TSTP Solution File: SYN451+1 by SuperZenon---0.0.1
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- Process Solution
%------------------------------------------------------------------------------
% File : SuperZenon---0.0.1
% Problem : SYN451+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 : n007.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 12:43:52 EDT 2022
% Result : Theorem 0.47s 0.66s
% Output : Proof 0.54s
% Verified :
% SZS Type : -
% Comments :
%------------------------------------------------------------------------------
%----WARNING: Could not form TPTP format derivation
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% 0.07/0.12 % Problem : SYN451+1 : TPTP v8.1.0. Released v2.1.0.
% 0.07/0.12 % Command : run_super_zenon -p0 -itptp -om -max-time %d %s
% 0.13/0.33 % Computer : n007.cluster.edu
% 0.13/0.33 % Model : x86_64 x86_64
% 0.13/0.33 % CPU : Intel(R) Xeon(R) CPU E5-2620 v4 @ 2.10GHz
% 0.13/0.33 % Memory : 8042.1875MB
% 0.13/0.33 % OS : Linux 3.10.0-693.el7.x86_64
% 0.13/0.33 % CPULimit : 300
% 0.13/0.33 % WCLimit : 600
% 0.13/0.33 % DateTime : Mon Jul 11 23:33:18 EDT 2022
% 0.13/0.33 % CPUTime :
% 0.47/0.66 % SZS status Theorem
% 0.47/0.66 (* PROOF-FOUND *)
% 0.47/0.66 (* BEGIN-PROOF *)
% 0.47/0.66 % SZS output start Proof
% 0.47/0.66 1. (-. (hskp7)) (hskp7) ### P-NotP
% 0.47/0.66 2. (-. (hskp1)) (hskp1) ### P-NotP
% 0.47/0.66 3. (-. (hskp4)) (hskp4) ### P-NotP
% 0.47/0.66 4. ((hskp7) \/ ((hskp1) \/ (hskp4))) (-. (hskp4)) (-. (hskp1)) (-. (hskp7)) ### DisjTree 1 2 3
% 0.47/0.66 5. (-. (hskp0)) (hskp0) ### P-NotP
% 0.47/0.66 6. (-. (hskp8)) (hskp8) ### P-NotP
% 0.47/0.66 7. ((hskp0) \/ (hskp8)) (-. (hskp8)) (-. (hskp0)) ### Or 5 6
% 0.47/0.66 8. (-. (ndr1_0)) (ndr1_0) ### P-NotP
% 0.47/0.66 9. (-. (c1_1 (a744))) (c1_1 (a744)) ### Axiom
% 0.47/0.66 10. (-. (c0_1 (a744))) (c0_1 (a744)) ### Axiom
% 0.47/0.66 11. (-. (c2_1 (a744))) (c2_1 (a744)) ### Axiom
% 0.47/0.66 12. (c3_1 (a744)) (-. (c3_1 (a744))) ### Axiom
% 0.47/0.66 13. ((ndr1_0) => ((c0_1 (a744)) \/ ((c2_1 (a744)) \/ (-. (c3_1 (a744)))))) (c3_1 (a744)) (-. (c2_1 (a744))) (-. (c0_1 (a744))) (ndr1_0) ### DisjTree 8 10 11 12
% 0.47/0.66 14. (All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) (ndr1_0) (-. (c0_1 (a744))) (-. (c2_1 (a744))) (c3_1 (a744)) ### All 13
% 0.47/0.66 15. (c3_1 (a744)) (-. (c3_1 (a744))) ### Axiom
% 0.47/0.66 16. ((ndr1_0) => ((c1_1 (a744)) \/ ((-. (c2_1 (a744))) \/ (-. (c3_1 (a744)))))) (c3_1 (a744)) (-. (c0_1 (a744))) (All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) (-. (c1_1 (a744))) (ndr1_0) ### DisjTree 8 9 14 15
% 0.47/0.66 17. (All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) (ndr1_0) (-. (c1_1 (a744))) (All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) (-. (c0_1 (a744))) (c3_1 (a744)) ### All 16
% 0.47/0.66 18. (-. (hskp5)) (hskp5) ### P-NotP
% 0.47/0.66 19. (-. (hskp20)) (hskp20) ### P-NotP
% 0.47/0.66 20. ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (-. (hskp20)) (-. (hskp5)) (c3_1 (a744)) (-. (c0_1 (a744))) (All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) (-. (c1_1 (a744))) (ndr1_0) ### DisjTree 17 18 19
% 0.47/0.66 21. (-. (hskp6)) (hskp6) ### P-NotP
% 0.47/0.66 22. ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp6) \/ (hskp4))) (-. (hskp4)) (-. (hskp6)) (ndr1_0) (-. (c1_1 (a744))) (-. (c0_1 (a744))) (c3_1 (a744)) (-. (hskp5)) (-. (hskp20)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ### DisjTree 20 21 3
% 0.47/0.66 23. (-. (c0_1 (a744))) (c0_1 (a744)) ### Axiom
% 0.47/0.66 24. (-. (c1_1 (a744))) (c1_1 (a744)) ### Axiom
% 0.47/0.66 25. (c3_1 (a744)) (-. (c3_1 (a744))) ### Axiom
% 0.47/0.66 26. ((ndr1_0) => ((c0_1 (a744)) \/ ((c1_1 (a744)) \/ (-. (c3_1 (a744)))))) (c3_1 (a744)) (-. (c1_1 (a744))) (-. (c0_1 (a744))) (ndr1_0) ### DisjTree 8 23 24 25
% 0.47/0.66 27. (All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) (ndr1_0) (-. (c0_1 (a744))) (-. (c1_1 (a744))) (c3_1 (a744)) ### All 26
% 0.47/0.66 28. (-. (c1_1 (a779))) (c1_1 (a779)) ### Axiom
% 0.47/0.66 29. (c0_1 (a779)) (-. (c0_1 (a779))) ### Axiom
% 0.47/0.66 30. (c2_1 (a779)) (-. (c2_1 (a779))) ### Axiom
% 0.47/0.66 31. ((ndr1_0) => ((c1_1 (a779)) \/ ((-. (c0_1 (a779))) \/ (-. (c2_1 (a779)))))) (c2_1 (a779)) (c0_1 (a779)) (-. (c1_1 (a779))) (ndr1_0) ### DisjTree 8 28 29 30
% 0.47/0.66 32. (All X21, ((ndr1_0) => ((c1_1 X21) \/ ((-. (c0_1 X21)) \/ (-. (c2_1 X21)))))) (ndr1_0) (-. (c1_1 (a779))) (c0_1 (a779)) (c2_1 (a779)) ### All 31
% 0.47/0.66 33. (-. (c1_1 (a779))) (c1_1 (a779)) ### Axiom
% 0.47/0.66 34. (c2_1 (a779)) (-. (c2_1 (a779))) ### Axiom
% 0.47/0.66 35. ((ndr1_0) => ((c0_1 (a779)) \/ ((c1_1 (a779)) \/ (-. (c2_1 (a779)))))) (c2_1 (a779)) (-. (c1_1 (a779))) (All X21, ((ndr1_0) => ((c1_1 X21) \/ ((-. (c0_1 X21)) \/ (-. (c2_1 X21)))))) (ndr1_0) ### DisjTree 8 32 33 34
% 0.47/0.66 36. (All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) (ndr1_0) (All X21, ((ndr1_0) => ((c1_1 X21) \/ ((-. (c0_1 X21)) \/ (-. (c2_1 X21)))))) (-. (c1_1 (a779))) (c2_1 (a779)) ### All 35
% 0.47/0.66 37. ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All X21, ((ndr1_0) => ((c1_1 X21) \/ ((-. (c0_1 X21)) \/ (-. (c2_1 X21)))))) \/ (hskp4))) (-. (hskp4)) (c2_1 (a779)) (-. (c1_1 (a779))) (All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) (c3_1 (a744)) (-. (c1_1 (a744))) (-. (c0_1 (a744))) (ndr1_0) ### DisjTree 27 36 3
% 0.47/0.66 38. (-. (hskp2)) (hskp2) ### P-NotP
% 0.47/0.66 39. ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((hskp1) \/ (hskp2))) (-. (hskp2)) (-. (hskp1)) (ndr1_0) (-. (c0_1 (a744))) (-. (c1_1 (a744))) (c3_1 (a744)) (-. (c1_1 (a779))) (c2_1 (a779)) (-. (hskp4)) ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All X21, ((ndr1_0) => ((c1_1 X21) \/ ((-. (c0_1 X21)) \/ (-. (c2_1 X21)))))) \/ (hskp4))) ### DisjTree 37 2 38
% 0.47/0.66 40. ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779)))))) ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All X21, ((ndr1_0) => ((c1_1 X21) \/ ((-. (c0_1 X21)) \/ (-. (c2_1 X21)))))) \/ (hskp4))) (-. (hskp4)) (c3_1 (a744)) (-. (c1_1 (a744))) (-. (c0_1 (a744))) (ndr1_0) (-. (hskp1)) (-. (hskp2)) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((hskp1) \/ (hskp2))) ### ConjTree 39
% 0.47/0.66 41. ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((hskp1) \/ (hskp2))) (-. (hskp2)) (-. (hskp1)) ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All X21, ((ndr1_0) => ((c1_1 X21) \/ ((-. (c0_1 X21)) \/ (-. (c2_1 X21)))))) \/ (hskp4))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (-. (hskp5)) (c3_1 (a744)) (-. (c0_1 (a744))) (-. (c1_1 (a744))) (ndr1_0) (-. (hskp6)) (-. (hskp4)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp6) \/ (hskp4))) ### Or 22 40
