp13)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (ndr1_0) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ### Or 20 471
% 0.60/0.80 473. ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124)))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (-. (hskp13)) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp9)) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) (c3_1 (a116)) (c1_1 (a116)) (-. (c0_1 (a116))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (hskp16)) (c1_1 (a102)) (c2_1 (a102)) (-. (c3_1 (a102))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### ConjTree 472
% 0.60/0.80 474. ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c3_1 (a102))) (c2_1 (a102)) (c1_1 (a102)) (-. (hskp16)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (c0_1 (a116))) (c1_1 (a116)) (c3_1 (a116)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) (-. (hskp9)) (c3_1 (a110)) (c2_1 (a110)) (-. (hskp13)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (ndr1_0) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp1)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ### Or 17 473
% 0.60/0.80 475. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) (-. (hskp1)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (-. (hskp13)) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp9)) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) (c3_1 (a116)) (c1_1 (a116)) (-. (c0_1 (a116))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c1_1 (a102)) (c2_1 (a102)) (-. (c3_1 (a102))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ### Or 474 423
% 0.60/0.80 476. ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116)))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c3_1 (a102))) (c2_1 (a102)) (c1_1 (a102)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) (-. (hskp9)) (c3_1 (a110)) (c2_1 (a110)) (-. (hskp13)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (ndr1_0) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp1)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) (-. (hskp5)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 475
% 0.60/0.80 477. ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (hskp5)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (-. (hskp13)) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp9)) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c1_1 (a102)) (c2_1 (a102)) (-. (c3_1 (a102))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) (-. (hskp1)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ### Or 47 476
% 0.60/0.80 478. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (ndr1_0) (-. (hskp1)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c3_1 (a102))) (c2_1 (a102)) (c1_1 (a102)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) (-. (hskp9)) (c3_1 (a110)) (c2_1 (a110)) (-. (hskp13)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (-. (hskp5)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ### ConjTree 477
% 0.60/0.80 479. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (hskp5)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (-. (hskp13)) (c2_1 (a110)) (c3_1 (a110)) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c1_1 (a102)) (c2_1 (a102)) (-. (c3_1 (a102))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) (-. (hskp1)) (ndr1_0) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) (-. (hskp9)) (-. (hskp2)) ((hskp9) \/ ((hskp14) \/ (hskp2))) ### Or 170 478
% 0.60/0.80 480. ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) (-. (hskp26)) (ndr1_0) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) (-. (hskp16)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ### DisjTree 442 93 67
% 0.60/0.80 481. ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (c2_1 (a94)) (c1_1 (a94)) (c0_1 (a94)) (c3_1 (a133)) (c0_1 (a133)) (-. (c2_1 (a133))) (ndr1_0) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) (-. (hskp16)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ### DisjTree 442 39 113
% 0.60/0.80 482. ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (hskp16)) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) (c3_1 (a112)) (c0_1 (a112)) (-. (c1_1 (a112))) (ndr1_0) (-. (c2_1 (a133))) (c0_1 (a133)) (c3_1 (a133)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ### ConjTree 481
% 0.60/0.80 483. ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (c3_1 (a133)) (c0_1 (a133)) (-. (c2_1 (a133))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (hskp16)) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) (c3_1 (a112)) (c0_1 (a112)) (-. (c1_1 (a112))) (ndr1_0) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ### Or 480 482
% 0.60/0.80 484. ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) (ndr1_0) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) (-. (hskp16)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ### ConjTree 483
% 0.60/0.80 485. ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (hskp16)) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) (c3_1 (a112)) (c0_1 (a112)) (-. (c1_1 (a112))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (ndr1_0) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ### Or 20 484
% 0.60/0.80 486. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) (-. (hskp9)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) (-. (hskp1)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### Or 485 371
% 0.60/0.80 487. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) (c3_1 (a112)) (c0_1 (a112)) (-. (c1_1 (a112))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (ndr1_0) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) (-. (hskp1)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) (-. (hskp9)) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 486
% 0.60/0.80 488. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) (-. (hskp9)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) (-. (hskp1)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (ndr1_0) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ### Or 375 487
% 0.60/0.80 489. ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112)))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) (ndr1_0) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) (-. (hskp1)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) (-. (hskp9)) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### ConjTree 488
% 0.60/0.80 490. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((hskp9) \/ ((hskp14) \/ (hskp2))) (-. (hskp2)) (-. (hskp9)) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (ndr1_0) (-. (hskp1)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c3_1 (a102))) (c2_1 (a102)) (c1_1 (a102)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) (c3_1 (a110)) (c2_1 (a110)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (-. (hskp5)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### Or 479 489
% 0.60/0.80 491. ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110)))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (hskp5)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c1_1 (a102)) (c2_1 (a102)) (-. (c3_1 (a102))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) (-. (hskp1)) (ndr1_0) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) (-. (hskp9)) (-. (hskp2)) ((hskp9) \/ ((hskp14) \/ (hskp2))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### ConjTree 490
% 0.60/0.80 492. ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((hskp9) \/ ((hskp14) \/ (hskp2))) (-. (hskp2)) (-. (hskp9)) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp1)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c3_1 (a102))) (c2_1 (a102)) (c1_1 (a102)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) (-. (hskp11)) (ndr1_0) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### Or 225 491
% 0.60/0.80 493. ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (-. (hskp3)) ((hskp14) \/ ((hskp1) \/ (hskp3))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) (-. (hskp5)) (ndr1_0) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c1_1 (a102)) (c2_1 (a102)) (-. (c3_1 (a102))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) (-. (hskp1)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) (-. (hskp9)) (-. (hskp2)) ((hskp9) \/ ((hskp14) \/ (hskp2))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ### Or 492 229
% 0.60/0.80 494. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (c1_1 (a103))) (-. (c3_1 (a103))) (c0_1 (a103)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((hskp9) \/ ((hskp14) \/ (hskp2))) (-. (hskp2)) (-. (hskp9)) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp1)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c3_1 (a102))) (c2_1 (a102)) (c1_1 (a102)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) (ndr1_0) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((hskp14) \/ ((hskp1) \/ (hskp3))) (-. (hskp3)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### Or 493 393
% 0.60/0.80 495. ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (-. (hskp3)) ((hskp14) \/ ((hskp1) \/ (hskp3))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) (-. (hskp5)) (ndr1_0) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c1_1 (a102)) (c2_1 (a102)) (-. (c3_1 (a102))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) (-. (hskp1)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) (-. (hskp2)) ((hskp9) \/ ((hskp14) \/ (hskp2))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (c0_1 (a103)) (-. (c3_1 (a103))) (-. (c1_1 (a103))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### Or 494 401
% 0.60/0.80 496. ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103)))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((hskp9) \/ ((hskp14) \/ (hskp2))) (-. (hskp2)) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp1)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c3_1 (a102))) (c2_1 (a102)) (c1_1 (a102)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) (ndr1_0) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((hskp14) \/ ((hskp1) \/ (hskp3))) (-. (hskp3)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ### ConjTree 495
% 0.60/0.80 497. ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((hskp9) \/ ((hskp14) \/ (hskp2))) (-. (hskp2)) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (-. (hskp1)) (-. (hskp3)) ((hskp14) \/ ((hskp1) \/ (hskp3))) ((hskp14) \/ ((hskp12) \/ (hskp11))) (ndr1_0) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ### Or 453 496
% 0.60/0.80 498. ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102)))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) (-. (hskp5)) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((hskp14) \/ ((hskp1) \/ (hskp3))) (-. (hskp3)) (-. (hskp1)) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) (-. (hskp2)) ((hskp9) \/ ((hskp14) \/ (hskp2))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ### ConjTree 497
% 0.60/0.80 499. ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((hskp14) \/ ((hskp1) \/ (hskp3))) (-. (hskp3)) (-. (hskp1)) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((hskp9) \/ ((hskp14) \/ (hskp2))) (-. (hskp2)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ### Or 416 498
% 0.60/0.80 500. (-. (c1_1 (a101))) (c1_1 (a101)) ### Axiom
% 0.60/0.80 501. (-. (c2_1 (a101))) (c2_1 (a101)) ### Axiom
% 0.60/0.80 502. (c3_1 (a101)) (-. (c3_1 (a101))) ### Axiom
% 0.60/0.80 503. ((ndr1_0) => ((c1_1 (a101)) \/ ((c2_1 (a101)) \/ (-. (c3_1 (a101)))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) ### DisjTree 5 500 501 502
% 0.60/0.80 504. (All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) (ndr1_0) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ### All 503
% 0.60/0.80 505. (c0_1 (a133)) (-. (c0_1 (a133))) ### Axiom
% 0.60/0.80 506. (-. (c1_1 (a133))) (c1_1 (a133)) ### Axiom
% 0.60/0.80 507. (-. (c2_1 (a133))) (c2_1 (a133)) ### Axiom
% 0.60/0.80 508. (c0_1 (a133)) (-. (c0_1 (a133))) ### Axiom
% 0.60/0.80 509. ((ndr1_0) => ((c1_1 (a133)) \/ ((c2_1 (a133)) \/ (-. (c0_1 (a133)))))) (c0_1 (a133)) (-. (c2_1 (a133))) (-. (c1_1 (a133))) (ndr1_0) ### DisjTree 5 506 507 508
% 0.60/0.80 510. (All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) (ndr1_0) (-. (c1_1 (a133))) (-. (c2_1 (a133))) (c0_1 (a133)) ### All 509
% 0.60/0.80 511. (c3_1 (a133)) (-. (c3_1 (a133))) ### Axiom
% 0.60/0.80 512. ((ndr1_0) => ((-. (c0_1 (a133))) \/ ((-. (c1_1 (a133))) \/ (-. (c3_1 (a133)))))) (c3_1 (a133)) (-. (c2_1 (a133))) (All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) (c0_1 (a133)) (ndr1_0) ### DisjTree 5 505 510 511
% 0.60/0.80 513. (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) (ndr1_0) (c0_1 (a133)) (All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) (-. (c2_1 (a133))) (c3_1 (a133)) ### All 512
% 0.60/0.80 514. ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a133)) (-. (c2_1 (a133))) (c0_1 (a133)) (c0_1 (a115)) (-. (c2_1 (a115))) (All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) ### DisjTree 504 34 513
% 0.60/0.80 515. ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c0_1 (a133)) (c0_1 (a115)) (-. (c2_1 (a115))) (All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) (c3_1 (a133)) (-. (c2_1 (a133))) (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) (ndr1_0) ### DisjTree 82 34 513
% 0.60/0.80 516. ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (hskp15)) (ndr1_0) (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) (-. (c2_1 (a133))) (c3_1 (a133)) (-. (c2_1 (a115))) (c0_1 (a115)) (c0_1 (a133)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ### DisjTree 515 39 40
% 0.60/0.80 517. ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp15)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (ndr1_0) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a115))) (c0_1 (a115)) (c0_1 (a133)) (-. (c2_1 (a133))) (c3_1 (a133)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ### DisjTree 514 504 516
% 0.60/0.80 518. ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c0_1 (a115)) (-. (c2_1 (a115))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (hskp15)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ### ConjTree 517
% 0.60/0.80 519. ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp15)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (ndr1_0) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ### Or 20 518
% 0.60/0.80 520. (-. (hskp18)) (hskp18) ### P-NotP
% 0.60/0.80 521. ((hskp18) \/ ((hskp19) \/ (hskp13))) (-. (hskp13)) (-. (hskp19)) (-. (hskp18)) ### DisjTree 520 278 254
% 0.60/0.80 522. (-. (hskp28)) (hskp28) ### P-NotP
% 0.60/0.80 523. ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp18)) (-. (hskp28)) (c2_1 (a127)) (c0_1 (a127)) (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) (-. (c3_1 (a127))) (ndr1_0) ### DisjTree 295 522 520
% 0.60/0.80 524. ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (-. (hskp12)) (-. (c3_1 (a127))) (c0_1 (a127)) (c2_1 (a127)) (-. (hskp28)) (-. (hskp18)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (c3_1 (a116)) (c1_1 (a116)) (-. (c0_1 (a116))) (ndr1_0) ### DisjTree 190 523 11
% 0.60/0.80 525. (c0_1 (a142)) (-. (c0_1 (a142))) ### Axiom
% 0.60/0.80 526. (c1_1 (a142)) (-. (c1_1 (a142))) ### Axiom
% 0.60/0.80 527. (c3_1 (a142)) (-. (c3_1 (a142))) ### Axiom
% 0.60/0.80 528. ((ndr1_0) => ((-. (c0_1 (a142))) \/ ((-. (c1_1 (a142))) \/ (-. (c3_1 (a142)))))) (c3_1 (a142)) (c1_1 (a142)) (c0_1 (a142)) (ndr1_0) ### DisjTree 5 525 526 527
% 0.60/0.80 529. (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) (ndr1_0) (c0_1 (a142)) (c1_1 (a142)) (c3_1 (a142)) ### All 528
% 0.60/0.80 530. ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a142)) (c1_1 (a142)) (c0_1 (a142)) (c0_1 (a115)) (-. (c2_1 (a115))) (All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) ### DisjTree 504 34 529
% 0.60/0.80 531. ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c1_1 (a116)) (c3_1 (a116)) (-. (c0_1 (a116))) (All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) (ndr1_0) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a115))) (c0_1 (a115)) (c0_1 (a142)) (c1_1 (a142)) (c3_1 (a142)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ### DisjTree 530 504 152
% 0.60/0.80 532. ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a142)) (c1_1 (a142)) (c0_1 (a142)) (c0_1 (a115)) (-. (c2_1 (a115))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (-. (c0_1 (a116))) (c3_1 (a116)) (c1_1 (a116)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c1_1 (a153)) (-. (c2_1 (a153))) (-. (c0_1 (a153))) (ndr1_0) ### DisjTree 56 531 62
% 0.60/0.80 533. ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142))))) (ndr1_0) (-. (c0_1 (a153))) (-. (c2_1 (a153))) (c1_1 (a153)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c1_1 (a116)) (c3_1 (a116)) (-. (c0_1 (a116))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a115))) (c0_1 (a115)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ### ConjTree 532
% 0.60/0.80 534. ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c0_1 (a115)) (-. (c2_1 (a115))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c1_1 (a153)) (-. (c2_1 (a153))) (-. (c0_1 (a153))) (ndr1_0) (-. (c0_1 (a116))) (c1_1 (a116)) (c3_1 (a116)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp18)) (c2_1 (a127)) (c0_1 (a127)) (-. (c3_1 (a127))) (-. (hskp12)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ### Or 524 533
% 0.60/0.80 535. ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153)))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (-. (hskp12)) (-. (c3_1 (a127))) (c0_1 (a127)) (c2_1 (a127)) (-. (hskp18)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (c3_1 (a116)) (c1_1 (a116)) (-. (c0_1 (a116))) (ndr1_0) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a115))) (c0_1 (a115)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ### ConjTree 534
% 0.60/0.80 536. ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c0_1 (a115)) (-. (c2_1 (a115))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (ndr1_0) (-. (c0_1 (a116))) (c1_1 (a116)) (c3_1 (a116)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp18)) (c2_1 (a127)) (c0_1 (a127)) (-. (c3_1 (a127))) (-. (hskp12)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (-. (hskp23)) (-. (hskp16)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ### Or 51 535
% 0.60/0.80 537. ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) (c1_1 (a152)) (c0_1 (a152)) (-. (c2_1 (a152))) (-. (c3_1 (a124))) (-. (c1_1 (a124))) (-. (c0_1 (a124))) (ndr1_0) ### DisjTree 25 73 42
% 0.60/0.80 538. ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152)))))) (ndr1_0) (-. (c0_1 (a124))) (-. (c1_1 (a124))) (-. (c3_1 (a124))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ### ConjTree 537
% 0.60/0.80 539. ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) (-. (c3_1 (a124))) (-. (c1_1 (a124))) (-. (c0_1 (a124))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp16)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (-. (hskp12)) (-. (c3_1 (a127))) (c0_1 (a127)) (c2_1 (a127)) (-. (hskp18)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (c3_1 (a116)) (c1_1 (a116)) (-. (c0_1 (a116))) (ndr1_0) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a115))) (c0_1 (a115)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ### Or 536 538
% 0.60/0.80 540. ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c0_1 (a115)) (-. (c2_1 (a115))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (ndr1_0) (-. (c0_1 (a116))) (c1_1 (a116)) (c3_1 (a116)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp18)) (-. (hskp12)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (-. (hskp16)) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (c0_1 (a124))) (-. (c1_1 (a124))) (-. (c3_1 (a124))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ### ConjTree 539
% 0.60/0.80 541. ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) (-. (c3_1 (a124))) (-. (c1_1 (a124))) (-. (c0_1 (a124))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp16)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (-. (hskp12)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (c3_1 (a116)) (c1_1 (a116)) (-. (c0_1 (a116))) (ndr1_0) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a115))) (c0_1 (a115)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (-. (hskp18)) (-. (hskp13)) ((hskp18) \/ ((hskp19) \/ (hskp13))) ### Or 521 540
% 0.60/0.80 542. (-. (c3_1 (a125))) (c3_1 (a125)) ### Axiom
% 0.60/0.80 543. (c0_1 (a125)) (-. (c0_1 (a125))) ### Axiom
% 0.60/0.80 544. (c1_1 (a125)) (-. (c1_1 (a125))) ### Axiom
% 0.60/0.80 545. ((ndr1_0) => ((c3_1 (a125)) \/ ((-. (c0_1 (a125))) \/ (-. (c1_1 (a125)))))) (c1_1 (a125)) (c0_1 (a125)) (-. (c3_1 (a125))) (ndr1_0) ### DisjTree 5 542 543 544
% 0.60/0.80 546. (All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) (ndr1_0) (-. (c3_1 (a125))) (c0_1 (a125)) (c1_1 (a125)) ### All 545
% 0.60/0.80 547. ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (hskp16)) (c1_1 (a125)) (c0_1 (a125)) (-. (c3_1 (a125))) (c0_1 (a133)) (c3_1 (a133)) (-. (c2_1 (a133))) (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) (ndr1_0) ### DisjTree 357 546 50
% 0.60/0.80 548. ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c2_1 (a133))) (c3_1 (a133)) (c0_1 (a133)) (-. (c3_1 (a125))) (c0_1 (a125)) (c1_1 (a125)) (-. (hskp16)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (c0_1 (a115)) (-. (c2_1 (a115))) (All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) (ndr1_0) ### DisjTree 34 504 547
% 0.60/0.80 549. ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) (-. (c2_1 (a115))) (c0_1 (a115)) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (hskp16)) (c1_1 (a125)) (c0_1 (a125)) (-. (c3_1 (a125))) (c0_1 (a133)) (c3_1 (a133)) (-. (c2_1 (a133))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c3_1 (a124))) (-. (c1_1 (a124))) (-. (c0_1 (a124))) (ndr1_0) ### DisjTree 25 548 42
% 0.60/0.80 550. ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133)))))) (ndr1_0) (-. (c0_1 (a124))) (-. (c1_1 (a124))) (-. (c3_1 (a124))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c3_1 (a125))) (c0_1 (a125)) (c1_1 (a125)) (-. (hskp16)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (c0_1 (a115)) (-. (c2_1 (a115))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ### ConjTree 549
% 0.60/0.80 551. ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (hskp16)) (c1_1 (a125)) (c0_1 (a125)) (-. (c3_1 (a125))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c3_1 (a124))) (-. (c1_1 (a124))) (-. (c0_1 (a124))) (ndr1_0) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ### Or 20 550
% 0.60/0.80 552. ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125)))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) (-. (c0_1 (a124))) (-. (c1_1 (a124))) (-. (c3_1 (a124))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp16)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### ConjTree 551
% 0.60/0.80 553. ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (c3_1 (a115))) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((hskp18) \/ ((hskp19) \/ (hskp13))) (-. (hskp13)) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c0_1 (a115)) (-. (c2_1 (a115))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (ndr1_0) (-. (c0_1 (a116))) (c1_1 (a116)) (c3_1 (a116)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp12)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (-. (hskp16)) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (c0_1 (a124))) (-. (c1_1 (a124))) (-. (c3_1 (a124))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ### Or 541 552
% 0.60/0.80 554. ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124)))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp16)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (-. (hskp12)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (c3_1 (a116)) (c1_1 (a116)) (-. (c0_1 (a116))) (ndr1_0) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a115))) (c0_1 (a115)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (-. (hskp13)) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (-. (c3_1 (a115))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ### ConjTree 553
% 0.60/0.80 555. ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((hskp18) \/ ((hskp19) \/ (hskp13))) (-. (hskp13)) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c0_1 (a116))) (c1_1 (a116)) (c3_1 (a116)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp12)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (-. (hskp16)) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) (ndr1_0) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp1)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ### Or 17 554
% 0.60/0.80 556. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (-. (hskp9)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) (-. (hskp1)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (-. (hskp12)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (c3_1 (a116)) (c1_1 (a116)) (-. (c0_1 (a116))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (-. (hskp13)) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ### Or 555 371
% 0.60/0.81 557. ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116)))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((hskp18) \/ ((hskp19) \/ (hskp13))) (-. (hskp13)) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp12)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) (ndr1_0) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp1)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) (-. (hskp9)) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 556
% 0.60/0.81 558. ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (-. (hskp9)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) (-. (hskp1)) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (-. (hskp12)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (-. (hskp13)) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### Or 519 557
% 0.60/0.81 559. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (ndr1_0) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((hskp18) \/ ((hskp19) \/ (hskp13))) (-. (hskp13)) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp12)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) (-. (hskp1)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) (-. (hskp9)) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ### ConjTree 558
% 0.60/0.81 560. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (-. (hskp9)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) (-. (hskp1)) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (-. (hskp13)) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (ndr1_0) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (-. (hskp12)) (-. (hskp11)) ((hskp14) \/ ((hskp12) \/ (hskp11))) ### Or 224 559
% 0.60/0.81 561. ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a133)) (-. (c2_1 (a133))) (All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) (c0_1 (a133)) (c1_1 (a118)) (-. (c3_1 (a118))) (All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) (-. (c2_1 (a118))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) ### DisjTree 504 143 513
% 0.60/0.81 562. ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c0_1 (a115)) (-. (c2_1 (a115))) (-. (hskp15)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (ndr1_0) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a118))) (All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) (-. (c3_1 (a118))) (c1_1 (a118)) (c0_1 (a133)) (-. (c2_1 (a133))) (c3_1 (a133)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ### DisjTree 561 504 516
% 0.60/0.81 563. ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a133)) (-. (c2_1 (a133))) (c0_1 (a133)) (c1_1 (a118)) (-. (c3_1 (a118))) (-. (c2_1 (a118))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (hskp15)) (-. (c2_1 (a115))) (c0_1 (a115)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ### DisjTree 562 39 516
% 0.60/0.81 564. ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133)))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c0_1 (a115)) (-. (c2_1 (a115))) (-. (hskp15)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (ndr1_0) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a118))) (-. (c3_1 (a118))) (c1_1 (a118)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ### ConjTree 563
% 0.60/0.81 565. ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c1_1 (a118)) (-. (c3_1 (a118))) (-. (c2_1 (a118))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (hskp15)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (ndr1_0) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ### Or 20 564
% 0.60/0.81 566. ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118)))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp15)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### ConjTree 565
% 0.60/0.81 567. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (hskp15)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (hskp8)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ### Or 263 566
% 0.60/0.81 568. ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a133)) (-. (c2_1 (a133))) (All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) (c0_1 (a133)) (c1_1 (a118)) (All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) (-. (c2_1 (a118))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) ### DisjTree 504 134 513
% 0.60/0.81 569. ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c2_1 (a165)) (c3_1 (a165)) (c1_1 (a165)) (All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) (c1_1 (a118)) (All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) (-. (c2_1 (a118))) (c3_1 (a133)) (-. (c2_1 (a133))) (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) (ndr1_0) ### DisjTree 82 134 91
% 0.60/0.81 570. ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) (c1_1 (a165)) (c3_1 (a165)) (c2_1 (a165)) (ndr1_0) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a118))) (All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) (c1_1 (a118)) (c0_1 (a133)) (-. (c2_1 (a133))) (c3_1 (a133)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ### DisjTree 568 504 569
% 0.60/0.81 571. ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) (-. (hskp26)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a133)) (-. (c2_1 (a133))) (c0_1 (a133)) (c1_1 (a118)) (All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) (-. (c2_1 (a118))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) (c2_1 (a165)) (c3_1 (a165)) (c1_1 (a165)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ### DisjTree 570 93 67
% 0.60/0.81 572. ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c1_1 (a116)) (c3_1 (a116)) (-. (c0_1 (a116))) (All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) (ndr1_0) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a118))) (All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) (-. (c3_1 (a118))) (c1_1 (a118)) (c0_1 (a133)) (-. (c2_1 (a133))) (c3_1 (a133)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ### DisjTree 561 504 152
% 0.60/0.81 573. ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a133)) (-. (c2_1 (a133))) (c0_1 (a133)) (c1_1 (a118)) (-. (c3_1 (a118))) (-. (c2_1 (a118))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) (All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) (-. (c0_1 (a116))) (c3_1 (a116)) (c1_1 (a116)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ### DisjTree 572 39 152
% 0.60/0.81 574. ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c1_1 (a116)) (c3_1 (a116)) (-. (c0_1 (a116))) (-. (c3_1 (a118))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c1_1 (a165)) (c3_1 (a165)) (c2_1 (a165)) (ndr1_0) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a118))) (c1_1 (a118)) (c0_1 (a133)) (-. (c2_1 (a133))) (c3_1 (a133)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp26)) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ### DisjTree 571 573 62
% 0.60/0.81 575. ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) (-. (hskp26)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a133)) (-. (c2_1 (a133))) (c0_1 (a133)) (c1_1 (a118)) (-. (c2_1 (a118))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c3_1 (a118))) (-. (c0_1 (a116))) (c3_1 (a116)) (c1_1 (a116)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ### ConjTree 574
% 0.60/0.81 576. ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c1_1 (a116)) (c3_1 (a116)) (-. (c0_1 (a116))) (-. (c3_1 (a118))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (ndr1_0) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a118))) (c1_1 (a118)) (c0_1 (a133)) (-. (c2_1 (a133))) (c3_1 (a133)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp26)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp24)) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ### Or 68 575
% 0.60/0.81 577. ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (c2_1 (a94)) (c1_1 (a94)) (c0_1 (a94)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a133)) (-. (c2_1 (a133))) (c0_1 (a133)) (c1_1 (a118)) (All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) (-. (c2_1 (a118))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) (c2_1 (a165)) (c3_1 (a165)) (c1_1 (a165)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ### DisjTree 570 39 113
% 0.60/0.81 578. ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c1_1 (a116)) (c3_1 (a116)) (-. (c0_1 (a116))) (-. (c3_1 (a118))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c1_1 (a165)) (c3_1 (a165)) (c2_1 (a165)) (ndr1_0) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a118))) (c1_1 (a118)) (c0_1 (a133)) (-. (c2_1 (a133))) (c3_1 (a133)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c0_1 (a94)) (c1_1 (a94)) (c2_1 (a94)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ### DisjTree 577 573 62
% 0.60/0.81 579. ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (c2_1 (a94)) (c1_1 (a94)) (c0_1 (a94)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a133)) (-. (c2_1 (a133))) (c0_1 (a133)) (c1_1 (a118)) (-. (c2_1 (a118))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c3_1 (a118))) (-. (c0_1 (a116))) (c3_1 (a116)) (c1_1 (a116)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ### ConjTree 578
% 0.60/0.81 580. ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c1_1 (a116)) (c3_1 (a116)) (-. (c0_1 (a116))) (-. (c3_1 (a118))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (ndr1_0) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a118))) (c1_1 (a118)) (c0_1 (a133)) (-. (c2_1 (a133))) (c3_1 (a133)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c0_1 (a94)) (c1_1 (a94)) (c2_1 (a94)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (-. (hskp24)) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ### Or 68 579
% 0.60/0.81 581. ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) (-. (hskp24)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a133)) (-. (c2_1 (a133))) (c0_1 (a133)) (c1_1 (a118)) (-. (c2_1 (a118))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c3_1 (a118))) (-. (c0_1 (a116))) (c3_1 (a116)) (c1_1 (a116)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ### ConjTree 580
% 0.60/0.81 582. ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) (-. (hskp24)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a133)) (-. (c2_1 (a133))) (c0_1 (a133)) (c1_1 (a118)) (-. (c2_1 (a118))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c3_1 (a118))) (-. (c0_1 (a116))) (c3_1 (a116)) (c1_1 (a116)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ### Or 576 581
% 0.60/0.81 583. ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c1_1 (a116)) (c3_1 (a116)) (-. (c0_1 (a116))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a118))) (-. (c3_1 (a118))) (c1_1 (a118)) (c0_1 (a133)) (-. (c2_1 (a133))) (c3_1 (a133)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c1_1 (a153)) (-. (c2_1 (a153))) (-. (c0_1 (a153))) (ndr1_0) ### DisjTree 56 573 62
% 0.60/0.81 584. ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153)))))) (ndr1_0) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a133)) (-. (c2_1 (a133))) (c0_1 (a133)) (c1_1 (a118)) (-. (c3_1 (a118))) (-. (c2_1 (a118))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (-. (c0_1 (a116))) (c3_1 (a116)) (c1_1 (a116)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ### ConjTree 583
% 0.60/0.81 585. ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c1_1 (a116)) (c3_1 (a116)) (-. (c0_1 (a116))) (-. (c3_1 (a118))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (ndr1_0) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a118))) (c1_1 (a118)) (c0_1 (a133)) (-. (c2_1 (a133))) (c3_1 (a133)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ### Or 582 584
% 0.60/0.81 586. ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133)))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c1_1 (a118)) (-. (c2_1 (a118))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c3_1 (a118))) (-. (c0_1 (a116))) (c3_1 (a116)) (c1_1 (a116)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ### ConjTree 585
% 0.60/0.81 587. ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c1_1 (a116)) (c3_1 (a116)) (-. (c0_1 (a116))) (-. (c3_1 (a118))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a118))) (c1_1 (a118)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) (ndr1_0) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ### Or 20 586
% 0.60/0.81 588. ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118)))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c0_1 (a116))) (c3_1 (a116)) (c1_1 (a116)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### ConjTree 587
% 0.60/0.81 589. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c1_1 (a116)) (c3_1 (a116)) (-. (c0_1 (a116))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (hskp8)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ### Or 263 588
% 0.60/0.81 590. ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116)))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp8)) (c3_1 (a112)) (c0_1 (a112)) (-. (c1_1 (a112))) (ndr1_0) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 589
% 0.60/0.81 591. ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp8)) (c3_1 (a112)) (c0_1 (a112)) (-. (c1_1 (a112))) (ndr1_0) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### Or 567 590
% 0.60/0.81 592. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (hskp8)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ### ConjTree 591
% 0.60/0.81 593. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp8)) (c3_1 (a112)) (c0_1 (a112)) (-. (c1_1 (a112))) (ndr1_0) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (-. (hskp12)) (-. (hskp11)) ((hskp14) \/ ((hskp12) \/ (hskp11))) ### Or 224 592
% 0.60/0.81 594. ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112)))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) (-. (hskp11)) (-. (hskp12)) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (ndr1_0) (-. (hskp8)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### ConjTree 593
% 0.60/0.81 595. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp8)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) (-. (hskp11)) (-. (hskp12)) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (ndr1_0) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) (-. (hskp1)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) (-. (hskp9)) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### Or 560 594
% 0.60/0.81 596. ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c2_1 (a165)) (c3_1 (a165)) (c1_1 (a165)) (All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) (c1_1 (a152)) (c0_1 (a152)) (-. (c2_1 (a152))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) ### DisjTree 504 73 91
% 0.60/0.81 597. ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) (-. (hskp26)) (ndr1_0) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a152))) (c0_1 (a152)) (c1_1 (a152)) (c1_1 (a165)) (c3_1 (a165)) (c2_1 (a165)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ### DisjTree 596 93 67
% 0.60/0.81 598. ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c1_1 (a152)) (c0_1 (a152)) (-. (c2_1 (a152))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) (-. (hskp26)) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ### ConjTree 597
% 0.60/0.81 599. ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp26)) (ndr1_0) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a152))) (c0_1 (a152)) (c1_1 (a152)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp24)) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ### Or 68 598
% 0.60/0.81 600. ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (c2_1 (a94)) (c1_1 (a94)) (c0_1 (a94)) (c3_1 (a133)) (c0_1 (a133)) (-. (c2_1 (a133))) (ndr1_0) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a152))) (c0_1 (a152)) (c1_1 (a152)) (c1_1 (a165)) (c3_1 (a165)) (c2_1 (a165)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ### DisjTree 596 39 113
% 0.60/0.81 601. ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c1_1 (a152)) (c0_1 (a152)) (-. (c2_1 (a152))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) (-. (c2_1 (a133))) (c0_1 (a133)) (c3_1 (a133)) (c0_1 (a94)) (c1_1 (a94)) (c2_1 (a94)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ### ConjTree 600
% 0.60/0.81 602. ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (c2_1 (a94)) (c1_1 (a94)) (c0_1 (a94)) (c3_1 (a133)) (c0_1 (a133)) (-. (c2_1 (a133))) (ndr1_0) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a152))) (c0_1 (a152)) (c1_1 (a152)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp24)) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ### Or 68 601
% 0.60/0.81 603. ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) (-. (hskp24)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c1_1 (a152)) (c0_1 (a152)) (-. (c2_1 (a152))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) (-. (c2_1 (a133))) (c0_1 (a133)) (c3_1 (a133)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ### ConjTree 602
% 0.60/0.81 604. ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (c3_1 (a133)) (c0_1 (a133)) (-. (c2_1 (a133))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) (-. (hskp24)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c1_1 (a152)) (c0_1 (a152)) (-. (c2_1 (a152))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ### Or 599 603
% 0.60/0.81 605. ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (ndr1_0) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a152))) (c0_1 (a152)) (c1_1 (a152)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (c2_1 (a133))) (c0_1 (a133)) (c3_1 (a133)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ### Or 604 64
% 0.60/0.81 606. ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152)))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (c3_1 (a133)) (c0_1 (a133)) (-. (c2_1 (a133))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) (-. (c0_1 (a110))) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ### ConjTree 605
% 0.60/0.81 607. ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (c2_1 (a133))) (c0_1 (a133)) (c3_1 (a133)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp16)) (ndr1_0) (-. (c0_1 (a110))) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ### Or 65 606
% 0.60/0.81 608. ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) (ndr1_0) (-. (hskp16)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ### ConjTree 607
% 0.60/0.81 609. ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp16)) (-. (c0_1 (a110))) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (ndr1_0) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ### Or 20 608
% 0.60/0.81 610. ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c1_1 (a165)) (c3_1 (a165)) (c2_1 (a165)) (ndr1_0) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a118))) (c1_1 (a118)) (c0_1 (a133)) (-. (c2_1 (a133))) (c3_1 (a133)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp26)) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ### DisjTree 571 61 62
% 0.60/0.81 611. ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) (-. (hskp26)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a133)) (-. (c2_1 (a133))) (c0_1 (a133)) (c1_1 (a118)) (-. (c2_1 (a118))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c0_1 (a110))) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ### ConjTree 610
% 0.60/0.81 612. ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (ndr1_0) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a118))) (c1_1 (a118)) (c0_1 (a133)) (-. (c2_1 (a133))) (c3_1 (a133)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp26)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp24)) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ### Or 68 611
% 0.60/0.81 613. ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c1_1 (a165)) (c3_1 (a165)) (c2_1 (a165)) (ndr1_0) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a118))) (c1_1 (a118)) (c0_1 (a133)) (-. (c2_1 (a133))) (c3_1 (a133)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c0_1 (a94)) (c1_1 (a94)) (c2_1 (a94)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ### DisjTree 577 61 62
% 0.60/0.81 614. ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (c2_1 (a94)) (c1_1 (a94)) (c0_1 (a94)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a133)) (-. (c2_1 (a133))) (c0_1 (a133)) (c1_1 (a118)) (-. (c2_1 (a118))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c0_1 (a110))) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ### ConjTree 613
% 0.60/0.81 615. ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (ndr1_0) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a118))) (c1_1 (a118)) (c0_1 (a133)) (-. (c2_1 (a133))) (c3_1 (a133)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c0_1 (a94)) (c1_1 (a94)) (c2_1 (a94)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (-. (hskp24)) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ### Or 68 614
% 0.60/0.81 616. ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) (-. (hskp24)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a133)) (-. (c2_1 (a133))) (c0_1 (a133)) (c1_1 (a118)) (-. (c2_1 (a118))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c0_1 (a110))) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ### ConjTree 615
% 0.60/0.81 617. ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) (-. (hskp24)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a133)) (-. (c2_1 (a133))) (c0_1 (a133)) (c1_1 (a118)) (-. (c2_1 (a118))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c0_1 (a110))) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ### Or 612 616
% 0.60/0.81 618. ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (ndr1_0) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a118))) (c1_1 (a118)) (c0_1 (a133)) (-. (c2_1 (a133))) (c3_1 (a133)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ### Or 617 64
% 0.60/0.81 619. ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133)))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c1_1 (a118)) (-. (c2_1 (a118))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c0_1 (a110))) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ### ConjTree 618
% 0.60/0.81 620. ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a118))) (c1_1 (a118)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) (ndr1_0) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ### Or 20 619
% 0.60/0.81 621. ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118)))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c0_1 (a110))) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### ConjTree 620
% 0.60/0.81 622. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### Or 609 621
% 0.60/0.81 623. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (c0_1 (a110))) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (ndr1_0) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 622
% 0.60/0.81 624. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (ndr1_0) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (-. (hskp1)) (-. (hskp3)) ((hskp14) \/ ((hskp1) \/ (hskp3))) ### Or 4 623
% 0.60/0.81 625. ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110)))))) ((hskp14) \/ ((hskp1) \/ (hskp3))) (-. (hskp3)) (-. (hskp1)) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (ndr1_0) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### ConjTree 624
% 0.60/0.81 626. ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) (-. (hskp3)) ((hskp14) \/ ((hskp1) \/ (hskp3))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (-. (hskp9)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) (-. (hskp1)) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (ndr1_0) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (-. (hskp11)) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp8)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### Or 595 625
% 0.60/0.81 627. ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109)))))) ((hskp9) \/ ((hskp14) \/ (hskp2))) (-. (hskp2)) (-. (hskp9)) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (ndr1_0) (-. (hskp1)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### ConjTree 195
% 0.60/0.81 628. ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (-. (hskp2)) ((hskp9) \/ ((hskp14) \/ (hskp2))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp8)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (ndr1_0) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) (-. (hskp1)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) (-. (hskp9)) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((hskp14) \/ ((hskp1) \/ (hskp3))) (-. (hskp3)) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ### Or 626 627
% 0.60/0.81 629. ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) (-. (hskp29)) (-. (hskp20)) ### DisjTree 18 66 42
% 0.60/0.81 630. ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a106)) (c1_1 (a106)) (All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) (-. (c2_1 (a106))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) ### DisjTree 504 208 217
% 0.60/0.81 631. (-. (c0_1 (a165))) (c0_1 (a165)) ### Axiom
% 0.60/0.81 632. (c2_1 (a165)) (-. (c2_1 (a165))) ### Axiom
% 0.60/0.81 633. (c3_1 (a165)) (-. (c3_1 (a165))) ### Axiom
% 0.60/0.81 634. ((ndr1_0) => ((c0_1 (a165)) \/ ((-. (c2_1 (a165))) \/ (-. (c3_1 (a165)))))) (c3_1 (a165)) (c2_1 (a165)) (-. (c0_1 (a165))) (ndr1_0) ### DisjTree 5 631 632 633
% 0.60/0.81 635. (All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) (ndr1_0) (-. (c0_1 (a165))) (c2_1 (a165)) (c3_1 (a165)) ### All 634
% 0.60/0.81 636. (c1_1 (a165)) (-. (c1_1 (a165))) ### Axiom
% 0.60/0.81 637. (c3_1 (a165)) (-. (c3_1 (a165))) ### Axiom
% 0.60/0.81 638. ((ndr1_0) => ((-. (c0_1 (a165))) \/ ((-. (c1_1 (a165))) \/ (-. (c3_1 (a165)))))) (c1_1 (a165)) (c3_1 (a165)) (c2_1 (a165)) (All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) (ndr1_0) ### DisjTree 5 635 636 637
% 0.60/0.81 639. (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) (ndr1_0) (All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) (c2_1 (a165)) (c3_1 (a165)) (c1_1 (a165)) ### All 638