% 0.47/0.66 42. ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744)))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp6) \/ (hskp4))) (-. (hskp4)) (-. (hskp6)) (ndr1_0) (-. (hskp5)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All X21, ((ndr1_0) => ((c1_1 X21) \/ ((-. (c0_1 X21)) \/ (-. (c2_1 X21)))))) \/ (hskp4))) (-. (hskp1)) (-. (hskp2)) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((hskp1) \/ (hskp2))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ### ConjTree 41
% 0.47/0.66 43. ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((hskp1) \/ (hskp2))) (-. (hskp2)) (-. (hskp1)) ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All X21, ((ndr1_0) => ((c1_1 X21) \/ ((-. (c0_1 X21)) \/ (-. (c2_1 X21)))))) \/ (hskp4))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (-. (hskp5)) (ndr1_0) (-. (hskp6)) (-. (hskp4)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp6) \/ (hskp4))) (-. (hskp0)) ((hskp0) \/ (hskp8)) ### Or 7 42
% 0.47/0.66 44. ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741)))))) ((hskp0) \/ (hskp8)) (-. (hskp0)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp6) \/ (hskp4))) (-. (hskp4)) (-. (hskp6)) (-. (hskp5)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All X21, ((ndr1_0) => ((c1_1 X21) \/ ((-. (c0_1 X21)) \/ (-. (c2_1 X21)))))) \/ (hskp4))) (-. (hskp1)) (-. (hskp2)) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((hskp1) \/ (hskp2))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ### ConjTree 43
% 0.47/0.66 45. ((-. (hskp7)) \/ ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741))))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((hskp1) \/ (hskp2))) (-. (hskp2)) ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All X21, ((ndr1_0) => ((c1_1 X21) \/ ((-. (c0_1 X21)) \/ (-. (c2_1 X21)))))) \/ (hskp4))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (-. (hskp5)) (-. (hskp6)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp6) \/ (hskp4))) (-. (hskp0)) ((hskp0) \/ (hskp8)) (-. (hskp1)) (-. (hskp4)) ((hskp7) \/ ((hskp1) \/ (hskp4))) ### Or 4 44
% 0.47/0.66 46. (-. (c0_1 (a738))) (c0_1 (a738)) ### Axiom
% 0.47/0.66 47. (-. (c2_1 (a738))) (c2_1 (a738)) ### Axiom
% 0.47/0.66 48. (c1_1 (a738)) (-. (c1_1 (a738))) ### Axiom
% 0.47/0.66 49. ((ndr1_0) => ((c0_1 (a738)) \/ ((c2_1 (a738)) \/ (-. (c1_1 (a738)))))) (c1_1 (a738)) (-. (c2_1 (a738))) (-. (c0_1 (a738))) (ndr1_0) ### DisjTree 8 46 47 48
% 0.47/0.66 50. (All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) (ndr1_0) (-. (c0_1 (a738))) (-. (c2_1 (a738))) (c1_1 (a738)) ### All 49
% 0.47/0.66 51. (-. (c0_1 (a741))) (c0_1 (a741)) ### Axiom
% 0.47/0.66 52. (c2_1 (a741)) (-. (c2_1 (a741))) ### Axiom
% 0.47/0.66 53. (c3_1 (a741)) (-. (c3_1 (a741))) ### Axiom
% 0.47/0.66 54. ((ndr1_0) => ((c0_1 (a741)) \/ ((-. (c2_1 (a741))) \/ (-. (c3_1 (a741)))))) (c3_1 (a741)) (c2_1 (a741)) (-. (c0_1 (a741))) (ndr1_0) ### DisjTree 8 51 52 53
% 0.47/0.66 55. (All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) (ndr1_0) (-. (c0_1 (a741))) (c2_1 (a741)) (c3_1 (a741)) ### All 54
% 0.47/0.66 56. (c1_1 (a741)) (-. (c1_1 (a741))) ### Axiom
% 0.47/0.66 57. (c3_1 (a741)) (-. (c3_1 (a741))) ### Axiom
% 0.47/0.66 58. ((ndr1_0) => ((c2_1 (a741)) \/ ((-. (c1_1 (a741))) \/ (-. (c3_1 (a741)))))) (c1_1 (a741)) (c3_1 (a741)) (-. (c0_1 (a741))) (All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) (ndr1_0) ### DisjTree 8 55 56 57
% 0.47/0.66 59. (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) (ndr1_0) (All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) (-. (c0_1 (a741))) (c3_1 (a741)) (c1_1 (a741)) ### All 58
% 0.47/0.66 60. (-. (hskp11)) (hskp11) ### P-NotP
% 0.47/0.66 61. ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) (-. (hskp11)) (c1_1 (a741)) (c3_1 (a741)) (-. (c0_1 (a741))) (All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) (c1_1 (a738)) (-. (c2_1 (a738))) (-. (c0_1 (a738))) (ndr1_0) ### DisjTree 50 59 60
% 0.47/0.66 62. (-. (hskp10)) (hskp10) ### P-NotP
% 0.47/0.66 63. ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) (-. (hskp10)) (-. (c0_1 (a741))) (c3_1 (a741)) (c1_1 (a741)) (-. (hskp11)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) (c1_1 (a738)) (-. (c2_1 (a738))) (-. (c0_1 (a738))) (ndr1_0) ### DisjTree 50 61 62
% 0.47/0.66 64. (-. (c0_1 (a749))) (c0_1 (a749)) ### Axiom
% 0.47/0.66 65. (-. (c1_1 (a749))) (c1_1 (a749)) ### Axiom
% 0.47/0.66 66. (-. (c3_1 (a749))) (c3_1 (a749)) ### Axiom
% 0.47/0.66 67. ((ndr1_0) => ((c0_1 (a749)) \/ ((c1_1 (a749)) \/ (c3_1 (a749))))) (-. (c3_1 (a749))) (-. (c1_1 (a749))) (-. (c0_1 (a749))) (ndr1_0) ### DisjTree 8 64 65 66
% 0.47/0.66 68. (All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) (ndr1_0) (-. (c0_1 (a749))) (-. (c1_1 (a749))) (-. (c3_1 (a749))) ### All 67
% 0.47/0.66 69. ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) (-. (hskp5)) (-. (hskp4)) (-. (c3_1 (a749))) (-. (c1_1 (a749))) (-. (c0_1 (a749))) (ndr1_0) ### DisjTree 68 3 18
% 0.47/0.66 70. ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749)))))) (ndr1_0) (-. (hskp4)) (-. (hskp5)) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) ### ConjTree 69
% 0.47/0.66 71. ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) (-. (hskp5)) (-. (hskp4)) (ndr1_0) (-. (c0_1 (a738))) (-. (c2_1 (a738))) (c1_1 (a738)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) (c1_1 (a741)) (c3_1 (a741)) (-. (c0_1 (a741))) (-. (hskp10)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) ### Or 63 70
% 0.47/0.66 72. (-. (c0_1 (a748))) (c0_1 (a748)) ### Axiom
% 0.47/0.66 73. (-. (c1_1 (a748))) (c1_1 (a748)) ### Axiom
% 0.47/0.66 74. (-. (c2_1 (a748))) (c2_1 (a748)) ### Axiom
% 0.47/0.66 75. ((ndr1_0) => ((c0_1 (a748)) \/ ((c1_1 (a748)) \/ (c2_1 (a748))))) (-. (c2_1 (a748))) (-. (c1_1 (a748))) (-. (c0_1 (a748))) (ndr1_0) ### DisjTree 8 72 73 74
% 0.47/0.66 76. (All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) (ndr1_0) (-. (c0_1 (a748))) (-. (c1_1 (a748))) (-. (c2_1 (a748))) ### All 75
% 0.47/0.66 77. ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((hskp0) \/ (hskp1))) (-. (hskp1)) (-. (hskp0)) (-. (c2_1 (a748))) (-. (c1_1 (a748))) (-. (c0_1 (a748))) (ndr1_0) ### DisjTree 76 5 2
% 0.47/0.66 78. ((ndr1_0) /\ ((-. (c0_1 (a748))) /\ ((-. (c1_1 (a748))) /\ (-. (c2_1 (a748)))))) (ndr1_0) (-. (hskp0)) (-. (hskp1)) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((hskp0) \/ (hskp1))) ### ConjTree 77
% 0.47/0.66 79. ((-. (hskp10)) \/ ((ndr1_0) /\ ((-. (c0_1 (a748))) /\ ((-. (c1_1 (a748))) /\ (-. (c2_1 (a748))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((hskp0) \/ (hskp1))) (-. (hskp1)) (-. (hskp0)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) (-. (c0_1 (a741))) (c3_1 (a741)) (c1_1 (a741)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) (c1_1 (a738)) (-. (c2_1 (a738))) (-. (c0_1 (a738))) (ndr1_0) (-. (hskp4)) (-. (hskp5)) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ### Or 71 78
% 0.47/0.66 80. ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741)))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) (-. (hskp5)) (-. (hskp4)) (ndr1_0) (-. (c0_1 (a738))) (-. (c2_1 (a738))) (c1_1 (a738)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) (-. (hskp0)) (-. (hskp1)) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((hskp0) \/ (hskp1))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((-. (c0_1 (a748))) /\ ((-. (c1_1 (a748))) /\ (-. (c2_1 (a748))))))) ### ConjTree 79
% 0.47/0.66 81. ((-. (hskp7)) \/ ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((-. (c0_1 (a748))) /\ ((-. (c1_1 (a748))) /\ (-. (c2_1 (a748))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((hskp0) \/ (hskp1))) (-. (hskp0)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) (c1_1 (a738)) (-. (c2_1 (a738))) (-. (c0_1 (a738))) (ndr1_0) (-. (hskp5)) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) (-. (hskp1)) (-. (hskp4)) ((hskp7) \/ ((hskp1) \/ (hskp4))) ### Or 4 80
% 0.47/0.66 82. ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738)))))) ((hskp7) \/ ((hskp1) \/ (hskp4))) (-. (hskp4)) (-. (hskp1)) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) (-. (hskp5)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) (-. (hskp0)) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((hskp0) \/ (hskp1))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((-. (c0_1 (a748))) /\ ((-. (c1_1 (a748))) /\ (-. (c2_1 (a748))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741))))))) ### ConjTree 81
% 0.47/0.66 83. ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((-. (c0_1 (a748))) /\ ((-. (c1_1 (a748))) /\ (-. (c2_1 (a748))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((hskp0) \/ (hskp1))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((hskp7) \/ ((hskp1) \/ (hskp4))) (-. (hskp4)) (-. (hskp1)) ((hskp0) \/ (hskp8)) (-. (hskp0)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp6) \/ (hskp4))) (-. (hskp5)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All X21, ((ndr1_0) => ((c1_1 X21) \/ ((-. (c0_1 X21)) \/ (-. (c2_1 X21)))))) \/ (hskp4))) (-. (hskp2)) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((hskp1) \/ (hskp2))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741))))))) ### Or 45 82
% 0.47/0.66 84. (-. (hskp23)) (hskp23) ### P-NotP
% 0.47/0.66 85. (-. (hskp24)) (hskp24) ### P-NotP
% 0.47/0.66 86. (-. (hskp13)) (hskp13) ### P-NotP
% 0.47/0.66 87. ((hskp23) \/ ((hskp24) \/ (hskp13))) (-. (hskp13)) (-. (hskp24)) (-. (hskp23)) ### DisjTree 84 85 86
% 0.47/0.66 88. (-. (c2_1 (a802))) (c2_1 (a802)) ### Axiom
% 0.47/0.66 89. (-. (c3_1 (a802))) (c3_1 (a802)) ### Axiom
% 0.47/0.66 90. (c0_1 (a802)) (-. (c0_1 (a802))) ### Axiom
% 0.47/0.66 91. ((ndr1_0) => ((c2_1 (a802)) \/ ((c3_1 (a802)) \/ (-. (c0_1 (a802)))))) (c0_1 (a802)) (-. (c3_1 (a802))) (-. (c2_1 (a802))) (ndr1_0) ### DisjTree 8 88 89 90
% 0.47/0.66 92. (All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) (ndr1_0) (-. (c2_1 (a802))) (-. (c3_1 (a802))) (c0_1 (a802)) ### All 91
% 0.47/0.66 93. (-. (hskp25)) (hskp25) ### P-NotP
% 0.47/0.66 94. (-. (hskp9)) (hskp9) ### P-NotP
% 0.47/0.66 95. ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp9)) (-. (hskp25)) (c0_1 (a802)) (-. (c3_1 (a802))) (-. (c2_1 (a802))) (ndr1_0) ### DisjTree 92 93 94
% 0.47/0.66 96. (c0_1 (a729)) (-. (c0_1 (a729))) ### Axiom
% 0.47/0.66 97. (c2_1 (a729)) (-. (c2_1 (a729))) ### Axiom
% 0.47/0.66 98. (c3_1 (a729)) (-. (c3_1 (a729))) ### Axiom
% 0.47/0.66 99. ((ndr1_0) => ((-. (c0_1 (a729))) \/ ((-. (c2_1 (a729))) \/ (-. (c3_1 (a729)))))) (c3_1 (a729)) (c2_1 (a729)) (c0_1 (a729)) (ndr1_0) ### DisjTree 8 96 97 98
% 0.47/0.66 100. (All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) (ndr1_0) (c0_1 (a729)) (c2_1 (a729)) (c3_1 (a729)) ### All 99
% 0.47/0.66 101. (-. (hskp21)) (hskp21) ### P-NotP
% 0.47/0.66 102. ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (-. (hskp21)) (c3_1 (a729)) (c2_1 (a729)) (c0_1 (a729)) (ndr1_0) ### Or 100 101
% 0.47/0.66 103. ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729))))) (ndr1_0) (-. (hskp21)) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ### ConjTree 102
% 0.47/0.66 104. ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (-. (hskp21)) (ndr1_0) (-. (c2_1 (a802))) (-. (c3_1 (a802))) (c0_1 (a802)) (-. (hskp9)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ### Or 95 103
% 0.47/0.66 105. ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802)))))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp9)) (ndr1_0) (-. (hskp21)) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ### ConjTree 104
% 0.47/0.66 106. ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (-. (hskp21)) (ndr1_0) (-. (hskp9)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp23)) (-. (hskp13)) ((hskp23) \/ ((hskp24) \/ (hskp13))) ### Or 87 105
% 0.47/0.66 107. (-. (c3_1 (a798))) (c3_1 (a798)) ### Axiom
% 0.47/0.66 108. (c0_1 (a798)) (-. (c0_1 (a798))) ### Axiom
% 0.47/0.66 109. (c1_1 (a798)) (-. (c1_1 (a798))) ### Axiom
% 0.47/0.66 110. ((ndr1_0) => ((c3_1 (a798)) \/ ((-. (c0_1 (a798))) \/ (-. (c1_1 (a798)))))) (c1_1 (a798)) (c0_1 (a798)) (-. (c3_1 (a798))) (ndr1_0) ### DisjTree 8 107 108 109
% 0.47/0.66 111. (All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) (ndr1_0) (-. (c3_1 (a798))) (c0_1 (a798)) (c1_1 (a798)) ### All 110
% 0.47/0.66 112. (-. (hskp18)) (hskp18) ### P-NotP
% 0.47/0.66 113. ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) (-. (hskp11)) (-. (hskp18)) (c1_1 (a798)) (c0_1 (a798)) (-. (c3_1 (a798))) (ndr1_0) ### DisjTree 111 112 60
% 0.47/0.66 114. ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798)))))) (ndr1_0) (-. (hskp18)) (-. (hskp11)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ### ConjTree 113
% 0.47/0.66 115. ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) (-. (hskp11)) (-. (hskp18)) ((hskp23) \/ ((hskp24) \/ (hskp13))) (-. (hskp13)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp9)) (ndr1_0) (-. (hskp21)) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ### Or 106 114
% 0.47/0.66 116. (-. (c0_1 (a735))) (c0_1 (a735)) ### Axiom
% 0.47/0.66 117. (c2_1 (a735)) (-. (c2_1 (a735))) ### Axiom
% 0.47/0.66 118. (c3_1 (a735)) (-. (c3_1 (a735))) ### Axiom
% 0.47/0.66 119. ((ndr1_0) => ((c0_1 (a735)) \/ ((-. (c2_1 (a735))) \/ (-. (c3_1 (a735)))))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (ndr1_0) ### DisjTree 8 116 117 118
% 0.47/0.66 120. (All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) (ndr1_0) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) ### All 119
% 0.47/0.66 121. (-. (c2_1 (a793))) (c2_1 (a793)) ### Axiom
% 0.47/0.66 122. (c0_1 (a793)) (-. (c0_1 (a793))) ### Axiom
% 0.47/0.66 123. (c3_1 (a793)) (-. (c3_1 (a793))) ### Axiom
% 0.47/0.66 124. ((ndr1_0) => ((c2_1 (a793)) \/ ((-. (c0_1 (a793))) \/ (-. (c3_1 (a793)))))) (c3_1 (a793)) (c0_1 (a793)) (-. (c2_1 (a793))) (ndr1_0) ### DisjTree 8 121 122 123
% 0.47/0.66 125. (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))) (ndr1_0) (-. (c2_1 (a793))) (c0_1 (a793)) (c3_1 (a793)) ### All 124