% 0.60/0.81 640. ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c1_1 (a165)) (c3_1 (a165)) (c2_1 (a165)) (All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) (c0_1 (a115)) (-. (c2_1 (a115))) (All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) ### DisjTree 504 34 639
% 0.60/0.81 641. ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) (ndr1_0) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a115))) (c0_1 (a115)) (All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) (c2_1 (a165)) (c3_1 (a165)) (c1_1 (a165)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ### DisjTree 640 504 213
% 0.60/0.81 642. ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c1_1 (a165)) (c3_1 (a165)) (c2_1 (a165)) (c0_1 (a115)) (-. (c2_1 (a115))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (ndr1_0) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ### DisjTree 630 641 62
% 0.60/0.81 643. ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c2_1 (a115))) (c0_1 (a115)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ### ConjTree 642
% 0.60/0.81 644. ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c0_1 (a115)) (-. (c2_1 (a115))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (ndr1_0) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp20)) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ### Or 629 643
% 0.60/0.81 645. ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) (ndr1_0) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a115))) (c0_1 (a115)) (c0_1 (a133)) (-. (c2_1 (a133))) (c3_1 (a133)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ### DisjTree 514 504 213
% 0.60/0.81 646. ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c0_1 (a115)) (-. (c2_1 (a115))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ### ConjTree 645
% 0.60/0.81 647. ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c2_1 (a115))) (c0_1 (a115)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ### Or 644 646
% 0.60/0.81 648. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (ndr1_0) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### ConjTree 647
% 0.60/0.81 649. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) (-. (hskp9)) (-. (hskp2)) ((hskp9) \/ ((hskp14) \/ (hskp2))) ### Or 170 648
% 0.60/0.81 650. ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106)))))) ((hskp9) \/ ((hskp14) \/ (hskp2))) (-. (hskp2)) (-. (hskp9)) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (ndr1_0) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### ConjTree 649
% 0.60/0.81 651. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) (-. (hskp3)) ((hskp14) \/ ((hskp1) \/ (hskp3))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (-. (hskp9)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) (-. (hskp1)) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (ndr1_0) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp8)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((hskp9) \/ ((hskp14) \/ (hskp2))) (-. (hskp2)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### Or 628 650
% 0.60/0.81 652. ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a105)) (c0_1 (a105)) (-. (c1_1 (a105))) (ndr1_0) (-. (c3_1 (a127))) (c0_1 (a127)) (c2_1 (a127)) (-. (hskp28)) (-. (hskp18)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ### Or 523 399
% 0.60/0.81 653. ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a142)) (c1_1 (a142)) (c0_1 (a142)) (c1_1 (a152)) (c0_1 (a152)) (-. (c2_1 (a152))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) ### DisjTree 504 73 529
% 0.60/0.81 654. ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142))))) (ndr1_0) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a152))) (c0_1 (a152)) (c1_1 (a152)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ### ConjTree 653
% 0.60/0.81 655. ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c1_1 (a152)) (c0_1 (a152)) (-. (c2_1 (a152))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp18)) (c2_1 (a127)) (c0_1 (a127)) (-. (c3_1 (a127))) (ndr1_0) (-. (c1_1 (a105))) (c0_1 (a105)) (c2_1 (a105)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ### Or 652 654
% 0.60/0.81 656. ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152)))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a105)) (c0_1 (a105)) (-. (c1_1 (a105))) (ndr1_0) (-. (c3_1 (a127))) (c0_1 (a127)) (c2_1 (a127)) (-. (hskp18)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ### ConjTree 655
% 0.60/0.81 657. ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) (-. (c1_1 (a105))) (c0_1 (a105)) (c2_1 (a105)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp16)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (-. (hskp12)) (-. (c3_1 (a127))) (c0_1 (a127)) (c2_1 (a127)) (-. (hskp18)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (c3_1 (a116)) (c1_1 (a116)) (-. (c0_1 (a116))) (ndr1_0) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a115))) (c0_1 (a115)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ### Or 536 656
% 0.60/0.81 658. ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c0_1 (a115)) (-. (c2_1 (a115))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (ndr1_0) (-. (c0_1 (a116))) (c1_1 (a116)) (c3_1 (a116)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp18)) (-. (hskp12)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (-. (hskp16)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a105)) (c0_1 (a105)) (-. (c1_1 (a105))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ### ConjTree 657
% 0.60/0.81 659. ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) (-. (c1_1 (a105))) (c0_1 (a105)) (c2_1 (a105)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp16)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (-. (hskp12)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (c3_1 (a116)) (c1_1 (a116)) (-. (c0_1 (a116))) (ndr1_0) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a115))) (c0_1 (a115)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (-. (hskp18)) (-. (hskp13)) ((hskp18) \/ ((hskp19) \/ (hskp13))) ### Or 521 658
% 0.60/0.81 660. ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (c3_1 (a124))) (-. (c1_1 (a124))) (-. (c0_1 (a124))) (-. (c3_1 (a115))) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((hskp18) \/ ((hskp19) \/ (hskp13))) (-. (hskp13)) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c0_1 (a115)) (-. (c2_1 (a115))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (ndr1_0) (-. (c0_1 (a116))) (c1_1 (a116)) (c3_1 (a116)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp12)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (-. (hskp16)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a105)) (c0_1 (a105)) (-. (c1_1 (a105))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ### Or 659 552
% 0.60/0.81 661. ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124)))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) (-. (c1_1 (a105))) (c0_1 (a105)) (c2_1 (a105)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp16)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (-. (hskp12)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (c3_1 (a116)) (c1_1 (a116)) (-. (c0_1 (a116))) (ndr1_0) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a115))) (c0_1 (a115)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (-. (hskp13)) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (-. (c3_1 (a115))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ### ConjTree 660
% 0.60/0.81 662. ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((hskp18) \/ ((hskp19) \/ (hskp13))) (-. (hskp13)) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c0_1 (a116))) (c1_1 (a116)) (c3_1 (a116)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp12)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (-. (hskp16)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a105)) (c0_1 (a105)) (-. (c1_1 (a105))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) (ndr1_0) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp1)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ### Or 17 661
% 0.60/0.81 663. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) (-. (hskp1)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) (-. (c1_1 (a105))) (c0_1 (a105)) (c2_1 (a105)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (-. (hskp12)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (c3_1 (a116)) (c1_1 (a116)) (-. (c0_1 (a116))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (-. (hskp13)) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ### Or 662 588
% 0.60/0.81 664. ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116)))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((hskp18) \/ ((hskp19) \/ (hskp13))) (-. (hskp13)) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp12)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a105)) (c0_1 (a105)) (-. (c1_1 (a105))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) (ndr1_0) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp1)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 663
% 0.60/0.82 665. ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) (-. (hskp1)) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) (-. (c1_1 (a105))) (c0_1 (a105)) (c2_1 (a105)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (-. (hskp12)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (-. (hskp13)) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### Or 519 664
% 0.60/0.82 666. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (ndr1_0) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((hskp18) \/ ((hskp19) \/ (hskp13))) (-. (hskp13)) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp12)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a105)) (c0_1 (a105)) (-. (c1_1 (a105))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) (-. (hskp1)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ### ConjTree 665
% 0.60/0.82 667. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) (-. (c1_1 (a105))) (c0_1 (a105)) (c2_1 (a105)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (-. (hskp12)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (-. (hskp13)) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (ndr1_0) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (-. (hskp1)) (-. (hskp3)) ((hskp14) \/ ((hskp1) \/ (hskp3))) ### Or 4 666
% 0.60/0.82 668. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp8)) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((hskp14) \/ ((hskp1) \/ (hskp3))) (-. (hskp3)) (-. (hskp1)) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (ndr1_0) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp12)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a105)) (c0_1 (a105)) (-. (c1_1 (a105))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### Or 667 594
% 0.60/0.82 669. ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) (-. (c1_1 (a105))) (c0_1 (a105)) (c2_1 (a105)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (ndr1_0) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (-. (hskp1)) (-. (hskp3)) ((hskp14) \/ ((hskp1) \/ (hskp3))) ((hskp14) \/ ((hskp12) \/ (hskp11))) (-. (hskp8)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### Or 668 625
% 0.60/0.82 670. ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp8)) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((hskp14) \/ ((hskp1) \/ (hskp3))) (-. (hskp3)) (-. (hskp1)) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (ndr1_0) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a105)) (c0_1 (a105)) (-. (c1_1 (a105))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ### Or 669 229
% 0.60/0.82 671. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) (-. (hskp12)) (-. (hskp11)) ((hskp14) \/ ((hskp12) \/ (hskp11))) ### Or 224 648
% 0.60/0.82 672. ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) (-. (hskp11)) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (ndr1_0) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### Or 671 220
% 0.60/0.82 673. ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c2_1 (a165)) (c3_1 (a165)) (c1_1 (a165)) (All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) (c1_1 (a118)) (-. (c3_1 (a118))) (All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) (-. (c2_1 (a118))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) ### DisjTree 504 143 91
% 0.60/0.82 674. ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a106)) (c1_1 (a106)) (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) (-. (c2_1 (a106))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) ### DisjTree 504 239 243
% 0.60/0.82 675. ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a118))) (All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) (-. (c3_1 (a118))) (c1_1 (a118)) (c1_1 (a165)) (c3_1 (a165)) (c2_1 (a165)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c2_1 (a109)) (-. (c3_1 (a109))) (-. (c0_1 (a109))) (ndr1_0) ### DisjTree 175 673 674
% 0.60/0.82 676. (-. (c2_1 (a101))) (c2_1 (a101)) ### Axiom
% 0.60/0.82 677. (-. (c0_1 (a101))) (c0_1 (a101)) ### Axiom
% 0.60/0.82 678. (-. (c1_1 (a101))) (c1_1 (a101)) ### Axiom
% 0.60/0.82 679. (-. (c2_1 (a101))) (c2_1 (a101)) ### Axiom
% 0.60/0.82 680. ((ndr1_0) => ((c0_1 (a101)) \/ ((c1_1 (a101)) \/ (c2_1 (a101))))) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (-. (c0_1 (a101))) (ndr1_0) ### DisjTree 5 677 678 679
% 0.60/0.82 681. (All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) (ndr1_0) (-. (c0_1 (a101))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) ### All 680
% 0.60/0.82 682. (c3_1 (a101)) (-. (c3_1 (a101))) ### Axiom
% 0.60/0.82 683. ((ndr1_0) => ((c2_1 (a101)) \/ ((-. (c0_1 (a101))) \/ (-. (c3_1 (a101)))))) (c3_1 (a101)) (-. (c1_1 (a101))) (All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) (-. (c2_1 (a101))) (ndr1_0) ### DisjTree 5 676 681 682
% 0.60/0.82 684. (All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) (ndr1_0) (-. (c2_1 (a101))) (All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) (-. (c1_1 (a101))) (c3_1 (a101)) ### All 683
% 0.60/0.82 685. ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) (ndr1_0) (-. (c0_1 (a109))) (-. (c3_1 (a109))) (c2_1 (a109)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c2_1 (a165)) (c3_1 (a165)) (c1_1 (a165)) (c1_1 (a118)) (-. (c3_1 (a118))) (-. (c2_1 (a118))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ### DisjTree 675 684 213
% 0.60/0.82 686. ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) (c2_1 (a109)) (-. (c3_1 (a109))) (-. (c0_1 (a109))) (ndr1_0) ### DisjTree 175 184 674
% 0.60/0.82 687. ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a118))) (-. (c3_1 (a118))) (c1_1 (a118)) (c1_1 (a165)) (c3_1 (a165)) (c2_1 (a165)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c2_1 (a109)) (-. (c3_1 (a109))) (-. (c0_1 (a109))) (ndr1_0) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ### DisjTree 685 674 686
% 0.60/0.82 688. ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (ndr1_0) (-. (c0_1 (a109))) (-. (c3_1 (a109))) (c2_1 (a109)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c1_1 (a118)) (-. (c3_1 (a118))) (-. (c2_1 (a118))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ### ConjTree 687
% 0.60/0.82 689. ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a118))) (-. (c3_1 (a118))) (c1_1 (a118)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c2_1 (a109)) (-. (c3_1 (a109))) (-. (c0_1 (a109))) (ndr1_0) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp20)) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ### Or 629 688
% 0.60/0.82 690. ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) (ndr1_0) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a118))) (All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) (-. (c3_1 (a118))) (c1_1 (a118)) (c0_1 (a133)) (-. (c2_1 (a133))) (c3_1 (a133)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ### DisjTree 561 504 213
% 0.60/0.82 691. ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a133)) (-. (c2_1 (a133))) (c0_1 (a133)) (c1_1 (a118)) (-. (c3_1 (a118))) (-. (c2_1 (a118))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ### DisjTree 690 39 213
% 0.60/0.82 692. ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133)))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) (ndr1_0) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a118))) (-. (c3_1 (a118))) (c1_1 (a118)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ### ConjTree 691
% 0.60/0.82 693. ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (ndr1_0) (-. (c0_1 (a109))) (-. (c3_1 (a109))) (c2_1 (a109)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c1_1 (a118)) (-. (c3_1 (a118))) (-. (c2_1 (a118))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ### Or 689 692
% 0.60/0.82 694. ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118)))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c2_1 (a109)) (-. (c3_1 (a109))) (-. (c0_1 (a109))) (ndr1_0) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### ConjTree 693
% 0.60/0.82 695. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c0_1 (a109))) (-. (c3_1 (a109))) (c2_1 (a109)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) (ndr1_0) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (hskp8)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ### Or 263 694
% 0.60/0.82 696. ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112)))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp8)) (ndr1_0) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c2_1 (a109)) (-. (c3_1 (a109))) (-. (c0_1 (a109))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 695
% 0.60/0.82 697. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c0_1 (a109))) (-. (c3_1 (a109))) (c2_1 (a109)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) (-. (hskp8)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) (ndr1_0) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c0_1 (a105)) (c2_1 (a105)) (-. (c1_1 (a105))) (-. (hskp12)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ### Or 256 696
% 0.60/0.82 698. ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) (ndr1_0) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ### DisjTree 630 61 62
% 0.60/0.82 699. ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ### ConjTree 698
% 0.60/0.82 700. ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (-. (c1_1 (a105))) (c2_1 (a105)) (c0_1 (a105)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (ndr1_0) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp8)) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c2_1 (a109)) (-. (c3_1 (a109))) (-. (c0_1 (a109))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### Or 697 699
% 0.60/0.82 701. ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109)))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) (-. (hskp8)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) (ndr1_0) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c0_1 (a105)) (c2_1 (a105)) (-. (c1_1 (a105))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ### ConjTree 700
% 0.60/0.82 702. ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (-. (c1_1 (a105))) (c2_1 (a105)) (c0_1 (a105)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp8)) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ### Or 672 701
% 0.60/0.82 703. ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106)))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (ndr1_0) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) (-. (hskp8)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c0_1 (a105)) (c2_1 (a105)) (-. (c1_1 (a105))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### ConjTree 702
% 0.60/0.82 704. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) (-. (c1_1 (a105))) (c0_1 (a105)) (c2_1 (a105)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (ndr1_0) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (-. (hskp1)) (-. (hskp3)) ((hskp14) \/ ((hskp1) \/ (hskp3))) ((hskp14) \/ ((hskp12) \/ (hskp11))) (-. (hskp8)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### Or 670 703
% 0.60/0.82 705. ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105)))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp8)) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((hskp14) \/ ((hskp1) \/ (hskp3))) (-. (hskp3)) (-. (hskp1)) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (ndr1_0) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### ConjTree 704
% 0.60/0.82 706. ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (-. (hskp2)) ((hskp9) \/ ((hskp14) \/ (hskp2))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp8)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (ndr1_0) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) (-. (hskp1)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((hskp14) \/ ((hskp1) \/ (hskp3))) (-. (hskp3)) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### Or 651 705
% 0.60/0.82 707. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (hskp15)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) (ndr1_0) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ### Or 408 566
% 0.60/0.82 708. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c1_1 (a116)) (c3_1 (a116)) (-. (c0_1 (a116))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) (ndr1_0) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ### Or 408 588
% 0.60/0.82 709. ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) ((hskp23) \/ ((hskp24) \/ (hskp16))) (ndr1_0) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 708
% 0.60/0.82 710. ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) ((hskp23) \/ ((hskp24) \/ (hskp16))) (ndr1_0) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### Or 707 709
% 0.60/0.82 711. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) (ndr1_0) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ### ConjTree 710
% 0.60/0.82 712. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) ((hskp23) \/ ((hskp24) \/ (hskp16))) (ndr1_0) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (-. (hskp12)) (-. (hskp11)) ((hskp14) \/ ((hskp12) \/ (hskp11))) ### Or 224 711
% 0.60/0.82 713. ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) (-. (hskp1)) ((hskp14) \/ ((hskp1) \/ (hskp3))) ((hskp14) \/ ((hskp12) \/ (hskp11))) (-. (hskp11)) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) (ndr1_0) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### Or 712 625
% 0.60/0.82 714. ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (c2_1 (a109)) (-. (c3_1 (a109))) (-. (c0_1 (a109))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### Or 519 192
% 0.60/0.82 715. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (ndr1_0) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (c0_1 (a109))) (-. (c3_1 (a109))) (c2_1 (a109)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ### ConjTree 714
% 0.60/0.82 716. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (c2_1 (a109)) (-. (c3_1 (a109))) (-. (c0_1 (a109))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (ndr1_0) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (-. (hskp1)) (-. (hskp3)) ((hskp14) \/ ((hskp1) \/ (hskp3))) ### Or 4 715
% 0.60/0.82 717. ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109)))))) ((hskp14) \/ ((hskp1) \/ (hskp3))) (-. (hskp3)) (-. (hskp1)) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (ndr1_0) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### ConjTree 716
% 0.60/0.82 718. ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) ((hskp23) \/ ((hskp24) \/ (hskp16))) (ndr1_0) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((hskp14) \/ ((hskp1) \/ (hskp3))) (-. (hskp1)) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ### Or 713 717
% 0.60/0.82 719. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) (-. (hskp1)) ((hskp14) \/ ((hskp1) \/ (hskp3))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) (ndr1_0) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### Or 718 328
% 0.60/0.82 720. ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104)))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) ((hskp23) \/ ((hskp24) \/ (hskp16))) (ndr1_0) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((hskp14) \/ ((hskp1) \/ (hskp3))) (-. (hskp1)) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### ConjTree 719
% 0.60/0.82 721. ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) (-. (hskp3)) ((hskp14) \/ ((hskp1) \/ (hskp3))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) (-. (hskp1)) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (ndr1_0) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((hskp9) \/ ((hskp14) \/ (hskp2))) (-. (hskp2)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ### Or 706 720
% 0.60/0.82 722. ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (-. (hskp12)) (c0_1 (a103)) (-. (c3_1 (a103))) (-. (c1_1 (a103))) (c3_1 (a116)) (c1_1 (a116)) (-. (c0_1 (a116))) (ndr1_0) ### DisjTree 190 388 11
% 0.60/0.82 723. ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116)))))) (ndr1_0) (-. (c1_1 (a103))) (-. (c3_1 (a103))) (c0_1 (a103)) (-. (hskp12)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ### ConjTree 722
% 0.60/0.82 724. ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (-. (hskp12)) (c0_1 (a103)) (-. (c3_1 (a103))) (-. (c1_1 (a103))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### Or 519 723
% 0.60/0.82 725. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (ndr1_0) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (c1_1 (a103))) (-. (c3_1 (a103))) (c0_1 (a103)) (-. (hskp12)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ### ConjTree 724
% 0.60/0.82 726. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (-. (hskp12)) (c0_1 (a103)) (-. (c3_1 (a103))) (-. (c1_1 (a103))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (ndr1_0) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (-. (hskp1)) (-. (hskp3)) ((hskp14) \/ ((hskp1) \/ (hskp3))) ### Or 4 725
% 0.60/0.82 727. (-. (c3_1 (a127))) (c3_1 (a127)) ### Axiom
% 0.60/0.82 728. (-. (c1_1 (a127))) (c1_1 (a127)) ### Axiom
% 0.60/0.82 729. (c0_1 (a127)) (-. (c0_1 (a127))) ### Axiom
% 0.60/0.82 730. (c2_1 (a127)) (-. (c2_1 (a127))) ### Axiom
% 0.60/0.82 731. ((ndr1_0) => ((c1_1 (a127)) \/ ((-. (c0_1 (a127))) \/ (-. (c2_1 (a127)))))) (c2_1 (a127)) (c0_1 (a127)) (-. (c1_1 (a127))) (ndr1_0) ### DisjTree 5 728 729 730
% 0.60/0.82 732. (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50)))))) (ndr1_0) (-. (c1_1 (a127))) (c0_1 (a127)) (c2_1 (a127)) ### All 731
% 0.60/0.82 733. (c2_1 (a127)) (-. (c2_1 (a127))) ### Axiom
% 0.60/0.82 734. ((ndr1_0) => ((c3_1 (a127)) \/ ((-. (c1_1 (a127))) \/ (-. (c2_1 (a127)))))) (c2_1 (a127)) (c0_1 (a127)) (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50)))))) (-. (c3_1 (a127))) (ndr1_0) ### DisjTree 5 727 732 733
% 0.60/0.82 735. (All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) (ndr1_0) (-. (c3_1 (a127))) (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50)))))) (c0_1 (a127)) (c2_1 (a127)) ### All 734
% 0.60/0.82 736. ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp18)) (-. (hskp28)) (c2_1 (a127)) (c0_1 (a127)) (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50)))))) (-. (c3_1 (a127))) (ndr1_0) ### DisjTree 735 522 520
% 0.60/0.82 737. ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (-. (c3_1 (a127))) (c0_1 (a127)) (c2_1 (a127)) (-. (hskp28)) (-. (hskp18)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (c0_1 (a103)) (-. (c3_1 (a103))) (-. (c1_1 (a103))) (ndr1_0) ### Or 388 736
% 0.60/0.82 738. ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c2_1 (a133))) (c3_1 (a133)) (c0_1 (a133)) (-. (hskp16)) (-. (hskp8)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (c1_1 (a149))) (c3_1 (a149)) (-. (hskp13)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (ndr1_0) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a115))) (c0_1 (a115)) (c0_1 (a142)) (c1_1 (a142)) (c3_1 (a142)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ### DisjTree 530 353 358
% 0.60/0.82 739. ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c0_1 (a115)) (-. (c2_1 (a115))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (-. (hskp13)) (c3_1 (a149)) (-. (c1_1 (a149))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp8)) (-. (hskp16)) (c0_1 (a133)) (c3_1 (a133)) (-. (c2_1 (a133))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ### ConjTree 738
% 0.60/0.82 740. ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c2_1 (a133))) (c3_1 (a133)) (c0_1 (a133)) (-. (hskp16)) (-. (hskp8)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (c1_1 (a149))) (c3_1 (a149)) (-. (hskp13)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a115))) (c0_1 (a115)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (ndr1_0) (-. (c1_1 (a103))) (-. (c3_1 (a103))) (c0_1 (a103)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp18)) (c2_1 (a127)) (c0_1 (a127)) (-. (c3_1 (a127))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ### Or 737 739
% 0.60/0.82 741. ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149)))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (-. (c3_1 (a127))) (c0_1 (a127)) (c2_1 (a127)) (-. (hskp18)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (c0_1 (a103)) (-. (c3_1 (a103))) (-. (c1_1 (a103))) (ndr1_0) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c0_1 (a115)) (-. (c2_1 (a115))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (-. (hskp13)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp8)) (-. (hskp16)) (c0_1 (a133)) (c3_1 (a133)) (-. (c2_1 (a133))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ### ConjTree 740
% 0.60/0.82 742. ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c2_1 (a133))) (c3_1 (a133)) (c0_1 (a133)) (-. (hskp16)) (-. (hskp8)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a115))) (c0_1 (a115)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (c1_1 (a103))) (-. (c3_1 (a103))) (c0_1 (a103)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp18)) (c2_1 (a127)) (c0_1 (a127)) (-. (c3_1 (a127))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) (-. (hskp9)) (c3_1 (a110)) (c2_1 (a110)) (ndr1_0) (-. (hskp13)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ### Or 343 741
% 0.60/0.82 743. ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133)))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (-. (hskp13)) (ndr1_0) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp9)) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (-. (c3_1 (a127))) (c0_1 (a127)) (c2_1 (a127)) (-. (hskp18)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (c0_1 (a103)) (-. (c3_1 (a103))) (-. (c1_1 (a103))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c0_1 (a115)) (-. (c2_1 (a115))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp8)) (-. (hskp16)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ### ConjTree 742
% 0.60/0.82 744. ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp16)) (-. (hskp8)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (c1_1 (a103))) (-. (c3_1 (a103))) (c0_1 (a103)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp18)) (c2_1 (a127)) (c0_1 (a127)) (-. (c3_1 (a127))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) (-. (hskp9)) (c3_1 (a110)) (c2_1 (a110)) (-. (hskp13)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (ndr1_0) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ### Or 20 743
% 0.60/0.82 745. ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127)))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (-. (hskp13)) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp9)) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (-. (hskp18)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (c0_1 (a103)) (-. (c3_1 (a103))) (-. (c1_1 (a103))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp8)) (-. (hskp16)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### ConjTree 744
% 0.60/0.82 746. ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp16)) (-. (hskp8)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (c1_1 (a103))) (-. (c3_1 (a103))) (c0_1 (a103)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) (-. (hskp9)) (c3_1 (a110)) (c2_1 (a110)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (ndr1_0) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp18)) (-. (hskp13)) ((hskp18) \/ ((hskp19) \/ (hskp13))) ### Or 521 745
% 0.60/0.82 747. ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c2_1 (a133))) (c3_1 (a133)) (c0_1 (a133)) (-. (c3_1 (a125))) (c0_1 (a125)) (c1_1 (a125)) (-. (hskp16)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (c1_1 (a149))) (c3_1 (a149)) (-. (hskp13)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c0_1 (a115)) (-. (c2_1 (a115))) (All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) (ndr1_0) ### DisjTree 34 353 547
% 0.60/0.82 748. ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) (-. (c2_1 (a115))) (c0_1 (a115)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (-. (hskp13)) (c3_1 (a149)) (-. (c1_1 (a149))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (hskp16)) (c1_1 (a125)) (c0_1 (a125)) (-. (c3_1 (a125))) (c0_1 (a133)) (c3_1 (a133)) (-. (c2_1 (a133))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c3_1 (a124))) (-. (c1_1 (a124))) (-. (c0_1 (a124))) (ndr1_0) ### DisjTree 25 747 42
% 0.60/0.82 749. ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149)))))) (ndr1_0) (-. (c0_1 (a124))) (-. (c1_1 (a124))) (-. (c3_1 (a124))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c2_1 (a133))) (c3_1 (a133)) (c0_1 (a133)) (-. (c3_1 (a125))) (c0_1 (a125)) (c1_1 (a125)) (-. (hskp16)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (hskp13)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c0_1 (a115)) (-. (c2_1 (a115))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ### ConjTree 748
% 0.60/0.82 750. ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) (-. (c2_1 (a115))) (c0_1 (a115)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (hskp16)) (c1_1 (a125)) (c0_1 (a125)) (-. (c3_1 (a125))) (c0_1 (a133)) (c3_1 (a133)) (-. (c2_1 (a133))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c3_1 (a124))) (-. (c1_1 (a124))) (-. (c0_1 (a124))) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) (-. (hskp9)) (c3_1 (a110)) (c2_1 (a110)) (ndr1_0) (-. (hskp13)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ### Or 343 749
% 0.60/0.82 751. ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133)))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (-. (hskp13)) (ndr1_0) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp9)) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) (-. (c0_1 (a124))) (-. (c1_1 (a124))) (-. (c3_1 (a124))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c3_1 (a125))) (c0_1 (a125)) (c1_1 (a125)) (-. (hskp16)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c0_1 (a115)) (-. (c2_1 (a115))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ### ConjTree 750
% 0.60/0.82 752. ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (hskp16)) (c1_1 (a125)) (c0_1 (a125)) (-. (c3_1 (a125))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c3_1 (a124))) (-. (c1_1 (a124))) (-. (c0_1 (a124))) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) (-. (hskp9)) (c3_1 (a110)) (c2_1 (a110)) (-. (hskp13)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (ndr1_0) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ### Or 20 751
% 0.60/0.82 753. ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125)))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (-. (hskp13)) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp9)) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) (-. (c0_1 (a124))) (-. (c1_1 (a124))) (-. (c3_1 (a124))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp16)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### ConjTree 752
% 0.60/0.82 754. ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (c3_1 (a124))) (-. (c1_1 (a124))) (-. (c0_1 (a124))) ((hskp18) \/ ((hskp19) \/ (hskp13))) (-. (hskp13)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp9)) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (c0_1 (a103)) (-. (c3_1 (a103))) (-. (c1_1 (a103))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp8)) (-. (hskp16)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ### Or 746 753
% 0.60/0.82 755. ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124)))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp16)) (-. (hskp8)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (c1_1 (a103))) (-. (c3_1 (a103))) (c0_1 (a103)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) (-. (hskp9)) (c3_1 (a110)) (c2_1 (a110)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (ndr1_0) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp13)) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ### ConjTree 754
% 0.60/0.82 756. ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((hskp18) \/ ((hskp19) \/ (hskp13))) (-. (hskp13)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp9)) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (c0_1 (a103)) (-. (c3_1 (a103))) (-. (c1_1 (a103))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp8)) (-. (hskp16)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) (ndr1_0) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp1)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ### Or 17 755
% 0.60/0.83 757. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) (-. (hskp1)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp8)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (c1_1 (a103))) (-. (c3_1 (a103))) (c0_1 (a103)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) (-. (hskp9)) (c3_1 (a110)) (c2_1 (a110)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp13)) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ### Or 756 371
% 0.60/0.83 758. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((hskp18) \/ ((hskp19) \/ (hskp13))) (-. (hskp13)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp9)) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (c0_1 (a103)) (-. (c3_1 (a103))) (-. (c1_1 (a103))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp8)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) (ndr1_0) (-. (hskp1)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 757
% 0.60/0.83 759. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) (-. (hskp1)) (ndr1_0) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp8)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (c1_1 (a103))) (-. (c3_1 (a103))) (c0_1 (a103)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) (c3_1 (a110)) (c2_1 (a110)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp13)) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) (-. (hskp9)) (-. (hskp2)) ((hskp9) \/ ((hskp14) \/ (hskp2))) ### Or 170 758
% 0.60/0.83 760. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((hskp9) \/ ((hskp14) \/ (hskp2))) (-. (hskp2)) (-. (hskp9)) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c2_1 (a110)) (c3_1 (a110)) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (c0_1 (a103)) (-. (c3_1 (a103))) (-. (c1_1 (a103))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp8)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) (ndr1_0) (-. (hskp1)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### Or 759 379
% 0.60/0.83 761. ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110)))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) (-. (hskp1)) (ndr1_0) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp8)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (c1_1 (a103))) (-. (c3_1 (a103))) (c0_1 (a103)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) (-. (hskp9)) (-. (hskp2)) ((hskp9) \/ ((hskp14) \/ (hskp2))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### ConjTree 760
% 0.60/0.83 762. ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((hskp9) \/ ((hskp14) \/ (hskp2))) (-. (hskp2)) (-. (hskp9)) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp8)) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((hskp14) \/ ((hskp1) \/ (hskp3))) (-. (hskp3)) (-. (hskp1)) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (ndr1_0) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (c1_1 (a103))) (-. (c3_1 (a103))) (c0_1 (a103)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### Or 726 761
% 0.60/0.83 763. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (c0_1 (a103)) (-. (c3_1 (a103))) (-. (c1_1 (a103))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (ndr1_0) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (-. (hskp1)) (-. (hskp3)) ((hskp14) \/ ((hskp1) \/ (hskp3))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) (-. (hskp8)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) (-. (hskp9)) (-. (hskp2)) ((hskp9) \/ ((hskp14) \/ (hskp2))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ### Or 762 393
% 0.60/0.83 764. ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((hskp9) \/ ((hskp14) \/ (hskp2))) (-. (hskp2)) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp8)) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((hskp14) \/ ((hskp1) \/ (hskp3))) (-. (hskp3)) (-. (hskp1)) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (ndr1_0) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (c1_1 (a103))) (-. (c3_1 (a103))) (c0_1 (a103)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### Or 763 401
% 0.60/0.83 765. ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (ndr1_0) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a152))) (c0_1 (a152)) (c1_1 (a152)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (c2_1 (a133))) (c0_1 (a133)) (c3_1 (a133)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ### Or 604 404
% 0.60/0.83 766. ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152)))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (c3_1 (a133)) (c0_1 (a133)) (-. (c2_1 (a133))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ### ConjTree 765
% 0.60/0.83 767. ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (c2_1 (a133))) (c0_1 (a133)) (c3_1 (a133)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp16)) (ndr1_0) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ### Or 405 766
% 0.60/0.83 768. ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) (ndr1_0) (-. (hskp16)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ### ConjTree 767
% 0.60/0.83 769. ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp16)) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (ndr1_0) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ### Or 20 768
% 0.60/0.83 770. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) (-. (hskp9)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) (-. (hskp1)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### Or 769 371
% 0.60/0.83 771. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (ndr1_0) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) (-. (hskp1)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) (-. (hskp9)) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 770
% 0.60/0.83 772. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) (-. (hskp9)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (ndr1_0) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (-. (hskp1)) (-. (hskp3)) ((hskp14) \/ ((hskp1) \/ (hskp3))) ### Or 4 771
% 0.60/0.83 773. ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp14) \/ ((hskp1) \/ (hskp3))) (-. (hskp3)) (-. (hskp1)) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (ndr1_0) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) (-. (hskp9)) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### Or 772 717
% 0.60/0.83 774. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (c1_1 (a103))) (-. (c3_1 (a103))) (c0_1 (a103)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) (-. (hskp9)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (ndr1_0) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (-. (hskp1)) (-. (hskp3)) ((hskp14) \/ ((hskp1) \/ (hskp3))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### Or 773 393
% 0.60/0.83 775. ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp14) \/ ((hskp1) \/ (hskp3))) (-. (hskp3)) (-. (hskp1)) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (ndr1_0) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (c0_1 (a103)) (-. (c3_1 (a103))) (-. (c1_1 (a103))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### Or 774 401
% 0.60/0.83 776. ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104)))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (c1_1 (a103))) (-. (c3_1 (a103))) (c0_1 (a103)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (ndr1_0) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (-. (hskp1)) (-. (hskp3)) ((hskp14) \/ ((hskp1) \/ (hskp3))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ### ConjTree 775
% 0.60/0.83 777. ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (c0_1 (a103)) (-. (c3_1 (a103))) (-. (c1_1 (a103))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (ndr1_0) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (-. (hskp1)) (-. (hskp3)) ((hskp14) \/ ((hskp1) \/ (hskp3))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) (-. (hskp2)) ((hskp9) \/ ((hskp14) \/ (hskp2))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ### Or 764 776
% 0.60/0.83 778. ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103)))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((hskp9) \/ ((hskp14) \/ (hskp2))) (-. (hskp2)) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((hskp14) \/ ((hskp1) \/ (hskp3))) (-. (hskp3)) (-. (hskp1)) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (ndr1_0) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ### ConjTree 777
% 0.60/0.83 779. ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (-. (hskp2)) ((hskp9) \/ ((hskp14) \/ (hskp2))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (ndr1_0) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) (-. (hskp1)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((hskp14) \/ ((hskp1) \/ (hskp3))) (-. (hskp3)) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ### Or 721 778
% 0.60/0.83 780. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((hskp14) \/ ((hskp12) \/ (hskp11))) (-. (hskp11)) (-. (hskp12)) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (ndr1_0) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) (-. (hskp1)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) (-. (hskp9)) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### Or 560 489
% 0.60/0.83 781. ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c3_1 (a102))) (All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) (c1_1 (a102)) (c2_1 (a102)) (-. (hskp16)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (ndr1_0) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a115))) (c0_1 (a115)) (c0_1 (a133)) (-. (c2_1 (a133))) (c3_1 (a133)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ### DisjTree 514 504 465
% 0.60/0.83 782. ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) (c3_1 (a116)) (c1_1 (a116)) (-. (c0_1 (a116))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) (All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) (-. (c2_1 (a115))) (c0_1 (a115)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (-. (hskp13)) (c3_1 (a149)) (-. (c1_1 (a149))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (hskp16)) (c1_1 (a102)) (c2_1 (a102)) (-. (c3_1 (a102))) (c0_1 (a133)) (c3_1 (a133)) (-. (c2_1 (a133))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ### DisjTree 464 781 190
% 0.60/0.83 783. ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c2_1 (a133))) (c3_1 (a133)) (c0_1 (a133)) (-. (c3_1 (a102))) (c2_1 (a102)) (c1_1 (a102)) (-. (hskp16)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (c1_1 (a149))) (c3_1 (a149)) (-. (hskp13)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c0_1 (a115)) (-. (c2_1 (a115))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (c0_1 (a116))) (c1_1 (a116)) (c3_1 (a116)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) (-. (c3_1 (a124))) (-. (c1_1 (a124))) (-. (c0_1 (a124))) (ndr1_0) ### DisjTree 25 782 42
% 0.60/0.83 784. ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149)))))) (ndr1_0) (-. (c0_1 (a124))) (-. (c1_1 (a124))) (-. (c3_1 (a124))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) (c3_1 (a116)) (c1_1 (a116)) (-. (c0_1 (a116))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (-. (c2_1 (a115))) (c0_1 (a115)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (-. (hskp13)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (hskp16)) (c1_1 (a102)) (c2_1 (a102)) (-. (c3_1 (a102))) (c0_1 (a133)) (c3_1 (a133)) (-. (c2_1 (a133))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ### ConjTree 783
% 0.60/0.83 785. ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c2_1 (a133))) (c3_1 (a133)) (c0_1 (a133)) (-. (c3_1 (a102))) (c2_1 (a102)) (c1_1 (a102)) (-. (hskp16)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c0_1 (a115)) (-. (c2_1 (a115))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (c0_1 (a116))) (c1_1 (a116)) (c3_1 (a116)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) (-. (c3_1 (a124))) (-. (c1_1 (a124))) (-. (c0_1 (a124))) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) (-. (hskp9)) (c3_1 (a110)) (c2_1 (a110)) (ndr1_0) (-. (hskp13)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ### Or 343 784
% 0.60/0.83 786. ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133)))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (-. (hskp13)) (ndr1_0) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp9)) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) (-. (c0_1 (a124))) (-. (c1_1 (a124))) (-. (c3_1 (a124))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) (c3_1 (a116)) (c1_1 (a116)) (-. (c0_1 (a116))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (-. (c2_1 (a115))) (c0_1 (a115)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (hskp16)) (c1_1 (a102)) (c2_1 (a102)) (-. (c3_1 (a102))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ### ConjTree 785
% 0.60/0.83 787. ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c3_1 (a102))) (c2_1 (a102)) (c1_1 (a102)) (-. (hskp16)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (c0_1 (a116))) (c1_1 (a116)) (c3_1 (a116)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) (-. (c3_1 (a124))) (-. (c1_1 (a124))) (-. (c0_1 (a124))) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) (-. (hskp9)) (c3_1 (a110)) (c2_1 (a110)) (-. (hskp13)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (ndr1_0) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ### Or 20 786
% 0.60/0.83 788. ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124)))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (-. (hskp13)) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp9)) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) (c3_1 (a116)) (c1_1 (a116)) (-. (c0_1 (a116))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (hskp16)) (c1_1 (a102)) (c2_1 (a102)) (-. (c3_1 (a102))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### ConjTree 787