% 0.47/0.66 126. ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c3_1 (a793)) (c0_1 (a793)) (-. (c2_1 (a793))) (c3_1 (a744)) (-. (c0_1 (a744))) (All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) (-. (c1_1 (a744))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (ndr1_0) ### DisjTree 120 17 125
% 0.47/0.66 127. (c1_1 (a735)) (-. (c1_1 (a735))) ### Axiom
% 0.47/0.66 128. (c2_1 (a735)) (-. (c2_1 (a735))) ### Axiom
% 0.47/0.66 129. (c3_1 (a735)) (-. (c3_1 (a735))) ### Axiom
% 0.47/0.66 130. ((ndr1_0) => ((-. (c1_1 (a735))) \/ ((-. (c2_1 (a735))) \/ (-. (c3_1 (a735)))))) (c3_1 (a735)) (c2_1 (a735)) (c1_1 (a735)) (ndr1_0) ### DisjTree 8 127 128 129
% 0.47/0.66 131. (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))) (ndr1_0) (c1_1 (a735)) (c2_1 (a735)) (c3_1 (a735)) ### All 130
% 0.47/0.66 132. (c2_1 (a735)) (-. (c2_1 (a735))) ### Axiom
% 0.47/0.66 133. (c3_1 (a735)) (-. (c3_1 (a735))) ### Axiom
% 0.47/0.66 134. ((ndr1_0) => ((c1_1 (a735)) \/ ((-. (c2_1 (a735))) \/ (-. (c3_1 (a735)))))) (c3_1 (a735)) (c2_1 (a735)) (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))) (ndr1_0) ### DisjTree 8 131 132 133
% 0.47/0.66 135. (All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) (ndr1_0) (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))) (c2_1 (a735)) (c3_1 (a735)) ### All 134
% 0.47/0.66 136. ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c3_1 (a793)) (c0_1 (a793)) (-. (c2_1 (a793))) (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (ndr1_0) ### DisjTree 120 135 125
% 0.47/0.66 137. ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) (ndr1_0) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) (-. (c1_1 (a744))) (-. (c0_1 (a744))) (c3_1 (a744)) (-. (c2_1 (a793))) (c0_1 (a793)) (c3_1 (a793)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ### DisjTree 126 120 136
% 0.47/0.66 138. ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793)))))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c3_1 (a744)) (-. (c0_1 (a744))) (-. (c1_1 (a744))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (ndr1_0) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ### ConjTree 137
% 0.47/0.66 139. ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) (-. (c1_1 (a744))) (-. (c0_1 (a744))) (c3_1 (a744)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (ndr1_0) (-. (hskp9)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp13)) ((hskp23) \/ ((hskp24) \/ (hskp13))) (-. (hskp18)) (-. (hskp11)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ### Or 115 138
% 0.47/0.66 140. (-. (c2_1 (a775))) (c2_1 (a775)) ### Axiom
% 0.47/0.66 141. (-. (c3_1 (a775))) (c3_1 (a775)) ### Axiom
% 0.47/0.66 142. (c0_1 (a775)) (-. (c0_1 (a775))) ### Axiom
% 0.47/0.66 143. ((ndr1_0) => ((c2_1 (a775)) \/ ((c3_1 (a775)) \/ (-. (c0_1 (a775)))))) (c0_1 (a775)) (-. (c3_1 (a775))) (-. (c2_1 (a775))) (ndr1_0) ### DisjTree 8 140 141 142
% 0.47/0.66 144. (All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) (ndr1_0) (-. (c2_1 (a775))) (-. (c3_1 (a775))) (c0_1 (a775)) ### All 143
% 0.47/0.66 145. (-. (c3_1 (a775))) (c3_1 (a775)) ### Axiom
% 0.47/0.66 146. (c1_1 (a775)) (-. (c1_1 (a775))) ### Axiom
% 0.47/0.66 147. ((ndr1_0) => ((c0_1 (a775)) \/ ((c3_1 (a775)) \/ (-. (c1_1 (a775)))))) (c1_1 (a775)) (-. (c3_1 (a775))) (-. (c2_1 (a775))) (All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) (ndr1_0) ### DisjTree 8 144 145 146
% 0.47/0.66 148. (All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) (ndr1_0) (All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) (-. (c2_1 (a775))) (-. (c3_1 (a775))) (c1_1 (a775)) ### All 147
% 0.47/0.66 149. ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp9)) (-. (hskp25)) (c1_1 (a775)) (-. (c3_1 (a775))) (-. (c2_1 (a775))) (ndr1_0) (All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) ### DisjTree 148 93 94
% 0.47/0.66 150. ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) (-. (hskp0)) (ndr1_0) (-. (c2_1 (a775))) (-. (c3_1 (a775))) (c1_1 (a775)) (-. (hskp25)) (-. (hskp9)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ### DisjTree 149 5 94
% 0.47/0.66 151. ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (-. (hskp21)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp9)) (c1_1 (a775)) (-. (c3_1 (a775))) (-. (c2_1 (a775))) (ndr1_0) (-. (hskp0)) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ### Or 150 103
% 0.47/0.66 152. ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) (-. (c1_1 (a744))) (-. (c0_1 (a744))) (c3_1 (a744)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) (-. (hskp0)) (ndr1_0) (-. (c2_1 (a775))) (-. (c3_1 (a775))) (c1_1 (a775)) (-. (hskp9)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ### Or 151 138
% 0.47/0.66 153. ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775)))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp9)) (ndr1_0) (-. (hskp0)) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c3_1 (a744)) (-. (c0_1 (a744))) (-. (c1_1 (a744))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ### ConjTree 152
% 0.47/0.66 154. ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) (-. (hskp0)) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) (-. (hskp11)) ((hskp23) \/ ((hskp24) \/ (hskp13))) (-. (hskp13)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp9)) (ndr1_0) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c3_1 (a744)) (-. (c0_1 (a744))) (-. (c1_1 (a744))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ### Or 139 153
% 0.47/0.66 155. (-. (c0_1 (a759))) (c0_1 (a759)) ### Axiom
% 0.47/0.66 156. (-. (c1_1 (a759))) (c1_1 (a759)) ### Axiom
% 0.47/0.66 157. (c2_1 (a759)) (-. (c2_1 (a759))) ### Axiom
% 0.47/0.66 158. ((ndr1_0) => ((c0_1 (a759)) \/ ((c1_1 (a759)) \/ (-. (c2_1 (a759)))))) (c2_1 (a759)) (-. (c1_1 (a759))) (-. (c0_1 (a759))) (ndr1_0) ### DisjTree 8 155 156 157
% 0.47/0.66 159. (All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) (ndr1_0) (-. (c0_1 (a759))) (-. (c1_1 (a759))) (c2_1 (a759)) ### All 158
% 0.47/0.66 160. (c2_1 (a759)) (-. (c2_1 (a759))) ### Axiom
% 0.47/0.66 161. (c3_1 (a759)) (-. (c3_1 (a759))) ### Axiom
% 0.47/0.66 162. ((ndr1_0) => ((-. (c0_1 (a759))) \/ ((-. (c2_1 (a759))) \/ (-. (c3_1 (a759)))))) (c3_1 (a759)) (c2_1 (a759)) (-. (c1_1 (a759))) (All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) (ndr1_0) ### DisjTree 8 159 160 161
% 0.47/0.66 163. (All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) (ndr1_0) (All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) (-. (c1_1 (a759))) (c2_1 (a759)) (c3_1 (a759)) ### All 162
% 0.47/0.66 164. ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (-. (hskp21)) (c3_1 (a759)) (c2_1 (a759)) (-. (c1_1 (a759))) (All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) (ndr1_0) ### Or 163 101
% 0.47/0.66 165. ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((hskp1) \/ (hskp2))) (-. (hskp2)) (-. (hskp1)) (ndr1_0) (-. (c1_1 (a759))) (c2_1 (a759)) (c3_1 (a759)) (-. (hskp21)) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ### DisjTree 164 2 38
% 0.47/0.66 166. ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) (-. (c1_1 (a744))) (-. (c0_1 (a744))) (c3_1 (a744)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (c3_1 (a759)) (c2_1 (a759)) (-. (c1_1 (a759))) (ndr1_0) (-. (hskp1)) (-. (hskp2)) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((hskp1) \/ (hskp2))) ### Or 165 138
% 0.47/0.66 167. ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759)))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((hskp1) \/ (hskp2))) (-. (hskp2)) (-. (hskp1)) (ndr1_0) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c3_1 (a744)) (-. (c0_1 (a744))) (-. (c1_1 (a744))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ### ConjTree 166
% 0.47/0.66 168. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) (-. (hskp1)) (-. (hskp2)) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((hskp1) \/ (hskp2))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) (-. (c1_1 (a744))) (-. (c0_1 (a744))) (c3_1 (a744)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (ndr1_0) (-. (hskp9)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((hskp23) \/ ((hskp24) \/ (hskp13))) (-. (hskp11)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) (-. (hskp0)) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ### Or 154 167
% 0.47/0.66 169. (-. (c0_1 (a744))) (c0_1 (a744)) ### Axiom
% 0.47/0.66 170. (-. (c0_1 (a744))) (c0_1 (a744)) ### Axiom
% 0.47/0.66 171. (-. (c1_1 (a744))) (c1_1 (a744)) ### Axiom
% 0.47/0.66 172. (c2_1 (a744)) (-. (c2_1 (a744))) ### Axiom
% 0.47/0.66 173. ((ndr1_0) => ((c0_1 (a744)) \/ ((c1_1 (a744)) \/ (-. (c2_1 (a744)))))) (c2_1 (a744)) (-. (c1_1 (a744))) (-. (c0_1 (a744))) (ndr1_0) ### DisjTree 8 170 171 172
% 0.47/0.66 174. (All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) (ndr1_0) (-. (c0_1 (a744))) (-. (c1_1 (a744))) (c2_1 (a744)) ### All 173
% 0.47/0.66 175. (c3_1 (a744)) (-. (c3_1 (a744))) ### Axiom
% 0.47/0.66 176. ((ndr1_0) => ((c0_1 (a744)) \/ ((c2_1 (a744)) \/ (-. (c3_1 (a744)))))) (c3_1 (a744)) (-. (c1_1 (a744))) (All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) (-. (c0_1 (a744))) (ndr1_0) ### DisjTree 8 169 174 175
% 0.47/0.66 177. (All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) (ndr1_0) (-. (c0_1 (a744))) (All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) (-. (c1_1 (a744))) (c3_1 (a744)) ### All 176
% 0.47/0.66 178. ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((hskp1) \/ (hskp2))) (-. (hskp2)) (-. (hskp1)) (c3_1 (a744)) (-. (c1_1 (a744))) (-. (c0_1 (a744))) (ndr1_0) (All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) ### DisjTree 177 2 38
% 0.47/0.66 179. ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ (hskp2))) (-. (c0_1 (a744))) (-. (c1_1 (a744))) (c3_1 (a744)) (-. (hskp1)) (-. (hskp2)) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((hskp1) \/ (hskp2))) (-. (c3_1 (a749))) (-. (c1_1 (a749))) (-. (c0_1 (a749))) (ndr1_0) ### DisjTree 68 178 38
% 0.47/0.66 180. ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749)))))) (ndr1_0) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((hskp1) \/ (hskp2))) (-. (hskp2)) (-. (hskp1)) (c3_1 (a744)) (-. (c1_1 (a744))) (-. (c0_1 (a744))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ (hskp2))) ### ConjTree 179
% 0.47/0.66 181. ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ (hskp2))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) (-. (hskp0)) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((hskp23) \/ ((hskp24) \/ (hskp13))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp9)) (ndr1_0) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c3_1 (a744)) (-. (c0_1 (a744))) (-. (c1_1 (a744))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((hskp1) \/ (hskp2))) (-. (hskp2)) (-. (hskp1)) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ### Or 168 180
% 0.47/0.66 182. (-. (c0_1 (a746))) (c0_1 (a746)) ### Axiom
% 0.47/0.66 183. (-. (c2_1 (a746))) (c2_1 (a746)) ### Axiom
% 0.47/0.66 184. (c3_1 (a746)) (-. (c3_1 (a746))) ### Axiom
% 0.47/0.66 185. ((ndr1_0) => ((c0_1 (a746)) \/ ((c2_1 (a746)) \/ (-. (c3_1 (a746)))))) (c3_1 (a746)) (-. (c2_1 (a746))) (-. (c0_1 (a746))) (ndr1_0) ### DisjTree 8 182 183 184
% 0.47/0.66 186. (All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) (ndr1_0) (-. (c0_1 (a746))) (-. (c2_1 (a746))) (c3_1 (a746)) ### All 185
% 0.47/0.66 187. ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) (-. (hskp6)) (-. (hskp25)) (c3_1 (a746)) (-. (c2_1 (a746))) (-. (c0_1 (a746))) (ndr1_0) ### DisjTree 186 93 21
% 0.47/0.66 188. ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (-. (hskp21)) (ndr1_0) (-. (c0_1 (a746))) (-. (c2_1 (a746))) (c3_1 (a746)) (-. (hskp6)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) ### Or 187 103
% 0.47/0.66 189. ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) (-. (c1_1 (a744))) (-. (c0_1 (a744))) (c3_1 (a744)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) (-. (hskp6)) (c3_1 (a746)) (-. (c2_1 (a746))) (-. (c0_1 (a746))) (ndr1_0) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ### Or 188 138
% 0.47/0.66 190. ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746)))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (ndr1_0) (-. (hskp6)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c3_1 (a744)) (-. (c0_1 (a744))) (-. (c1_1 (a744))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ### ConjTree 189
% 0.47/0.66 191. ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) (-. (hskp6)) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) (-. (hskp1)) (-. (hskp2)) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((hskp1) \/ (hskp2))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) (-. (c1_1 (a744))) (-. (c0_1 (a744))) (c3_1 (a744)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (ndr1_0) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((hskp23) \/ ((hskp24) \/ (hskp13))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) (-. (hskp0)) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ (hskp2))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ### Or 181 190
% 0.47/0.66 192. ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744)))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ (hskp2))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) (-. (hskp0)) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((hskp23) \/ ((hskp24) \/ (hskp13))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (ndr1_0) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((hskp1) \/ (hskp2))) (-. (hskp2)) (-. (hskp1)) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) (-. (hskp6)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ### ConjTree 191