% 0.60/0.83 789. ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c3_1 (a102))) (c2_1 (a102)) (c1_1 (a102)) (-. (hskp16)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (c0_1 (a116))) (c1_1 (a116)) (c3_1 (a116)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) (-. (hskp9)) (c3_1 (a110)) (c2_1 (a110)) (-. (hskp13)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (ndr1_0) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp1)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ### Or 17 788
% 0.60/0.83 790. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) (-. (hskp1)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (-. (hskp13)) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp9)) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) (c3_1 (a116)) (c1_1 (a116)) (-. (c0_1 (a116))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c1_1 (a102)) (c2_1 (a102)) (-. (c3_1 (a102))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ### Or 789 371
% 0.60/0.83 791. ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116)))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c3_1 (a102))) (c2_1 (a102)) (c1_1 (a102)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) (-. (hskp9)) (c3_1 (a110)) (c2_1 (a110)) (-. (hskp13)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (ndr1_0) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp1)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 790
% 0.60/0.83 792. ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) (-. (hskp1)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (-. (hskp13)) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp9)) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c1_1 (a102)) (c2_1 (a102)) (-. (c3_1 (a102))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### Or 519 791
% 0.60/0.83 793. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (ndr1_0) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) (-. (c3_1 (a102))) (c2_1 (a102)) (c1_1 (a102)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) (-. (hskp9)) (c3_1 (a110)) (c2_1 (a110)) (-. (hskp13)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (-. (hskp1)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ### ConjTree 792
% 0.60/0.83 794. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) (-. (hskp1)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (-. (hskp13)) (c2_1 (a110)) (c3_1 (a110)) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c1_1 (a102)) (c2_1 (a102)) (-. (c3_1 (a102))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (ndr1_0) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (-. (hskp9)) (-. (hskp2)) ((hskp9) \/ ((hskp14) \/ (hskp2))) ### Or 170 793
% 0.60/0.83 795. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((hskp9) \/ ((hskp14) \/ (hskp2))) (-. (hskp2)) (-. (hskp9)) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (ndr1_0) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) (-. (c3_1 (a102))) (c2_1 (a102)) (c1_1 (a102)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) (c3_1 (a110)) (c2_1 (a110)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (-. (hskp1)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### Or 794 489
% 0.60/0.83 796. ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110)))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) (-. (hskp1)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c1_1 (a102)) (c2_1 (a102)) (-. (c3_1 (a102))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (ndr1_0) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (-. (hskp9)) (-. (hskp2)) ((hskp9) \/ ((hskp14) \/ (hskp2))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### ConjTree 795
% 0.60/0.83 797. ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((hskp9) \/ ((hskp14) \/ (hskp2))) (-. (hskp2)) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (-. (hskp9)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) (-. (hskp1)) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (ndr1_0) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (-. (hskp11)) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### Or 780 796
% 0.60/0.83 798. ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (ndr1_0) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) (-. (hskp1)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) (-. (hskp9)) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) (-. (hskp2)) ((hskp9) \/ ((hskp14) \/ (hskp2))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ### Or 797 627
% 0.60/0.83 799. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((hskp9) \/ ((hskp14) \/ (hskp2))) (-. (hskp2)) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (-. (hskp9)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) (-. (hskp1)) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (ndr1_0) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### Or 798 650
% 0.60/0.83 800. ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp18)) (-. (hskp28)) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) (ndr1_0) ### DisjTree 421 522 520
% 0.60/0.83 801. ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (hskp15)) (c3_1 (a133)) (c0_1 (a133)) (-. (c2_1 (a133))) (ndr1_0) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a115))) (c0_1 (a115)) (c0_1 (a142)) (c1_1 (a142)) (c3_1 (a142)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ### DisjTree 530 39 40
% 0.60/0.83 802. ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c0_1 (a115)) (-. (c2_1 (a115))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) (-. (c2_1 (a133))) (c0_1 (a133)) (c3_1 (a133)) (-. (hskp15)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ### ConjTree 801
% 0.60/0.83 803. ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (hskp15)) (c3_1 (a133)) (c0_1 (a133)) (-. (c2_1 (a133))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a115))) (c0_1 (a115)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (ndr1_0) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) (-. (hskp18)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ### Or 800 802
% 0.60/0.83 804. ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133)))))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp18)) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) (ndr1_0) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c0_1 (a115)) (-. (c2_1 (a115))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (-. (hskp15)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ### ConjTree 803
% 0.60/0.83 805. ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (hskp15)) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) (-. (hskp18)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (ndr1_0) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ### Or 20 804
% 0.60/0.83 806. ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (hskp16)) (c1_1 (a125)) (c0_1 (a125)) (-. (c3_1 (a125))) (c3_1 (a112)) (c0_1 (a112)) (-. (c1_1 (a112))) (ndr1_0) ### DisjTree 261 546 50
% 0.60/0.83 807. ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125)))))) (ndr1_0) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (hskp16)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ### ConjTree 806
% 0.60/0.83 808. ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (hskp16)) (c3_1 (a112)) (c0_1 (a112)) (-. (c1_1 (a112))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (-. (hskp15)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### Or 805 807
% 0.60/0.83 809. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (hskp15)) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (ndr1_0) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ### Or 808 566
% 0.60/0.83 810. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c1_1 (a116)) (c3_1 (a116)) (-. (c0_1 (a116))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### Or 485 588
% 0.60/0.83 811. ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) (c3_1 (a112)) (c0_1 (a112)) (-. (c1_1 (a112))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (ndr1_0) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 810
% 0.60/0.83 812. ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c3_1 (a112)) (c0_1 (a112)) (-. (c1_1 (a112))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### Or 809 811
% 0.60/0.83 813. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (ndr1_0) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ### ConjTree 812
% 0.60/0.83 814. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (ndr1_0) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ### Or 375 813
% 0.60/0.83 815. ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112)))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) (ndr1_0) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### ConjTree 814
% 0.60/0.83 816. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((hskp14) \/ ((hskp1) \/ (hskp3))) (-. (hskp3)) (-. (hskp1)) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (ndr1_0) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp12)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a105)) (c0_1 (a105)) (-. (c1_1 (a105))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### Or 667 815
% 0.60/0.83 817. ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) (-. (c1_1 (a105))) (c0_1 (a105)) (c2_1 (a105)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (ndr1_0) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (-. (hskp1)) (-. (hskp3)) ((hskp14) \/ ((hskp1) \/ (hskp3))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### Or 816 625
% 0.60/0.84 818. ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((hskp14) \/ ((hskp1) \/ (hskp3))) (-. (hskp3)) (-. (hskp1)) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (ndr1_0) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a105)) (c0_1 (a105)) (-. (c1_1 (a105))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ### Or 817 229
% 0.60/0.84 819. (-. (c1_1 (a101))) (c1_1 (a101)) ### Axiom
% 0.60/0.84 820. (c3_1 (a101)) (-. (c3_1 (a101))) ### Axiom
% 0.60/0.84 821. ((ndr1_0) => ((c1_1 (a101)) \/ ((-. (c0_1 (a101))) \/ (-. (c3_1 (a101)))))) (c3_1 (a101)) (-. (c2_1 (a101))) (All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) (-. (c1_1 (a101))) (ndr1_0) ### DisjTree 5 819 681 820
% 0.60/0.84 822. (All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) (ndr1_0) (-. (c1_1 (a101))) (All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) (-. (c2_1 (a101))) (c3_1 (a101)) ### All 821
% 0.60/0.84 823. ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (hskp16)) (c2_1 (a102)) (c1_1 (a102)) (All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) (-. (c3_1 (a102))) (c3_1 (a101)) (-. (c2_1 (a101))) (All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) (-. (c1_1 (a101))) (ndr1_0) ### DisjTree 822 441 50
% 0.60/0.84 824. ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (c1_1 (a101))) (All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) (-. (hskp16)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c2_1 (a109)) (-. (c3_1 (a109))) (-. (c0_1 (a109))) (ndr1_0) ### DisjTree 175 823 674
% 0.60/0.84 825. ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (ndr1_0) (-. (c0_1 (a109))) (-. (c3_1 (a109))) (c2_1 (a109)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (hskp16)) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ### DisjTree 824 244 686
% 0.60/0.84 826. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c2_1 (a109)) (-. (c3_1 (a109))) (-. (c0_1 (a109))) (ndr1_0) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ### Or 825 694
% 0.60/0.84 827. ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109)))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 826
% 0.60/0.84 828. ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ### Or 672 827
% 0.60/0.84 829. ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106)))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (ndr1_0) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### ConjTree 828
% 0.60/0.84 830. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) (-. (c1_1 (a105))) (c0_1 (a105)) (c2_1 (a105)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (ndr1_0) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (-. (hskp1)) (-. (hskp3)) ((hskp14) \/ ((hskp1) \/ (hskp3))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### Or 818 829
% 0.60/0.84 831. ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105)))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((hskp14) \/ ((hskp1) \/ (hskp3))) (-. (hskp3)) (-. (hskp1)) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (ndr1_0) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### ConjTree 830
% 0.60/0.84 832. ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (-. (hskp3)) ((hskp14) \/ ((hskp1) \/ (hskp3))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (ndr1_0) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) (-. (hskp1)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) (-. (hskp2)) ((hskp9) \/ ((hskp14) \/ (hskp2))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### Or 799 831
% 0.60/0.84 833. ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((hskp9) \/ ((hskp14) \/ (hskp2))) (-. (hskp2)) (-. (hskp9)) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) (-. (c3_1 (a102))) (c2_1 (a102)) (c1_1 (a102)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((hskp14) \/ ((hskp1) \/ (hskp3))) (-. (hskp3)) (-. (hskp1)) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (ndr1_0) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (c1_1 (a103))) (-. (c3_1 (a103))) (c0_1 (a103)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### Or 726 796
% 0.60/0.84 834. ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (c0_1 (a103)) (-. (c3_1 (a103))) (-. (c1_1 (a103))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (ndr1_0) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (-. (hskp1)) (-. (hskp3)) ((hskp14) \/ ((hskp1) \/ (hskp3))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c1_1 (a102)) (c2_1 (a102)) (-. (c3_1 (a102))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) (-. (hskp9)) (-. (hskp2)) ((hskp9) \/ ((hskp14) \/ (hskp2))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ### Or 833 717
% 0.60/0.84 835. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((hskp9) \/ ((hskp14) \/ (hskp2))) (-. (hskp2)) (-. (hskp9)) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) (-. (c3_1 (a102))) (c2_1 (a102)) (c1_1 (a102)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((hskp14) \/ ((hskp1) \/ (hskp3))) (-. (hskp3)) (-. (hskp1)) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (ndr1_0) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (c1_1 (a103))) (-. (c3_1 (a103))) (c0_1 (a103)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### Or 834 393
% 0.60/0.84 836. ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (c0_1 (a103)) (-. (c3_1 (a103))) (-. (c1_1 (a103))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (ndr1_0) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (-. (hskp1)) (-. (hskp3)) ((hskp14) \/ ((hskp1) \/ (hskp3))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c1_1 (a102)) (c2_1 (a102)) (-. (c3_1 (a102))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) (-. (hskp2)) ((hskp9) \/ ((hskp14) \/ (hskp2))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### Or 835 401
% 0.60/0.84 837. ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103)))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((hskp9) \/ ((hskp14) \/ (hskp2))) (-. (hskp2)) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) (-. (c3_1 (a102))) (c2_1 (a102)) (c1_1 (a102)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((hskp14) \/ ((hskp1) \/ (hskp3))) (-. (hskp3)) (-. (hskp1)) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (ndr1_0) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ### ConjTree 836
% 0.60/0.84 838. ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((hskp9) \/ ((hskp14) \/ (hskp2))) (-. (hskp2)) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) (-. (hskp1)) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (ndr1_0) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((hskp14) \/ ((hskp1) \/ (hskp3))) (-. (hskp3)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ### Or 832 837
% 0.60/0.84 839. ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102)))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (-. (hskp3)) ((hskp14) \/ ((hskp1) \/ (hskp3))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (ndr1_0) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) (-. (hskp1)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) (-. (hskp2)) ((hskp9) \/ ((hskp14) \/ (hskp2))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ### ConjTree 838
% 0.60/0.84 840. ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102))))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) (-. (hskp3)) ((hskp14) \/ ((hskp1) \/ (hskp3))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) (-. (hskp1)) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (ndr1_0) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((hskp9) \/ ((hskp14) \/ (hskp2))) (-. (hskp2)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ### Or 779 839
% 0.60/0.84 841. ((ndr1_0) /\ ((c3_1 (a101)) /\ ((-. (c1_1 (a101))) /\ (-. (c2_1 (a101)))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (-. (hskp2)) ((hskp9) \/ ((hskp14) \/ (hskp2))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) (-. (hskp1)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((hskp14) \/ ((hskp1) \/ (hskp3))) (-. (hskp3)) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102))))))) ### ConjTree 840
% 0.60/0.84 842. ((-. (hskp5)) \/ ((ndr1_0) /\ ((c3_1 (a101)) /\ ((-. (c1_1 (a101))) /\ (-. (c2_1 (a101))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (-. (hskp2)) ((hskp9) \/ ((hskp14) \/ (hskp2))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) (-. (hskp1)) (-. (hskp3)) ((hskp14) \/ ((hskp1) \/ (hskp3))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102))))))) ### Or 499 841
% 0.60/0.84 843. (-. (c1_1 (a99))) (c1_1 (a99)) ### Axiom
% 0.60/0.84 844. (-. (c3_1 (a99))) (c3_1 (a99)) ### Axiom
% 0.60/0.84 845. (c2_1 (a99)) (-. (c2_1 (a99))) ### Axiom
% 0.60/0.84 846. ((ndr1_0) => ((c1_1 (a99)) \/ ((c3_1 (a99)) \/ (-. (c2_1 (a99)))))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (ndr1_0) ### DisjTree 5 843 844 845
% 0.60/0.84 847. (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) (ndr1_0) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ### All 846
% 0.60/0.84 848. (-. (c3_1 (a118))) (c3_1 (a118)) ### Axiom
% 0.60/0.84 849. (c1_1 (a118)) (-. (c1_1 (a118))) ### Axiom
% 0.60/0.84 850. ((ndr1_0) => ((c3_1 (a118)) \/ ((-. (c0_1 (a118))) \/ (-. (c1_1 (a118)))))) (c1_1 (a118)) (-. (c2_1 (a118))) (All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) (-. (c3_1 (a118))) (ndr1_0) ### DisjTree 5 848 131 849
% 0.60/0.84 851. (All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) (ndr1_0) (-. (c3_1 (a118))) (All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) (-. (c2_1 (a118))) (c1_1 (a118)) ### All 850
% 0.60/0.84 852. ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (-. (hskp10)) (c1_1 (a118)) (-. (c2_1 (a118))) (All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) (-. (c3_1 (a118))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (ndr1_0) ### DisjTree 847 851 19
% 0.60/0.84 853. ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) (ndr1_0) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) (-. (c3_1 (a118))) (-. (c2_1 (a118))) (c1_1 (a118)) (-. (hskp10)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ### DisjTree 852 61 62
% 0.60/0.84 854. ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118)))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (-. (hskp10)) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (ndr1_0) (-. (c0_1 (a110))) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ### ConjTree 853
% 0.60/0.84 855. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp1)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### Or 125 854
% 0.60/0.84 856. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) (-. (hskp1)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (c0_1 (a110))) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (ndr1_0) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 855
% 0.60/0.84 857. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (ndr1_0) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp1)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (-. (hskp9)) (-. (hskp2)) ((hskp9) \/ ((hskp14) \/ (hskp2))) ### Or 170 856
% 0.60/0.84 858. ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110)))))) ((hskp9) \/ ((hskp14) \/ (hskp2))) (-. (hskp2)) (-. (hskp9)) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) (-. (hskp1)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (ndr1_0) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### ConjTree 857
% 0.60/0.84 859. ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp1)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (-. (hskp9)) (-. (hskp2)) ((hskp9) \/ ((hskp14) \/ (hskp2))) ((hskp14) \/ ((hskp12) \/ (hskp11))) (-. (hskp11)) (ndr1_0) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### Or 225 858
% 0.60/0.84 860. ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (-. (hskp10)) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (c2_1 (a109)) (-. (c3_1 (a109))) (-. (c0_1 (a109))) (ndr1_0) ### DisjTree 175 847 19
% 0.60/0.84 861. ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109)))))) (ndr1_0) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) (-. (hskp10)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ### ConjTree 860
% 0.60/0.84 862. ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) (-. (hskp5)) (ndr1_0) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((hskp9) \/ ((hskp14) \/ (hskp2))) (-. (hskp2)) (-. (hskp9)) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) (-. (hskp1)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ### Or 859 861
% 0.60/0.84 863. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp1)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (-. (hskp9)) (-. (hskp2)) ((hskp9) \/ ((hskp14) \/ (hskp2))) ((hskp14) \/ ((hskp12) \/ (hskp11))) (ndr1_0) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### Or 862 430
% 0.60/0.84 864. (-. (hskp21)) (hskp21) ### P-NotP
% 0.60/0.84 865. ((hskp14) \/ ((hskp16) \/ (hskp21))) (-. (hskp21)) (-. (hskp16)) (-. (hskp14)) ### DisjTree 1 50 864
% 0.60/0.84 866. (-. (c1_1 (a99))) (c1_1 (a99)) ### Axiom
% 0.60/0.84 867. (-. (c0_1 (a99))) (c0_1 (a99)) ### Axiom
% 0.60/0.84 868. (-. (c3_1 (a99))) (c3_1 (a99)) ### Axiom
% 0.60/0.84 869. (c2_1 (a99)) (-. (c2_1 (a99))) ### Axiom
% 0.60/0.84 870. ((ndr1_0) => ((c0_1 (a99)) \/ ((c3_1 (a99)) \/ (-. (c2_1 (a99)))))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c0_1 (a99))) (ndr1_0) ### DisjTree 5 867 868 869
% 0.60/0.84 871. (All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) (ndr1_0) (-. (c0_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ### All 870
% 0.60/0.84 872. (c2_1 (a99)) (-. (c2_1 (a99))) ### Axiom
% 0.60/0.84 873. ((ndr1_0) => ((c1_1 (a99)) \/ ((-. (c0_1 (a99))) \/ (-. (c2_1 (a99)))))) (c2_1 (a99)) (-. (c3_1 (a99))) (All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) (-. (c1_1 (a99))) (ndr1_0) ### DisjTree 5 866 871 872
% 0.60/0.84 874. (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50)))))) (ndr1_0) (-. (c1_1 (a99))) (All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) (-. (c3_1 (a99))) (c2_1 (a99)) ### All 873
% 0.60/0.84 875. ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a99)) (-. (c3_1 (a99))) (All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) (-. (c1_1 (a99))) (ndr1_0) (-. (c3_1 (a127))) (c0_1 (a127)) (c2_1 (a127)) (-. (hskp28)) (-. (hskp18)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ### Or 523 874
% 0.60/0.84 876. ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (-. (hskp10)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp18)) (-. (hskp28)) (c2_1 (a127)) (c0_1 (a127)) (-. (c3_1 (a127))) (ndr1_0) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ### DisjTree 875 847 19
% 0.60/0.84 877. (-. (c2_1 (a145))) (c2_1 (a145)) ### Axiom
% 0.60/0.84 878. (c1_1 (a145)) (-. (c1_1 (a145))) ### Axiom
% 0.60/0.84 879. (c3_1 (a145)) (-. (c3_1 (a145))) ### Axiom
% 0.60/0.84 880. ((ndr1_0) => ((c2_1 (a145)) \/ ((-. (c1_1 (a145))) \/ (-. (c3_1 (a145)))))) (c3_1 (a145)) (c1_1 (a145)) (-. (c2_1 (a145))) (ndr1_0) ### DisjTree 5 877 878 879
% 0.60/0.84 881. (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) (ndr1_0) (-. (c2_1 (a145))) (c1_1 (a145)) (c3_1 (a145)) ### All 880
% 0.60/0.84 882. (-. (c2_1 (a145))) (c2_1 (a145)) ### Axiom
% 0.60/0.84 883. (c3_1 (a145)) (-. (c3_1 (a145))) ### Axiom
% 0.60/0.84 884. ((ndr1_0) => ((c1_1 (a145)) \/ ((c2_1 (a145)) \/ (-. (c3_1 (a145)))))) (c3_1 (a145)) (-. (c2_1 (a145))) (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) (ndr1_0) ### DisjTree 5 881 882 883
% 0.60/0.84 885. (All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) (ndr1_0) (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) (-. (c2_1 (a145))) (c3_1 (a145)) ### All 884
% 0.60/0.84 886. ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c2_1 (a165)) (c3_1 (a165)) (c1_1 (a165)) (All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) (c1_1 (a152)) (c0_1 (a152)) (-. (c2_1 (a152))) (c3_1 (a145)) (-. (c2_1 (a145))) (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) (ndr1_0) ### DisjTree 885 73 91
% 0.60/0.84 887. (c0_1 (a142)) (-. (c0_1 (a142))) ### Axiom
% 0.60/0.84 888. (c2_1 (a142)) (-. (c2_1 (a142))) ### Axiom
% 0.60/0.84 889. (c3_1 (a142)) (-. (c3_1 (a142))) ### Axiom
% 0.60/0.84 890. ((ndr1_0) => ((-. (c0_1 (a142))) \/ ((-. (c2_1 (a142))) \/ (-. (c3_1 (a142)))))) (c3_1 (a142)) (c2_1 (a142)) (c0_1 (a142)) (ndr1_0) ### DisjTree 5 887 888 889
% 0.60/0.84 891. (All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) (ndr1_0) (c0_1 (a142)) (c2_1 (a142)) (c3_1 (a142)) ### All 890
% 0.60/0.84 892. (c0_1 (a142)) (-. (c0_1 (a142))) ### Axiom
% 0.60/0.84 893. (c1_1 (a142)) (-. (c1_1 (a142))) ### Axiom
% 0.60/0.84 894. ((ndr1_0) => ((c2_1 (a142)) \/ ((-. (c0_1 (a142))) \/ (-. (c1_1 (a142)))))) (c1_1 (a142)) (c3_1 (a142)) (c0_1 (a142)) (All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) (ndr1_0) ### DisjTree 5 891 892 893
% 0.60/0.84 895. (All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) (ndr1_0) (All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) (c0_1 (a142)) (c3_1 (a142)) (c1_1 (a142)) ### All 894
% 0.60/0.84 896. ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c1_1 (a142)) (c3_1 (a142)) (c0_1 (a142)) (All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) (c3_1 (a145)) (-. (c2_1 (a145))) (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) (ndr1_0) ### DisjTree 885 895 529
% 0.60/0.84 897. ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) (-. (hskp1)) (c0_1 (a142)) (c3_1 (a142)) (c1_1 (a142)) (ndr1_0) (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) (-. (c2_1 (a145))) (c3_1 (a145)) (-. (c2_1 (a152))) (c0_1 (a152)) (c1_1 (a152)) (c1_1 (a165)) (c3_1 (a165)) (c2_1 (a165)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ### DisjTree 886 896 2
% 0.60/0.84 898. ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c2_1 (a165)) (c3_1 (a165)) (c1_1 (a165)) (c3_1 (a145)) (-. (c2_1 (a145))) (c1_1 (a142)) (c3_1 (a142)) (c0_1 (a142)) (-. (hskp1)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) (c1_1 (a152)) (c0_1 (a152)) (-. (c2_1 (a152))) (ndr1_0) ### DisjTree 73 897 91
% 0.60/0.84 899. ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (c2_1 (a145))) (c3_1 (a145)) (All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) (c0_1 (a142)) (c3_1 (a142)) (c1_1 (a142)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c1_1 (a152)) (c0_1 (a152)) (-. (c2_1 (a152))) (ndr1_0) ### DisjTree 73 896 529
% 0.60/0.84 900. (ndr1_0) (-. (c2_1 (a152))) (c0_1 (a152)) (c1_1 (a152)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) (-. (hskp1)) (c0_1 (a142)) (c3_1 (a142)) (c1_1 (a142)) (-. (c2_1 (a145))) (c3_1 (a145)) (c1_1 (a165)) (c3_1 (a165)) (c2_1 (a165)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ### DisjTree 898 899 2
% 0.60/0.84 901. ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a145)) (-. (c2_1 (a145))) (c1_1 (a142)) (c3_1 (a142)) (c0_1 (a142)) (-. (hskp1)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) (c1_1 (a152)) (c0_1 (a152)) (-. (c2_1 (a152))) (ndr1_0) ### ConjTree 900
% 0.60/0.84 902. ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) (ndr1_0) (-. (c2_1 (a152))) (c0_1 (a152)) (c1_1 (a152)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) (-. (hskp1)) (c0_1 (a142)) (c3_1 (a142)) (c1_1 (a142)) (-. (c2_1 (a145))) (c3_1 (a145)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp20)) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ### Or 629 901
% 0.60/0.84 903. ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) (-. (hskp20)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a145)) (-. (c2_1 (a145))) (-. (hskp1)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) (c1_1 (a152)) (c0_1 (a152)) (-. (c2_1 (a152))) (ndr1_0) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ### ConjTree 902
% 0.60/0.84 904. ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) (-. (c2_1 (a152))) (c0_1 (a152)) (c1_1 (a152)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) (-. (hskp1)) (-. (c2_1 (a145))) (c3_1 (a145)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp20)) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (ndr1_0) (-. (c3_1 (a127))) (c0_1 (a127)) (c2_1 (a127)) (-. (hskp18)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp10)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ### Or 876 903
% 0.60/0.84 905. ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152)))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (-. (hskp10)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp18)) (c2_1 (a127)) (c0_1 (a127)) (-. (c3_1 (a127))) (ndr1_0) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) (-. (hskp20)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a145)) (-. (c2_1 (a145))) (-. (hskp1)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ### ConjTree 904
% 0.60/0.84 906. ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) (-. (hskp1)) (-. (c2_1 (a145))) (c3_1 (a145)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp20)) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (-. (c3_1 (a127))) (c0_1 (a127)) (c2_1 (a127)) (-. (hskp18)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp10)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp16)) (ndr1_0) (-. (c0_1 (a110))) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ### Or 65 905
% 0.60/0.84 907. ((ndr1_0) /\ ((c3_1 (a145)) /\ ((-. (c0_1 (a145))) /\ (-. (c2_1 (a145)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) (ndr1_0) (-. (hskp16)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (-. (hskp10)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp18)) (c2_1 (a127)) (c0_1 (a127)) (-. (c3_1 (a127))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) (-. (hskp20)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp1)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ### ConjTree 906
% 0.60/0.84 908. ((-. (hskp21)) \/ ((ndr1_0) /\ ((c3_1 (a145)) /\ ((-. (c0_1 (a145))) /\ (-. (c2_1 (a145))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) (-. (hskp1)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp20)) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (-. (c3_1 (a127))) (c0_1 (a127)) (c2_1 (a127)) (-. (hskp18)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp10)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (ndr1_0) (-. (c0_1 (a110))) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (-. (hskp14)) (-. (hskp16)) ((hskp14) \/ ((hskp16) \/ (hskp21))) ### Or 865 907
% 0.60/0.84 909. ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp14) \/ ((hskp16) \/ (hskp21))) (-. (hskp16)) (-. (hskp14)) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) (ndr1_0) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (-. (hskp10)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp18)) (c2_1 (a127)) (c0_1 (a127)) (-. (c3_1 (a127))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp1)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c3_1 (a145)) /\ ((-. (c0_1 (a145))) /\ (-. (c2_1 (a145))))))) ### Or 908 124
% 0.60/0.84 910. ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127)))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c3_1 (a145)) /\ ((-. (c0_1 (a145))) /\ (-. (c2_1 (a145))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) (-. (hskp1)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (-. (hskp18)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp10)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (ndr1_0) (-. (c0_1 (a110))) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (-. (hskp14)) (-. (hskp16)) ((hskp14) \/ ((hskp16) \/ (hskp21))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### ConjTree 909
% 0.60/0.84 911. ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp14) \/ ((hskp16) \/ (hskp21))) (-. (hskp16)) (-. (hskp14)) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) (ndr1_0) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (-. (hskp10)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp1)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c3_1 (a145)) /\ ((-. (c0_1 (a145))) /\ (-. (c2_1 (a145))))))) (-. (hskp18)) (-. (hskp13)) ((hskp18) \/ ((hskp19) \/ (hskp13))) ### Or 521 910
% 0.60/0.84 912. ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (-. (hskp10)) (c1_1 (a125)) (c0_1 (a125)) (-. (c3_1 (a125))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (ndr1_0) ### DisjTree 847 546 19
% 0.60/0.84 913. ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125)))))) (ndr1_0) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) (-. (hskp10)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ### ConjTree 912
% 0.60/0.84 914. ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((hskp18) \/ ((hskp19) \/ (hskp13))) (-. (hskp13)) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c3_1 (a145)) /\ ((-. (c0_1 (a145))) /\ (-. (c2_1 (a145))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) (-. (hskp1)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp10)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (ndr1_0) (-. (c0_1 (a110))) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (-. (hskp14)) (-. (hskp16)) ((hskp14) \/ ((hskp16) \/ (hskp21))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ### Or 911 913
% 0.60/0.84 915. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp14) \/ ((hskp16) \/ (hskp21))) (-. (hskp14)) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) (ndr1_0) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (-. (hskp10)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp1)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c3_1 (a145)) /\ ((-. (c0_1 (a145))) /\ (-. (c2_1 (a145))))))) (-. (hskp13)) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ### Or 914 854
% 0.60/0.84 916. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((hskp18) \/ ((hskp19) \/ (hskp13))) (-. (hskp13)) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c3_1 (a145)) /\ ((-. (c0_1 (a145))) /\ (-. (c2_1 (a145))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) (-. (hskp1)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp10)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (ndr1_0) (-. (c0_1 (a110))) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((hskp14) \/ ((hskp16) \/ (hskp21))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### Or 915 856
% 0.60/0.85 917. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp1)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (ndr1_0) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ### Or 375 856
% 0.60/0.85 918. ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112)))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) (ndr1_0) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) (-. (hskp1)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (c0_1 (a110))) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### ConjTree 917
% 0.60/0.85 919. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp14) \/ ((hskp16) \/ (hskp21))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) (ndr1_0) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (-. (hskp10)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp1)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c3_1 (a145)) /\ ((-. (c0_1 (a145))) /\ (-. (c2_1 (a145))))))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### Or 916 918
% 0.60/0.85 920. ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110)))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c3_1 (a145)) /\ ((-. (c0_1 (a145))) /\ (-. (c2_1 (a145))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) (-. (hskp1)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp10)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (ndr1_0) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((hskp14) \/ ((hskp16) \/ (hskp21))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### ConjTree 919
% 0.60/0.85 921. ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp14) \/ ((hskp16) \/ (hskp21))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (-. (hskp10)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp1)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c3_1 (a145)) /\ ((-. (c0_1 (a145))) /\ (-. (c2_1 (a145))))))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((hskp14) \/ ((hskp12) \/ (hskp11))) (-. (hskp11)) (ndr1_0) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### Or 225 920
% 0.60/0.85 922. ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) (-. (hskp5)) (ndr1_0) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c3_1 (a145)) /\ ((-. (c0_1 (a145))) /\ (-. (c2_1 (a145))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) (-. (hskp1)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp10)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((hskp14) \/ ((hskp16) \/ (hskp21))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ### Or 921 861
% 0.60/0.85 923. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (-. (c1_1 (a105))) (c2_1 (a105)) (c0_1 (a105)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp8)) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp14) \/ ((hskp16) \/ (hskp21))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp1)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c3_1 (a145)) /\ ((-. (c0_1 (a145))) /\ (-. (c2_1 (a145))))))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((hskp14) \/ ((hskp12) \/ (hskp11))) (ndr1_0) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### Or 922 306
% 0.60/0.85 924. ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105)))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) (-. (hskp5)) (ndr1_0) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c3_1 (a145)) /\ ((-. (c0_1 (a145))) /\ (-. (c2_1 (a145))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) (-. (hskp1)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((hskp14) \/ ((hskp16) \/ (hskp21))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) (-. (hskp8)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### ConjTree 923
% 0.60/0.85 925. ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp8)) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((hskp14) \/ ((hskp16) \/ (hskp21))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c3_1 (a145)) /\ ((-. (c0_1 (a145))) /\ (-. (c2_1 (a145))))))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) (-. (hskp5)) (ndr1_0) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((hskp9) \/ ((hskp14) \/ (hskp2))) (-. (hskp2)) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) (-. (hskp1)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### Or 863 924
% 0.60/0.85 926. ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) (-. (c2_1 (a152))) (c0_1 (a152)) (c1_1 (a152)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) (-. (hskp1)) (-. (c2_1 (a145))) (c3_1 (a145)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp20)) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp18)) (c2_1 (a127)) (c0_1 (a127)) (-. (c3_1 (a127))) (ndr1_0) (-. (c1_1 (a105))) (c0_1 (a105)) (c2_1 (a105)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ### Or 652 903
% 0.60/0.85 927. ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152)))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a105)) (c0_1 (a105)) (-. (c1_1 (a105))) (ndr1_0) (-. (c3_1 (a127))) (c0_1 (a127)) (c2_1 (a127)) (-. (hskp18)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) (-. (hskp20)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a145)) (-. (c2_1 (a145))) (-. (hskp1)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ### ConjTree 926
% 0.60/0.85 928. ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) (-. (hskp1)) (-. (c2_1 (a145))) (c3_1 (a145)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp20)) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp18)) (c2_1 (a127)) (c0_1 (a127)) (-. (c3_1 (a127))) (-. (c1_1 (a105))) (c0_1 (a105)) (c2_1 (a105)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp16)) (ndr1_0) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ### Or 405 927
% 0.60/0.85 929. ((ndr1_0) /\ ((c3_1 (a145)) /\ ((-. (c0_1 (a145))) /\ (-. (c2_1 (a145)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) (ndr1_0) (-. (hskp16)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a105)) (c0_1 (a105)) (-. (c1_1 (a105))) (-. (c3_1 (a127))) (c0_1 (a127)) (c2_1 (a127)) (-. (hskp18)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) (-. (hskp20)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp1)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ### ConjTree 928
% 0.60/0.85 930. ((-. (hskp21)) \/ ((ndr1_0) /\ ((c3_1 (a145)) /\ ((-. (c0_1 (a145))) /\ (-. (c2_1 (a145))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) (-. (hskp1)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp20)) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp18)) (c2_1 (a127)) (c0_1 (a127)) (-. (c3_1 (a127))) (-. (c1_1 (a105))) (c0_1 (a105)) (c2_1 (a105)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (ndr1_0) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (-. (hskp14)) (-. (hskp16)) ((hskp14) \/ ((hskp16) \/ (hskp21))) ### Or 865 929
% 0.60/0.85 931. (c0_1 (a127)) (-. (c0_1 (a127))) ### Axiom
% 0.60/0.85 932. (c2_1 (a127)) (-. (c2_1 (a127))) ### Axiom
% 0.60/0.85 933. ((ndr1_0) => ((-. (c0_1 (a127))) \/ ((-. (c1_1 (a127))) \/ (-. (c2_1 (a127)))))) (c2_1 (a127)) (-. (c3_1 (a127))) (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) (c0_1 (a127)) (ndr1_0) ### DisjTree 5 931 292 932
% 0.60/0.85 934. (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))) (ndr1_0) (c0_1 (a127)) (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) (-. (c3_1 (a127))) (c2_1 (a127)) ### All 933
% 0.60/0.85 935. (c0_1 (a127)) (-. (c0_1 (a127))) ### Axiom
% 0.60/0.85 936. (c1_1 (a127)) (-. (c1_1 (a127))) ### Axiom
% 0.60/0.85 937. (c2_1 (a127)) (-. (c2_1 (a127))) ### Axiom
% 0.60/0.85 938. ((ndr1_0) => ((-. (c0_1 (a127))) \/ ((-. (c1_1 (a127))) \/ (-. (c2_1 (a127)))))) (c2_1 (a127)) (c1_1 (a127)) (c0_1 (a127)) (ndr1_0) ### DisjTree 5 935 936 937
% 0.60/0.85 939. (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))) (ndr1_0) (c0_1 (a127)) (c1_1 (a127)) (c2_1 (a127)) ### All 938
% 0.60/0.85 940. (c0_1 (a127)) (-. (c0_1 (a127))) ### Axiom
% 0.60/0.85 941. (c2_1 (a127)) (-. (c2_1 (a127))) ### Axiom
% 0.60/0.85 942. ((ndr1_0) => ((c1_1 (a127)) \/ ((-. (c0_1 (a127))) \/ (-. (c2_1 (a127)))))) (c2_1 (a127)) (c0_1 (a127)) (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))) (ndr1_0) ### DisjTree 5 939 940 941
% 0.60/0.85 943. (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50)))))) (ndr1_0) (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))) (c0_1 (a127)) (c2_1 (a127)) ### All 942
% 0.60/0.85 944. ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a127)) (-. (c3_1 (a127))) (c0_1 (a127)) (ndr1_0) (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))) ### Or 934 943
% 0.60/0.85 945. ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (c0_1 (a127)) (-. (c3_1 (a127))) (c2_1 (a127)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c0_1 (a133)) (ndr1_0) (-. (c2_1 (a152))) (c0_1 (a152)) (c1_1 (a152)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) (-. (hskp26)) (-. (c2_1 (a133))) (c3_1 (a133)) (c1_1 (a165)) (c3_1 (a165)) (c2_1 (a165)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ### DisjTree 95 39 944
% 0.60/0.85 946. ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a133)) (-. (c2_1 (a133))) (-. (hskp26)) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (c1_1 (a152)) (c0_1 (a152)) (-. (c2_1 (a152))) (ndr1_0) (c0_1 (a133)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a127)) (-. (c3_1 (a127))) (c0_1 (a127)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ### ConjTree 945
% 0.60/0.85 947. ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (c0_1 (a127)) (-. (c3_1 (a127))) (c2_1 (a127)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c0_1 (a133)) (ndr1_0) (-. (c2_1 (a152))) (c0_1 (a152)) (c1_1 (a152)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp26)) (-. (c2_1 (a133))) (c3_1 (a133)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp24)) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ### Or 68 946
% 0.60/0.85 948. (c0_1 (a127)) (-. (c3_1 (a127))) (c2_1 (a127)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (ndr1_0) (-. (c2_1 (a152))) (c0_1 (a152)) (c1_1 (a152)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (c2_1 (a94)) (c1_1 (a94)) (c0_1 (a94)) (c0_1 (a133)) (-. (c2_1 (a133))) (c3_1 (a133)) (c1_1 (a165)) (c3_1 (a165)) (c2_1 (a165)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ### DisjTree 115 39 944
% 0.60/0.85 949. ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a133)) (-. (c2_1 (a133))) (c0_1 (a133)) (c0_1 (a94)) (c1_1 (a94)) (c2_1 (a94)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (c1_1 (a152)) (c0_1 (a152)) (-. (c2_1 (a152))) (ndr1_0) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a127)) (-. (c3_1 (a127))) (c0_1 (a127)) ### ConjTree 948
% 0.60/0.85 950. ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) (c0_1 (a127)) (-. (c3_1 (a127))) (c2_1 (a127)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (ndr1_0) (-. (c2_1 (a152))) (c0_1 (a152)) (c1_1 (a152)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (c2_1 (a94)) (c1_1 (a94)) (c0_1 (a94)) (c0_1 (a133)) (-. (c2_1 (a133))) (c3_1 (a133)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp24)) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ### Or 68 949
% 0.60/0.85 951. ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) (-. (hskp24)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a133)) (-. (c2_1 (a133))) (c0_1 (a133)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (c1_1 (a152)) (c0_1 (a152)) (-. (c2_1 (a152))) (ndr1_0) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a127)) (-. (c3_1 (a127))) (c0_1 (a127)) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ### ConjTree 950
% 0.60/0.85 952. ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) (-. (hskp24)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a133)) (-. (c2_1 (a133))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (c1_1 (a152)) (c0_1 (a152)) (-. (c2_1 (a152))) (ndr1_0) (c0_1 (a133)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a127)) (-. (c3_1 (a127))) (c0_1 (a127)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ### Or 947 951
% 0.60/0.85 953. ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (c0_1 (a127)) (-. (c3_1 (a127))) (c2_1 (a127)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c0_1 (a133)) (ndr1_0) (-. (c2_1 (a152))) (c0_1 (a152)) (c1_1 (a152)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c2_1 (a133))) (c3_1 (a133)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ### Or 952 404
% 0.60/0.85 954. ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152)))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a133)) (-. (c2_1 (a133))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (ndr1_0) (c0_1 (a133)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a127)) (-. (c3_1 (a127))) (c0_1 (a127)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ### ConjTree 953
% 0.60/0.85 955. ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (c0_1 (a127)) (-. (c3_1 (a127))) (c2_1 (a127)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c0_1 (a133)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c2_1 (a133))) (c3_1 (a133)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp16)) (ndr1_0) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ### Or 405 954
% 0.60/0.85 956. ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) (ndr1_0) (-. (hskp16)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a127)) (-. (c3_1 (a127))) (c0_1 (a127)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ### ConjTree 955
% 0.60/0.85 957. ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp14) \/ ((hskp16) \/ (hskp21))) (-. (hskp16)) (-. (hskp14)) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) (ndr1_0) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a105)) (c0_1 (a105)) (-. (c1_1 (a105))) (-. (c3_1 (a127))) (c0_1 (a127)) (c2_1 (a127)) (-. (hskp18)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp1)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c3_1 (a145)) /\ ((-. (c0_1 (a145))) /\ (-. (c2_1 (a145))))))) ### Or 930 956
% 0.60/0.85 958. ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127)))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c3_1 (a145)) /\ ((-. (c0_1 (a145))) /\ (-. (c2_1 (a145))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) (-. (hskp1)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp18)) (-. (c1_1 (a105))) (c0_1 (a105)) (c2_1 (a105)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (ndr1_0) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (-. (hskp14)) (-. (hskp16)) ((hskp14) \/ ((hskp16) \/ (hskp21))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### ConjTree 957
% 0.60/0.85 959. ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp14) \/ ((hskp16) \/ (hskp21))) (-. (hskp16)) (-. (hskp14)) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) (ndr1_0) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a105)) (c0_1 (a105)) (-. (c1_1 (a105))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp1)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c3_1 (a145)) /\ ((-. (c0_1 (a145))) /\ (-. (c2_1 (a145))))))) (-. (hskp18)) (-. (hskp13)) ((hskp18) \/ ((hskp19) \/ (hskp13))) ### Or 521 958
% 0.60/0.85 960. ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (-. (hskp10)) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((hskp18) \/ ((hskp19) \/ (hskp13))) (-. (hskp13)) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c3_1 (a145)) /\ ((-. (c0_1 (a145))) /\ (-. (c2_1 (a145))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) (-. (hskp1)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (c1_1 (a105))) (c0_1 (a105)) (c2_1 (a105)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (ndr1_0) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (-. (hskp14)) (-. (hskp16)) ((hskp14) \/ ((hskp16) \/ (hskp21))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ### Or 959 913
% 0.60/0.85 961. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp14) \/ ((hskp16) \/ (hskp21))) (-. (hskp14)) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) (ndr1_0) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a105)) (c0_1 (a105)) (-. (c1_1 (a105))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp1)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c3_1 (a145)) /\ ((-. (c0_1 (a145))) /\ (-. (c2_1 (a145))))))) (-. (hskp13)) ((hskp18) \/ ((hskp19) \/ (hskp13))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) (-. (hskp10)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ### Or 960 854
% 0.60/0.85 962. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (-. (hskp10)) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((hskp18) \/ ((hskp19) \/ (hskp13))) (-. (hskp13)) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c3_1 (a145)) /\ ((-. (c0_1 (a145))) /\ (-. (c2_1 (a145))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) (-. (hskp1)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (c1_1 (a105))) (c0_1 (a105)) (c2_1 (a105)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (ndr1_0) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((hskp14) \/ ((hskp16) \/ (hskp21))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) (-. (c0_1 (a110))) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### Or 961 856
% 0.60/0.85 963. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp14) \/ ((hskp16) \/ (hskp21))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) (ndr1_0) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a105)) (c0_1 (a105)) (-. (c1_1 (a105))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp1)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c3_1 (a145)) /\ ((-. (c0_1 (a145))) /\ (-. (c2_1 (a145))))))) ((hskp18) \/ ((hskp19) \/ (hskp13))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) (-. (hskp10)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### Or 962 918
% 0.60/0.85 964. ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110)))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (-. (hskp10)) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c3_1 (a145)) /\ ((-. (c0_1 (a145))) /\ (-. (c2_1 (a145))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) (-. (hskp1)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (c1_1 (a105))) (c0_1 (a105)) (c2_1 (a105)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (ndr1_0) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((hskp14) \/ ((hskp16) \/ (hskp21))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### ConjTree 963
% 0.60/0.85 965. ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp14) \/ ((hskp16) \/ (hskp21))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a105)) (c0_1 (a105)) (-. (c1_1 (a105))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp1)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c3_1 (a145)) /\ ((-. (c0_1 (a145))) /\ (-. (c2_1 (a145))))))) ((hskp18) \/ ((hskp19) \/ (hskp13))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) (-. (hskp10)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((hskp14) \/ ((hskp12) \/ (hskp11))) (-. (hskp11)) (ndr1_0) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### Or 225 964
% 0.60/0.85 966. ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) (-. (hskp5)) (ndr1_0) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (-. (hskp10)) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c3_1 (a145)) /\ ((-. (c0_1 (a145))) /\ (-. (c2_1 (a145))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) (-. (hskp1)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (c1_1 (a105))) (c0_1 (a105)) (c2_1 (a105)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((hskp14) \/ ((hskp16) \/ (hskp21))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ### Or 965 861
% 0.60/0.85 967. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp14) \/ ((hskp16) \/ (hskp21))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a105)) (c0_1 (a105)) (-. (c1_1 (a105))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp1)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c3_1 (a145)) /\ ((-. (c0_1 (a145))) /\ (-. (c2_1 (a145))))))) ((hskp18) \/ ((hskp19) \/ (hskp13))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((hskp14) \/ ((hskp12) \/ (hskp11))) (ndr1_0) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### Or 966 328
% 0.60/0.85 968. ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105)))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) (-. (hskp5)) (ndr1_0) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c3_1 (a145)) /\ ((-. (c0_1 (a145))) /\ (-. (c2_1 (a145))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) (-. (hskp1)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((hskp14) \/ ((hskp16) \/ (hskp21))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### ConjTree 967
% 0.60/0.85 969. ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((hskp14) \/ ((hskp16) \/ (hskp21))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c3_1 (a145)) /\ ((-. (c0_1 (a145))) /\ (-. (c2_1 (a145))))))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) (-. (hskp5)) (ndr1_0) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((hskp9) \/ ((hskp14) \/ (hskp2))) (-. (hskp2)) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) (-. (hskp1)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### Or 863 968
% 0.60/0.85 970. ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104)))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp1)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (-. (hskp2)) ((hskp9) \/ ((hskp14) \/ (hskp2))) ((hskp14) \/ ((hskp12) \/ (hskp11))) (ndr1_0) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c3_1 (a145)) /\ ((-. (c0_1 (a145))) /\ (-. (c2_1 (a145))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((hskp14) \/ ((hskp16) \/ (hskp21))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ### ConjTree 969
% 0.60/0.85 971. ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp1)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (-. (hskp2)) ((hskp9) \/ ((hskp14) \/ (hskp2))) ((hskp14) \/ ((hskp12) \/ (hskp11))) (ndr1_0) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c3_1 (a145)) /\ ((-. (c0_1 (a145))) /\ (-. (c2_1 (a145))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((hskp14) \/ ((hskp16) \/ (hskp21))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ### Or 925 970
% 0.60/0.85 972. ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a99)) (-. (c3_1 (a99))) (All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) (-. (c1_1 (a99))) (c0_1 (a103)) (-. (c3_1 (a103))) (-. (c1_1 (a103))) (ndr1_0) ### Or 388 874
% 0.60/0.85 973. ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (-. (hskp10)) (ndr1_0) (-. (c1_1 (a103))) (-. (c3_1 (a103))) (c0_1 (a103)) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ### DisjTree 972 847 19
% 0.60/0.85 974. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (c0_1 (a103)) (-. (c3_1 (a103))) (-. (c1_1 (a103))) (ndr1_0) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ### Or 973 393
% 0.60/0.85 975. ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103)))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### ConjTree 974
% 0.60/0.85 976. ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((hskp14) \/ ((hskp16) \/ (hskp21))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c3_1 (a145)) /\ ((-. (c0_1 (a145))) /\ (-. (c2_1 (a145))))))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) (-. (hskp5)) (ndr1_0) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((hskp9) \/ ((hskp14) \/ (hskp2))) (-. (hskp2)) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) (-. (hskp1)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ### Or 971 975
% 0.60/0.85 977. ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (-. (hskp10)) (c1_1 (a102)) (c2_1 (a102)) (All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) (-. (c3_1 (a102))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (ndr1_0) ### DisjTree 847 462 19
% 0.60/0.85 978. ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) (-. (c3_1 (a102))) (c2_1 (a102)) (c1_1 (a102)) (-. (hskp10)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ### DisjTree 977 847 19
% 0.60/0.85 979. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp9) \/ ((hskp14) \/ (hskp2))) (-. (hskp2)) (-. (hskp9)) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c1_1 (a102)) (c2_1 (a102)) (-. (c3_1 (a102))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (ndr1_0) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ### Or 978 430
% 0.60/0.85 980. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (-. (c1_1 (a105))) (c2_1 (a105)) (c0_1 (a105)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) (-. (hskp5)) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c1_1 (a102)) (c2_1 (a102)) (-. (c3_1 (a102))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (ndr1_0) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ### Or 978 450
% 0.60/0.85 981. ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105)))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) (-. (c3_1 (a102))) (c2_1 (a102)) (c1_1 (a102)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### ConjTree 980
% 0.60/0.85 982. ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) (-. (c3_1 (a102))) (c2_1 (a102)) (c1_1 (a102)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) (-. (hskp5)) (-. (hskp2)) ((hskp9) \/ ((hskp14) \/ (hskp2))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### Or 979 981
% 0.60/0.85 983. ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp9) \/ ((hskp14) \/ (hskp2))) (-. (hskp2)) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c1_1 (a102)) (c2_1 (a102)) (-. (c3_1 (a102))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (ndr1_0) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ### Or 982 975
% 0.60/0.85 984. ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102)))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) (-. (hskp5)) (-. (hskp2)) ((hskp9) \/ ((hskp14) \/ (hskp2))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ### ConjTree 983
% 0.60/0.85 985. ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp1)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (-. (hskp2)) ((hskp9) \/ ((hskp14) \/ (hskp2))) ((hskp14) \/ ((hskp12) \/ (hskp11))) (ndr1_0) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c3_1 (a145)) /\ ((-. (c0_1 (a145))) /\ (-. (c2_1 (a145))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((hskp14) \/ ((hskp16) \/ (hskp21))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ### Or 976 984
% 0.60/0.85 986. ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (hskp15)) (c3_1 (a133)) (c0_1 (a133)) (-. (c2_1 (a133))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a115))) (c0_1 (a115)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (ndr1_0) (-. (c3_1 (a127))) (c0_1 (a127)) (c2_1 (a127)) (-. (hskp18)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp10)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ### Or 876 802
% 0.60/0.85 987. ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133)))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (-. (hskp10)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp18)) (c2_1 (a127)) (c0_1 (a127)) (-. (c3_1 (a127))) (ndr1_0) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c0_1 (a115)) (-. (c2_1 (a115))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (-. (hskp15)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ### ConjTree 986
% 0.60/0.85 988. ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (hskp15)) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (-. (c3_1 (a127))) (c0_1 (a127)) (c2_1 (a127)) (-. (hskp18)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (ndr1_0) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ### Or 20 987
% 0.60/0.85 989. ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127)))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp18)) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (-. (hskp15)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### ConjTree 988
% 0.60/0.85 990. ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (hskp15)) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (ndr1_0) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp18)) (-. (hskp13)) ((hskp18) \/ ((hskp19) \/ (hskp13))) ### Or 521 989
% 0.60/0.85 991. ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((hskp18) \/ ((hskp19) \/ (hskp13))) (-. (hskp13)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (-. (hskp15)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ### Or 990 913
% 0.60/0.85 992. ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c0_1 (a115)) (-. (c2_1 (a115))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (-. (c0_1 (a116))) (c3_1 (a116)) (c1_1 (a116)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c1_1 (a153)) (-. (c2_1 (a153))) (-. (c0_1 (a153))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (ndr1_0) (-. (c3_1 (a127))) (c0_1 (a127)) (c2_1 (a127)) (-. (hskp18)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp10)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ### Or 876 533
% 0.60/0.85 993. ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153)))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (-. (hskp10)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp18)) (c2_1 (a127)) (c0_1 (a127)) (-. (c3_1 (a127))) (ndr1_0) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c1_1 (a116)) (c3_1 (a116)) (-. (c0_1 (a116))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a115))) (c0_1 (a115)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ### ConjTree 992
% 0.60/0.85 994. ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c0_1 (a115)) (-. (c2_1 (a115))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (-. (c0_1 (a116))) (c3_1 (a116)) (c1_1 (a116)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (ndr1_0) (-. (c3_1 (a127))) (c0_1 (a127)) (c2_1 (a127)) (-. (hskp18)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp10)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (-. (hskp23)) (-. (hskp16)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ### Or 51 993
% 0.60/0.86 995. ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c1_1 (a152)) (c0_1 (a152)) (-. (c2_1 (a152))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (ndr1_0) (-. (c3_1 (a127))) (c0_1 (a127)) (c2_1 (a127)) (-. (hskp18)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp10)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ### Or 876 654
% 0.60/0.86 996. ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152)))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (-. (hskp10)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp18)) (c2_1 (a127)) (c0_1 (a127)) (-. (c3_1 (a127))) (ndr1_0) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ### ConjTree 995
% 0.60/0.86 997. ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp16)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (-. (hskp10)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp18)) (c2_1 (a127)) (c0_1 (a127)) (-. (c3_1 (a127))) (ndr1_0) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c1_1 (a116)) (c3_1 (a116)) (-. (c0_1 (a116))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a115))) (c0_1 (a115)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ### Or 994 996
% 0.60/0.86 998. ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c0_1 (a115)) (-. (c2_1 (a115))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (-. (c0_1 (a116))) (c3_1 (a116)) (c1_1 (a116)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (ndr1_0) (-. (hskp18)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp10)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (-. (hskp16)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ### ConjTree 997
% 0.60/0.86 999. ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp16)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (-. (hskp10)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (ndr1_0) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c1_1 (a116)) (c3_1 (a116)) (-. (c0_1 (a116))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a115))) (c0_1 (a115)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (-. (hskp18)) (-. (hskp13)) ((hskp18) \/ ((hskp19) \/ (hskp13))) ### Or 521 998
% 0.60/0.86 1000. ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((hskp18) \/ ((hskp19) \/ (hskp13))) (-. (hskp13)) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c0_1 (a115)) (-. (c2_1 (a115))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (-. (c0_1 (a116))) (c3_1 (a116)) (c1_1 (a116)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (ndr1_0) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp10)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (-. (hskp16)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ### Or 999 913
% 0.60/0.86 1001. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) (-. (c3_1 (a115))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (-. (hskp10)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (ndr1_0) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c1_1 (a116)) (c3_1 (a116)) (-. (c0_1 (a116))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a115))) (c0_1 (a115)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (-. (hskp13)) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ### Or 1000 588
% 0.60/0.86 1002. ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116)))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((hskp18) \/ ((hskp19) \/ (hskp13))) (-. (hskp13)) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c0_1 (a115)) (-. (c2_1 (a115))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (ndr1_0) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp10)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (c3_1 (a115))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 1001
% 0.60/0.86 1003. ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (ndr1_0) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp13)) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ### Or 991 1002
% 0.60/0.86 1004. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((hskp18) \/ ((hskp19) \/ (hskp13))) (-. (hskp13)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (ndr1_0) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ### ConjTree 1003
% 0.60/0.86 1005. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (ndr1_0) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp13)) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) (-. (hskp12)) (-. (hskp11)) ((hskp14) \/ ((hskp12) \/ (hskp11))) ### Or 224 1004
% 0.60/0.86 1006. (-. (c3_1 (a118))) (c3_1 (a118)) ### Axiom
% 0.60/0.86 1007. (c1_1 (a118)) (-. (c1_1 (a118))) ### Axiom
% 0.60/0.86 1008. ((ndr1_0) => ((c3_1 (a118)) \/ ((-. (c0_1 (a118))) \/ (-. (c1_1 (a118)))))) (c1_1 (a118)) (All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) (-. (c3_1 (a118))) (ndr1_0) ### DisjTree 5 1006 140 1007
% 0.60/0.86 1009. (All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) (ndr1_0) (-. (c3_1 (a118))) (All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) (c1_1 (a118)) ### All 1008
% 0.60/0.86 1010. ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (-. (hskp10)) (c1_1 (a118)) (All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) (-. (c3_1 (a118))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (ndr1_0) ### DisjTree 847 1009 19
% 0.60/0.86 1011. ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) (-. (hskp9)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) (-. (c3_1 (a118))) (c1_1 (a118)) (-. (hskp10)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ### DisjTree 1010 10 168
% 0.60/0.86 1012. ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118)))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (-. (hskp10)) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (ndr1_0) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp9)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ### ConjTree 1011
% 0.60/0.86 1013. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) (-. (hskp9)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) (-. (hskp10)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (hskp8)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ### Or 263 1012
% 0.60/0.86 1014. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp8)) (c3_1 (a112)) (c0_1 (a112)) (-. (c1_1 (a112))) (ndr1_0) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (-. (hskp10)) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (-. (hskp9)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 1013
% 0.60/0.86 1015. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) (-. (hskp9)) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (-. (hskp8)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (ndr1_0) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ### Or 375 1014
% 0.60/0.86 1016. ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112)))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp8)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (-. (hskp9)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### ConjTree 1015
% 0.60/0.86 1017. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) (-. (hskp9)) (-. (hskp8)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((hskp14) \/ ((hskp12) \/ (hskp11))) (-. (hskp11)) (-. (hskp12)) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (ndr1_0) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### Or 1005 1016
% 0.60/0.86 1018. ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (-. (c3_1 (a127))) (c0_1 (a127)) (c2_1 (a127)) (-. (hskp18)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp10)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp16)) (ndr1_0) (-. (c0_1 (a110))) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ### Or 65 996
% 0.60/0.86 1019. ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) (ndr1_0) (-. (hskp16)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (-. (hskp10)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp18)) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ### ConjTree 1018
% 0.60/0.86 1020. ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp10)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp16)) (ndr1_0) (-. (c0_1 (a110))) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (-. (hskp18)) (-. (hskp13)) ((hskp18) \/ ((hskp19) \/ (hskp13))) ### Or 521 1019
% 0.60/0.86 1021. ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((hskp18) \/ ((hskp19) \/ (hskp13))) (-. (hskp13)) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) (ndr1_0) (-. (hskp16)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (-. (hskp10)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ### Or 1020 913
% 0.60/0.86 1022. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp10)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (ndr1_0) (-. (c0_1 (a110))) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (-. (hskp13)) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ### Or 1021 854
% 0.60/0.86 1023. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### Or 609 854
% 0.60/0.86 1024. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (c0_1 (a110))) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (ndr1_0) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 1023
% 0.60/0.86 1025. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (ndr1_0) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ### Or 375 1024
% 0.60/0.86 1026. ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112)))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) (ndr1_0) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (c0_1 (a110))) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### ConjTree 1025
% 0.60/0.86 1027. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) (ndr1_0) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (-. (hskp10)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### Or 1022 1026
% 0.60/0.86 1028. ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110)))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp10)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (ndr1_0) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### ConjTree 1027
% 0.60/0.86 1029. ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (ndr1_0) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) (-. (hskp11)) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp8)) (-. (hskp9)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### Or 1017 1028
% 0.60/0.86 1030. ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) (-. (hskp9)) (-. (hskp8)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (ndr1_0) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ### Or 1029 861
% 0.60/0.86 1031. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) (-. (hskp2)) ((hskp9) \/ ((hskp14) \/ (hskp2))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (ndr1_0) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp8)) (-. (hskp9)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### Or 1030 650
% 0.60/0.86 1032. ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) (-. (c1_1 (a105))) (c0_1 (a105)) (c2_1 (a105)) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp16)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (-. (hskp10)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp18)) (c2_1 (a127)) (c0_1 (a127)) (-. (c3_1 (a127))) (ndr1_0) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c1_1 (a116)) (c3_1 (a116)) (-. (c0_1 (a116))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a115))) (c0_1 (a115)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ### Or 994 656
% 0.60/0.86 1033. ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c0_1 (a115)) (-. (c2_1 (a115))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (-. (c0_1 (a116))) (c3_1 (a116)) (c1_1 (a116)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (ndr1_0) (-. (hskp18)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp10)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (-. (hskp16)) ((hskp23) \/ ((hskp24) \/ (hskp16))) (c2_1 (a105)) (c0_1 (a105)) (-. (c1_1 (a105))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ### ConjTree 1032
% 0.60/0.86 1034. ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) (-. (c1_1 (a105))) (c0_1 (a105)) (c2_1 (a105)) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp16)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (-. (hskp10)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (ndr1_0) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c1_1 (a116)) (c3_1 (a116)) (-. (c0_1 (a116))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a115))) (c0_1 (a115)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (-. (hskp18)) (-. (hskp13)) ((hskp18) \/ ((hskp19) \/ (hskp13))) ### Or 521 1033
% 0.60/0.86 1035. ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((hskp18) \/ ((hskp19) \/ (hskp13))) (-. (hskp13)) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c0_1 (a115)) (-. (c2_1 (a115))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (-. (c0_1 (a116))) (c3_1 (a116)) (c1_1 (a116)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (ndr1_0) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp10)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (-. (hskp16)) ((hskp23) \/ ((hskp24) \/ (hskp16))) (c2_1 (a105)) (c0_1 (a105)) (-. (c1_1 (a105))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ### Or 1034 913
% 0.60/0.86 1036. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) (-. (c3_1 (a115))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) (-. (c1_1 (a105))) (c0_1 (a105)) (c2_1 (a105)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (-. (hskp10)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (ndr1_0) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c1_1 (a116)) (c3_1 (a116)) (-. (c0_1 (a116))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a115))) (c0_1 (a115)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (-. (hskp13)) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ### Or 1035 588
% 0.60/0.86 1037. ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116)))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((hskp18) \/ ((hskp19) \/ (hskp13))) (-. (hskp13)) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c0_1 (a115)) (-. (c2_1 (a115))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (ndr1_0) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp10)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (c2_1 (a105)) (c0_1 (a105)) (-. (c1_1 (a105))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (c3_1 (a115))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 1036
% 0.60/0.86 1038. ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) (-. (c1_1 (a105))) (c0_1 (a105)) (c2_1 (a105)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (ndr1_0) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp13)) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ### Or 991 1037
% 0.60/0.86 1039. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((hskp18) \/ ((hskp19) \/ (hskp13))) (-. (hskp13)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (ndr1_0) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (c2_1 (a105)) (c0_1 (a105)) (-. (c1_1 (a105))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ### ConjTree 1038
% 0.60/0.86 1040. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) (-. (c1_1 (a105))) (c0_1 (a105)) (c2_1 (a105)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (ndr1_0) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp13)) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) (-. (hskp12)) (-. (hskp11)) ((hskp14) \/ ((hskp12) \/ (hskp11))) ### Or 224 1039
% 0.60/0.86 1041. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp8)) ((hskp14) \/ ((hskp12) \/ (hskp11))) (-. (hskp11)) (-. (hskp12)) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (ndr1_0) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (c2_1 (a105)) (c0_1 (a105)) (-. (c1_1 (a105))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### Or 1040 594
% 0.60/0.86 1042. ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp18)) (c2_1 (a127)) (c0_1 (a127)) (-. (c3_1 (a127))) (-. (c1_1 (a105))) (c0_1 (a105)) (c2_1 (a105)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp16)) (ndr1_0) (-. (c0_1 (a110))) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ### Or 65 656
% 0.60/0.86 1043. ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) (ndr1_0) (-. (hskp16)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a105)) (c0_1 (a105)) (-. (c1_1 (a105))) (-. (hskp18)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ### ConjTree 1042
% 0.60/0.86 1044. ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (c1_1 (a105))) (c0_1 (a105)) (c2_1 (a105)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp16)) (ndr1_0) (-. (c0_1 (a110))) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (-. (hskp18)) (-. (hskp13)) ((hskp18) \/ ((hskp19) \/ (hskp13))) ### Or 521 1043
% 0.60/0.86 1045. ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (-. (hskp10)) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((hskp18) \/ ((hskp19) \/ (hskp13))) (-. (hskp13)) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) (ndr1_0) (-. (hskp16)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a105)) (c0_1 (a105)) (-. (c1_1 (a105))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ### Or 1044 913
% 0.60/0.86 1046. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (c1_1 (a105))) (c0_1 (a105)) (c2_1 (a105)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (ndr1_0) (-. (c0_1 (a110))) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (-. (hskp13)) ((hskp18) \/ ((hskp19) \/ (hskp13))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) (-. (hskp10)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ### Or 1045 854
% 0.60/0.86 1047. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (-. (hskp10)) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) (ndr1_0) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a105)) (c0_1 (a105)) (-. (c1_1 (a105))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### Or 1046 1026
% 0.60/0.86 1048. ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110)))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (c1_1 (a105))) (c0_1 (a105)) (c2_1 (a105)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (ndr1_0) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((hskp18) \/ ((hskp19) \/ (hskp13))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) (-. (hskp10)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### ConjTree 1047
% 0.60/0.86 1049. ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) (-. (c1_1 (a105))) (c0_1 (a105)) (c2_1 (a105)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (ndr1_0) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) (-. (hskp11)) ((hskp14) \/ ((hskp12) \/ (hskp11))) (-. (hskp8)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### Or 1041 1048
% 0.60/0.86 1050. ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp8)) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (ndr1_0) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (c2_1 (a105)) (c0_1 (a105)) (-. (c1_1 (a105))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ### Or 1049 861
% 0.60/0.86 1051. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) (-. (c1_1 (a105))) (c0_1 (a105)) (c2_1 (a105)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (ndr1_0) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) (-. (hskp8)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### Or 1050 703
% 0.60/0.86 1052. ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105)))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp8)) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (ndr1_0) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### ConjTree 1051
% 0.60/0.86 1053. ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) (-. (hskp8)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (ndr1_0) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((hskp9) \/ ((hskp14) \/ (hskp2))) (-. (hskp2)) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### Or 1031 1052
% 0.60/0.86 1054. ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) (-. (c3_1 (a118))) (-. (c2_1 (a118))) (c1_1 (a118)) (-. (hskp10)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) (ndr1_0) ### DisjTree 314 852 315
% 0.60/0.86 1055. ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118)))))) (ndr1_0) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (-. (hskp10)) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ### ConjTree 1054
% 0.60/0.86 1056. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### Or 769 1055
% 0.60/0.86 1057. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (ndr1_0) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 1056
% 0.60/0.86 1058. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (ndr1_0) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (-. (hskp12)) (-. (hskp11)) ((hskp14) \/ ((hskp12) \/ (hskp11))) ### Or 224 1057
% 0.60/0.86 1059. ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) (-. (hskp11)) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (ndr1_0) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### Or 1058 1028
% 0.60/0.86 1060. ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (ndr1_0) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ### Or 1059 861
% 0.60/0.86 1061. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (ndr1_0) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### Or 1060 328
% 0.60/0.87 1062. ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104)))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (ndr1_0) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### ConjTree 1061
% 0.60/0.87 1063. ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) (-. (hskp2)) ((hskp9) \/ ((hskp14) \/ (hskp2))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (ndr1_0) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ### Or 1053 1062
% 0.60/0.87 1064. ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (ndr1_0) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((hskp9) \/ ((hskp14) \/ (hskp2))) (-. (hskp2)) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ### Or 1063 975
% 0.60/0.87 1065. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c1_1 (a102)) (c2_1 (a102)) (-. (c3_1 (a102))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (ndr1_0) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ### Or 978 829
% 0.60/0.87 1066. ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) (-. (c3_1 (a102))) (c2_1 (a102)) (c1_1 (a102)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### Or 1065 975
% 0.60/0.87 1067. ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102)))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (ndr1_0) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ### ConjTree 1066
% 0.60/0.87 1068. ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) (-. (hskp2)) ((hskp9) \/ ((hskp14) \/ (hskp2))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (ndr1_0) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ### Or 1064 1067
% 0.60/0.87 1069. ((ndr1_0) /\ ((c3_1 (a101)) /\ ((-. (c1_1 (a101))) /\ (-. (c2_1 (a101)))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (ndr1_0) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((hskp9) \/ ((hskp14) \/ (hskp2))) (-. (hskp2)) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102))))))) ### ConjTree 1068
% 0.60/0.87 1070. ((-. (hskp5)) \/ ((ndr1_0) /\ ((c3_1 (a101)) /\ ((-. (c1_1 (a101))) /\ (-. (c2_1 (a101))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((hskp14) \/ ((hskp16) \/ (hskp21))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c3_1 (a145)) /\ ((-. (c0_1 (a145))) /\ (-. (c2_1 (a145))))))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) (ndr1_0) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((hskp9) \/ ((hskp14) \/ (hskp2))) (-. (hskp2)) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) (-. (hskp1)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102))))))) ### Or 985 1069
% 0.60/0.87 1071. ((ndr1_0) /\ ((c2_1 (a99)) /\ ((-. (c1_1 (a99))) /\ (-. (c3_1 (a99)))))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp1)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (-. (hskp2)) ((hskp9) \/ ((hskp14) \/ (hskp2))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c3_1 (a145)) /\ ((-. (c0_1 (a145))) /\ (-. (c2_1 (a145))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((hskp14) \/ ((hskp16) \/ (hskp21))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp5)) \/ ((ndr1_0) /\ ((c3_1 (a101)) /\ ((-. (c1_1 (a101))) /\ (-. (c2_1 (a101))))))) ### ConjTree 1070
% 0.60/0.87 1072. ((-. (hskp3)) \/ ((ndr1_0) /\ ((c2_1 (a99)) /\ ((-. (c1_1 (a99))) /\ (-. (c3_1 (a99))))))) ((hskp14) \/ ((hskp16) \/ (hskp21))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c3_1 (a145)) /\ ((-. (c0_1 (a145))) /\ (-. (c2_1 (a145))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((hskp14) \/ ((hskp1) \/ (hskp3))) (-. (hskp1)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((hskp9) \/ ((hskp14) \/ (hskp2))) (-. (hskp2)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((-. (hskp5)) \/ ((ndr1_0) /\ ((c3_1 (a101)) /\ ((-. (c1_1 (a101))) /\ (-. (c2_1 (a101))))))) ### Or 842 1071
% 0.70/0.87 1073. (-. (c0_1 (a98))) (c0_1 (a98)) ### Axiom
% 0.70/0.87 1074. (-. (c3_1 (a98))) (c3_1 (a98)) ### Axiom
% 0.70/0.87 1075. (c1_1 (a98)) (-. (c1_1 (a98))) ### Axiom
% 0.70/0.87 1076. ((ndr1_0) => ((c0_1 (a98)) \/ ((c3_1 (a98)) \/ (-. (c1_1 (a98)))))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (ndr1_0) ### DisjTree 5 1073 1074 1075
% 0.70/0.87 1077. (All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) (ndr1_0) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ### All 1076
% 0.70/0.87 1078. ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c0_1 (a115)) (-. (c2_1 (a115))) (-. (hskp15)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (c3_1 (a133)) (c0_1 (a133)) (-. (c2_1 (a133))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (ndr1_0) ### DisjTree 1077 39 516
% 0.70/0.87 1079. ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133)))))) (ndr1_0) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (hskp15)) (-. (c2_1 (a115))) (c0_1 (a115)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ### ConjTree 1078
% 0.70/0.87 1080. ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp15)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (ndr1_0) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ### Or 20 1079
% 0.70/0.87 1081. ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c2_1 (a165)) (c3_1 (a165)) (c1_1 (a165)) (c1_1 (a152)) (c0_1 (a152)) (-. (c2_1 (a152))) (-. (hskp26)) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (c3_1 (a133)) (c0_1 (a133)) (-. (c2_1 (a133))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (ndr1_0) ### DisjTree 1077 39 94
% 0.70/0.87 1082. ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165))))) (ndr1_0) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) (-. (c2_1 (a133))) (c0_1 (a133)) (c3_1 (a133)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) (-. (hskp26)) (-. (c2_1 (a152))) (c0_1 (a152)) (c1_1 (a152)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ### ConjTree 1081
% 0.70/0.87 1083. ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c1_1 (a152)) (c0_1 (a152)) (-. (c2_1 (a152))) (-. (hskp26)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (c3_1 (a133)) (c0_1 (a133)) (-. (c2_1 (a133))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (ndr1_0) (-. (hskp24)) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ### Or 68 1082
% 0.70/0.87 1084. ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c2_1 (a165)) (c3_1 (a165)) (c1_1 (a165)) (c1_1 (a152)) (c0_1 (a152)) (-. (c2_1 (a152))) (c0_1 (a94)) (c1_1 (a94)) (c2_1 (a94)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (c3_1 (a133)) (c0_1 (a133)) (-. (c2_1 (a133))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (ndr1_0) ### DisjTree 1077 39 114
% 0.70/0.87 1085. ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165))))) (ndr1_0) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) (-. (c2_1 (a133))) (c0_1 (a133)) (c3_1 (a133)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (c2_1 (a94)) (c1_1 (a94)) (c0_1 (a94)) (-. (c2_1 (a152))) (c0_1 (a152)) (c1_1 (a152)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ### ConjTree 1084
% 0.70/0.87 1086. ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c1_1 (a152)) (c0_1 (a152)) (-. (c2_1 (a152))) (c0_1 (a94)) (c1_1 (a94)) (c2_1 (a94)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (c3_1 (a133)) (c0_1 (a133)) (-. (c2_1 (a133))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (ndr1_0) (-. (hskp24)) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ### Or 68 1085
% 0.70/0.87 1087. ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) (-. (hskp24)) (ndr1_0) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) (-. (c2_1 (a133))) (c0_1 (a133)) (c3_1 (a133)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (-. (c2_1 (a152))) (c0_1 (a152)) (c1_1 (a152)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ### ConjTree 1086
% 0.70/0.87 1088. ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) (-. (hskp24)) (ndr1_0) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) (-. (c2_1 (a133))) (c0_1 (a133)) (c3_1 (a133)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c2_1 (a152))) (c0_1 (a152)) (c1_1 (a152)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ### Or 1083 1087
% 0.70/0.87 1089. ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c1_1 (a152)) (c0_1 (a152)) (-. (c2_1 (a152))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (c3_1 (a133)) (c0_1 (a133)) (-. (c2_1 (a133))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (ndr1_0) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ### Or 1088 64
% 0.70/0.87 1090. ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152)))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) (ndr1_0) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) (-. (c2_1 (a133))) (c0_1 (a133)) (c3_1 (a133)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) (-. (c0_1 (a110))) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ### ConjTree 1089
% 0.70/0.87 1091. ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (c3_1 (a133)) (c0_1 (a133)) (-. (c2_1 (a133))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp16)) (ndr1_0) (-. (c0_1 (a110))) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ### Or 65 1090
% 0.70/0.87 1092. ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) (ndr1_0) (-. (hskp16)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ### ConjTree 1091
% 0.70/0.87 1093. ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp16)) (-. (c0_1 (a110))) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (ndr1_0) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ### Or 20 1092
% 0.70/0.87 1094. ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) (-. (hskp26)) (ndr1_0) (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) (-. (c2_1 (a133))) (c3_1 (a133)) (-. (c2_1 (a118))) (All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) (c1_1 (a118)) (c1_1 (a165)) (c3_1 (a165)) (c2_1 (a165)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ### DisjTree 569 93 67
% 0.70/0.87 1095. ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c2_1 (a165)) (c3_1 (a165)) (c1_1 (a165)) (c1_1 (a118)) (All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) (-. (c2_1 (a118))) (-. (hskp26)) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (c3_1 (a133)) (c0_1 (a133)) (-. (c2_1 (a133))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (ndr1_0) ### DisjTree 1077 39 1094
% 0.70/0.87 1096. ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c1_1 (a116)) (c3_1 (a116)) (-. (c0_1 (a116))) (All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) (c3_1 (a133)) (c0_1 (a133)) (-. (c2_1 (a133))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (ndr1_0) ### DisjTree 1077 39 152
% 0.70/0.87 1097. ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c0_1 (a116))) (c3_1 (a116)) (c1_1 (a116)) (ndr1_0) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) (-. (c2_1 (a133))) (c0_1 (a133)) (c3_1 (a133)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) (-. (hskp26)) (-. (c2_1 (a118))) (c1_1 (a118)) (c1_1 (a165)) (c3_1 (a165)) (c2_1 (a165)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ### DisjTree 1095 1096 62
% 0.70/0.87 1098. ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c1_1 (a118)) (-. (c2_1 (a118))) (-. (hskp26)) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (c3_1 (a133)) (c0_1 (a133)) (-. (c2_1 (a133))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (ndr1_0) (c1_1 (a116)) (c3_1 (a116)) (-. (c0_1 (a116))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ### ConjTree 1097
% 0.70/0.87 1099. ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c0_1 (a116))) (c3_1 (a116)) (c1_1 (a116)) (ndr1_0) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) (-. (c2_1 (a133))) (c0_1 (a133)) (c3_1 (a133)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp26)) (-. (c2_1 (a118))) (c1_1 (a118)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp24)) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ### Or 68 1098
% 0.70/0.87 1100. ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (c2_1 (a94)) (c1_1 (a94)) (c0_1 (a94)) (c0_1 (a133)) (ndr1_0) (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) (-. (c2_1 (a133))) (c3_1 (a133)) (-. (c2_1 (a118))) (All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) (c1_1 (a118)) (c1_1 (a165)) (c3_1 (a165)) (c2_1 (a165)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ### DisjTree 569 39 113
% 0.70/0.87 1101. ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c2_1 (a165)) (c3_1 (a165)) (c1_1 (a165)) (c1_1 (a118)) (All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) (-. (c2_1 (a118))) (c0_1 (a94)) (c1_1 (a94)) (c2_1 (a94)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (c3_1 (a133)) (c0_1 (a133)) (-. (c2_1 (a133))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (ndr1_0) ### DisjTree 1077 39 1100
% 0.70/0.87 1102. ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) (ndr1_0) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) (-. (c2_1 (a133))) (c0_1 (a133)) (c3_1 (a133)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (c2_1 (a94)) (c1_1 (a94)) (c0_1 (a94)) (-. (c2_1 (a118))) (c1_1 (a118)) (c1_1 (a165)) (c3_1 (a165)) (c2_1 (a165)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ### DisjTree 1101 61 62
% 0.70/0.87 1103. ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c1_1 (a118)) (-. (c2_1 (a118))) (c0_1 (a94)) (c1_1 (a94)) (c2_1 (a94)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (c3_1 (a133)) (c0_1 (a133)) (-. (c2_1 (a133))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (ndr1_0) (-. (c0_1 (a110))) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ### ConjTree 1102
% 0.70/0.87 1104. ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) (ndr1_0) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) (-. (c2_1 (a133))) (c0_1 (a133)) (c3_1 (a133)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (c2_1 (a94)) (c1_1 (a94)) (c0_1 (a94)) (-. (c2_1 (a118))) (c1_1 (a118)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp24)) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ### Or 68 1103
% 0.70/0.87 1105. ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) (-. (hskp24)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c1_1 (a118)) (-. (c2_1 (a118))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (c3_1 (a133)) (c0_1 (a133)) (-. (c2_1 (a133))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (ndr1_0) (-. (c0_1 (a110))) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ### ConjTree 1104
% 0.70/0.87 1106. ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) (-. (hskp24)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c1_1 (a118)) (-. (c2_1 (a118))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (c3_1 (a133)) (c0_1 (a133)) (-. (c2_1 (a133))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (ndr1_0) (c1_1 (a116)) (c3_1 (a116)) (-. (c0_1 (a116))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ### Or 1099 1105
% 0.70/0.87 1107. ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c0_1 (a116))) (c3_1 (a116)) (c1_1 (a116)) (ndr1_0) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) (-. (c2_1 (a133))) (c0_1 (a133)) (c3_1 (a133)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c2_1 (a118))) (c1_1 (a118)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (-. (c0_1 (a110))) (c2_1 (a110)) (c3_1 (a110)) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ### Or 1106 64
% 0.70/0.87 1108. ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133)))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c1_1 (a118)) (-. (c2_1 (a118))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (ndr1_0) (c1_1 (a116)) (c3_1 (a116)) (-. (c0_1 (a116))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ### ConjTree 1107