% 0.47/0.66 193. ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) (-. (hskp6)) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) (-. (hskp1)) (-. (hskp2)) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((hskp1) \/ (hskp2))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (ndr1_0) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((hskp23) \/ ((hskp24) \/ (hskp13))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ (hskp2))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) (-. (hskp0)) ((hskp0) \/ (hskp8)) ### Or 7 192
% 0.47/0.66 194. ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) (-. (hskp10)) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (c1_1 (a738)) (-. (c2_1 (a738))) (-. (c0_1 (a738))) (ndr1_0) ### DisjTree 50 120 62
% 0.47/0.66 195. ((-. (hskp10)) \/ ((ndr1_0) /\ ((-. (c0_1 (a748))) /\ ((-. (c1_1 (a748))) /\ (-. (c2_1 (a748))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((hskp0) \/ (hskp1))) (-. (hskp1)) (-. (hskp0)) (ndr1_0) (-. (c0_1 (a738))) (-. (c2_1 (a738))) (c1_1 (a738)) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) ### Or 194 78
% 0.47/0.66 196. ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738)))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (ndr1_0) (-. (hskp0)) (-. (hskp1)) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((hskp0) \/ (hskp1))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((-. (c0_1 (a748))) /\ ((-. (c1_1 (a748))) /\ (-. (c2_1 (a748))))))) ### ConjTree 195
% 0.47/0.66 197. ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((-. (c0_1 (a748))) /\ ((-. (c1_1 (a748))) /\ (-. (c2_1 (a748))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((hskp0) \/ (hskp1))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) ((hskp0) \/ (hskp8)) (-. (hskp0)) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ (hskp2))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((hskp23) \/ ((hskp24) \/ (hskp13))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (ndr1_0) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((hskp1) \/ (hskp2))) (-. (hskp2)) (-. (hskp1)) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ### Or 193 196
% 0.47/0.66 198. ((ndr1_0) /\ ((c2_1 (a735)) /\ ((c3_1 (a735)) /\ (-. (c0_1 (a735)))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) (-. (hskp1)) (-. (hskp2)) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((hskp1) \/ (hskp2))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((hskp23) \/ ((hskp24) \/ (hskp13))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ (hskp2))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) (-. (hskp0)) ((hskp0) \/ (hskp8)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((hskp0) \/ (hskp1))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((-. (c0_1 (a748))) /\ ((-. (c1_1 (a748))) /\ (-. (c2_1 (a748))))))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738))))))) ### ConjTree 197
% 0.47/0.66 199. ((-. (hskp5)) \/ ((ndr1_0) /\ ((c2_1 (a735)) /\ ((c3_1 (a735)) /\ (-. (c0_1 (a735))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ (hskp2))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((hskp23) \/ ((hskp24) \/ (hskp13))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741))))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((hskp1) \/ (hskp2))) (-. (hskp2)) ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All X21, ((ndr1_0) => ((c1_1 X21) \/ ((-. (c0_1 X21)) \/ (-. (c2_1 X21)))))) \/ (hskp4))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp6) \/ (hskp4))) (-. (hskp0)) ((hskp0) \/ (hskp8)) (-. (hskp1)) (-. (hskp4)) ((hskp7) \/ ((hskp1) \/ (hskp4))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((hskp0) \/ (hskp1))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((-. (c0_1 (a748))) /\ ((-. (c1_1 (a748))) /\ (-. (c2_1 (a748))))))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738))))))) ### Or 83 198
% 0.47/0.67 200. (-. (c0_1 (a734))) (c0_1 (a734)) ### Axiom
% 0.47/0.67 201. (-. (c0_1 (a734))) (c0_1 (a734)) ### Axiom
% 0.47/0.67 202. (-. (c3_1 (a734))) (c3_1 (a734)) ### Axiom
% 0.47/0.67 203. (c2_1 (a734)) (-. (c2_1 (a734))) ### Axiom
% 0.47/0.67 204. ((ndr1_0) => ((c0_1 (a734)) \/ ((c3_1 (a734)) \/ (-. (c2_1 (a734)))))) (c2_1 (a734)) (-. (c3_1 (a734))) (-. (c0_1 (a734))) (ndr1_0) ### DisjTree 8 201 202 203
% 0.47/0.67 205. (All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) (ndr1_0) (-. (c0_1 (a734))) (-. (c3_1 (a734))) (c2_1 (a734)) ### All 204
% 0.47/0.67 206. (c1_1 (a734)) (-. (c1_1 (a734))) ### Axiom
% 0.47/0.67 207. ((ndr1_0) => ((c0_1 (a734)) \/ ((c2_1 (a734)) \/ (-. (c1_1 (a734)))))) (c1_1 (a734)) (-. (c3_1 (a734))) (All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) (-. (c0_1 (a734))) (ndr1_0) ### DisjTree 8 200 205 206
% 0.47/0.67 208. (All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) (ndr1_0) (-. (c0_1 (a734))) (All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) (-. (c3_1 (a734))) (c1_1 (a734)) ### All 207
% 0.47/0.67 209. (-. (c0_1 (a734))) (c0_1 (a734)) ### Axiom
% 0.47/0.67 210. (-. (c3_1 (a734))) (c3_1 (a734)) ### Axiom
% 0.47/0.67 211. (c1_1 (a734)) (-. (c1_1 (a734))) ### Axiom
% 0.47/0.67 212. ((ndr1_0) => ((c0_1 (a734)) \/ ((c3_1 (a734)) \/ (-. (c1_1 (a734)))))) (c1_1 (a734)) (-. (c3_1 (a734))) (-. (c0_1 (a734))) (ndr1_0) ### DisjTree 8 209 210 211
% 0.47/0.67 213. (All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) (ndr1_0) (-. (c0_1 (a734))) (-. (c3_1 (a734))) (c1_1 (a734)) ### All 212
% 0.47/0.67 214. ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) (-. (hskp5)) (c1_1 (a734)) (-. (c3_1 (a734))) (All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) (-. (c0_1 (a734))) (ndr1_0) ### DisjTree 208 213 18
% 0.47/0.67 215. ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp7))) (-. (hskp7)) (-. (c0_1 (a734))) (-. (c3_1 (a734))) (c1_1 (a734)) (-. (hskp5)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) (c3_1 (a744)) (-. (c1_1 (a744))) (-. (c0_1 (a744))) (ndr1_0) ### DisjTree 27 214 1
% 0.47/0.67 216. ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744)))))) (ndr1_0) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) (-. (hskp5)) (c1_1 (a734)) (-. (c3_1 (a734))) (-. (c0_1 (a734))) (-. (hskp7)) ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp7))) ### ConjTree 215
% 0.47/0.67 217. ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp7))) (-. (hskp7)) (-. (c0_1 (a734))) (-. (c3_1 (a734))) (c1_1 (a734)) (-. (hskp5)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) (ndr1_0) (-. (hskp0)) ((hskp0) \/ (hskp8)) ### Or 7 216
% 0.47/0.67 218. ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) (-. (hskp9)) (-. (hskp0)) (c1_1 (a734)) (-. (c3_1 (a734))) (-. (c0_1 (a734))) (ndr1_0) ### DisjTree 213 5 94
% 0.47/0.67 219. (-. (c0_1 (a741))) (c0_1 (a741)) ### Axiom
% 0.47/0.67 220. (c1_1 (a741)) (-. (c1_1 (a741))) ### Axiom
% 0.47/0.67 221. (c3_1 (a741)) (-. (c3_1 (a741))) ### Axiom
% 0.47/0.67 222. ((ndr1_0) => ((c0_1 (a741)) \/ ((-. (c1_1 (a741))) \/ (-. (c3_1 (a741)))))) (c3_1 (a741)) (c1_1 (a741)) (-. (c0_1 (a741))) (ndr1_0) ### DisjTree 8 219 220 221
% 0.47/0.67 223. (All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) (ndr1_0) (-. (c0_1 (a741))) (c1_1 (a741)) (c3_1 (a741)) ### All 222
% 0.47/0.67 224. (-. (c2_1 (a793))) (c2_1 (a793)) ### Axiom
% 0.47/0.67 225. (-. (c1_1 (a793))) (c1_1 (a793)) ### Axiom
% 0.47/0.67 226. (-. (c2_1 (a793))) (c2_1 (a793)) ### Axiom
% 0.47/0.67 227. (c0_1 (a793)) (-. (c0_1 (a793))) ### Axiom
% 0.47/0.67 228. ((ndr1_0) => ((c1_1 (a793)) \/ ((c2_1 (a793)) \/ (-. (c0_1 (a793)))))) (c0_1 (a793)) (-. (c2_1 (a793))) (-. (c1_1 (a793))) (ndr1_0) ### DisjTree 8 225 226 227
% 0.47/0.67 229. (All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) (ndr1_0) (-. (c1_1 (a793))) (-. (c2_1 (a793))) (c0_1 (a793)) ### All 228
% 0.47/0.67 230. (c3_1 (a793)) (-. (c3_1 (a793))) ### Axiom
% 0.47/0.67 231. ((ndr1_0) => ((c2_1 (a793)) \/ ((-. (c1_1 (a793))) \/ (-. (c3_1 (a793)))))) (c3_1 (a793)) (c0_1 (a793)) (All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) (-. (c2_1 (a793))) (ndr1_0) ### DisjTree 8 224 229 230
% 0.47/0.67 232. (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) (ndr1_0) (-. (c2_1 (a793))) (All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) (c0_1 (a793)) (c3_1 (a793)) ### All 231
% 0.47/0.67 233. ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) \/ (hskp2))) (-. (hskp2)) (c3_1 (a793)) (c0_1 (a793)) (-. (c2_1 (a793))) (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) (c3_1 (a741)) (c1_1 (a741)) (-. (c0_1 (a741))) (ndr1_0) ### DisjTree 223 232 38
% 0.47/0.67 234. ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) (-. (c2_1 (a793))) (c0_1 (a793)) (c3_1 (a793)) (-. (hskp2)) ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) \/ (hskp2))) (c3_1 (a741)) (c1_1 (a741)) (-. (c0_1 (a741))) (c3_1 (a746)) (-. (c2_1 (a746))) (-. (c0_1 (a746))) (ndr1_0) ### DisjTree 186 223 233
% 0.47/0.67 235. ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793)))))) (ndr1_0) (-. (c0_1 (a746))) (-. (c2_1 (a746))) (c3_1 (a746)) (-. (c0_1 (a741))) (c1_1 (a741)) (c3_1 (a741)) ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) \/ (hskp2))) (-. (hskp2)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ### ConjTree 234
% 0.47/0.67 236. ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) (-. (hskp2)) ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) \/ (hskp2))) (c3_1 (a741)) (c1_1 (a741)) (-. (c0_1 (a741))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) (-. (hskp6)) (c3_1 (a746)) (-. (c2_1 (a746))) (-. (c0_1 (a746))) (ndr1_0) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ### Or 188 235
% 0.47/0.67 237. ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746)))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (ndr1_0) (-. (hskp6)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) (-. (c0_1 (a741))) (c1_1 (a741)) (c3_1 (a741)) ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) \/ (hskp2))) (-. (hskp2)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ### ConjTree 236
% 0.47/0.67 238. ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) (-. (hskp2)) ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) \/ (hskp2))) (c3_1 (a741)) (c1_1 (a741)) (-. (c0_1 (a741))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) (-. (hskp6)) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) (ndr1_0) (-. (c0_1 (a734))) (-. (c3_1 (a734))) (c1_1 (a734)) (-. (hskp0)) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ### Or 218 237
% 0.47/0.67 239. ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741)))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) (-. (hskp0)) (c1_1 (a734)) (-. (c3_1 (a734))) (-. (c0_1 (a734))) (ndr1_0) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (-. (hskp6)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) \/ (hskp2))) (-. (hskp2)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ### ConjTree 238
% 0.47/0.67 240. ((-. (hskp7)) \/ ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) (-. (hskp2)) ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) \/ (hskp2))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) (-. (hskp6)) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ((hskp0) \/ (hskp8)) (-. (hskp0)) (ndr1_0) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) (-. (hskp5)) (c1_1 (a734)) (-. (c3_1 (a734))) (-. (c0_1 (a734))) ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp7))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ### Or 217 239
% 0.47/0.67 241. ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) (-. (hskp5)) (c1_1 (a734)) (-. (c3_1 (a734))) (-. (c0_1 (a734))) (c1_1 (a738)) (-. (c2_1 (a738))) (-. (c0_1 (a738))) (ndr1_0) ### DisjTree 50 213 18
% 0.47/0.67 242. ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738)))))) (ndr1_0) (-. (c0_1 (a734))) (-. (c3_1 (a734))) (c1_1 (a734)) (-. (hskp5)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) ### ConjTree 241
% 0.47/0.67 243. ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738))))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp7))) (-. (c0_1 (a734))) (-. (c3_1 (a734))) (c1_1 (a734)) (-. (hskp5)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) (ndr1_0) (-. (hskp0)) ((hskp0) \/ (hskp8)) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) \/ (hskp2))) (-. (hskp2)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741))))))) ### Or 240 242
% 0.47/0.67 244. ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) (-. (c1_1 (a744))) (-. (c0_1 (a744))) (c3_1 (a744)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) (-. (hskp6)) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) (ndr1_0) (-. (c0_1 (a734))) (-. (c3_1 (a734))) (c1_1 (a734)) (-. (hskp0)) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ### Or 218 190
% 0.47/0.67 245. ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744)))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) (-. (hskp0)) (c1_1 (a734)) (-. (c3_1 (a734))) (-. (c0_1 (a734))) (ndr1_0) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (-. (hskp6)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ### ConjTree 244
% 0.47/0.67 246. ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) (-. (hskp6)) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) (ndr1_0) (-. (c0_1 (a734))) (-. (c3_1 (a734))) (c1_1 (a734)) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) (-. (hskp0)) ((hskp0) \/ (hskp8)) ### Or 7 245
% 0.47/0.67 247. ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((-. (c0_1 (a748))) /\ ((-. (c1_1 (a748))) /\ (-. (c2_1 (a748))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((hskp0) \/ (hskp1))) (-. (hskp1)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) ((hskp0) \/ (hskp8)) (-. (hskp0)) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) (c1_1 (a734)) (-. (c3_1 (a734))) (-. (c0_1 (a734))) (ndr1_0) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ### Or 246 196