% 0.70/0.87 1109. ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c0_1 (a116))) (c3_1 (a116)) (c1_1 (a116)) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c2_1 (a118))) (c1_1 (a118)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (-. (c0_1 (a110))) (c2_1 (a110)) (c3_1 (a110)) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) (ndr1_0) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ### Or 20 1108
% 0.70/0.87 1110. ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118)))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (c1_1 (a116)) (c3_1 (a116)) (-. (c0_1 (a116))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### ConjTree 1109
% 0.70/0.87 1111. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (-. (c0_1 (a116))) (c3_1 (a116)) (c1_1 (a116)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### Or 1093 1110
% 0.70/0.87 1112. ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (c0_1 (a110))) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (ndr1_0) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 1111
% 0.70/0.87 1113. ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### Or 1080 1112
% 0.70/0.87 1114. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (ndr1_0) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (c0_1 (a110))) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ### ConjTree 1113
% 0.70/0.87 1115. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (ndr1_0) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (-. (hskp1)) (-. (hskp3)) ((hskp14) \/ ((hskp1) \/ (hskp3))) ### Or 4 1114
% 0.70/0.87 1116. ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110)))))) ((hskp14) \/ ((hskp1) \/ (hskp3))) (-. (hskp3)) (-. (hskp1)) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (ndr1_0) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### ConjTree 1115
% 0.70/0.87 1117. ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (-. (hskp1)) (-. (hskp3)) ((hskp14) \/ ((hskp1) \/ (hskp3))) ((hskp14) \/ ((hskp12) \/ (hskp11))) (-. (hskp11)) (ndr1_0) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### Or 225 1116
% 0.70/0.87 1118. ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (c2_1 (a109)) (-. (c3_1 (a109))) (-. (c0_1 (a109))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### Or 1080 192
% 0.70/0.87 1119. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (ndr1_0) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (c0_1 (a109))) (-. (c3_1 (a109))) (c2_1 (a109)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ### ConjTree 1118
% 0.70/0.87 1120. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (c2_1 (a109)) (-. (c3_1 (a109))) (-. (c0_1 (a109))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (ndr1_0) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (-. (hskp1)) (-. (hskp3)) ((hskp14) \/ ((hskp1) \/ (hskp3))) ### Or 4 1119
% 0.70/0.87 1121. ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109)))))) ((hskp14) \/ ((hskp1) \/ (hskp3))) (-. (hskp3)) (-. (hskp1)) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (ndr1_0) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### ConjTree 1120
% 0.70/0.87 1122. ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) (-. (hskp5)) (ndr1_0) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((hskp14) \/ ((hskp1) \/ (hskp3))) (-. (hskp3)) (-. (hskp1)) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ### Or 1117 1121
% 0.70/0.87 1123. (-. (c0_1 (a109))) (c0_1 (a109)) ### Axiom
% 0.70/0.87 1124. (-. (c0_1 (a109))) (c0_1 (a109)) ### Axiom
% 0.70/0.87 1125. (-. (c1_1 (a109))) (c1_1 (a109)) ### Axiom
% 0.70/0.87 1126. (c2_1 (a109)) (-. (c2_1 (a109))) ### Axiom
% 0.70/0.87 1127. ((ndr1_0) => ((c0_1 (a109)) \/ ((c1_1 (a109)) \/ (-. (c2_1 (a109)))))) (c2_1 (a109)) (-. (c1_1 (a109))) (-. (c0_1 (a109))) (ndr1_0) ### DisjTree 5 1124 1125 1126
% 0.70/0.87 1128. (All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (-. (c2_1 X1)))))) (ndr1_0) (-. (c0_1 (a109))) (-. (c1_1 (a109))) (c2_1 (a109)) ### All 1127
% 0.70/0.87 1129. (c2_1 (a109)) (-. (c2_1 (a109))) ### Axiom
% 0.70/0.87 1130. ((ndr1_0) => ((c0_1 (a109)) \/ ((-. (c1_1 (a109))) \/ (-. (c2_1 (a109)))))) (c2_1 (a109)) (All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (-. (c2_1 X1)))))) (-. (c0_1 (a109))) (ndr1_0) ### DisjTree 5 1123 1128 1129
% 0.70/0.87 1131. (All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) (ndr1_0) (-. (c0_1 (a109))) (All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (-. (c2_1 X1)))))) (c2_1 (a109)) ### All 1130
% 0.70/0.87 1132. ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (-. (c2_1 X1)))))) (c2_1 (a109)) (-. (c3_1 (a109))) (-. (c0_1 (a109))) (ndr1_0) ### DisjTree 175 1131 244
% 0.70/0.87 1133. ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c1_1 (a165)) (c3_1 (a165)) (c2_1 (a165)) (All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) (c2_1 (a109)) (-. (c3_1 (a109))) (-. (c0_1 (a109))) (ndr1_0) ### DisjTree 175 104 244
% 0.70/0.87 1134. ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (-. (c2_1 X1)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) (-. (hskp1)) (c2_1 (a165)) (c3_1 (a165)) (c1_1 (a165)) (ndr1_0) (-. (c0_1 (a109))) (-. (c3_1 (a109))) (c2_1 (a109)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ### DisjTree 1132 1133 2
% 0.70/0.87 1135. ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c2_1 (a109)) (-. (c3_1 (a109))) (-. (c0_1 (a109))) (ndr1_0) (-. (hskp1)) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (-. (c2_1 X1)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ### ConjTree 1134
% 0.70/0.87 1136. ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (-. (c2_1 X1)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) (-. (hskp1)) (ndr1_0) (-. (c0_1 (a109))) (-. (c3_1 (a109))) (c2_1 (a109)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) (-. (hskp20)) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ### Or 629 1135
% 0.70/0.87 1137. ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) (c3_1 (a133)) (c0_1 (a133)) (-. (c2_1 (a133))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (ndr1_0) ### DisjTree 1077 39 213
% 0.70/0.87 1138. ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133)))))) (ndr1_0) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ### ConjTree 1137
% 0.70/0.87 1139. ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c2_1 (a109)) (-. (c3_1 (a109))) (-. (c0_1 (a109))) (ndr1_0) (-. (hskp1)) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (-. (c2_1 X1)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ### Or 1136 1138
% 0.70/0.87 1140. ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109)))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (-. (c2_1 X1)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) (-. (hskp1)) (ndr1_0) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### ConjTree 1139
% 0.70/0.87 1141. ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) (-. (hskp1)) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (-. (c2_1 X1)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) (-. (hskp5)) (ndr1_0) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ### Or 432 1140
% 0.70/0.87 1142. ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106)))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) (ndr1_0) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (-. (c2_1 X1)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) (-. (hskp1)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### ConjTree 1141
% 0.70/0.87 1143. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (-. (c2_1 X1)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (-. (hskp1)) (-. (hskp3)) ((hskp14) \/ ((hskp1) \/ (hskp3))) ((hskp14) \/ ((hskp12) \/ (hskp11))) (ndr1_0) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### Or 1122 1142
% 0.70/0.87 1144. ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) (-. (hskp9)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (ndr1_0) ### DisjTree 1077 10 168
% 0.70/0.87 1145. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) (ndr1_0) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) (-. (hskp9)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ### ConjTree 1144
% 0.70/0.87 1146. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) (-. (hskp9)) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (ndr1_0) (-. (hskp1)) (-. (hskp3)) ((hskp14) \/ ((hskp1) \/ (hskp3))) ### Or 4 1145
% 0.70/0.87 1147. ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c0_1 (a103)) (-. (c3_1 (a103))) (-. (c1_1 (a103))) ((hskp14) \/ ((hskp1) \/ (hskp3))) (-. (hskp3)) (-. (hskp1)) (ndr1_0) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### Or 1146 401
% 0.70/0.87 1148. ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103)))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (ndr1_0) (-. (hskp1)) (-. (hskp3)) ((hskp14) \/ ((hskp1) \/ (hskp3))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ### ConjTree 1147
% 0.70/0.87 1149. ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) (-. (hskp5)) (ndr1_0) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((hskp14) \/ ((hskp1) \/ (hskp3))) (-. (hskp3)) (-. (hskp1)) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (-. (c2_1 X1)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### Or 1143 1148
% 0.70/0.87 1150. ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) (-. (c2_1 (a133))) (c0_1 (a133)) (c3_1 (a133)) (-. (c0_1 (a116))) (c3_1 (a116)) (c1_1 (a116)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c1_1 (a153)) (-. (c2_1 (a153))) (-. (c0_1 (a153))) (ndr1_0) ### DisjTree 56 1096 62
% 0.70/0.87 1151. ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153)))))) (ndr1_0) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c1_1 (a116)) (c3_1 (a116)) (-. (c0_1 (a116))) (c3_1 (a133)) (c0_1 (a133)) (-. (c2_1 (a133))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ### ConjTree 1150
% 0.70/0.87 1152. ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) (-. (c2_1 (a133))) (c0_1 (a133)) (c3_1 (a133)) (-. (c0_1 (a116))) (c3_1 (a116)) (c1_1 (a116)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (ndr1_0) (-. (hskp23)) (-. (hskp16)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ### Or 51 1151
% 0.70/0.88 1153. ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) (-. (c0_1 (a116))) (c3_1 (a116)) (c1_1 (a116)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (ndr1_0) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a152))) (c0_1 (a152)) (c1_1 (a152)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (c2_1 (a133))) (c0_1 (a133)) (c3_1 (a133)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ### Or 604 1151
% 0.70/0.88 1154. ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152)))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (c3_1 (a133)) (c0_1 (a133)) (-. (c2_1 (a133))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c1_1 (a116)) (c3_1 (a116)) (-. (c0_1 (a116))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ### ConjTree 1153
% 0.70/0.88 1155. ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp16)) (ndr1_0) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c1_1 (a116)) (c3_1 (a116)) (-. (c0_1 (a116))) (c3_1 (a133)) (c0_1 (a133)) (-. (c2_1 (a133))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ### Or 1152 1154
% 0.70/0.88 1156. ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) (-. (c0_1 (a116))) (c3_1 (a116)) (c1_1 (a116)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (ndr1_0) (-. (hskp16)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ### ConjTree 1155
% 0.70/0.88 1157. ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp16)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c1_1 (a116)) (c3_1 (a116)) (-. (c0_1 (a116))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (ndr1_0) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ### Or 20 1156
% 0.70/0.88 1158. ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) (-. (c0_1 (a116))) (c3_1 (a116)) (c1_1 (a116)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c1_1 (a165)) (c3_1 (a165)) (c2_1 (a165)) (ndr1_0) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a118))) (c1_1 (a118)) (c0_1 (a133)) (-. (c2_1 (a133))) (c3_1 (a133)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp26)) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ### DisjTree 571 1096 62
% 0.70/0.88 1159. ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) (-. (hskp26)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a133)) (-. (c2_1 (a133))) (c0_1 (a133)) (c1_1 (a118)) (-. (c2_1 (a118))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c1_1 (a116)) (c3_1 (a116)) (-. (c0_1 (a116))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ### ConjTree 1158
% 0.70/0.88 1160. ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) (-. (c0_1 (a116))) (c3_1 (a116)) (c1_1 (a116)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (ndr1_0) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a118))) (c1_1 (a118)) (c0_1 (a133)) (-. (c2_1 (a133))) (c3_1 (a133)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp26)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp24)) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ### Or 68 1159
% 0.70/0.88 1161. ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c0_1 (a116))) (c3_1 (a116)) (c1_1 (a116)) (ndr1_0) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) (-. (c2_1 (a133))) (c0_1 (a133)) (c3_1 (a133)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (c2_1 (a94)) (c1_1 (a94)) (c0_1 (a94)) (-. (c2_1 (a118))) (c1_1 (a118)) (c1_1 (a165)) (c3_1 (a165)) (c2_1 (a165)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ### DisjTree 1101 1096 62
% 0.70/0.88 1162. ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c1_1 (a118)) (-. (c2_1 (a118))) (c0_1 (a94)) (c1_1 (a94)) (c2_1 (a94)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (c3_1 (a133)) (c0_1 (a133)) (-. (c2_1 (a133))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (ndr1_0) (c1_1 (a116)) (c3_1 (a116)) (-. (c0_1 (a116))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ### ConjTree 1161
% 0.70/0.88 1163. ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c0_1 (a116))) (c3_1 (a116)) (c1_1 (a116)) (ndr1_0) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) (-. (c2_1 (a133))) (c0_1 (a133)) (c3_1 (a133)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (c2_1 (a94)) (c1_1 (a94)) (c0_1 (a94)) (-. (c2_1 (a118))) (c1_1 (a118)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp24)) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ### Or 68 1162
% 0.70/0.88 1164. ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) (-. (hskp24)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c1_1 (a118)) (-. (c2_1 (a118))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (c3_1 (a133)) (c0_1 (a133)) (-. (c2_1 (a133))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (ndr1_0) (c1_1 (a116)) (c3_1 (a116)) (-. (c0_1 (a116))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ### ConjTree 1163
% 0.70/0.88 1165. ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) (-. (hskp24)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a133)) (-. (c2_1 (a133))) (c0_1 (a133)) (c1_1 (a118)) (-. (c2_1 (a118))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c1_1 (a116)) (c3_1 (a116)) (-. (c0_1 (a116))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ### Or 1160 1164
% 0.70/0.88 1166. ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) (-. (c0_1 (a116))) (c3_1 (a116)) (c1_1 (a116)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (ndr1_0) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a118))) (c1_1 (a118)) (c0_1 (a133)) (-. (c2_1 (a133))) (c3_1 (a133)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ### Or 1165 1151
% 0.70/0.88 1167. ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133)))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c1_1 (a118)) (-. (c2_1 (a118))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c1_1 (a116)) (c3_1 (a116)) (-. (c0_1 (a116))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ### ConjTree 1166
% 0.70/0.88 1168. ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) (-. (c0_1 (a116))) (c3_1 (a116)) (c1_1 (a116)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a118))) (c1_1 (a118)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) (ndr1_0) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ### Or 20 1167
% 0.70/0.88 1169. ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118)))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c1_1 (a116)) (c3_1 (a116)) (-. (c0_1 (a116))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### ConjTree 1168
% 0.70/0.88 1170. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) (-. (c0_1 (a116))) (c3_1 (a116)) (c1_1 (a116)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### Or 1157 1169
% 0.70/0.88 1171. ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (ndr1_0) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 1170
% 0.70/0.88 1172. ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### Or 1080 1171
% 0.70/0.88 1173. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (ndr1_0) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ### ConjTree 1172
% 0.70/0.88 1174. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (ndr1_0) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (-. (hskp1)) (-. (hskp3)) ((hskp14) \/ ((hskp1) \/ (hskp3))) ### Or 4 1173
% 0.70/0.88 1175. ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((hskp14) \/ ((hskp1) \/ (hskp3))) (-. (hskp3)) (-. (hskp1)) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (ndr1_0) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### Or 1174 1121
% 0.70/0.88 1176. ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp15)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c2_1 (a115))) (c0_1 (a115)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ### Or 644 1079
% 0.70/0.88 1177. ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp16)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c1_1 (a116)) (c3_1 (a116)) (-. (c0_1 (a116))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c2_1 (a115))) (c0_1 (a115)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ### Or 644 1156
% 0.70/0.88 1178. ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) (c1_1 (a118)) (All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) (-. (c2_1 (a118))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) ### DisjTree 504 134 217
% 0.70/0.88 1179. ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c1_1 (a165)) (c3_1 (a165)) (c2_1 (a165)) (c0_1 (a115)) (-. (c2_1 (a115))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (ndr1_0) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a118))) (c1_1 (a118)) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ### DisjTree 1178 641 62
% 0.70/0.88 1180. ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) (c1_1 (a118)) (-. (c2_1 (a118))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c2_1 (a115))) (c0_1 (a115)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ### ConjTree 1179
% 0.70/0.88 1181. ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c0_1 (a115)) (-. (c2_1 (a115))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (ndr1_0) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a118))) (c1_1 (a118)) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp20)) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ### Or 629 1180
% 0.70/0.88 1182. ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) (c1_1 (a118)) (-. (c2_1 (a118))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c2_1 (a115))) (c0_1 (a115)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ### Or 1181 1138
% 0.70/0.88 1183. ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118)))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c0_1 (a115)) (-. (c2_1 (a115))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (ndr1_0) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### ConjTree 1182
% 0.70/0.88 1184. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c0_1 (a115)) (-. (c2_1 (a115))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (ndr1_0) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) (-. (c0_1 (a116))) (c3_1 (a116)) (c1_1 (a116)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### Or 1177 1183
% 0.70/0.88 1185. ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c2_1 (a115))) (c0_1 (a115)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 1184
% 0.70/0.88 1186. ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c0_1 (a115)) (-. (c2_1 (a115))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (ndr1_0) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### Or 1176 1185
% 0.70/0.88 1187. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ### ConjTree 1186
% 0.70/0.88 1188. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (ndr1_0) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (-. (hskp12)) (-. (hskp11)) ((hskp14) \/ ((hskp12) \/ (hskp11))) ### Or 224 1187
% 0.70/0.88 1189. ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) (-. (hskp11)) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### Or 1188 220
% 0.70/0.88 1190. ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) (-. (hskp1)) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (-. (c2_1 X1)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (ndr1_0) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ### Or 1189 1140
% 0.70/0.88 1191. ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106)))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (-. (c2_1 X1)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) (-. (hskp1)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### ConjTree 1190
% 0.70/0.88 1192. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (-. (c2_1 X1)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (ndr1_0) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (-. (hskp1)) (-. (hskp3)) ((hskp14) \/ ((hskp1) \/ (hskp3))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### Or 1175 1191
% 0.70/0.88 1193. ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((hskp14) \/ ((hskp1) \/ (hskp3))) (-. (hskp3)) (-. (hskp1)) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (ndr1_0) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (-. (c2_1 X1)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### Or 1192 1148
% 0.70/0.88 1194. ((ndr1_0) /\ ((c3_1 (a101)) /\ ((-. (c1_1 (a101))) /\ (-. (c2_1 (a101)))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (-. (c2_1 X1)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (ndr1_0) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (-. (hskp1)) (-. (hskp3)) ((hskp14) \/ ((hskp1) \/ (hskp3))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ### ConjTree 1193
% 0.70/0.88 1195. ((-. (hskp5)) \/ ((ndr1_0) /\ ((c3_1 (a101)) /\ ((-. (c1_1 (a101))) /\ (-. (c2_1 (a101))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (-. (c2_1 X1)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (-. (hskp1)) (-. (hskp3)) ((hskp14) \/ ((hskp1) \/ (hskp3))) ((hskp14) \/ ((hskp12) \/ (hskp11))) (ndr1_0) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ### Or 1149 1194
% 0.70/0.88 1196. ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) (-. (hskp14)) (c0_1 (a133)) (c3_1 (a133)) (-. (c2_1 (a133))) (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) (ndr1_0) ### DisjTree 357 1 19
% 0.70/0.88 1197. ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp14)) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (c3_1 (a133)) (c0_1 (a133)) (-. (c2_1 (a133))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (ndr1_0) ### DisjTree 1077 39 1196
% 0.70/0.88 1198. ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133)))))) (ndr1_0) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) (-. (hskp14)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ### ConjTree 1197
% 0.70/0.88 1199. ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((hskp14) \/ ((hskp16) \/ (hskp21))) (-. (hskp16)) (-. (hskp14)) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) (ndr1_0) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (-. (hskp10)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp18)) (c2_1 (a127)) (c0_1 (a127)) (-. (c3_1 (a127))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp1)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c3_1 (a145)) /\ ((-. (c0_1 (a145))) /\ (-. (c2_1 (a145))))))) ### Or 908 1198
% 0.70/0.88 1200. ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127)))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c3_1 (a145)) /\ ((-. (c0_1 (a145))) /\ (-. (c2_1 (a145))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) (-. (hskp1)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (-. (hskp18)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp10)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (ndr1_0) (-. (c0_1 (a110))) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (-. (hskp14)) (-. (hskp16)) ((hskp14) \/ ((hskp16) \/ (hskp21))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### ConjTree 1199
% 0.70/0.88 1201. ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((hskp14) \/ ((hskp16) \/ (hskp21))) (-. (hskp16)) (-. (hskp14)) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) (ndr1_0) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (-. (hskp10)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp1)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c3_1 (a145)) /\ ((-. (c0_1 (a145))) /\ (-. (c2_1 (a145))))))) (-. (hskp18)) (-. (hskp13)) ((hskp18) \/ ((hskp19) \/ (hskp13))) ### Or 521 1200
% 0.70/0.88 1202. ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((hskp18) \/ ((hskp19) \/ (hskp13))) (-. (hskp13)) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c3_1 (a145)) /\ ((-. (c0_1 (a145))) /\ (-. (c2_1 (a145))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) (-. (hskp1)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp10)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (ndr1_0) (-. (c0_1 (a110))) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (-. (hskp14)) (-. (hskp16)) ((hskp14) \/ ((hskp16) \/ (hskp21))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ### Or 1201 913
% 0.70/0.88 1203. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((hskp14) \/ ((hskp16) \/ (hskp21))) (-. (hskp14)) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) (ndr1_0) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (-. (hskp10)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp1)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c3_1 (a145)) /\ ((-. (c0_1 (a145))) /\ (-. (c2_1 (a145))))))) (-. (hskp13)) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ### Or 1202 854
% 0.70/0.88 1204. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### Or 1093 854
% 0.70/0.88 1205. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (c0_1 (a110))) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (ndr1_0) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 1204
% 0.70/0.88 1206. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((hskp18) \/ ((hskp19) \/ (hskp13))) (-. (hskp13)) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c3_1 (a145)) /\ ((-. (c0_1 (a145))) /\ (-. (c2_1 (a145))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) (-. (hskp1)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp10)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (ndr1_0) (-. (c0_1 (a110))) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((hskp14) \/ ((hskp16) \/ (hskp21))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### Or 1203 1205
% 0.70/0.88 1207. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (ndr1_0) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ### Or 375 1205
% 0.70/0.88 1208. ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112)))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) (ndr1_0) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (c0_1 (a110))) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### ConjTree 1207
% 0.70/0.88 1209. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((hskp14) \/ ((hskp16) \/ (hskp21))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) (ndr1_0) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (-. (hskp10)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp1)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c3_1 (a145)) /\ ((-. (c0_1 (a145))) /\ (-. (c2_1 (a145))))))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### Or 1206 1208
% 0.70/0.88 1210. ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110)))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c3_1 (a145)) /\ ((-. (c0_1 (a145))) /\ (-. (c2_1 (a145))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) (-. (hskp1)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp10)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (ndr1_0) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((hskp14) \/ ((hskp16) \/ (hskp21))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### ConjTree 1209
% 0.70/0.88 1211. ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((hskp14) \/ ((hskp16) \/ (hskp21))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (-. (hskp10)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp1)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c3_1 (a145)) /\ ((-. (c0_1 (a145))) /\ (-. (c2_1 (a145))))))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((hskp14) \/ ((hskp12) \/ (hskp11))) (-. (hskp11)) (ndr1_0) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### Or 225 1210
% 0.70/0.88 1212. ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) (-. (hskp5)) (ndr1_0) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c3_1 (a145)) /\ ((-. (c0_1 (a145))) /\ (-. (c2_1 (a145))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) (-. (hskp1)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp10)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((hskp14) \/ ((hskp16) \/ (hskp21))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ### Or 1211 861
% 0.70/0.88 1213. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (-. (c2_1 X1)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((hskp14) \/ ((hskp16) \/ (hskp21))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp1)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c3_1 (a145)) /\ ((-. (c0_1 (a145))) /\ (-. (c2_1 (a145))))))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((hskp14) \/ ((hskp12) \/ (hskp11))) (ndr1_0) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### Or 1212 1142
% 0.70/0.88 1214. ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) (-. (hskp5)) (ndr1_0) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c3_1 (a145)) /\ ((-. (c0_1 (a145))) /\ (-. (c2_1 (a145))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) (-. (hskp1)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((hskp14) \/ ((hskp16) \/ (hskp21))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (-. (c2_1 X1)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### Or 1213 975
% 0.70/0.88 1215. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (ndr1_0) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (-. (hskp12)) (-. (hskp11)) ((hskp14) \/ ((hskp12) \/ (hskp11))) ### Or 224 1173
% 0.70/0.88 1216. ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) (-. (hskp11)) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (ndr1_0) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### Or 1215 1028
% 0.70/0.88 1217. ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (ndr1_0) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ### Or 1216 861
% 0.70/0.88 1218. ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) (c3_1 (a101)) (-. (c1_1 (a101))) (All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) (-. (c2_1 (a101))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (ndr1_0) ### DisjTree 1077 684 213
% 0.70/0.88 1219. ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (ndr1_0) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ### DisjTree 1218 674 847
% 0.70/0.88 1220. ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106)))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c3_1 (a101)) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (ndr1_0) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ### ConjTree 1219
% 0.70/0.89 1221. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (ndr1_0) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### Or 1217 1220
% 0.70/0.89 1222. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (c3_1 (a101)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (c0_1 (a103)) (-. (c3_1 (a103))) (-. (c1_1 (a103))) (ndr1_0) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ### Or 973 1220
% 0.70/0.89 1223. ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103)))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c3_1 (a101)) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### ConjTree 1222
% 0.70/0.89 1224. ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (ndr1_0) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### Or 1221 1223
% 0.70/0.89 1225. ((ndr1_0) /\ ((c3_1 (a101)) /\ ((-. (c1_1 (a101))) /\ (-. (c2_1 (a101)))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (ndr1_0) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ### ConjTree 1224
% 0.70/0.89 1226. ((-. (hskp5)) \/ ((ndr1_0) /\ ((c3_1 (a101)) /\ ((-. (c1_1 (a101))) /\ (-. (c2_1 (a101))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (-. (c2_1 X1)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((hskp14) \/ ((hskp16) \/ (hskp21))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp1)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c3_1 (a145)) /\ ((-. (c0_1 (a145))) /\ (-. (c2_1 (a145))))))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((hskp14) \/ ((hskp12) \/ (hskp11))) (ndr1_0) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ### Or 1214 1225
% 0.70/0.89 1227. ((ndr1_0) /\ ((c2_1 (a99)) /\ ((-. (c1_1 (a99))) /\ (-. (c3_1 (a99)))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) (ndr1_0) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c3_1 (a145)) /\ ((-. (c0_1 (a145))) /\ (-. (c2_1 (a145))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) (-. (hskp1)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((hskp14) \/ ((hskp16) \/ (hskp21))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (-. (c2_1 X1)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp5)) \/ ((ndr1_0) /\ ((c3_1 (a101)) /\ ((-. (c1_1 (a101))) /\ (-. (c2_1 (a101))))))) ### ConjTree 1226
% 0.70/0.89 1228. ((-. (hskp3)) \/ ((ndr1_0) /\ ((c2_1 (a99)) /\ ((-. (c1_1 (a99))) /\ (-. (c3_1 (a99))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((hskp14) \/ ((hskp16) \/ (hskp21))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c3_1 (a145)) /\ ((-. (c0_1 (a145))) /\ (-. (c2_1 (a145))))))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) (ndr1_0) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((hskp14) \/ ((hskp1) \/ (hskp3))) (-. (hskp1)) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (-. (c2_1 X1)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp5)) \/ ((ndr1_0) /\ ((c3_1 (a101)) /\ ((-. (c1_1 (a101))) /\ (-. (c2_1 (a101))))))) ### Or 1195 1227
% 0.70/0.89 1229. ((ndr1_0) /\ ((c1_1 (a98)) /\ ((-. (c0_1 (a98))) /\ (-. (c3_1 (a98)))))) ((-. (hskp5)) \/ ((ndr1_0) /\ ((c3_1 (a101)) /\ ((-. (c1_1 (a101))) /\ (-. (c2_1 (a101))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (-. (c2_1 X1)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (-. (hskp1)) ((hskp14) \/ ((hskp1) \/ (hskp3))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c3_1 (a145)) /\ ((-. (c0_1 (a145))) /\ (-. (c2_1 (a145))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((hskp14) \/ ((hskp16) \/ (hskp21))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((-. (hskp3)) \/ ((ndr1_0) /\ ((c2_1 (a99)) /\ ((-. (c1_1 (a99))) /\ (-. (c3_1 (a99))))))) ### ConjTree 1228
% 0.70/0.89 1230. ((-. (hskp2)) \/ ((ndr1_0) /\ ((c1_1 (a98)) /\ ((-. (c0_1 (a98))) /\ (-. (c3_1 (a98))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (-. (c2_1 X1)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp5)) \/ ((ndr1_0) /\ ((c3_1 (a101)) /\ ((-. (c1_1 (a101))) /\ (-. (c2_1 (a101))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((hskp9) \/ ((hskp14) \/ (hskp2))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) (-. (hskp1)) ((hskp14) \/ ((hskp1) \/ (hskp3))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) (-. (hskp0)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c3_1 (a145)) /\ ((-. (c0_1 (a145))) /\ (-. (c2_1 (a145))))))) ((hskp14) \/ ((hskp16) \/ (hskp21))) ((-. (hskp3)) \/ ((ndr1_0) /\ ((c2_1 (a99)) /\ ((-. (c1_1 (a99))) /\ (-. (c3_1 (a99))))))) ### Or 1072 1229
% 0.70/0.89 1231. (-. (c1_1 (a97))) (c1_1 (a97)) ### Axiom
% 0.70/0.89 1232. (c2_1 (a97)) (-. (c2_1 (a97))) ### Axiom
% 0.70/0.89 1233. (c3_1 (a97)) (-. (c3_1 (a97))) ### Axiom
% 0.70/0.89 1234. ((ndr1_0) => ((c1_1 (a97)) \/ ((-. (c2_1 (a97))) \/ (-. (c3_1 (a97)))))) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ### DisjTree 5 1231 1232 1233
% 0.70/0.89 1235. (All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ### All 1234
% 0.70/0.89 1236. ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (-. (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ### Or 1235 254
% 0.70/0.89 1237. (-. (c0_1 (a97))) (c0_1 (a97)) ### Axiom
% 0.70/0.89 1238. (c2_1 (a97)) (-. (c2_1 (a97))) ### Axiom
% 0.70/0.89 1239. (c3_1 (a97)) (-. (c3_1 (a97))) ### Axiom
% 0.70/0.89 1240. ((ndr1_0) => ((c0_1 (a97)) \/ ((-. (c2_1 (a97))) \/ (-. (c3_1 (a97)))))) (c3_1 (a97)) (c2_1 (a97)) (-. (c0_1 (a97))) (ndr1_0) ### DisjTree 5 1237 1238 1239
% 0.70/0.89 1241. (All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) (ndr1_0) (-. (c0_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ### All 1240
% 0.70/0.89 1242. (c2_1 (a97)) (-. (c2_1 (a97))) ### Axiom
% 0.70/0.89 1243. (c3_1 (a97)) (-. (c3_1 (a97))) ### Axiom
% 0.70/0.89 1244. ((ndr1_0) => ((-. (c0_1 (a97))) \/ ((-. (c2_1 (a97))) \/ (-. (c3_1 (a97)))))) (c3_1 (a97)) (c2_1 (a97)) (All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) (ndr1_0) ### DisjTree 5 1241 1242 1243
% 0.70/0.89 1245. (All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) (ndr1_0) (All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) (c2_1 (a97)) (c3_1 (a97)) ### All 1244
% 0.70/0.89 1246. ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (-. (hskp8)) (c3_1 (a97)) (c2_1 (a97)) (All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ### DisjTree 10 1245 262
% 0.70/0.89 1247. ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp8)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (c1_1 (a153)) (-. (c2_1 (a153))) (-. (c0_1 (a153))) (ndr1_0) ### DisjTree 56 1246 62
% 0.70/0.89 1248. ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153)))))) (ndr1_0) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (-. (hskp8)) (c3_1 (a97)) (c2_1 (a97)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ### ConjTree 1247
% 0.70/0.89 1249. ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp8)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (ndr1_0) (-. (hskp23)) (-. (hskp16)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ### Or 51 1248
% 0.70/0.89 1250. ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) (-. (hskp6)) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp16)) (ndr1_0) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (-. (hskp8)) (c3_1 (a97)) (c2_1 (a97)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ### Or 1249 407
% 0.70/0.89 1251. ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) (-. (hskp5)) (-. (hskp19)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ### DisjTree 1235 278 12
% 0.70/0.89 1252. (-. (c1_1 (a97))) (c1_1 (a97)) ### Axiom
% 0.70/0.89 1253. (-. (c0_1 (a97))) (c0_1 (a97)) ### Axiom
% 0.70/0.89 1254. (-. (c1_1 (a97))) (c1_1 (a97)) ### Axiom
% 0.70/0.89 1255. (c3_1 (a97)) (-. (c3_1 (a97))) ### Axiom
% 0.70/0.89 1256. ((ndr1_0) => ((c0_1 (a97)) \/ ((c1_1 (a97)) \/ (-. (c3_1 (a97)))))) (c3_1 (a97)) (-. (c1_1 (a97))) (-. (c0_1 (a97))) (ndr1_0) ### DisjTree 5 1253 1254 1255
% 0.70/0.89 1257. (All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) (ndr1_0) (-. (c0_1 (a97))) (-. (c1_1 (a97))) (c3_1 (a97)) ### All 1256
% 0.70/0.89 1258. (c2_1 (a97)) (-. (c2_1 (a97))) ### Axiom
% 0.70/0.89 1259. ((ndr1_0) => ((c1_1 (a97)) \/ ((-. (c0_1 (a97))) \/ (-. (c2_1 (a97)))))) (c2_1 (a97)) (c3_1 (a97)) (All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) (-. (c1_1 (a97))) (ndr1_0) ### DisjTree 5 1252 1257 1258
% 0.70/0.89 1260. (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50)))))) (ndr1_0) (-. (c1_1 (a97))) (All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) (c3_1 (a97)) (c2_1 (a97)) ### All 1259
% 0.70/0.89 1261. ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a97)) (c3_1 (a97)) (All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) (-. (c1_1 (a97))) (ndr1_0) (-. (c2_1 (a118))) (-. (c3_1 (a118))) (c1_1 (a118)) (-. (c3_1 (a127))) (c0_1 (a127)) (c2_1 (a127)) (-. (hskp5)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ### Or 296 1260
% 0.70/0.89 1262. ((All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) \/ ((hskp2) \/ (hskp3))) (-. (hskp3)) (-. (hskp2)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (hskp5)) (c2_1 (a127)) (c0_1 (a127)) (-. (c3_1 (a127))) (c1_1 (a118)) (-. (c3_1 (a118))) (-. (c2_1 (a118))) (ndr1_0) (-. (c1_1 (a97))) (c3_1 (a97)) (c2_1 (a97)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ### DisjTree 1261 169 3
% 0.70/0.89 1263. ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127)))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a97)) (c3_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) (-. (c2_1 (a118))) (-. (c3_1 (a118))) (c1_1 (a118)) (-. (hskp5)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (hskp2)) (-. (hskp3)) ((All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) \/ ((hskp2) \/ (hskp3))) ### ConjTree 1262
% 0.70/0.89 1264. ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) \/ ((hskp2) \/ (hskp3))) (-. (hskp3)) (-. (hskp2)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (c1_1 (a118)) (-. (c3_1 (a118))) (-. (c2_1 (a118))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp5)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ### Or 1251 1263
% 0.72/0.89 1265. ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118)))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) (-. (hskp5)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (hskp2)) (-. (hskp3)) ((All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) \/ ((hskp2) \/ (hskp3))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ### ConjTree 1264
% 0.72/0.89 1266. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) \/ ((hskp2) \/ (hskp3))) (-. (hskp2)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (-. (c1_1 (a97))) (-. (hskp5)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp8)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (ndr1_0) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ### Or 1250 1265
% 0.72/0.89 1267. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) (-. (hskp6)) ((hskp23) \/ ((hskp24) \/ (hskp16))) (ndr1_0) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (-. (hskp8)) (c3_1 (a97)) (c2_1 (a97)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) (-. (hskp5)) (-. (c1_1 (a97))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (hskp2)) ((All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) \/ ((hskp2) \/ (hskp3))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 1266
% 0.72/0.89 1268. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) \/ ((hskp2) \/ (hskp3))) (-. (hskp2)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (-. (c1_1 (a97))) (-. (hskp5)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp8)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) (ndr1_0) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ### Or 375 1267
% 0.72/0.89 1269. ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112)))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) (ndr1_0) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) (-. (hskp6)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (-. (hskp8)) (c3_1 (a97)) (c2_1 (a97)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) (-. (hskp5)) (-. (c1_1 (a97))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (hskp2)) ((All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) \/ ((hskp2) \/ (hskp3))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### ConjTree 1268
% 0.72/0.89 1270. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) \/ ((hskp2) \/ (hskp3))) (-. (hskp2)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (-. (hskp5)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (hskp8)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ### Or 1236 1269
% 0.72/0.89 1271. ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (-. (hskp14)) (-. (hskp18)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ### DisjTree 1235 520 1
% 0.72/0.89 1272. ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (hskp16)) (c3_1 (a112)) (c0_1 (a112)) (-. (c1_1 (a112))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp14)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ### Or 1271 807
% 0.72/0.89 1273. ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) (-. (hskp8)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (c1_1 (a118)) (-. (c3_1 (a118))) (-. (c2_1 (a118))) (-. (hskp12)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (-. (c2_1 (a106))) (c3_1 (a106)) (c1_1 (a106)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp5)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ### Or 1251 299
% 0.72/0.89 1274. ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118)))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) (-. (hskp5)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c1_1 (a106)) (c3_1 (a106)) (-. (c2_1 (a106))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (-. (hskp12)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (hskp8)) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ### ConjTree 1273
% 0.72/0.89 1275. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) (-. (hskp8)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (hskp12)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (-. (c2_1 (a106))) (c3_1 (a106)) (c1_1 (a106)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp5)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (-. (hskp14)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ### Or 1272 1274
% 0.72/0.89 1276. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c3_1 (a112)) (c0_1 (a112)) (-. (c1_1 (a112))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) (-. (hskp5)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c1_1 (a106)) (c3_1 (a106)) (-. (c2_1 (a106))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (-. (hskp12)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (hskp8)) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### Or 1275 198
% 0.72/0.89 1277. ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112)))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) (-. (hskp8)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (hskp12)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (-. (c2_1 (a106))) (c3_1 (a106)) (c1_1 (a106)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp5)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### ConjTree 1276
% 0.72/0.89 1278. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) (-. (hskp5)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c1_1 (a106)) (c3_1 (a106)) (-. (c2_1 (a106))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (-. (hskp12)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (hskp8)) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ### Or 1236 1277
% 0.72/0.89 1279. ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) (-. (hskp8)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (-. (c2_1 (a106))) (c3_1 (a106)) (c1_1 (a106)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp5)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### Or 1278 220
% 0.72/0.89 1280. ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106)))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) (-. (hskp5)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (hskp8)) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ### ConjTree 1279
% 0.72/0.89 1281. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) (-. (hskp6)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (-. (hskp8)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) (-. (hskp5)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (hskp2)) ((All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) \/ ((hskp2) \/ (hskp3))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### Or 1270 1280
% 0.72/0.89 1282. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) (-. (hskp5)) (-. (hskp12)) (ndr1_0) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ### Or 375 198
% 0.72/0.89 1283. ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112)))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) (ndr1_0) (-. (hskp12)) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### ConjTree 1282
% 0.72/0.89 1284. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) (-. (hskp5)) (-. (hskp12)) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ### Or 1236 1283
% 0.72/0.89 1285. ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) (-. (hskp6)) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp16)) (ndr1_0) (-. (c0_1 (a110))) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ### Or 65 407
% 0.72/0.89 1286. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) \/ ((hskp2) \/ (hskp3))) (-. (hskp2)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp5)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) (ndr1_0) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ### Or 1285 1265
% 0.72/0.89 1287. ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) (-. (hskp6)) ((hskp23) \/ ((hskp24) \/ (hskp16))) (ndr1_0) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) (-. (hskp5)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (hskp2)) ((All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) \/ ((hskp2) \/ (hskp3))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 1286
% 0.72/0.89 1288. ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) \/ ((hskp2) \/ (hskp3))) (-. (hskp2)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### Or 1284 1287
% 0.72/0.89 1289. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) (-. (hskp5)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) (-. (hskp6)) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (hskp2)) ((All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) \/ ((hskp2) \/ (hskp3))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ### Or 1288 328
% 0.72/0.89 1290. ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104)))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) \/ ((hskp2) \/ (hskp3))) (-. (hskp2)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### ConjTree 1289
% 0.72/0.89 1291. ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) \/ ((hskp2) \/ (hskp3))) (-. (hskp2)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (-. (hskp5)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### Or 1281 1290
% 0.72/0.89 1292. ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a97)) (c3_1 (a97)) (All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) (-. (c1_1 (a97))) (c0_1 (a103)) (-. (c3_1 (a103))) (-. (c1_1 (a103))) (ndr1_0) ### Or 388 1260
% 0.72/0.89 1293. ((All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) \/ ((hskp2) \/ (hskp3))) (-. (hskp3)) (-. (hskp2)) (ndr1_0) (-. (c1_1 (a103))) (-. (c3_1 (a103))) (c0_1 (a103)) (-. (c1_1 (a97))) (c3_1 (a97)) (c2_1 (a97)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ### DisjTree 1292 169 3
% 0.72/0.89 1294. ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103)))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a97)) (c3_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) (-. (hskp2)) (-. (hskp3)) ((All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) \/ ((hskp2) \/ (hskp3))) ### ConjTree 1293
% 0.72/0.89 1295. ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) (-. (hskp6)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) (-. (hskp5)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (hskp2)) ((All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) \/ ((hskp2) \/ (hskp3))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ### Or 1291 1294
% 0.72/0.89 1296. (-. (c3_1 (a102))) (c3_1 (a102)) ### Axiom
% 0.72/0.89 1297. (-. (c0_1 (a102))) (c0_1 (a102)) ### Axiom
% 0.72/0.89 1298. (-. (c3_1 (a102))) (c3_1 (a102)) ### Axiom
% 0.72/0.89 1299. (c1_1 (a102)) (-. (c1_1 (a102))) ### Axiom
% 0.72/0.89 1300. ((ndr1_0) => ((c0_1 (a102)) \/ ((c3_1 (a102)) \/ (-. (c1_1 (a102)))))) (c1_1 (a102)) (-. (c3_1 (a102))) (-. (c0_1 (a102))) (ndr1_0) ### DisjTree 5 1297 1298 1299
% 0.72/0.89 1301. (All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) (ndr1_0) (-. (c0_1 (a102))) (-. (c3_1 (a102))) (c1_1 (a102)) ### All 1300
% 0.72/0.89 1302. (c1_1 (a102)) (-. (c1_1 (a102))) ### Axiom
% 0.72/0.89 1303. ((ndr1_0) => ((c3_1 (a102)) \/ ((-. (c0_1 (a102))) \/ (-. (c1_1 (a102)))))) (c1_1 (a102)) (All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) (-. (c3_1 (a102))) (ndr1_0) ### DisjTree 5 1296 1301 1302
% 0.72/0.89 1304. (All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) (ndr1_0) (-. (c3_1 (a102))) (All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) (c1_1 (a102)) ### All 1303
% 0.72/0.89 1305. ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (hskp16)) (c1_1 (a102)) (All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) (-. (c3_1 (a102))) (c3_1 (a112)) (c0_1 (a112)) (-. (c1_1 (a112))) (ndr1_0) ### DisjTree 261 1304 50
% 0.72/0.89 1306. ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) (-. (hskp9)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (c3_1 (a102))) (c1_1 (a102)) (-. (hskp16)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ### DisjTree 1305 10 168
% 0.72/0.89 1307. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (hskp5)) (c2_1 (a102)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c1_1 (a102)) (-. (c3_1 (a102))) (c3_1 (a112)) (c0_1 (a112)) (-. (c1_1 (a112))) (ndr1_0) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp9)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ### Or 1306 423
% 0.72/0.89 1308. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) (-. (hskp9)) (ndr1_0) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (c3_1 (a102))) (c1_1 (a102)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c2_1 (a102)) (-. (hskp5)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 1307
% 0.72/0.89 1309. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (hskp5)) (c2_1 (a102)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c1_1 (a102)) (-. (c3_1 (a102))) (-. (hskp9)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) (ndr1_0) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ### Or 375 1308
% 0.72/0.89 1310. ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112)))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) (ndr1_0) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) (-. (hskp9)) (-. (c3_1 (a102))) (c1_1 (a102)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c2_1 (a102)) (-. (hskp5)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### ConjTree 1309
% 0.72/0.89 1311. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (hskp5)) (c2_1 (a102)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c1_1 (a102)) (-. (c3_1 (a102))) (-. (hskp9)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ### Or 1236 1310
% 0.72/0.89 1312. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (hskp5)) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (-. (hskp14)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ### Or 1272 423
% 0.72/0.89 1313. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) (-. (hskp12)) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c3_1 (a112)) (c0_1 (a112)) (-. (c1_1 (a112))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) (-. (hskp5)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### Or 1312 198
% 0.72/0.89 1314. ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112)))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (hskp5)) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) (-. (hskp12)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### ConjTree 1313
% 0.72/0.89 1315. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) (-. (hskp12)) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) (-. (hskp5)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ### Or 1236 1314
% 0.72/0.89 1316. ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (hskp5)) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### Or 1315 220
% 0.72/0.89 1317. ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106)))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) (-. (hskp5)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ### ConjTree 1316
% 0.72/0.89 1318. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) (-. (hskp9)) (-. (c3_1 (a102))) (c1_1 (a102)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c2_1 (a102)) (-. (hskp5)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### Or 1311 1317
% 0.72/0.89 1319. ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (c0_1 (a127)) (-. (c3_1 (a127))) (c2_1 (a127)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c3_1 (a133)) (c0_1 (a133)) (-. (c2_1 (a133))) (ndr1_0) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) (-. (hskp16)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ### DisjTree 442 39 944
% 0.72/0.89 1320. ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133)))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (hskp16)) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) (c3_1 (a112)) (c0_1 (a112)) (-. (c1_1 (a112))) (ndr1_0) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a127)) (-. (c3_1 (a127))) (c0_1 (a127)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ### ConjTree 1319
% 0.72/0.89 1321. ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (c0_1 (a127)) (-. (c3_1 (a127))) (c2_1 (a127)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) (-. (hskp16)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (ndr1_0) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ### Or 20 1320
% 0.72/0.89 1322. ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127)))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (hskp16)) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) (c3_1 (a112)) (c0_1 (a112)) (-. (c1_1 (a112))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### ConjTree 1321
% 0.72/0.89 1323. ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) (-. (hskp16)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp5)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ### Or 1251 1322
% 0.72/0.89 1324. ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a105)) (c0_1 (a105)) (-. (c1_1 (a105))) (ndr1_0) (-. (c2_1 (a118))) (-. (c3_1 (a118))) (c1_1 (a118)) (-. (c3_1 (a127))) (c0_1 (a127)) (c2_1 (a127)) (-. (hskp5)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ### Or 296 399
% 0.72/0.89 1325. ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127)))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (hskp5)) (c1_1 (a118)) (-. (c3_1 (a118))) (-. (c2_1 (a118))) (ndr1_0) (-. (c1_1 (a105))) (c0_1 (a105)) (c2_1 (a105)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ### ConjTree 1324
% 0.72/0.89 1326. ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a105)) (c0_1 (a105)) (-. (c1_1 (a105))) (-. (c2_1 (a118))) (-. (c3_1 (a118))) (c1_1 (a118)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp5)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ### Or 1251 1325
% 0.72/0.89 1327. ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118)))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) (-. (hskp5)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (c1_1 (a105))) (c0_1 (a105)) (c2_1 (a105)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ### ConjTree 1326
% 0.72/0.89 1328. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (c2_1 (a105)) (c0_1 (a105)) (-. (c1_1 (a105))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) (-. (hskp5)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) (c3_1 (a112)) (c0_1 (a112)) (-. (c1_1 (a112))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ### Or 1323 1327
% 0.72/0.89 1329. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp5)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (c1_1 (a105))) (c0_1 (a105)) (c2_1 (a105)) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 1328
% 0.72/0.89 1330. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (c2_1 (a105)) (c0_1 (a105)) (-. (c1_1 (a105))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) (-. (hskp5)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) (ndr1_0) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ### Or 375 1329
% 0.72/0.89 1331. ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112)))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) (ndr1_0) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp5)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (c1_1 (a105))) (c0_1 (a105)) (c2_1 (a105)) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### ConjTree 1330
% 0.72/0.89 1332. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (c2_1 (a105)) (c0_1 (a105)) (-. (c1_1 (a105))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ### Or 1236 1331
% 0.72/0.89 1333. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp5)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (c1_1 (a105))) (c0_1 (a105)) (c2_1 (a105)) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### Or 1332 1317
% 0.72/0.89 1334. ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105)))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### ConjTree 1333
% 0.72/0.89 1335. ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (hskp5)) (c2_1 (a102)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c1_1 (a102)) (-. (c3_1 (a102))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### Or 1318 1334
% 0.72/0.89 1336. ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) \/ ((hskp2) \/ (hskp3))) (-. (hskp3)) (-. (hskp2)) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) (-. (c3_1 (a102))) (c1_1 (a102)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c2_1 (a102)) (-. (hskp5)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ### Or 1335 1294
% 0.72/0.89 1337. ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102)))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (hskp5)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) (-. (hskp2)) (-. (hskp3)) ((All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) \/ ((hskp2) \/ (hskp3))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ### ConjTree 1336
% 0.72/0.90 1338. ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) \/ ((hskp2) \/ (hskp3))) (-. (hskp2)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (-. (hskp5)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ### Or 1295 1337
% 0.72/0.90 1339. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (hskp15)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp8)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (ndr1_0) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ### Or 1250 566
% 0.72/0.90 1340. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) (c1_1 (a116)) (c3_1 (a116)) (-. (c0_1 (a116))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp8)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (ndr1_0) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ### Or 1250 588
% 0.72/0.90 1341. ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) (-. (hskp6)) ((hskp23) \/ ((hskp24) \/ (hskp16))) (ndr1_0) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (-. (hskp8)) (c3_1 (a97)) (c2_1 (a97)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 1340
% 0.72/0.90 1342. ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) (-. (hskp6)) ((hskp23) \/ ((hskp24) \/ (hskp16))) (ndr1_0) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (-. (hskp8)) (c3_1 (a97)) (c2_1 (a97)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### Or 1339 1341
% 0.72/0.90 1343. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp8)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (ndr1_0) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ### ConjTree 1342
% 0.72/0.90 1344. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) (-. (hskp6)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (-. (hskp8)) (c3_1 (a97)) (c2_1 (a97)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (ndr1_0) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ### Or 375 1343
% 0.72/0.90 1345. ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112)))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) (ndr1_0) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp8)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### ConjTree 1344
% 0.72/0.90 1346. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) (-. (hskp6)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (-. (hskp8)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ### Or 1236 1345
% 0.72/0.90 1347. ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (c2_1 (a109)) (-. (c3_1 (a109))) (-. (c0_1 (a109))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) (-. (hskp6)) ((hskp23) \/ ((hskp24) \/ (hskp16))) (ndr1_0) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (-. (hskp8)) (c3_1 (a97)) (c2_1 (a97)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### Or 1339 192
% 0.72/0.90 1348. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp8)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (ndr1_0) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) (-. (c0_1 (a109))) (-. (c3_1 (a109))) (c2_1 (a109)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ### ConjTree 1347
% 0.72/0.90 1349. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (c2_1 (a109)) (-. (c3_1 (a109))) (-. (c0_1 (a109))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) (-. (hskp6)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (-. (hskp8)) (c3_1 (a97)) (c2_1 (a97)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (ndr1_0) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ### Or 375 1348
% 0.72/0.90 1350. ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112)))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) (ndr1_0) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp8)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) (-. (c0_1 (a109))) (-. (c3_1 (a109))) (c2_1 (a109)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### ConjTree 1349
% 0.72/0.90 1351. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (c2_1 (a109)) (-. (c3_1 (a109))) (-. (c0_1 (a109))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) (-. (hskp6)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (-. (hskp8)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ### Or 1236 1350
% 0.72/0.90 1352. ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109)))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (hskp8)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### ConjTree 1351
% 0.72/0.90 1353. ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (hskp8)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### Or 1346 1352
% 0.72/0.90 1354. ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c3_1 (a118))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) (c1_1 (a118)) (-. (c2_1 (a118))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c2_1 (a115))) (c0_1 (a115)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ### Or 1181 692
% 0.72/0.90 1355. ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118)))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c0_1 (a115)) (-. (c2_1 (a115))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (ndr1_0) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### ConjTree 1354
% 0.72/0.90 1356. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c2_1 (a115))) (c0_1 (a115)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) (ndr1_0) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (hskp8)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ### Or 263 1355
% 0.72/0.90 1357. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp8)) (c3_1 (a112)) (c0_1 (a112)) (-. (c1_1 (a112))) (ndr1_0) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 1356
% 0.72/0.90 1358. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) (ndr1_0) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (hskp8)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp12)) (-. (hskp11)) ((hskp14) \/ ((hskp12) \/ (hskp11))) ### Or 224 1357
% 0.72/0.90 1359. ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112)))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) (-. (hskp11)) (-. (hskp12)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp8)) (ndr1_0) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### ConjTree 1358
% 0.72/0.90 1360. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) (-. (hskp8)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp12)) (-. (hskp11)) ((hskp14) \/ ((hskp12) \/ (hskp11))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ### Or 1236 1359
% 0.72/0.90 1361. ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((hskp14) \/ ((hskp12) \/ (hskp11))) (-. (hskp11)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp8)) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### Or 1360 220
% 0.72/0.90 1362. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c0_1 (a109))) (-. (c3_1 (a109))) (c2_1 (a109)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (-. (hskp14)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ### Or 1272 694
% 0.72/0.90 1363. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp8)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c3_1 (a112)) (c0_1 (a112)) (-. (c1_1 (a112))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c2_1 (a109)) (-. (c3_1 (a109))) (-. (c0_1 (a109))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### Or 1362 1357
% 0.72/0.90 1364. ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112)))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c0_1 (a109))) (-. (c3_1 (a109))) (c2_1 (a109)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp8)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### ConjTree 1363
% 0.72/0.90 1365. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp8)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c2_1 (a109)) (-. (c3_1 (a109))) (-. (c0_1 (a109))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ### Or 1236 1364
% 0.72/0.90 1366. ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109)))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp8)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### ConjTree 1365
% 0.72/0.90 1367. ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) (-. (hskp8)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((hskp14) \/ ((hskp12) \/ (hskp11))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ### Or 1361 1366
% 0.72/0.90 1368. ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106)))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp8)) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### ConjTree 1367
% 0.72/0.90 1369. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) (-. (hskp6)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (-. (hskp8)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### Or 1353 1368
% 0.72/0.90 1370. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (ndr1_0) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ### Or 375 711
% 0.72/0.90 1371. ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112)))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) (ndr1_0) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### ConjTree 1370
% 0.72/0.90 1372. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ### Or 1236 1371
% 0.72/0.90 1373. ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (c2_1 (a109)) (-. (c3_1 (a109))) (-. (c0_1 (a109))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) ((hskp23) \/ ((hskp24) \/ (hskp16))) (ndr1_0) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### Or 707 192
% 0.72/0.90 1374. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) (ndr1_0) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) (-. (c0_1 (a109))) (-. (c3_1 (a109))) (c2_1 (a109)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ### ConjTree 1373
% 0.72/0.90 1375. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (c2_1 (a109)) (-. (c3_1 (a109))) (-. (c0_1 (a109))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (ndr1_0) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ### Or 375 1374
% 0.72/0.90 1376. ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112)))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) (ndr1_0) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) (-. (c0_1 (a109))) (-. (c3_1 (a109))) (c2_1 (a109)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### ConjTree 1375
% 0.72/0.90 1377. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (c2_1 (a109)) (-. (c3_1 (a109))) (-. (c0_1 (a109))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ### Or 1236 1376
% 0.72/0.90 1378. ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109)))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### ConjTree 1377
% 0.72/0.90 1379. ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### Or 1372 1378
% 0.72/0.90 1380. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### Or 1379 328
% 0.72/0.90 1381. ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104)))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### ConjTree 1380
% 0.72/0.90 1382. ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### Or 1369 1381
% 0.72/0.90 1383. ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) \/ ((hskp2) \/ (hskp3))) (-. (hskp2)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) (-. (hskp6)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ### Or 1382 1294
% 0.72/0.90 1384. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ### Or 1236 815
% 0.72/0.90 1385. ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (c2_1 (a109)) (-. (c3_1 (a109))) (-. (c0_1 (a109))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c3_1 (a112)) (c0_1 (a112)) (-. (c1_1 (a112))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### Or 809 192
% 0.72/0.90 1386. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (ndr1_0) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) (-. (c0_1 (a109))) (-. (c3_1 (a109))) (c2_1 (a109)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ### ConjTree 1385
% 0.72/0.90 1387. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (c2_1 (a109)) (-. (c3_1 (a109))) (-. (c0_1 (a109))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (ndr1_0) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ### Or 375 1386
% 0.72/0.90 1388. ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112)))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) (ndr1_0) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) (-. (c0_1 (a109))) (-. (c3_1 (a109))) (c2_1 (a109)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### ConjTree 1387
% 0.72/0.90 1389. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (c2_1 (a109)) (-. (c3_1 (a109))) (-. (c0_1 (a109))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ### Or 1236 1388
% 0.72/0.90 1390. ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109)))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### ConjTree 1389
% 0.72/0.91 1391. ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### Or 1384 1390
% 0.72/0.91 1392. ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) (ndr1_0) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a115))) (c0_1 (a115)) (c0_1 (a142)) (c1_1 (a142)) (c3_1 (a142)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ### DisjTree 530 504 213
% 0.72/0.91 1393. ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c0_1 (a115)) (-. (c2_1 (a115))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ### ConjTree 1392
% 0.72/0.91 1394. ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a115))) (c0_1 (a115)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (ndr1_0) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) (-. (hskp18)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ### Or 800 1393
% 0.72/0.91 1395. ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (hskp16)) (c3_1 (a112)) (c0_1 (a112)) (-. (c1_1 (a112))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) (ndr1_0) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c0_1 (a115)) (-. (c2_1 (a115))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ### Or 1394 807
% 0.72/0.91 1396. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a115))) (c0_1 (a115)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (ndr1_0) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ### Or 1395 1355
% 0.72/0.91 1397. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c3_1 (a112)) (c0_1 (a112)) (-. (c1_1 (a112))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) (ndr1_0) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 1396
% 0.72/0.91 1398. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (ndr1_0) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) (-. (hskp12)) (-. (hskp11)) ((hskp14) \/ ((hskp12) \/ (hskp11))) ### Or 224 1397
% 0.72/0.91 1399. ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112)))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) (-. (hskp11)) (-. (hskp12)) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) (ndr1_0) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### ConjTree 1398
% 0.72/0.91 1400. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) (-. (hskp12)) (-. (hskp11)) ((hskp14) \/ ((hskp12) \/ (hskp11))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ### Or 1236 1399
% 0.72/0.91 1401. ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((hskp14) \/ ((hskp12) \/ (hskp11))) (-. (hskp11)) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### Or 1400 220
% 0.72/0.91 1402. ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a142)) (c1_1 (a142)) (c0_1 (a142)) (c3_1 (a106)) (c1_1 (a106)) (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) (-. (c2_1 (a106))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) ### DisjTree 504 239 529
% 0.72/0.91 1403. ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) (c0_1 (a142)) (c1_1 (a142)) (c3_1 (a142)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) (-. (hskp16)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c2_1 (a109)) (-. (c3_1 (a109))) (-. (c0_1 (a109))) (ndr1_0) ### DisjTree 175 442 1402
% 0.72/0.91 1404. ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142))))) (ndr1_0) (-. (c0_1 (a109))) (-. (c3_1 (a109))) (c2_1 (a109)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (hskp16)) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) (c3_1 (a112)) (c0_1 (a112)) (-. (c1_1 (a112))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ### ConjTree 1403
% 0.72/0.91 1405. ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (hskp16)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c2_1 (a109)) (-. (c3_1 (a109))) (-. (c0_1 (a109))) (ndr1_0) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) (-. (hskp18)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ### Or 800 1404
% 0.72/0.91 1406. ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) (ndr1_0) (-. (c0_1 (a109))) (-. (c3_1 (a109))) (c2_1 (a109)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (hskp16)) (c3_1 (a112)) (c0_1 (a112)) (-. (c1_1 (a112))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ### Or 1405 807
% 0.72/0.91 1407. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c2_1 (a115))) (c0_1 (a115)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c2_1 (a109)) (-. (c3_1 (a109))) (-. (c0_1 (a109))) (ndr1_0) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ### Or 1406 1355
% 0.72/0.91 1408. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) (ndr1_0) (-. (c0_1 (a109))) (-. (c3_1 (a109))) (c2_1 (a109)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c3_1 (a112)) (c0_1 (a112)) (-. (c1_1 (a112))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 1407
% 0.72/0.91 1409. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c3_1 (a112)) (c0_1 (a112)) (-. (c1_1 (a112))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c2_1 (a109)) (-. (c3_1 (a109))) (-. (c0_1 (a109))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### Or 1362 1408
% 0.72/0.91 1410. ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112)))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c0_1 (a109))) (-. (c3_1 (a109))) (c2_1 (a109)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### ConjTree 1409
% 0.72/0.91 1411. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c2_1 (a109)) (-. (c3_1 (a109))) (-. (c0_1 (a109))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ### Or 1236 1410
% 0.72/0.91 1412. ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109)))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### ConjTree 1411
% 0.72/0.91 1413. ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ### Or 1401 1412
% 0.72/0.91 1414. ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106)))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### ConjTree 1413
% 0.72/0.91 1415. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### Or 1391 1414
% 0.72/0.91 1416. ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) \/ ((hskp2) \/ (hskp3))) (-. (hskp3)) (-. (hskp2)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### Or 1415 1294
% 0.72/0.91 1417. ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102)))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (-. (hskp2)) (-. (hskp3)) ((All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) \/ ((hskp2) \/ (hskp3))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ### ConjTree 1416
% 0.72/0.91 1418. ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (-. (hskp2)) ((All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) \/ ((hskp2) \/ (hskp3))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ### Or 1383 1417
% 0.72/0.91 1419. ((ndr1_0) /\ ((c3_1 (a101)) /\ ((-. (c1_1 (a101))) /\ (-. (c2_1 (a101)))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) \/ ((hskp2) \/ (hskp3))) (-. (hskp2)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102))))))) ### ConjTree 1418
% 0.72/0.91 1420. ((-. (hskp5)) \/ ((ndr1_0) /\ ((c3_1 (a101)) /\ ((-. (c1_1 (a101))) /\ (-. (c2_1 (a101))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (hskp2)) ((All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) \/ ((hskp2) \/ (hskp3))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102))))))) ### Or 1338 1419
% 0.72/0.91 1421. ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp8)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (ndr1_0) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) (-. (c3_1 (a118))) (-. (c2_1 (a118))) (c1_1 (a118)) (-. (hskp10)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ### DisjTree 852 1246 62
% 0.72/0.91 1422. ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118)))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (-. (hskp10)) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (ndr1_0) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (-. (hskp8)) (c3_1 (a97)) (c2_1 (a97)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ### ConjTree 1421
% 0.72/0.91 1423. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (c2_1 (a97)) (c3_1 (a97)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) (-. (hskp10)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (hskp8)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ### Or 263 1422
% 0.72/0.91 1424. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp8)) (c3_1 (a112)) (c0_1 (a112)) (-. (c1_1 (a112))) (ndr1_0) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (-. (hskp10)) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (c3_1 (a97)) (c2_1 (a97)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 1423
% 0.72/0.91 1425. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c2_1 (a97)) (c3_1 (a97)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (-. (hskp8)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (ndr1_0) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ### Or 375 1424
% 0.72/0.91 1426. ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112)))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp8)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (c3_1 (a97)) (c2_1 (a97)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### ConjTree 1425
% 0.72/0.91 1427. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (-. (hskp8)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ### Or 1236 1426
% 0.72/0.91 1428. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp5)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp8)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### Or 1427 1280
% 0.72/0.91 1429. ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (c0_1 (a127)) (-. (c3_1 (a127))) (c2_1 (a127)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp16)) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (ndr1_0) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ### Or 20 956
% 0.72/0.91 1430. ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127)))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) (-. (hskp16)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### ConjTree 1429
% 0.72/0.91 1431. ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp16)) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp5)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ### Or 1251 1430
% 0.72/0.91 1432. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) (-. (hskp5)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ### Or 1431 1055
% 0.72/0.91 1433. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp5)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 1432
% 0.72/0.91 1434. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) (-. (hskp5)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) (ndr1_0) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ### Or 375 1433
% 0.72/0.91 1435. ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112)))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) (ndr1_0) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp5)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### ConjTree 1434
% 0.72/0.91 1436. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ### Or 1236 1435
% 0.72/0.91 1437. ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp5)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### Or 1436 861
% 0.72/0.91 1438. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### Or 1437 328
% 0.72/0.91 1439. ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104)))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp5)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### ConjTree 1438
% 0.72/0.91 1440. ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) (-. (hskp5)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### Or 1428 1439
% 0.72/0.91 1441. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) (-. (hskp9)) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (-. (hskp8)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ### Or 1236 1016
% 0.72/0.91 1442. (-. (c1_1 (a97))) (c1_1 (a97)) ### Axiom
% 0.72/0.91 1443. (c2_1 (a97)) (-. (c2_1 (a97))) ### Axiom
% 0.72/0.91 1444. ((ndr1_0) => ((c1_1 (a97)) \/ ((-. (c0_1 (a97))) \/ (-. (c2_1 (a97)))))) (c3_1 (a97)) (c2_1 (a97)) (All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) (-. (c1_1 (a97))) (ndr1_0) ### DisjTree 5 1442 1241 1443
% 0.72/0.91 1445. (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50)))))) (ndr1_0) (-. (c1_1 (a97))) (All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) (c2_1 (a97)) (c3_1 (a97)) ### All 1444
% 0.72/0.91 1446. ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c3_1 (a97)) (c2_1 (a97)) (All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) (-. (c1_1 (a97))) (c0_1 (a103)) (-. (c3_1 (a103))) (-. (c1_1 (a103))) (ndr1_0) ### Or 388 1445
% 0.72/0.91 1447. ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) (-. (c1_1 (a103))) (-. (c3_1 (a103))) (c0_1 (a103)) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (ndr1_0) (-. (c2_1 (a106))) (c3_1 (a106)) (c1_1 (a106)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ### DisjTree 277 1446 388
% 0.72/0.91 1448. ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106)))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (ndr1_0) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (c0_1 (a103)) (-. (c3_1 (a103))) (-. (c1_1 (a103))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ### ConjTree 1447
% 0.72/0.91 1449. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) (-. (c1_1 (a103))) (-. (c3_1 (a103))) (c0_1 (a103)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp8)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (-. (hskp9)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### Or 1441 1448
% 0.72/0.91 1450. ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (-. (hskp8)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c0_1 (a103)) (-. (c3_1 (a103))) (-. (c1_1 (a103))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### Or 1449 401
% 0.72/0.91 1451. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) (-. (c1_1 (a103))) (-. (c3_1 (a103))) (c0_1 (a103)) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### Or 1437 1448
% 0.72/0.91 1452. ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104)))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp5)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) (c0_1 (a103)) (-. (c3_1 (a103))) (-. (c1_1 (a103))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### ConjTree 1451
% 0.72/0.91 1453. ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) (-. (c1_1 (a103))) (-. (c3_1 (a103))) (c0_1 (a103)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ### Or 1450 1452
% 0.72/0.91 1454. ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103)))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp5)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ### ConjTree 1453
% 0.72/0.91 1455. ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp5)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ### Or 1440 1454
% 0.72/0.91 1456. ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (-. (hskp10)) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp14)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ### Or 1271 913
% 0.72/0.91 1457. ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (-. (hskp10)) (c2_1 (a102)) (c1_1 (a102)) (All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) (-. (c3_1 (a102))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (ndr1_0) ### DisjTree 847 441 19
% 0.72/0.91 1458. ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) (-. (hskp26)) (ndr1_0) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) (-. (hskp10)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ### DisjTree 1457 93 67
% 0.72/0.91 1459. ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (c2_1 (a94)) (c1_1 (a94)) (c0_1 (a94)) (c3_1 (a133)) (c0_1 (a133)) (-. (c2_1 (a133))) (ndr1_0) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) (-. (hskp10)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ### DisjTree 1457 39 113
% 0.72/0.91 1460. ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (-. (hskp10)) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (ndr1_0) (-. (c2_1 (a133))) (c0_1 (a133)) (c3_1 (a133)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ### ConjTree 1459
% 0.72/0.91 1461. ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (c3_1 (a133)) (c0_1 (a133)) (-. (c2_1 (a133))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (-. (hskp10)) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (ndr1_0) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ### Or 1458 1460
% 0.72/0.91 1462. ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) (ndr1_0) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) (-. (hskp10)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ### ConjTree 1461
% 0.72/0.91 1463. ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (ndr1_0) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ### Or 20 1462
% 0.72/0.91 1464. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (ndr1_0) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### ConjTree 1463
% 0.72/0.91 1465. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) (-. (hskp10)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ### Or 1456 1464
% 0.72/0.92 1466. ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (-. (hskp10)) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### Or 1465 861
% 0.72/0.92 1467. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (hskp5)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### Or 1466 1317
% 0.72/0.92 1468. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) (-. (c1_1 (a103))) (-. (c3_1 (a103))) (c0_1 (a103)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### Or 1466 1448
% 0.72/0.92 1469. ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103)))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### ConjTree 1468
% 0.75/0.92 1470. ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (hskp5)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### Or 1467 1469
% 0.75/0.92 1471. ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102)))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (hskp5)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ### ConjTree 1470
% 0.75/0.92 1472. ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102))))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) (-. (hskp5)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ### Or 1455 1471
% 0.75/0.92 1473. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp8)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### Or 1427 1368
% 0.75/0.92 1474. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) (-. (hskp10)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ### Or 1456 1057
% 0.75/0.92 1475. ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (-. (hskp10)) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### Or 1474 861
% 0.75/0.92 1476. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### Or 1475 328
% 0.75/0.92 1477. ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104)))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### ConjTree 1476
% 0.75/0.92 1478. ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### Or 1473 1477
% 0.75/0.92 1479. ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c1_1 (a106)) (c3_1 (a106)) (All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) (-. (c2_1 (a106))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) ### DisjTree 504 272 276
% 0.75/0.92 1480. ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) (-. (c1_1 (a103))) (-. (c3_1 (a103))) (c0_1 (a103)) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (ndr1_0) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a106))) (c3_1 (a106)) (c1_1 (a106)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ### DisjTree 1479 1446 388
% 0.75/0.92 1481. ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (c0_1 (a103)) (-. (c3_1 (a103))) (-. (c1_1 (a103))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ### ConjTree 1480
% 0.75/0.92 1482. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) (-. (c1_1 (a103))) (-. (c3_1 (a103))) (c0_1 (a103)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### Or 1475 1481
% 0.75/0.92 1483. ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104)))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c0_1 (a103)) (-. (c3_1 (a103))) (-. (c1_1 (a103))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### ConjTree 1482
% 0.75/0.92 1484. ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) (-. (c1_1 (a103))) (-. (c3_1 (a103))) (c0_1 (a103)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ### Or 1450 1483
% 0.75/0.92 1485. ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103)))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ### ConjTree 1484
% 0.75/0.92 1486. ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ### Or 1478 1485
% 0.75/0.92 1487. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### Or 1466 1414
% 0.75/0.92 1488. ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (-. (hskp10)) (c1_1 (a102)) (All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) (-. (c3_1 (a102))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (ndr1_0) ### DisjTree 847 1304 19
% 0.75/0.92 1489. ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) (-. (hskp9)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) (-. (c3_1 (a102))) (c1_1 (a102)) (-. (hskp10)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ### DisjTree 1488 10 168
% 0.75/0.92 1490. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (-. (hskp10)) (c1_1 (a102)) (-. (c3_1 (a102))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (ndr1_0) (-. (hskp9)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ### ConjTree 1489
% 0.75/0.92 1491. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) (-. (hskp9)) (-. (c3_1 (a102))) (c1_1 (a102)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) (-. (hskp10)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ### Or 1456 1490
% 0.75/0.92 1492. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) (-. (c1_1 (a103))) (-. (c3_1 (a103))) (c0_1 (a103)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (c1_1 (a102)) (-. (c3_1 (a102))) (-. (hskp9)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### Or 1491 1481
% 0.75/0.92 1493. ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) (-. (c3_1 (a102))) (c1_1 (a102)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c0_1 (a103)) (-. (c3_1 (a103))) (-. (c1_1 (a103))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### Or 1492 401
% 0.75/0.92 1494. ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103)))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (c1_1 (a102)) (-. (c3_1 (a102))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ### ConjTree 1493
% 0.75/0.92 1495. ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### Or 1487 1494
% 0.75/0.92 1496. ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102)))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ### ConjTree 1495
% 0.75/0.92 1497. ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102))))))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ### Or 1486 1496
% 0.75/0.92 1498. ((ndr1_0) /\ ((c3_1 (a101)) /\ ((-. (c1_1 (a101))) /\ (-. (c2_1 (a101)))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102))))))) ### ConjTree 1497
% 0.75/0.92 1499. ((-. (hskp5)) \/ ((ndr1_0) /\ ((c3_1 (a101)) /\ ((-. (c1_1 (a101))) /\ (-. (c2_1 (a101))))))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102))))))) ### Or 1472 1498
% 0.75/0.92 1500. ((ndr1_0) /\ ((c2_1 (a99)) /\ ((-. (c1_1 (a99))) /\ (-. (c3_1 (a99)))))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102))))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((-. (hskp5)) \/ ((ndr1_0) /\ ((c3_1 (a101)) /\ ((-. (c1_1 (a101))) /\ (-. (c2_1 (a101))))))) ### ConjTree 1499
% 0.75/0.92 1501. ((-. (hskp3)) \/ ((ndr1_0) /\ ((c2_1 (a99)) /\ ((-. (c1_1 (a99))) /\ (-. (c3_1 (a99))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) \/ ((hskp2) \/ (hskp3))) (-. (hskp2)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp5)) \/ ((ndr1_0) /\ ((c3_1 (a101)) /\ ((-. (c1_1 (a101))) /\ (-. (c2_1 (a101))))))) ### Or 1420 1500
% 0.75/0.92 1502. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) (-. (hskp9)) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (ndr1_0) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ### Or 375 1145
% 0.75/0.92 1503. ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112)))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) (ndr1_0) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) (-. (hskp9)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### ConjTree 1502
% 0.75/0.92 1504. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) (-. (hskp9)) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ### Or 1236 1503
% 0.75/0.92 1505. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) (-. (hskp8)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp5)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) (-. (hskp9)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### Or 1504 1280
% 0.75/0.92 1506. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a105)) (c0_1 (a105)) (-. (c1_1 (a105))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (c1_1 (a97))) (-. (hskp5)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp8)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (ndr1_0) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ### Or 1250 1327
% 0.75/0.92 1507. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) (-. (hskp6)) ((hskp23) \/ ((hskp24) \/ (hskp16))) (ndr1_0) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (-. (hskp8)) (c3_1 (a97)) (c2_1 (a97)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) (-. (hskp5)) (-. (c1_1 (a97))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (c1_1 (a105))) (c0_1 (a105)) (c2_1 (a105)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 1506
% 0.75/0.92 1508. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a105)) (c0_1 (a105)) (-. (c1_1 (a105))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (c1_1 (a97))) (-. (hskp5)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp8)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) (ndr1_0) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ### Or 375 1507
% 0.75/0.92 1509. ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112)))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) (ndr1_0) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) (-. (hskp6)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (-. (hskp8)) (c3_1 (a97)) (c2_1 (a97)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) (-. (hskp5)) (-. (c1_1 (a97))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (c1_1 (a105))) (c0_1 (a105)) (c2_1 (a105)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### ConjTree 1508
% 0.75/0.92 1510. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c2_1 (a105)) (c0_1 (a105)) (-. (c1_1 (a105))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (hskp5)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (hskp8)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ### Or 1236 1509
% 0.75/0.92 1511. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) (-. (hskp6)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (-. (hskp8)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) (-. (hskp5)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (c1_1 (a105))) (c0_1 (a105)) (c2_1 (a105)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### Or 1510 1280
% 0.75/0.92 1512. ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105)))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (hskp5)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (hskp8)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### ConjTree 1511
% 0.75/0.92 1513. ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) (-. (hskp6)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) (-. (hskp5)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (hskp8)) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### Or 1505 1512
% 0.75/0.92 1514. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) (-. (hskp9)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### Or 1504 328
% 0.75/0.92 1515. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (c2_1 (a105)) (c0_1 (a105)) (-. (c1_1 (a105))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) (-. (hskp5)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ### Or 1431 1327
% 0.75/0.93 1516. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp5)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (c1_1 (a105))) (c0_1 (a105)) (c2_1 (a105)) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 1515
% 0.75/0.93 1517. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (c2_1 (a105)) (c0_1 (a105)) (-. (c1_1 (a105))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) (-. (hskp5)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) (ndr1_0) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ### Or 375 1516
% 0.75/0.93 1518. ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112)))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) (ndr1_0) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp5)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (c1_1 (a105))) (c0_1 (a105)) (c2_1 (a105)) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### ConjTree 1517
% 0.75/0.93 1519. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (c2_1 (a105)) (c0_1 (a105)) (-. (c1_1 (a105))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ### Or 1236 1518
% 0.75/0.93 1520. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (c2_1 (a109)) (-. (c3_1 (a109))) (-. (c0_1 (a109))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (ndr1_0) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ### Or 375 1119
% 0.75/0.93 1521. ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112)))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) (ndr1_0) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (c0_1 (a109))) (-. (c3_1 (a109))) (c2_1 (a109)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### ConjTree 1520
% 0.75/0.93 1522. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (c2_1 (a109)) (-. (c3_1 (a109))) (-. (c0_1 (a109))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ### Or 1236 1521
% 0.75/0.93 1523. ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109)))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### ConjTree 1522
% 0.75/0.93 1524. ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp5)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (c1_1 (a105))) (c0_1 (a105)) (c2_1 (a105)) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### Or 1519 1523
% 0.75/0.93 1525. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (c2_1 (a105)) (c0_1 (a105)) (-. (c1_1 (a105))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### Or 1524 328
% 0.75/0.93 1526. ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105)))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp5)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### ConjTree 1525
% 0.75/0.93 1527. ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### Or 1514 1526
% 0.75/0.93 1528. ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104)))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp5)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ### ConjTree 1527
% 0.75/0.93 1529. ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp5)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ### Or 1513 1528
% 0.75/0.93 1530. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) (-. (c1_1 (a103))) (-. (c3_1 (a103))) (c0_1 (a103)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) (-. (hskp9)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### Or 1504 1448
% 0.75/0.93 1531. ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c0_1 (a103)) (-. (c3_1 (a103))) (-. (c1_1 (a103))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### Or 1530 401
% 0.75/0.93 1532. ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103)))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ### ConjTree 1531
% 0.75/0.93 1533. ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) (-. (hskp6)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) (-. (hskp5)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ### Or 1529 1532
% 0.75/0.93 1534. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### Or 485 423
% 0.75/0.93 1535. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) (c3_1 (a112)) (c0_1 (a112)) (-. (c1_1 (a112))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (ndr1_0) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp5)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 1534
% 0.75/0.93 1536. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (ndr1_0) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ### Or 375 1535
% 0.75/0.93 1537. ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112)))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) (ndr1_0) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp5)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### ConjTree 1536
% 0.75/0.93 1538. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ### Or 1236 1537
% 0.75/0.93 1539. ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp5)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### Or 1538 1523
% 0.75/0.93 1540. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### Or 1539 1317
% 0.75/0.93 1541. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) (-. (hskp9)) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c3_1 (a112)) (c0_1 (a112)) (-. (c1_1 (a112))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) (-. (hskp5)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### Or 1312 1145
% 0.75/0.93 1542. ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112)))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (hskp5)) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) (-. (hskp9)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### ConjTree 1541
% 0.75/0.93 1543. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) (-. (hskp9)) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) (-. (hskp5)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ### Or 1236 1542
% 0.75/0.93 1544. ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c0_1 (a103)) (-. (c3_1 (a103))) (-. (c1_1 (a103))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (hskp5)) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### Or 1543 401
% 0.75/0.93 1545. ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103)))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) (-. (hskp5)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ### ConjTree 1544
% 0.75/0.93 1546. ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp5)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### Or 1540 1545
% 0.75/0.93 1547. ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102)))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ### ConjTree 1546
% 0.75/0.93 1548. ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102))))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp5)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ### Or 1533 1547
% 0.75/0.93 1549. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) (-. (c0_1 (a116))) (c3_1 (a116)) (c1_1 (a116)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp8)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (ndr1_0) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ### Or 1250 1169
% 0.75/0.93 1550. ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) (-. (hskp6)) ((hskp23) \/ ((hskp24) \/ (hskp16))) (ndr1_0) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (-. (hskp8)) (c3_1 (a97)) (c2_1 (a97)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 1549
% 0.75/0.93 1551. ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp8)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### Or 1080 1550
% 0.75/0.93 1552. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (ndr1_0) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) (-. (hskp6)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (-. (hskp8)) (c3_1 (a97)) (c2_1 (a97)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ### ConjTree 1551
% 0.75/0.93 1553. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp8)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (ndr1_0) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ### Or 375 1552
% 0.75/0.93 1554. ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112)))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) (ndr1_0) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) (-. (hskp6)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (-. (hskp8)) (c3_1 (a97)) (c2_1 (a97)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### ConjTree 1553
% 0.75/0.93 1555. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (hskp8)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ### Or 1236 1554
% 0.75/0.93 1556. ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) (-. (hskp6)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (-. (hskp8)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### Or 1555 1523
% 0.75/0.93 1557. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp8)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (ndr1_0) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ### Or 1250 1183
% 0.75/0.93 1558. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) (-. (hskp6)) ((hskp23) \/ ((hskp24) \/ (hskp16))) (ndr1_0) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (-. (hskp8)) (c3_1 (a97)) (c2_1 (a97)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 1557
% 0.75/0.93 1559. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp8)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (ndr1_0) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) (-. (hskp12)) (-. (hskp11)) ((hskp14) \/ ((hskp12) \/ (hskp11))) ### Or 224 1558
% 0.75/0.93 1560. ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) (-. (hskp11)) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) (-. (hskp6)) ((hskp23) \/ ((hskp24) \/ (hskp16))) (ndr1_0) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (-. (hskp8)) (c3_1 (a97)) (c2_1 (a97)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### Or 1559 220
% 0.75/0.93 1561. ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) (-. (c0_1 (a109))) (-. (c3_1 (a109))) (c2_1 (a109)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (ndr1_0) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ### DisjTree 1218 674 686
% 0.75/0.93 1562. ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109)))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) (c3_1 (a101)) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (ndr1_0) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ### ConjTree 1561
% 0.75/0.93 1563. ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp8)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (ndr1_0) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ### Or 1560 1562
% 0.75/0.93 1564. ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106)))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) (-. (hskp6)) ((hskp23) \/ ((hskp24) \/ (hskp16))) (ndr1_0) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (-. (hskp8)) (c3_1 (a97)) (c2_1 (a97)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### ConjTree 1563
% 0.75/0.93 1565. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (hskp8)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### Or 1556 1564
% 0.75/0.93 1566. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) (-. (c0_1 (a116))) (c3_1 (a116)) (c1_1 (a116)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### Or 769 1169
% 0.75/0.93 1567. ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (ndr1_0) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 1566
% 0.75/0.93 1568. ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### Or 1080 1567
% 0.75/0.93 1569. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (ndr1_0) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ### ConjTree 1568
% 0.75/0.93 1570. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (ndr1_0) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ### Or 375 1569
% 0.75/0.93 1571. ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112)))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) (ndr1_0) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### ConjTree 1570
% 0.75/0.94 1572. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ### Or 1236 1571
% 0.75/0.94 1573. ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### Or 1572 1523
% 0.75/0.94 1574. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### Or 1573 328
% 0.75/0.94 1575. ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104)))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### ConjTree 1574
% 0.75/0.94 1576. ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) (-. (hskp6)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### Or 1565 1575
% 0.75/0.94 1577. ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ### Or 1576 1532
% 0.75/0.94 1578. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) (-. (c0_1 (a116))) (c3_1 (a116)) (c1_1 (a116)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### Or 485 1169
% 0.75/0.94 1579. ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) (c3_1 (a112)) (c0_1 (a112)) (-. (c1_1 (a112))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (ndr1_0) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 1578
% 0.75/0.94 1580. ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### Or 1080 1579
% 0.75/0.94 1581. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (ndr1_0) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) (c3_1 (a112)) (c0_1 (a112)) (-. (c1_1 (a112))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ### ConjTree 1580
% 0.75/0.94 1582. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (ndr1_0) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ### Or 375 1581
% 0.75/0.94 1583. ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112)))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) (ndr1_0) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### ConjTree 1582
% 0.75/0.94 1584. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ### Or 1236 1583
% 0.75/0.94 1585. ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### Or 1584 1523
% 0.75/0.94 1586. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a115))) (c0_1 (a115)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (ndr1_0) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ### Or 1395 1183
% 0.75/0.94 1587. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c3_1 (a112)) (c0_1 (a112)) (-. (c1_1 (a112))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) (ndr1_0) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 1586
% 0.75/0.94 1588. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (ndr1_0) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) (-. (hskp12)) (-. (hskp11)) ((hskp14) \/ ((hskp12) \/ (hskp11))) ### Or 224 1587
% 0.75/0.94 1589. ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112)))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) (-. (hskp11)) (-. (hskp12)) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) (ndr1_0) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### ConjTree 1588
% 0.75/0.94 1590. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) (-. (hskp12)) (-. (hskp11)) ((hskp14) \/ ((hskp12) \/ (hskp11))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ### Or 1236 1589
% 0.75/0.94 1591. ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((hskp14) \/ ((hskp12) \/ (hskp11))) (-. (hskp11)) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### Or 1590 699
% 0.75/0.94 1592. ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ### Or 1591 1562
% 0.75/0.94 1593. ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106)))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### ConjTree 1592
% 0.75/0.94 1594. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### Or 1585 1593
% 0.75/0.94 1595. ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### Or 1594 1532
% 0.75/0.94 1596. ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102)))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ### ConjTree 1595
% 0.75/0.94 1597. ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ### Or 1577 1596
% 0.75/0.94 1598. ((ndr1_0) /\ ((c3_1 (a101)) /\ ((-. (c1_1 (a101))) /\ (-. (c2_1 (a101)))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102))))))) ### ConjTree 1597
% 0.75/0.94 1599. ((-. (hskp5)) \/ ((ndr1_0) /\ ((c3_1 (a101)) /\ ((-. (c1_1 (a101))) /\ (-. (c2_1 (a101))))))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102))))))) ### Or 1548 1598
% 0.75/0.94 1600. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) (-. (hskp5)) (-. (hskp12)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) (-. (hskp10)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ### Or 1456 198
% 0.75/0.94 1601. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp8)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### Or 1093 1422
% 0.75/0.94 1602. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (c0_1 (a110))) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (ndr1_0) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (-. (hskp8)) (c3_1 (a97)) (c2_1 (a97)) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 1601
% 0.75/0.94 1603. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (-. (hskp8)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) (-. (hskp10)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ### Or 1456 1602
% 0.75/0.94 1604. ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110)))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (-. (hskp10)) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (-. (hskp8)) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### ConjTree 1603
% 0.75/0.94 1605. ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (-. (hskp8)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (-. (hskp10)) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### Or 1600 1604
% 0.75/0.94 1606. ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) (-. (hskp5)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) (-. (hskp10)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (-. (hskp8)) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ### Or 1605 861
% 0.75/0.94 1607. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (-. (hskp8)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### Or 1606 1280
% 0.75/0.94 1608. ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (c3_1 (a133)) (c0_1 (a133)) (-. (c2_1 (a133))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp16)) (ndr1_0) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ### Or 405 1090
% 0.75/0.94 1609. ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) (ndr1_0) (-. (hskp16)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) (-. (c0_1 (a110))) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ### ConjTree 1608
% 0.75/0.94 1610. ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp16)) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (ndr1_0) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ### Or 20 1609
% 0.75/0.94 1611. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) (-. (c0_1 (a110))) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### Or 1610 1055
% 0.75/0.94 1612. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (ndr1_0) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 1611
% 0.75/0.94 1613. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) (-. (c0_1 (a110))) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) (-. (hskp10)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ### Or 1456 1612
% 0.75/0.94 1614. ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110)))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (-. (hskp10)) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### ConjTree 1613
% 0.75/0.94 1615. ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (-. (hskp10)) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### Or 1600 1614
% 0.75/0.94 1616. ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) (-. (hskp5)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) (-. (hskp10)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ### Or 1615 861
% 0.75/0.94 1617. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### Or 1616 328
% 0.75/0.94 1618. ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104)))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) (-. (hskp5)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### ConjTree 1617
% 0.75/0.94 1619. ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) (-. (hskp5)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### Or 1607 1618
% 0.75/0.94 1620. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) (-. (hskp9)) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) (-. (hskp10)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ### Or 1456 1145
% 0.75/0.94 1621. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) (-. (c1_1 (a103))) (-. (c3_1 (a103))) (c0_1 (a103)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) (-. (hskp9)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### Or 1620 1448
% 0.75/0.94 1622. ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c0_1 (a103)) (-. (c3_1 (a103))) (-. (c1_1 (a103))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### Or 1621 401
% 0.75/0.95 1623. ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103)))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ### ConjTree 1622
% 0.75/0.95 1624. ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ### Or 1619 1623
% 0.75/0.95 1625. ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (hskp5)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### Or 1467 1545
% 0.75/0.95 1626. ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102)))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (hskp5)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ### ConjTree 1625
% 0.75/0.95 1627. ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102))))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) (-. (hskp5)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ### Or 1624 1626
% 0.75/0.95 1628. ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp8)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (ndr1_0) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a152))) (c0_1 (a152)) (c1_1 (a152)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (c2_1 (a133))) (c0_1 (a133)) (c3_1 (a133)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ### Or 604 1248
% 0.75/0.95 1629. ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152)))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (c3_1 (a133)) (c0_1 (a133)) (-. (c2_1 (a133))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (-. (hskp8)) (c3_1 (a97)) (c2_1 (a97)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ### ConjTree 1628
% 0.75/0.95 1630. ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (c2_1 (a133))) (c0_1 (a133)) (c3_1 (a133)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp16)) (ndr1_0) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (-. (hskp8)) (c3_1 (a97)) (c2_1 (a97)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ### Or 1249 1629
% 0.75/0.95 1631. ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp8)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (ndr1_0) (-. (hskp16)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ### ConjTree 1630
% 0.75/0.95 1632. ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp16)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (-. (hskp8)) (c3_1 (a97)) (c2_1 (a97)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (ndr1_0) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ### Or 20 1631
% 0.75/0.95 1633. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp8)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### Or 1632 1422
% 0.75/0.95 1634. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (-. (hskp8)) (c3_1 (a97)) (c2_1 (a97)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (ndr1_0) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 1633
% 0.75/0.95 1635. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (hskp8)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) (-. (hskp10)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ### Or 1456 1634
% 0.75/0.95 1636. ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (-. (hskp10)) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (-. (hskp8)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### Or 1635 861
% 0.75/0.95 1637. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (hskp8)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### Or 1636 1220
% 0.75/0.95 1638. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### Or 1475 1220
% 0.75/0.95 1639. ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104)))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### ConjTree 1638
% 0.75/0.95 1640. ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### Or 1637 1639
% 0.75/0.95 1641. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) (-. (c1_1 (a103))) (-. (c3_1 (a103))) (c0_1 (a103)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) (-. (hskp9)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### Or 1620 1481
% 0.75/0.95 1642. ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (c0_1 (a103)) (-. (c3_1 (a103))) (-. (c1_1 (a103))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### Or 1641 401
% 0.75/0.95 1643. ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103)))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ### ConjTree 1642
% 0.75/0.95 1644. ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ### Or 1640 1643
% 0.75/0.95 1645. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (c3_1 (a101)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### Or 1466 1220
% 0.75/0.95 1646. ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102)))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c3_1 (a101)) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### ConjTree 1645
% 0.75/0.95 1647. ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102))))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ### Or 1644 1646
% 0.75/0.95 1648. ((ndr1_0) /\ ((c3_1 (a101)) /\ ((-. (c1_1 (a101))) /\ (-. (c2_1 (a101)))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102))))))) ### ConjTree 1647
% 0.75/0.95 1649. ((-. (hskp5)) \/ ((ndr1_0) /\ ((c3_1 (a101)) /\ ((-. (c1_1 (a101))) /\ (-. (c2_1 (a101))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102))))))) ### Or 1627 1648
% 0.75/0.95 1650. ((ndr1_0) /\ ((c2_1 (a99)) /\ ((-. (c1_1 (a99))) /\ (-. (c3_1 (a99)))))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102))))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((-. (hskp5)) \/ ((ndr1_0) /\ ((c3_1 (a101)) /\ ((-. (c1_1 (a101))) /\ (-. (c2_1 (a101))))))) ### ConjTree 1649
% 0.75/0.95 1651. ((-. (hskp3)) \/ ((ndr1_0) /\ ((c2_1 (a99)) /\ ((-. (c1_1 (a99))) /\ (-. (c3_1 (a99))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102))))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((-. (hskp5)) \/ ((ndr1_0) /\ ((c3_1 (a101)) /\ ((-. (c1_1 (a101))) /\ (-. (c2_1 (a101))))))) ### Or 1599 1650
% 0.75/0.95 1652. ((ndr1_0) /\ ((c1_1 (a98)) /\ ((-. (c0_1 (a98))) /\ (-. (c3_1 (a98)))))) ((-. (hskp5)) \/ ((ndr1_0) /\ ((c3_1 (a101)) /\ ((-. (c1_1 (a101))) /\ (-. (c2_1 (a101))))))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp3)) \/ ((ndr1_0) /\ ((c2_1 (a99)) /\ ((-. (c1_1 (a99))) /\ (-. (c3_1 (a99))))))) ### ConjTree 1651
% 0.75/0.95 1653. ((-. (hskp2)) \/ ((ndr1_0) /\ ((c1_1 (a98)) /\ ((-. (c0_1 (a98))) /\ (-. (c3_1 (a98))))))) ((-. (hskp5)) \/ ((ndr1_0) /\ ((c3_1 (a101)) /\ ((-. (c1_1 (a101))) /\ (-. (c2_1 (a101))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) (-. (hskp0)) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) \/ ((hskp2) \/ (hskp3))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((-. (hskp3)) \/ ((ndr1_0) /\ ((c2_1 (a99)) /\ ((-. (c1_1 (a99))) /\ (-. (c3_1 (a99))))))) ### Or 1501 1652
% 0.75/0.95 1654. ((ndr1_0) /\ ((c2_1 (a97)) /\ ((c3_1 (a97)) /\ (-. (c1_1 (a97)))))) ((-. (hskp3)) \/ ((ndr1_0) /\ ((c2_1 (a99)) /\ ((-. (c1_1 (a99))) /\ (-. (c3_1 (a99))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) \/ ((hskp2) \/ (hskp3))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) (-. (hskp0)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp5)) \/ ((ndr1_0) /\ ((c3_1 (a101)) /\ ((-. (c1_1 (a101))) /\ (-. (c2_1 (a101))))))) ((-. (hskp2)) \/ ((ndr1_0) /\ ((c1_1 (a98)) /\ ((-. (c0_1 (a98))) /\ (-. (c3_1 (a98))))))) ### ConjTree 1653
% 0.75/0.95 1655. ((-. (hskp1)) \/ ((ndr1_0) /\ ((c2_1 (a97)) /\ ((c3_1 (a97)) /\ (-. (c1_1 (a97))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) \/ ((hskp2) \/ (hskp3))) ((-. (hskp3)) \/ ((ndr1_0) /\ ((c2_1 (a99)) /\ ((-. (c1_1 (a99))) /\ (-. (c3_1 (a99))))))) ((hskp14) \/ ((hskp16) \/ (hskp21))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c3_1 (a145)) /\ ((-. (c0_1 (a145))) /\ (-. (c2_1 (a145))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) (-. (hskp0)) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((hskp14) \/ ((hskp1) \/ (hskp3))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((hskp9) \/ ((hskp14) \/ (hskp2))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((-. (hskp5)) \/ ((ndr1_0) /\ ((c3_1 (a101)) /\ ((-. (c1_1 (a101))) /\ (-. (c2_1 (a101))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (-. (c2_1 X1)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp2)) \/ ((ndr1_0) /\ ((c1_1 (a98)) /\ ((-. (c0_1 (a98))) /\ (-. (c3_1 (a98))))))) ### Or 1230 1654
% 0.75/0.95 1656. (-. (c1_1 (a96))) (c1_1 (a96)) ### Axiom
% 0.75/0.95 1657. (-. (c2_1 (a96))) (c2_1 (a96)) ### Axiom
% 0.75/0.95 1658. (-. (c3_1 (a96))) (c3_1 (a96)) ### Axiom
% 0.75/0.95 1659. ((ndr1_0) => ((c1_1 (a96)) \/ ((c2_1 (a96)) \/ (c3_1 (a96))))) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) (ndr1_0) ### DisjTree 5 1656 1657 1658
% 0.75/0.95 1660. (All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) (ndr1_0) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) ### All 1659
% 0.75/0.95 1661. ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (hskp1)) (-. (hskp1)) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) (ndr1_0) ### Or 1660 2
% 0.75/0.95 1662. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) \/ ((hskp2) \/ (hskp3))) (-. (hskp3)) (-. (hskp2)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) (-. (hskp5)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ### Or 1431 1265
% 0.75/0.95 1663. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp5)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (hskp2)) (-. (hskp3)) ((All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) \/ ((hskp2) \/ (hskp3))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 1662
% 0.75/0.95 1664. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) \/ ((hskp2) \/ (hskp3))) (-. (hskp3)) (-. (hskp2)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) (-. (hskp5)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) (ndr1_0) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ### Or 375 1663
% 0.75/0.95 1665. ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112)))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) (ndr1_0) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp5)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (hskp2)) (-. (hskp3)) ((All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) \/ ((hskp2) \/ (hskp3))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### ConjTree 1664
% 0.75/0.95 1666. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) \/ ((hskp2) \/ (hskp3))) (-. (hskp3)) (-. (hskp2)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ### Or 1236 1665
% 0.75/0.95 1667. ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) (c1_1 (a118)) (-. (c3_1 (a118))) (-. (c2_1 (a118))) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) (c2_1 (a109)) (-. (c3_1 (a109))) (-. (c0_1 (a109))) (ndr1_0) ### DisjTree 175 1660 286
% 0.75/0.95 1668. ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118)))))) (ndr1_0) (-. (c0_1 (a109))) (-. (c3_1 (a109))) (c2_1 (a109)) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) ### ConjTree 1667
% 0.75/0.95 1669. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) (c2_1 (a109)) (-. (c3_1 (a109))) (-. (c0_1 (a109))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) (ndr1_0) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ### Or 408 1668
% 0.75/0.95 1670. ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) ((hskp23) \/ ((hskp24) \/ (hskp16))) (ndr1_0) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 1669
% 0.75/0.95 1671. ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp5)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (hskp2)) (-. (hskp3)) ((All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) \/ ((hskp2) \/ (hskp3))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### Or 1666 1670
% 0.75/0.95 1672. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) \/ ((hskp2) \/ (hskp3))) (-. (hskp3)) (-. (hskp2)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### Or 1671 328
% 0.75/0.95 1673. ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104)))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp5)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (hskp2)) (-. (hskp3)) ((All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) \/ ((hskp2) \/ (hskp3))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### ConjTree 1672
% 0.75/0.95 1674. ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) \/ ((hskp2) \/ (hskp3))) (-. (hskp2)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (-. (hskp5)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### Or 1281 1673
% 0.75/0.95 1675. ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) (-. (hskp6)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) (-. (hskp5)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (hskp2)) ((All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) \/ ((hskp2) \/ (hskp3))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ### Or 1674 1294
% 0.75/0.96 1676. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) (c2_1 (a109)) (-. (c3_1 (a109))) (-. (c0_1 (a109))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) (-. (hskp5)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) (c3_1 (a112)) (c0_1 (a112)) (-. (c1_1 (a112))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ### Or 1323 1668
% 0.75/0.96 1677. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp5)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) (-. (c0_1 (a109))) (-. (c3_1 (a109))) (c2_1 (a109)) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 1676
% 0.75/0.96 1678. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) (c2_1 (a109)) (-. (c3_1 (a109))) (-. (c0_1 (a109))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) (-. (hskp5)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) (ndr1_0) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ### Or 375 1677
% 0.75/0.96 1679. ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112)))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) (ndr1_0) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp5)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) (-. (c0_1 (a109))) (-. (c3_1 (a109))) (c2_1 (a109)) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### ConjTree 1678
% 0.75/0.96 1680. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) (c2_1 (a109)) (-. (c3_1 (a109))) (-. (c0_1 (a109))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ### Or 1236 1679
% 0.75/0.96 1681. ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109)))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp5)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### ConjTree 1680
% 0.75/0.96 1682. ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp5)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### Or 1538 1681
% 0.75/0.96 1683. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### Or 1682 1317
% 0.75/0.96 1684. ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) \/ ((hskp2) \/ (hskp3))) (-. (hskp3)) (-. (hskp2)) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp5)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### Or 1683 1294
% 0.75/0.96 1685. ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102)))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) (-. (hskp2)) (-. (hskp3)) ((All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) \/ ((hskp2) \/ (hskp3))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ### ConjTree 1684
% 0.75/0.96 1686. ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102))))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) \/ ((hskp2) \/ (hskp3))) (-. (hskp2)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (-. (hskp5)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ### Or 1675 1685
% 0.75/0.96 1687. ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (hskp3)) (c3_1 (a97)) (c2_1 (a97)) (All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) (ndr1_0) ### DisjTree 1660 1245 3
% 0.75/0.96 1688. ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp3)) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c1_1 (a165)) (c3_1 (a165)) (c2_1 (a165)) (ndr1_0) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a118))) (c1_1 (a118)) (c0_1 (a133)) (-. (c2_1 (a133))) (c3_1 (a133)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp26)) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ### DisjTree 571 1687 62
% 0.75/0.96 1689. ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) (-. (hskp26)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a133)) (-. (c2_1 (a133))) (c0_1 (a133)) (c1_1 (a118)) (-. (c2_1 (a118))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (hskp3)) (c3_1 (a97)) (c2_1 (a97)) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ### ConjTree 1688
% 0.75/0.96 1690. ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp3)) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (ndr1_0) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a118))) (c1_1 (a118)) (c0_1 (a133)) (-. (c2_1 (a133))) (c3_1 (a133)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp26)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp24)) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ### Or 68 1689
% 0.75/0.96 1691. ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp3)) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c1_1 (a165)) (c3_1 (a165)) (c2_1 (a165)) (ndr1_0) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a118))) (c1_1 (a118)) (c0_1 (a133)) (-. (c2_1 (a133))) (c3_1 (a133)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c0_1 (a94)) (c1_1 (a94)) (c2_1 (a94)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ### DisjTree 577 1687 62
% 0.75/0.96 1692. ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (c2_1 (a94)) (c1_1 (a94)) (c0_1 (a94)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a133)) (-. (c2_1 (a133))) (c0_1 (a133)) (c1_1 (a118)) (-. (c2_1 (a118))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (hskp3)) (c3_1 (a97)) (c2_1 (a97)) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ### ConjTree 1691
% 0.75/0.96 1693. ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp3)) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (ndr1_0) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a118))) (c1_1 (a118)) (c0_1 (a133)) (-. (c2_1 (a133))) (c3_1 (a133)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c0_1 (a94)) (c1_1 (a94)) (c2_1 (a94)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (-. (hskp24)) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ### Or 68 1692
% 0.75/0.96 1694. ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) (-. (hskp24)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a133)) (-. (c2_1 (a133))) (c0_1 (a133)) (c1_1 (a118)) (-. (c2_1 (a118))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (hskp3)) (c3_1 (a97)) (c2_1 (a97)) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ### ConjTree 1693
% 0.75/0.96 1695. ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) (-. (hskp24)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a133)) (-. (c2_1 (a133))) (c0_1 (a133)) (c1_1 (a118)) (-. (c2_1 (a118))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (hskp3)) (c3_1 (a97)) (c2_1 (a97)) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ### Or 1690 1694
% 0.75/0.96 1696. ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp3)) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (c1_1 (a153)) (-. (c2_1 (a153))) (-. (c0_1 (a153))) (ndr1_0) ### DisjTree 56 1687 62
% 0.75/0.96 1697. ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153)))))) (ndr1_0) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (hskp3)) (c3_1 (a97)) (c2_1 (a97)) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ### ConjTree 1696
% 0.75/0.96 1698. ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp3)) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (ndr1_0) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a118))) (c1_1 (a118)) (c0_1 (a133)) (-. (c2_1 (a133))) (c3_1 (a133)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ### Or 1695 1697
% 0.75/0.96 1699. ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133)))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c1_1 (a118)) (-. (c2_1 (a118))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (hskp3)) (c3_1 (a97)) (c2_1 (a97)) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ### ConjTree 1698
% 0.75/0.96 1700. ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp3)) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a118))) (c1_1 (a118)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) (ndr1_0) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ### Or 20 1699
% 0.75/0.96 1701. ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118)))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (hskp3)) (c3_1 (a97)) (c2_1 (a97)) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### ConjTree 1700
% 0.75/0.96 1702. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp8)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (ndr1_0) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ### Or 1250 1701
% 0.75/0.96 1703. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) (-. (hskp6)) ((hskp23) \/ ((hskp24) \/ (hskp16))) (ndr1_0) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (-. (hskp8)) (c3_1 (a97)) (c2_1 (a97)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 1702
% 0.75/0.96 1704. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp8)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) (ndr1_0) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ### Or 375 1703
% 0.75/0.96 1705. ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112)))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) (ndr1_0) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) (-. (hskp6)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (-. (hskp8)) (c3_1 (a97)) (c2_1 (a97)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### ConjTree 1704
% 0.75/0.96 1706. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (hskp8)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ### Or 1236 1705
% 0.75/0.96 1707. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) (c2_1 (a109)) (-. (c3_1 (a109))) (-. (c0_1 (a109))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (-. (hskp14)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ### Or 1272 1668
% 0.75/0.96 1708. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) (c2_1 (a109)) (-. (c3_1 (a109))) (-. (c0_1 (a109))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp8)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (ndr1_0) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ### Or 1250 1668
% 0.75/0.96 1709. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) (-. (hskp6)) ((hskp23) \/ ((hskp24) \/ (hskp16))) (ndr1_0) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (-. (hskp8)) (c3_1 (a97)) (c2_1 (a97)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (-. (c0_1 (a109))) (-. (c3_1 (a109))) (c2_1 (a109)) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 1708
% 0.75/0.96 1710. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (hskp8)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c3_1 (a112)) (c0_1 (a112)) (-. (c1_1 (a112))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (-. (c0_1 (a109))) (-. (c3_1 (a109))) (c2_1 (a109)) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### Or 1707 1709
% 0.75/0.96 1711. ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112)))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) (c2_1 (a109)) (-. (c3_1 (a109))) (-. (c0_1 (a109))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) (-. (hskp6)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (-. (hskp8)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### ConjTree 1710
% 0.75/0.96 1712. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (hskp8)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (-. (c0_1 (a109))) (-. (c3_1 (a109))) (c2_1 (a109)) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ### Or 1236 1711
% 0.75/0.96 1713. ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109)))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) (-. (hskp6)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (-. (hskp8)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### ConjTree 1712
% 0.75/0.96 1714. ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) (-. (hskp6)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (-. (hskp8)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### Or 1706 1713
% 0.75/0.96 1715. ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp3)) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (ndr1_0) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a118))) (c1_1 (a118)) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ### DisjTree 1178 1687 62
% 0.75/0.96 1716. ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (hskp3)) (c3_1 (a97)) (c2_1 (a97)) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ### ConjTree 1715
% 0.75/0.96 1717. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) (-. (hskp3)) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (-. (hskp14)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ### Or 1272 1716
% 0.75/0.96 1718. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp8)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (ndr1_0) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ### Or 1250 1716
% 0.75/0.96 1719. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) (-. (hskp6)) ((hskp23) \/ ((hskp24) \/ (hskp16))) (ndr1_0) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (-. (hskp8)) (c3_1 (a97)) (c2_1 (a97)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 1718
% 0.75/0.96 1720. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (-. (hskp8)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c3_1 (a112)) (c0_1 (a112)) (-. (c1_1 (a112))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (hskp3)) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### Or 1717 1719
% 0.75/0.96 1721. ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112)))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) (-. (hskp3)) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp6)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (-. (hskp8)) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### ConjTree 1720
% 0.75/0.96 1722. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (-. (hskp8)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (hskp3)) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ### Or 1236 1721
% 0.75/0.96 1723. ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106)))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) (-. (hskp3)) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp6)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (-. (hskp8)) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### ConjTree 1722
% 0.75/0.96 1724. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (hskp8)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### Or 1714 1723
% 0.75/0.96 1725. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp3)) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### Or 769 1701
% 0.75/0.96 1726. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (ndr1_0) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (hskp3)) (c3_1 (a97)) (c2_1 (a97)) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 1725
% 0.75/0.96 1727. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp3)) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (ndr1_0) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ### Or 375 1726
% 0.75/0.96 1728. ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112)))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) (ndr1_0) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (hskp3)) (c3_1 (a97)) (c2_1 (a97)) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### ConjTree 1727
% 0.75/0.96 1729. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) (-. (hskp3)) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ### Or 1236 1728
% 0.75/0.96 1730. ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (hskp3)) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### Or 1729 1670
% 0.75/0.96 1731. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) (-. (hskp3)) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### Or 1730 328
% 0.75/0.96 1732. ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104)))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (hskp3)) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### ConjTree 1731
% 0.75/0.96 1733. ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) (-. (hskp6)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### Or 1724 1732
% 0.75/0.96 1734. ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) \/ ((hskp2) \/ (hskp3))) (-. (hskp2)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ### Or 1733 1294
% 0.75/0.96 1735. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp3)) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### Or 485 1701
% 0.75/0.96 1736. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) (c3_1 (a112)) (c0_1 (a112)) (-. (c1_1 (a112))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (ndr1_0) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (hskp3)) (c3_1 (a97)) (c2_1 (a97)) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 1735
% 0.75/0.96 1737. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp3)) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (ndr1_0) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ### Or 375 1736
% 0.75/0.96 1738. ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112)))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) (ndr1_0) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (hskp3)) (c3_1 (a97)) (c2_1 (a97)) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### ConjTree 1737
% 0.75/0.96 1739. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) (-. (hskp3)) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ### Or 1236 1738
% 0.75/0.96 1740. ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp3)) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (ndr1_0) (-. (hskp23)) (-. (hskp16)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ### Or 51 1697
% 0.75/0.96 1741. ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c1_1 (a152)) (c0_1 (a152)) (-. (c2_1 (a152))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) (-. (hskp18)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ### Or 800 654
% 0.75/0.96 1742. ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152)))))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (hskp18)) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) (ndr1_0) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ### ConjTree 1741
% 0.75/0.96 1743. ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) (-. (hskp18)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp16)) (ndr1_0) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (hskp3)) (c3_1 (a97)) (c2_1 (a97)) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ### Or 1740 1742
% 0.75/0.96 1744. ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c3_1 (a112)) (c0_1 (a112)) (-. (c1_1 (a112))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp3)) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (ndr1_0) (-. (hskp16)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ### Or 1743 807
% 0.75/0.96 1745. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) (c2_1 (a109)) (-. (c3_1 (a109))) (-. (c0_1 (a109))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (ndr1_0) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (hskp3)) (c3_1 (a97)) (c2_1 (a97)) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ### Or 1744 1668
% 0.75/0.96 1746. ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112)))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp3)) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (ndr1_0) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) (-. (c0_1 (a109))) (-. (c3_1 (a109))) (c2_1 (a109)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 1745
% 0.75/0.96 1747. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) (c2_1 (a109)) (-. (c3_1 (a109))) (-. (c0_1 (a109))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (hskp3)) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ### Or 1236 1746
% 0.75/0.97 1748. ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109)))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) (-. (hskp3)) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### ConjTree 1747
% 0.75/0.97 1749. ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (hskp3)) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### Or 1739 1748
% 0.75/0.97 1750. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (ndr1_0) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (hskp3)) (c3_1 (a97)) (c2_1 (a97)) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ### Or 1744 1716
% 0.75/0.97 1751. ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112)))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp3)) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (ndr1_0) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 1750
% 0.75/0.97 1752. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (hskp3)) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ### Or 1236 1751
% 0.75/0.97 1753. ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106)))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) (-. (hskp3)) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### ConjTree 1752
% 0.75/0.97 1754. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) (-. (hskp3)) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### Or 1749 1753
% 0.75/0.97 1755. ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) \/ ((hskp2) \/ (hskp3))) (-. (hskp2)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (hskp3)) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### Or 1754 1294
% 0.75/0.97 1756. ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102)))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) (-. (hskp3)) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (-. (hskp2)) ((All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) \/ ((hskp2) \/ (hskp3))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ### ConjTree 1755
% 0.75/0.97 1757. ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (-. (hskp2)) ((All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) \/ ((hskp2) \/ (hskp3))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ### Or 1734 1756
% 0.75/0.97 1758. ((ndr1_0) /\ ((c3_1 (a101)) /\ ((-. (c1_1 (a101))) /\ (-. (c2_1 (a101)))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) \/ ((hskp2) \/ (hskp3))) (-. (hskp2)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102))))))) ### ConjTree 1757
% 0.75/0.97 1759. ((-. (hskp5)) \/ ((ndr1_0) /\ ((c3_1 (a101)) /\ ((-. (c1_1 (a101))) /\ (-. (c2_1 (a101))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) (-. (hskp2)) ((All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) \/ ((hskp2) \/ (hskp3))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102))))))) ### Or 1686 1758
% 0.75/0.97 1760. (-. (c1_1 (a96))) (c1_1 (a96)) ### Axiom
% 0.75/0.97 1761. (-. (c3_1 (a96))) (c3_1 (a96)) ### Axiom
% 0.75/0.97 1762. (c0_1 (a96)) (-. (c0_1 (a96))) ### Axiom
% 0.75/0.97 1763. ((ndr1_0) => ((c1_1 (a96)) \/ ((c3_1 (a96)) \/ (-. (c0_1 (a96)))))) (c0_1 (a96)) (-. (c3_1 (a96))) (-. (c1_1 (a96))) (ndr1_0) ### DisjTree 5 1760 1761 1762
% 0.75/0.97 1764. (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) (ndr1_0) (-. (c1_1 (a96))) (-. (c3_1 (a96))) (c0_1 (a96)) ### All 1763
% 0.75/0.97 1765. (-. (c1_1 (a96))) (c1_1 (a96)) ### Axiom
% 0.75/0.97 1766. (-. (c2_1 (a96))) (c2_1 (a96)) ### Axiom
% 0.75/0.97 1767. ((ndr1_0) => ((c0_1 (a96)) \/ ((c1_1 (a96)) \/ (c2_1 (a96))))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) (-. (c1_1 (a96))) (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) (ndr1_0) ### DisjTree 5 1764 1765 1766
% 0.75/0.97 1768. (All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) (ndr1_0) (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) (-. (c1_1 (a96))) (-. (c3_1 (a96))) (-. (c2_1 (a96))) ### All 1767
% 0.75/0.97 1769. ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (-. (hskp12)) (-. (c2_1 (a96))) (-. (c3_1 (a96))) (-. (c1_1 (a96))) (All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) (ndr1_0) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ### DisjTree 674 1768 11
% 0.75/0.97 1770. ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a106)) (c1_1 (a106)) (-. (c2_1 (a106))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) (-. (c1_1 (a96))) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (hskp12)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ### DisjTree 1769 674 847
% 0.75/0.97 1771. ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) (-. (c1_1 (a96))) (ndr1_0) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) (-. (c2_1 (a106))) (c1_1 (a106)) (c3_1 (a106)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ### Or 1770 699
% 0.75/0.97 1772. ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106)))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (ndr1_0) (-. (c1_1 (a96))) (-. (c3_1 (a96))) (-. (c2_1 (a96))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ### ConjTree 1771
% 0.75/0.97 1773. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) (-. (c1_1 (a96))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (hskp8)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### Or 1636 1772
% 0.75/0.97 1774. ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) (-. (c1_1 (a96))) (-. (c3_1 (a96))) (-. (c2_1 (a96))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### Or 1773 1477
% 0.75/0.97 1775. ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) (-. (c1_1 (a96))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ### Or 1774 1485
% 0.75/0.97 1776. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) (-. (c1_1 (a96))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### Or 1466 1772
% 0.75/0.97 1777. ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) (-. (c1_1 (a96))) (-. (c3_1 (a96))) (-. (c2_1 (a96))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### Or 1776 1494
% 0.75/0.97 1778. ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102)))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) (-. (c1_1 (a96))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ### ConjTree 1777
% 0.75/0.97 1779. ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102))))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) (-. (c1_1 (a96))) (-. (c3_1 (a96))) (-. (c2_1 (a96))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ### Or 1775 1778
% 0.75/0.97 1780. ((ndr1_0) /\ ((c3_1 (a101)) /\ ((-. (c1_1 (a101))) /\ (-. (c2_1 (a101)))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) (-. (c1_1 (a96))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) (-. (c1_1 (a99))) (-. (c3_1 (a99))) (c2_1 (a99)) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102))))))) ### ConjTree 1779
% 0.75/0.97 1781. ((-. (hskp5)) \/ ((ndr1_0) /\ ((c3_1 (a101)) /\ ((-. (c1_1 (a101))) /\ (-. (c2_1 (a101))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) (-. (c1_1 (a96))) (-. (c3_1 (a96))) (-. (c2_1 (a96))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) (c2_1 (a99)) (-. (c3_1 (a99))) (-. (c1_1 (a99))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102))))))) ### Or 1472 1780
% 0.75/0.97 1782. ((ndr1_0) /\ ((c2_1 (a99)) /\ ((-. (c1_1 (a99))) /\ (-. (c3_1 (a99)))))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102))))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) (-. (c1_1 (a96))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((-. (hskp5)) \/ ((ndr1_0) /\ ((c3_1 (a101)) /\ ((-. (c1_1 (a101))) /\ (-. (c2_1 (a101))))))) ### ConjTree 1781
% 0.75/0.97 1783. ((-. (hskp3)) \/ ((ndr1_0) /\ ((c2_1 (a99)) /\ ((-. (c1_1 (a99))) /\ (-. (c3_1 (a99))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102))))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) \/ ((hskp2) \/ (hskp3))) (-. (hskp2)) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp5)) \/ ((ndr1_0) /\ ((c3_1 (a101)) /\ ((-. (c1_1 (a101))) /\ (-. (c2_1 (a101))))))) ### Or 1759 1782
% 0.75/0.97 1784. ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp3)) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (ndr1_0) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) (-. (c2_1 (a133))) (c0_1 (a133)) (c3_1 (a133)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) (-. (hskp26)) (-. (c2_1 (a118))) (c1_1 (a118)) (c1_1 (a165)) (c3_1 (a165)) (c2_1 (a165)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ### DisjTree 1095 1687 62
% 0.75/0.97 1785. ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c1_1 (a118)) (-. (c2_1 (a118))) (-. (hskp26)) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (c3_1 (a133)) (c0_1 (a133)) (-. (c2_1 (a133))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (ndr1_0) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (hskp3)) (c3_1 (a97)) (c2_1 (a97)) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ### ConjTree 1784
% 0.75/0.97 1786. ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp3)) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (ndr1_0) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) (-. (c2_1 (a133))) (c0_1 (a133)) (c3_1 (a133)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp26)) (-. (c2_1 (a118))) (c1_1 (a118)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp24)) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ### Or 68 1785
% 0.75/0.97 1787. ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp3)) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (ndr1_0) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) (-. (c2_1 (a133))) (c0_1 (a133)) (c3_1 (a133)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (c2_1 (a94)) (c1_1 (a94)) (c0_1 (a94)) (-. (c2_1 (a118))) (c1_1 (a118)) (c1_1 (a165)) (c3_1 (a165)) (c2_1 (a165)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ### DisjTree 1101 1687 62
% 0.75/0.97 1788. ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c1_1 (a118)) (-. (c2_1 (a118))) (c0_1 (a94)) (c1_1 (a94)) (c2_1 (a94)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (c3_1 (a133)) (c0_1 (a133)) (-. (c2_1 (a133))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (ndr1_0) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (hskp3)) (c3_1 (a97)) (c2_1 (a97)) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ### ConjTree 1787
% 0.75/0.97 1789. ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp3)) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (ndr1_0) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) (-. (c2_1 (a133))) (c0_1 (a133)) (c3_1 (a133)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (c2_1 (a94)) (c1_1 (a94)) (c0_1 (a94)) (-. (c2_1 (a118))) (c1_1 (a118)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp24)) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ### Or 68 1788
% 0.75/0.97 1790. ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) (-. (hskp24)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c1_1 (a118)) (-. (c2_1 (a118))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (c3_1 (a133)) (c0_1 (a133)) (-. (c2_1 (a133))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (ndr1_0) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (hskp3)) (c3_1 (a97)) (c2_1 (a97)) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ### ConjTree 1789
% 0.75/0.97 1791. ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) (-. (hskp24)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c1_1 (a118)) (-. (c2_1 (a118))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (c3_1 (a133)) (c0_1 (a133)) (-. (c2_1 (a133))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (ndr1_0) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (hskp3)) (c3_1 (a97)) (c2_1 (a97)) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ### Or 1786 1790
% 0.75/0.97 1792. ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp3)) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (ndr1_0) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) (-. (c2_1 (a133))) (c0_1 (a133)) (c3_1 (a133)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c2_1 (a118))) (c1_1 (a118)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ### Or 1791 1697
% 0.75/0.97 1793. ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133)))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c1_1 (a118)) (-. (c2_1 (a118))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (ndr1_0) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (hskp3)) (c3_1 (a97)) (c2_1 (a97)) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ### ConjTree 1792
% 0.75/0.97 1794. ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp3)) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c2_1 (a118))) (c1_1 (a118)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) (ndr1_0) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ### Or 20 1793
% 0.75/0.97 1795. ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118)))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (hskp3)) (c3_1 (a97)) (c2_1 (a97)) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### ConjTree 1794
% 0.75/0.97 1796. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp8)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (ndr1_0) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ### Or 1250 1795
% 0.75/0.97 1797. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) (-. (hskp6)) ((hskp23) \/ ((hskp24) \/ (hskp16))) (ndr1_0) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (-. (hskp8)) (c3_1 (a97)) (c2_1 (a97)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 1796
% 0.75/0.97 1798. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp8)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) (ndr1_0) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ### Or 375 1797
% 0.75/0.97 1799. ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112)))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) (ndr1_0) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) (-. (hskp6)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (-. (hskp8)) (c3_1 (a97)) (c2_1 (a97)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### ConjTree 1798
% 0.75/0.97 1800. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (hskp8)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ### Or 1236 1799
% 0.75/0.97 1801. ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) (-. (hskp6)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (-. (hskp8)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### Or 1800 1713
% 0.75/0.97 1802. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp5)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (hskp8)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### Or 1801 1280
% 0.75/0.97 1803. ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) (-. (hskp24)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c1_1 (a118)) (-. (c2_1 (a118))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (c3_1 (a133)) (c0_1 (a133)) (-. (c2_1 (a133))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (ndr1_0) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (hskp3)) (c3_1 (a97)) (c2_1 (a97)) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ### Or 1786 1105
% 0.75/0.97 1804. ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp3)) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (ndr1_0) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) (-. (c2_1 (a133))) (c0_1 (a133)) (c3_1 (a133)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c2_1 (a118))) (c1_1 (a118)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (-. (c0_1 (a110))) (c2_1 (a110)) (c3_1 (a110)) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ### Or 1803 1697
% 0.75/0.97 1805. ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133)))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c1_1 (a118)) (-. (c2_1 (a118))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) (ndr1_0) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (hskp3)) (c3_1 (a97)) (c2_1 (a97)) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ### ConjTree 1804
% 0.75/0.97 1806. ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp3)) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c2_1 (a118))) (c1_1 (a118)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) (-. (c0_1 (a110))) (c2_1 (a110)) (c3_1 (a110)) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) (ndr1_0) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ### Or 20 1805
% 0.75/0.97 1807. ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118)))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (hskp3)) (c3_1 (a97)) (c2_1 (a97)) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### ConjTree 1806
% 0.75/0.97 1808. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) (c2_1 (a97)) (c3_1 (a97)) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) (-. (c2_1 (a115))) (-. (c3_1 (a115))) (c0_1 (a115)) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) (ndr1_0) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ### Or 1285 1807
% 0.75/0.97 1809. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) (-. (hskp6)) ((hskp23) \/ ((hskp24) \/ (hskp16))) (ndr1_0) (-. (c0_1 (a110))) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (c3_1 (a97)) (c2_1 (a97)) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 1808
% 0.75/0.97 1810. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) (c2_1 (a97)) (c3_1 (a97)) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) (ndr1_0) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ### Or 375 1809
% 0.75/0.97 1811. ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112)))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) (ndr1_0) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) (-. (hskp6)) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (c0_1 (a110))) (c2_1 (a110)) (c3_1 (a110)) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (c3_1 (a97)) (c2_1 (a97)) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### ConjTree 1810
% 0.75/0.97 1812. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a110)) (c2_1 (a110)) (-. (c0_1 (a110))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ### Or 1236 1811
% 0.75/0.97 1813. ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110)))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) (-. (hskp6)) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### ConjTree 1812
% 0.75/0.98 1814. ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### Or 1284 1813
% 0.75/0.98 1815. ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) (-. (hskp5)) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) (-. (hskp6)) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ### Or 1814 1670
% 0.75/0.98 1816. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp5)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### Or 1815 328
% 0.75/0.98 1817. ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104)))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) (-. (hskp5)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) (-. (hskp6)) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### ConjTree 1816
% 0.75/0.98 1818. ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) (-. (hskp6)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) (-. (hskp5)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### Or 1802 1817
% 0.75/0.98 1819. ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp5)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ### Or 1818 1532
% 0.75/0.98 1820. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp3)) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### Or 485 1795
% 0.75/0.98 1821. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) (c3_1 (a112)) (c0_1 (a112)) (-. (c1_1 (a112))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (ndr1_0) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (hskp3)) (c3_1 (a97)) (c2_1 (a97)) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 1820
% 0.75/0.98 1822. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp3)) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (ndr1_0) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ### Or 375 1821
% 0.75/0.98 1823. ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112)))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) (ndr1_0) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) (-. (hskp11)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (hskp3)) (c3_1 (a97)) (c2_1 (a97)) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### ConjTree 1822
% 0.75/0.98 1824. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) (-. (hskp3)) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (hskp11)) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ### Or 1236 1823
% 0.75/0.98 1825. ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) (-. (hskp5)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (hskp3)) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### Or 1824 1681
% 0.75/0.98 1826. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) (-. (hskp3)) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (-. (hskp5)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### Or 1825 1317
% 0.75/0.98 1827. ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) (-. (hskp5)) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (hskp3)) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### Or 1826 1545
% 0.75/0.98 1828. ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102)))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) (-. (hskp3)) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) (-. (hskp5)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ### ConjTree 1827
% 0.75/0.98 1829. ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102))))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) (-. (hskp5)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ### Or 1819 1828
% 0.75/0.98 1830. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (hskp8)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### Or 1801 1723
% 0.75/0.98 1831. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp3)) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) (-. (hskp10)) (c0_1 (a115)) (-. (c3_1 (a115))) (-. (c2_1 (a115))) (ndr1_0) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ### Or 769 1795
% 0.75/0.98 1832. ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) (ndr1_0) (-. (hskp10)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (hskp3)) (c3_1 (a97)) (c2_1 (a97)) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ### ConjTree 1831
% 0.75/0.98 1833. ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) (c2_1 (a97)) (c3_1 (a97)) (-. (hskp3)) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (ndr1_0) (-. (c1_1 (a112))) (c0_1 (a112)) (c3_1 (a112)) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ### Or 375 1832
% 0.75/0.98 1834. ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112)))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) (ndr1_0) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (-. (hskp11)) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (hskp3)) (c3_1 (a97)) (c2_1 (a97)) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ### ConjTree 1833
% 0.75/0.98 1835. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) (-. (hskp3)) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) (-. (hskp11)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (-. (hskp10)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ### Or 1236 1834
% 0.75/0.98 1836. ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (c0_1 (a104))) (-. (c2_1 (a104))) (-. (c3_1 (a104))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (hskp3)) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### Or 1835 1670
% 0.75/0.98 1837. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) (-. (hskp3)) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) (-. (hskp6)) (-. (c3_1 (a104))) (-. (c2_1 (a104))) (-. (c0_1 (a104))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### Or 1836 328
% 0.75/0.98 1838. ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104)))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (hskp3)) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### ConjTree 1837
% 0.75/0.98 1839. ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) (-. (hskp6)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### Or 1830 1838
% 0.75/0.98 1840. ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp6)) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ### Or 1839 1532
% 0.75/0.98 1841. ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (-. (hskp10)) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (hskp3)) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) (-. (hskp7)) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ### Or 1824 1748
% 0.75/0.98 1842. ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (hskp7)) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) (-. (hskp3)) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (-. (c3_1 (a102))) (c1_1 (a102)) (c2_1 (a102)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ### Or 1841 1753
% 0.75/0.98 1843. ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) (c3_1 (a101)) (-. (c2_1 (a101))) (-. (c1_1 (a101))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) (c2_1 (a102)) (c1_1 (a102)) (-. (c3_1 (a102))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (hskp3)) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ### Or 1842 1532
% 0.75/0.98 1844. ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102)))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) (-. (hskp3)) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ### ConjTree 1843
% 0.75/0.98 1845. ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) (-. (hskp3)) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) (-. (c1_1 (a101))) (-. (c2_1 (a101))) (c3_1 (a101)) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ### Or 1840 1844
% 0.75/0.98 1846. ((ndr1_0) /\ ((c3_1 (a101)) /\ ((-. (c1_1 (a101))) /\ (-. (c2_1 (a101)))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102))))))) ### ConjTree 1845
% 0.75/0.98 1847. ((-. (hskp5)) \/ ((ndr1_0) /\ ((c3_1 (a101)) /\ ((-. (c1_1 (a101))) /\ (-. (c2_1 (a101))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (c0_1 (a98))) (-. (c3_1 (a98))) (c1_1 (a98)) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((hskp23) \/ ((hskp24) \/ (hskp16))) (-. (hskp3)) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102))))))) ### Or 1829 1846
% 0.75/0.98 1848. ((-. (hskp3)) \/ ((ndr1_0) /\ ((c2_1 (a99)) /\ ((-. (c1_1 (a99))) /\ (-. (c3_1 (a99))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102))))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) (c1_1 (a98)) (-. (c3_1 (a98))) (-. (c0_1 (a98))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp5)) \/ ((ndr1_0) /\ ((c3_1 (a101)) /\ ((-. (c1_1 (a101))) /\ (-. (c2_1 (a101))))))) ### Or 1847 1650
% 0.75/0.98 1849. ((ndr1_0) /\ ((c1_1 (a98)) /\ ((-. (c0_1 (a98))) /\ (-. (c3_1 (a98)))))) ((-. (hskp5)) \/ ((ndr1_0) /\ ((c3_1 (a101)) /\ ((-. (c1_1 (a101))) /\ (-. (c2_1 (a101))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) (-. (c1_1 (a97))) (c2_1 (a97)) (c3_1 (a97)) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((-. (hskp3)) \/ ((ndr1_0) /\ ((c2_1 (a99)) /\ ((-. (c1_1 (a99))) /\ (-. (c3_1 (a99))))))) ### ConjTree 1848
% 0.75/0.98 1850. ((-. (hskp2)) \/ ((ndr1_0) /\ ((c1_1 (a98)) /\ ((-. (c0_1 (a98))) /\ (-. (c3_1 (a98))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp5)) \/ ((ndr1_0) /\ ((c3_1 (a101)) /\ ((-. (c1_1 (a101))) /\ (-. (c2_1 (a101))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) (c3_1 (a97)) (c2_1 (a97)) (-. (c1_1 (a97))) (ndr1_0) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) \/ ((hskp2) \/ (hskp3))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) (-. (c3_1 (a96))) (-. (c2_1 (a96))) (-. (c1_1 (a96))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((-. (hskp3)) \/ ((ndr1_0) /\ ((c2_1 (a99)) /\ ((-. (c1_1 (a99))) /\ (-. (c3_1 (a99))))))) ### Or 1783 1849
% 0.75/0.98 1851. ((ndr1_0) /\ ((c2_1 (a97)) /\ ((c3_1 (a97)) /\ (-. (c1_1 (a97)))))) ((-. (hskp3)) \/ ((ndr1_0) /\ ((c2_1 (a99)) /\ ((-. (c1_1 (a99))) /\ (-. (c3_1 (a99))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102))))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) \/ ((hskp2) \/ (hskp3))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) (ndr1_0) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp5)) \/ ((ndr1_0) /\ ((c3_1 (a101)) /\ ((-. (c1_1 (a101))) /\ (-. (c2_1 (a101))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp2)) \/ ((ndr1_0) /\ ((c1_1 (a98)) /\ ((-. (c0_1 (a98))) /\ (-. (c3_1 (a98))))))) ### ConjTree 1850
% 0.75/0.99 1852. ((-. (hskp1)) \/ ((ndr1_0) /\ ((c2_1 (a97)) /\ ((c3_1 (a97)) /\ (-. (c1_1 (a97))))))) ((-. (hskp2)) \/ ((ndr1_0) /\ ((c1_1 (a98)) /\ ((-. (c0_1 (a98))) /\ (-. (c3_1 (a98))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp5)) \/ ((ndr1_0) /\ ((c3_1 (a101)) /\ ((-. (c1_1 (a101))) /\ (-. (c2_1 (a101))))))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) \/ ((hskp2) \/ (hskp3))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((-. (hskp3)) \/ ((ndr1_0) /\ ((c2_1 (a99)) /\ ((-. (c1_1 (a99))) /\ (-. (c3_1 (a99))))))) (ndr1_0) (-. (c1_1 (a96))) (-. (c2_1 (a96))) (-. (c3_1 (a96))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (hskp1)) ### Or 1661 1851
% 0.75/0.99 1853. ((ndr1_0) /\ ((-. (c1_1 (a96))) /\ ((-. (c2_1 (a96))) /\ (-. (c3_1 (a96)))))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (hskp1)) ((-. (hskp3)) \/ ((ndr1_0) /\ ((c2_1 (a99)) /\ ((-. (c1_1 (a99))) /\ (-. (c3_1 (a99))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102))))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) \/ ((hskp2) \/ (hskp3))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((-. (hskp5)) \/ ((ndr1_0) /\ ((c3_1 (a101)) /\ ((-. (c1_1 (a101))) /\ (-. (c2_1 (a101))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp2)) \/ ((ndr1_0) /\ ((c1_1 (a98)) /\ ((-. (c0_1 (a98))) /\ (-. (c3_1 (a98))))))) ((-. (hskp1)) \/ ((ndr1_0) /\ ((c2_1 (a97)) /\ ((c3_1 (a97)) /\ (-. (c1_1 (a97))))))) ### ConjTree 1852
% 0.75/0.99 1854. ((-. (hskp0)) \/ ((ndr1_0) /\ ((-. (c1_1 (a96))) /\ ((-. (c2_1 (a96))) /\ (-. (c3_1 (a96))))))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (hskp1)) ((-. (hskp2)) \/ ((ndr1_0) /\ ((c1_1 (a98)) /\ ((-. (c0_1 (a98))) /\ (-. (c3_1 (a98))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (-. (c2_1 X1)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((-. (hskp5)) \/ ((ndr1_0) /\ ((c3_1 (a101)) /\ ((-. (c1_1 (a101))) /\ (-. (c2_1 (a101))))))) ((hskp20) \/ ((hskp29) \/ (hskp0))) ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) ((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) ((hskp18) \/ ((hskp19) \/ (hskp13))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) ((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) ((hskp14) \/ ((hskp12) \/ (hskp11))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) ((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) ((hskp9) \/ ((hskp14) \/ (hskp2))) ((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) ((hskp14) \/ ((hskp1) \/ (hskp3))) ((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) ((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) ((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) ((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) ((hskp29) \/ ((hskp24) \/ (hskp11))) ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) ((hskp23) \/ ((hskp24) \/ (hskp16))) ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) ((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) ((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) ((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) ((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102))))))) ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c3_1 (a145)) /\ ((-. (c0_1 (a145))) /\ (-. (c2_1 (a145))))))) ((hskp14) \/ ((hskp16) \/ (hskp21))) ((-. (hskp3)) \/ ((ndr1_0) /\ ((c2_1 (a99)) /\ ((-. (c1_1 (a99))) /\ (-. (c3_1 (a99))))))) ((All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) \/ ((hskp2) \/ (hskp3))) ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) ((-. (hskp1)) \/ ((ndr1_0) /\ ((c2_1 (a97)) /\ ((c3_1 (a97)) /\ (-. (c1_1 (a97))))))) ### Or 1655 1853
% 0.75/0.99 1855. (((-. (hskp0)) \/ ((ndr1_0) /\ ((-. (c1_1 (a96))) /\ ((-. (c2_1 (a96))) /\ (-. (c3_1 (a96))))))) /\ (((-. (hskp1)) \/ ((ndr1_0) /\ ((c2_1 (a97)) /\ ((c3_1 (a97)) /\ (-. (c1_1 (a97))))))) /\ (((-. (hskp2)) \/ ((ndr1_0) /\ ((c1_1 (a98)) /\ ((-. (c0_1 (a98))) /\ (-. (c3_1 (a98))))))) /\ (((-. (hskp3)) \/ ((ndr1_0) /\ ((c2_1 (a99)) /\ ((-. (c1_1 (a99))) /\ (-. (c3_1 (a99))))))) /\ (((-. (hskp4)) \/ ((ndr1_0) /\ ((c2_1 (a100)) /\ ((-. (c0_1 (a100))) /\ (-. (c1_1 (a100))))))) /\ (((-. (hskp5)) \/ ((ndr1_0) /\ ((c3_1 (a101)) /\ ((-. (c1_1 (a101))) /\ (-. (c2_1 (a101))))))) /\ (((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102))))))) /\ (((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) /\ (((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) /\ (((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) /\ (((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) /\ (((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) /\ (((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) /\ (((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) /\ (((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) /\ (((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) /\ (((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) /\ (((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) /\ (((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) /\ (((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) /\ (((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) /\ (((-. (hskp21)) \/ ((ndr1_0) /\ ((c3_1 (a145)) /\ ((-. (c0_1 (a145))) /\ (-. (c2_1 (a145))))))) /\ (((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) /\ (((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) /\ (((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) /\ (((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a159)) /\ ((-. (c1_1 (a159))) /\ (-. (c2_1 (a159))))))) /\ (((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) /\ (((-. (hskp27)) \/ ((ndr1_0) /\ ((c0_1 (a95)) /\ ((c2_1 (a95)) /\ (c3_1 (a95)))))) /\ (((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) /\ (((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) /\ (((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) /\ (((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((hskp26) \/ (hskp27))) /\ (((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) /\ (((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (-. (c2_1 X1)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) /\ (((All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) \/ ((hskp2) \/ (hskp3))) /\ (((All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) \/ ((hskp4) \/ (hskp5))) /\ (((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) /\ (((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) /\ (((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) /\ (((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) /\ (((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) /\ (((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) /\ (((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) /\ (((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) /\ (((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) /\ (((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) /\ (((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) /\ (((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) /\ (((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) /\ (((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) /\ (((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((hskp13) \/ (hskp3))) /\ (((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (hskp1)) /\ (((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) /\ (((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (hskp14))) /\ (((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) /\ (((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) /\ (((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) /\ (((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) /\ (((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) /\ (((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) /\ (((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) /\ (((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp26) \/ (hskp17))) /\ (((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) /\ (((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) /\ (((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) /\ (((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp6) \/ (hskp4))) /\ (((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) /\ (((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) /\ (((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) /\ (((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) /\ (((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) /\ (((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) /\ (((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) /\ (((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) /\ (((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp12) \/ (hskp21))) /\ (((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ ((hskp26) \/ (hskp1))) /\ (((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) /\ (((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp12) \/ (hskp8))) /\ (((hskp23) \/ ((hskp24) \/ (hskp16))) /\ (((hskp18) \/ ((hskp19) \/ (hskp13))) /\ (((hskp18) \/ ((hskp25) \/ (hskp17))) /\ (((hskp9) \/ ((hskp14) \/ (hskp2))) /\ (((hskp20) \/ ((hskp29) \/ (hskp0))) /\ (((hskp20) \/ ((hskp3) \/ (hskp8))) /\ (((hskp14) \/ ((hskp16) \/ (hskp21))) /\ (((hskp14) \/ ((hskp12) \/ (hskp11))) /\ (((hskp14) \/ ((hskp1) \/ (hskp3))) /\ (((hskp29) \/ ((hskp24) \/ (hskp11))) /\ (((hskp6) \/ ((hskp22) \/ (hskp17))) /\ ((hskp15) \/ ((hskp22) \/ (hskp17)))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))) ### ConjTree 1854
% 0.75/0.99 1856. (-. (-. (((-. (hskp0)) \/ ((ndr1_0) /\ ((-. (c1_1 (a96))) /\ ((-. (c2_1 (a96))) /\ (-. (c3_1 (a96))))))) /\ (((-. (hskp1)) \/ ((ndr1_0) /\ ((c2_1 (a97)) /\ ((c3_1 (a97)) /\ (-. (c1_1 (a97))))))) /\ (((-. (hskp2)) \/ ((ndr1_0) /\ ((c1_1 (a98)) /\ ((-. (c0_1 (a98))) /\ (-. (c3_1 (a98))))))) /\ (((-. (hskp3)) \/ ((ndr1_0) /\ ((c2_1 (a99)) /\ ((-. (c1_1 (a99))) /\ (-. (c3_1 (a99))))))) /\ (((-. (hskp4)) \/ ((ndr1_0) /\ ((c2_1 (a100)) /\ ((-. (c0_1 (a100))) /\ (-. (c1_1 (a100))))))) /\ (((-. (hskp5)) \/ ((ndr1_0) /\ ((c3_1 (a101)) /\ ((-. (c1_1 (a101))) /\ (-. (c2_1 (a101))))))) /\ (((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a102)) /\ ((c2_1 (a102)) /\ (-. (c3_1 (a102))))))) /\ (((-. (hskp7)) \/ ((ndr1_0) /\ ((c0_1 (a103)) /\ ((-. (c1_1 (a103))) /\ (-. (c3_1 (a103))))))) /\ (((-. (hskp8)) \/ ((ndr1_0) /\ ((-. (c0_1 (a104))) /\ ((-. (c2_1 (a104))) /\ (-. (c3_1 (a104))))))) /\ (((-. (hskp9)) \/ ((ndr1_0) /\ ((c0_1 (a105)) /\ ((c2_1 (a105)) /\ (-. (c1_1 (a105))))))) /\ (((-. (hskp10)) \/ ((ndr1_0) /\ ((c1_1 (a106)) /\ ((c3_1 (a106)) /\ (-. (c2_1 (a106))))))) /\ (((-. (hskp11)) \/ ((ndr1_0) /\ ((c2_1 (a109)) /\ ((-. (c0_1 (a109))) /\ (-. (c3_1 (a109))))))) /\ (((-. (hskp12)) \/ ((ndr1_0) /\ ((c2_1 (a110)) /\ ((c3_1 (a110)) /\ (-. (c0_1 (a110))))))) /\ (((-. (hskp13)) \/ ((ndr1_0) /\ ((c0_1 (a112)) /\ ((c3_1 (a112)) /\ (-. (c1_1 (a112))))))) /\ (((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a115)) /\ ((-. (c2_1 (a115))) /\ (-. (c3_1 (a115))))))) /\ (((-. (hskp15)) \/ ((ndr1_0) /\ ((c1_1 (a116)) /\ ((c3_1 (a116)) /\ (-. (c0_1 (a116))))))) /\ (((-. (hskp16)) \/ ((ndr1_0) /\ ((c1_1 (a118)) /\ ((-. (c2_1 (a118))) /\ (-. (c3_1 (a118))))))) /\ (((-. (hskp17)) \/ ((ndr1_0) /\ ((-. (c0_1 (a124))) /\ ((-. (c1_1 (a124))) /\ (-. (c3_1 (a124))))))) /\ (((-. (hskp18)) \/ ((ndr1_0) /\ ((c0_1 (a125)) /\ ((c1_1 (a125)) /\ (-. (c3_1 (a125))))))) /\ (((-. (hskp19)) \/ ((ndr1_0) /\ ((c0_1 (a127)) /\ ((c2_1 (a127)) /\ (-. (c3_1 (a127))))))) /\ (((-. (hskp20)) \/ ((ndr1_0) /\ ((c0_1 (a133)) /\ ((c3_1 (a133)) /\ (-. (c2_1 (a133))))))) /\ (((-. (hskp21)) \/ ((ndr1_0) /\ ((c3_1 (a145)) /\ ((-. (c0_1 (a145))) /\ (-. (c2_1 (a145))))))) /\ (((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a149)) /\ ((-. (c0_1 (a149))) /\ (-. (c1_1 (a149))))))) /\ (((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a152)) /\ ((c1_1 (a152)) /\ (-. (c2_1 (a152))))))) /\ (((-. (hskp24)) \/ ((ndr1_0) /\ ((c1_1 (a153)) /\ ((-. (c0_1 (a153))) /\ (-. (c2_1 (a153))))))) /\ (((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a159)) /\ ((-. (c1_1 (a159))) /\ (-. (c2_1 (a159))))))) /\ (((-. (hskp26)) \/ ((ndr1_0) /\ ((c0_1 (a94)) /\ ((c1_1 (a94)) /\ (c2_1 (a94)))))) /\ (((-. (hskp27)) \/ ((ndr1_0) /\ ((c0_1 (a95)) /\ ((c2_1 (a95)) /\ (c3_1 (a95)))))) /\ (((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a142)) /\ ((c1_1 (a142)) /\ (c3_1 (a142)))))) /\ (((-. (hskp29)) \/ ((ndr1_0) /\ ((c1_1 (a165)) /\ ((c2_1 (a165)) /\ (c3_1 (a165)))))) /\ (((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ (All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))))) /\ (((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((hskp26) \/ (hskp27))) /\ (((All Y, ((ndr1_0) => ((c0_1 Y) \/ ((c1_1 Y) \/ (c3_1 Y))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (hskp0))) /\ (((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (-. (c2_1 X1)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) /\ (((All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) \/ ((hskp2) \/ (hskp3))) /\ (((All X3, ((ndr1_0) => ((c0_1 X3) \/ ((c1_1 X3) \/ (-. (c3_1 X3)))))) \/ ((hskp4) \/ (hskp5))) /\ (((All X5, ((ndr1_0) => ((c0_1 X5) \/ ((c2_1 X5) \/ (c3_1 X5))))) \/ ((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ (hskp6))) /\ (((All X6, ((ndr1_0) => ((c0_1 X6) \/ ((c2_1 X6) \/ (-. (c1_1 X6)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (hskp7))) /\ (((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X8, ((ndr1_0) => ((c0_1 X8) \/ ((-. (c2_1 X8)) \/ (-. (c3_1 X8)))))) \/ (All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))))) /\ (((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c2_1 X9) \/ (-. (c3_1 X9)))))) \/ ((All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))) \/ (hskp8))) /\ (((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ (hskp9))) /\ (((All X14, ((ndr1_0) => ((c0_1 X14) \/ ((c3_1 X14) \/ (-. (c1_1 X14)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) /\ (((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ (All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))))) /\ (((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))))) /\ (((All X19, ((ndr1_0) => ((c0_1 X19) \/ ((c3_1 X19) \/ (-. (c2_1 X19)))))) \/ ((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ (hskp10))) /\ (((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (All X29, ((ndr1_0) => ((-. (c0_1 X29)) \/ ((-. (c1_1 X29)) \/ (-. (c2_1 X29)))))))) /\ (((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp1))) /\ (((All X20, ((ndr1_0) => ((c0_1 X20) \/ ((-. (c1_1 X20)) \/ (-. (c2_1 X20)))))) \/ ((hskp26) \/ (hskp11))) /\ (((All V, ((ndr1_0) => ((c0_1 V) \/ ((-. (c1_1 V)) \/ (-. (c3_1 V)))))) \/ ((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (hskp12))) /\ (((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp3))) /\ (((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ ((hskp13) \/ (hskp3))) /\ (((All X23, ((ndr1_0) => ((c1_1 X23) \/ ((c2_1 X23) \/ (c3_1 X23))))) \/ (hskp1)) /\ (((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))))) /\ (((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ (hskp14))) /\ (((All X39, ((ndr1_0) => ((c1_1 X39) \/ ((c2_1 X39) \/ (-. (c0_1 X39)))))) \/ ((All X17, ((ndr1_0) => ((c2_1 X17) \/ ((-. (c0_1 X17)) \/ (-. (c3_1 X17)))))) \/ (hskp15))) /\ (((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c2_1 X40) \/ (-. (c3_1 X40)))))) \/ ((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) /\ (((All X11, ((ndr1_0) => ((c1_1 X11) \/ ((c3_1 X11) \/ (-. (c0_1 X11)))))) \/ (All X50, ((ndr1_0) => ((c1_1 X50) \/ ((-. (c0_1 X50)) \/ (-. (c2_1 X50))))))) /\ (((All W, ((ndr1_0) => ((c1_1 W) \/ ((c3_1 W) \/ (-. (c2_1 W)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp10))) /\ (((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((All X52, ((ndr1_0) => ((c3_1 X52) \/ ((-. (c0_1 X52)) \/ (-. (c1_1 X52)))))) \/ (hskp16))) /\ (((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp14) \/ (hskp10))) /\ (((All X53, ((ndr1_0) => ((c1_1 X53) \/ ((-. (c0_1 X53)) \/ (-. (c3_1 X53)))))) \/ ((hskp16) \/ (hskp8))) /\ (((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp26) \/ (hskp17))) /\ (((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp18) \/ (hskp14))) /\ (((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp19) \/ (hskp5))) /\ (((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ (hskp13)) /\ (((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((-. (c2_1 X57)) \/ (-. (c3_1 X57)))))) \/ ((hskp6) \/ (hskp4))) /\ (((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ (hskp8))) /\ (((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp20) \/ (hskp10))) /\ (((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp12) \/ (hskp5))) /\ (((All X15, ((ndr1_0) => ((c2_1 X15) \/ ((c3_1 X15) \/ (-. (c0_1 X15)))))) \/ ((hskp1) \/ (hskp17))) /\ (((All X24, ((ndr1_0) => ((c2_1 X24) \/ ((c3_1 X24) \/ (-. (c1_1 X24)))))) \/ ((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ (hskp5))) /\ (((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((All X18, ((ndr1_0) => ((c2_1 X18) \/ ((-. (c1_1 X18)) \/ (-. (c3_1 X18)))))) \/ (All X13, ((ndr1_0) => ((-. (c0_1 X13)) \/ ((-. (c1_1 X13)) \/ (-. (c3_1 X13)))))))) /\ (((All Z, ((ndr1_0) => ((c2_1 Z) \/ ((-. (c0_1 Z)) \/ (-. (c1_1 Z)))))) \/ ((hskp6) \/ (hskp3))) /\ (((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp28) \/ (hskp18))) /\ (((All X68, ((ndr1_0) => ((c3_1 X68) \/ ((-. (c1_1 X68)) \/ (-. (c2_1 X68)))))) \/ ((hskp12) \/ (hskp21))) /\ (((All X2, ((ndr1_0) => ((-. (c0_1 X2)) \/ ((-. (c2_1 X2)) \/ (-. (c3_1 X2)))))) \/ ((hskp26) \/ (hskp1))) /\ (((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp9) \/ (hskp22))) /\ (((All X76, ((ndr1_0) => ((-. (c1_1 X76)) \/ ((-. (c2_1 X76)) \/ (-. (c3_1 X76)))))) \/ ((hskp12) \/ (hskp8))) /\ (((hskp23) \/ ((hskp24) \/ (hskp16))) /\ (((hskp18) \/ ((hskp19) \/ (hskp13))) /\ (((hskp18) \/ ((hskp25) \/ (hskp17))) /\ (((hskp9) \/ ((hskp14) \/ (hskp2))) /\ (((hskp20) \/ ((hskp29) \/ (hskp0))) /\ (((hskp20) \/ ((hskp3) \/ (hskp8))) /\ (((hskp14) \/ ((hskp16) \/ (hskp21))) /\ (((hskp14) \/ ((hskp12) \/ (hskp11))) /\ (((hskp14) \/ ((hskp1) \/ (hskp3))) /\ (((hskp29) \/ ((hskp24) \/ (hskp11))) /\ (((hskp6) \/ ((hskp22) \/ (hskp17))) /\ ((hskp15) \/ ((hskp22) \/ (hskp17)))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))) ### NotNot 1855
% 0.75/0.99 % SZS output end Proof
% 0.75/0.99 (* END-PROOF *)
%------------------------------------------------------------------------------