% 0.47/0.67 248. ((ndr1_0) /\ ((c2_1 (a735)) /\ ((c3_1 (a735)) /\ (-. (c0_1 (a735)))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) (ndr1_0) (-. (c0_1 (a734))) (-. (c3_1 (a734))) (c1_1 (a734)) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) (-. (hskp0)) ((hskp0) \/ (hskp8)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) (-. (hskp1)) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((hskp0) \/ (hskp1))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((-. (c0_1 (a748))) /\ ((-. (c1_1 (a748))) /\ (-. (c2_1 (a748))))))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738))))))) ### ConjTree 247
% 0.47/0.67 249. ((-. (hskp5)) \/ ((ndr1_0) /\ ((c2_1 (a735)) /\ ((c3_1 (a735)) /\ (-. (c0_1 (a735))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((-. (c0_1 (a748))) /\ ((-. (c1_1 (a748))) /\ (-. (c2_1 (a748))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((hskp0) \/ (hskp1))) (-. (hskp1)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) (-. (hskp2)) ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) \/ (hskp2))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ((hskp0) \/ (hskp8)) (-. (hskp0)) (ndr1_0) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) (c1_1 (a734)) (-. (c3_1 (a734))) (-. (c0_1 (a734))) ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp7))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738))))))) ### Or 243 248
% 0.47/0.67 250. ((ndr1_0) /\ ((c1_1 (a734)) /\ ((-. (c0_1 (a734))) /\ (-. (c3_1 (a734)))))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738))))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp7))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) (-. (hskp0)) ((hskp0) \/ (hskp8)) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) \/ (hskp2))) (-. (hskp2)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) (-. (hskp1)) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((hskp0) \/ (hskp1))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((-. (c0_1 (a748))) /\ ((-. (c1_1 (a748))) /\ (-. (c2_1 (a748))))))) ((-. (hskp5)) \/ ((ndr1_0) /\ ((c2_1 (a735)) /\ ((c3_1 (a735)) /\ (-. (c0_1 (a735))))))) ### ConjTree 249
% 0.47/0.67 251. ((-. (hskp4)) \/ ((ndr1_0) /\ ((c1_1 (a734)) /\ ((-. (c0_1 (a734))) /\ (-. (c3_1 (a734))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) \/ (hskp2))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp7))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((-. (c0_1 (a748))) /\ ((-. (c1_1 (a748))) /\ (-. (c2_1 (a748))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((hskp0) \/ (hskp1))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((hskp7) \/ ((hskp1) \/ (hskp4))) (-. (hskp1)) ((hskp0) \/ (hskp8)) (-. (hskp0)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp6) \/ (hskp4))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All X21, ((ndr1_0) => ((c1_1 X21) \/ ((-. (c0_1 X21)) \/ (-. (c2_1 X21)))))) \/ (hskp4))) (-. (hskp2)) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((hskp1) \/ (hskp2))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((hskp23) \/ ((hskp24) \/ (hskp13))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ (hskp2))) ((-. (hskp5)) \/ ((ndr1_0) /\ ((c2_1 (a735)) /\ ((c3_1 (a735)) /\ (-. (c0_1 (a735))))))) ### Or 199 250
% 0.47/0.67 252. (-. (c0_1 (a732))) (c0_1 (a732)) ### Axiom
% 0.47/0.67 253. (-. (c2_1 (a732))) (c2_1 (a732)) ### Axiom
% 0.47/0.67 254. (-. (c3_1 (a732))) (c3_1 (a732)) ### Axiom
% 0.47/0.67 255. ((ndr1_0) => ((c0_1 (a732)) \/ ((c2_1 (a732)) \/ (c3_1 (a732))))) (-. (c3_1 (a732))) (-. (c2_1 (a732))) (-. (c0_1 (a732))) (ndr1_0) ### DisjTree 8 252 253 254
% 0.47/0.67 256. (All X22, ((ndr1_0) => ((c0_1 X22) \/ ((c2_1 X22) \/ (c3_1 X22))))) (ndr1_0) (-. (c0_1 (a732))) (-. (c2_1 (a732))) (-. (c3_1 (a732))) ### All 255
% 0.47/0.67 257. ((All X22, ((ndr1_0) => ((c0_1 X22) \/ ((c2_1 X22) \/ (c3_1 X22))))) \/ ((hskp5) \/ (hskp9))) (-. (hskp9)) (-. (hskp5)) (-. (c3_1 (a732))) (-. (c2_1 (a732))) (-. (c0_1 (a732))) (ndr1_0) ### DisjTree 256 18 94
% 0.47/0.67 258. ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp6) \/ (hskp4))) (-. (hskp4)) (-. (hskp6)) (c3_1 (a746)) (-. (c2_1 (a746))) (-. (c0_1 (a746))) (ndr1_0) ### DisjTree 186 21 3
% 0.47/0.67 259. ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746)))))) (ndr1_0) (-. (hskp6)) (-. (hskp4)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp6) \/ (hskp4))) ### ConjTree 258
% 0.47/0.67 260. ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp6) \/ (hskp4))) (-. (hskp4)) (-. (hskp6)) (ndr1_0) (-. (c0_1 (a732))) (-. (c2_1 (a732))) (-. (c3_1 (a732))) (-. (hskp5)) ((All X22, ((ndr1_0) => ((c0_1 X22) \/ ((c2_1 X22) \/ (c3_1 X22))))) \/ ((hskp5) \/ (hskp9))) ### Or 257 259
% 0.47/0.67 261. ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738)))))) ((hskp7) \/ ((hskp1) \/ (hskp4))) (-. (hskp4)) (-. (hskp1)) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) (-. (hskp5)) (ndr1_0) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) (-. (hskp0)) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((hskp0) \/ (hskp1))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((-. (c0_1 (a748))) /\ ((-. (c1_1 (a748))) /\ (-. (c2_1 (a748))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741))))))) ### ConjTree 81
% 0.47/0.67 262. ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((-. (c0_1 (a748))) /\ ((-. (c1_1 (a748))) /\ (-. (c2_1 (a748))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((hskp0) \/ (hskp1))) (-. (hskp0)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) (-. (hskp1)) ((hskp7) \/ ((hskp1) \/ (hskp4))) ((All X22, ((ndr1_0) => ((c0_1 X22) \/ ((c2_1 X22) \/ (c3_1 X22))))) \/ ((hskp5) \/ (hskp9))) (-. (hskp5)) (-. (c3_1 (a732))) (-. (c2_1 (a732))) (-. (c0_1 (a732))) (ndr1_0) (-. (hskp4)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp6) \/ (hskp4))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ### Or 260 261
% 0.47/0.67 263. (-. (c0_1 (a732))) (c0_1 (a732)) ### Axiom
% 0.47/0.67 264. (-. (c0_1 (a732))) (c0_1 (a732)) ### Axiom
% 0.47/0.67 265. (-. (c2_1 (a732))) (c2_1 (a732)) ### Axiom
% 0.47/0.67 266. (c1_1 (a732)) (-. (c1_1 (a732))) ### Axiom
% 0.47/0.67 267. ((ndr1_0) => ((c0_1 (a732)) \/ ((c2_1 (a732)) \/ (-. (c1_1 (a732)))))) (c1_1 (a732)) (-. (c2_1 (a732))) (-. (c0_1 (a732))) (ndr1_0) ### DisjTree 8 264 265 266
% 0.47/0.67 268. (All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) (ndr1_0) (-. (c0_1 (a732))) (-. (c2_1 (a732))) (c1_1 (a732)) ### All 267
% 0.47/0.67 269. (-. (c2_1 (a732))) (c2_1 (a732)) ### Axiom
% 0.47/0.67 270. ((ndr1_0) => ((c0_1 (a732)) \/ ((c1_1 (a732)) \/ (c2_1 (a732))))) (-. (c2_1 (a732))) (All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) (-. (c0_1 (a732))) (ndr1_0) ### DisjTree 8 263 268 269
% 0.47/0.67 271. (All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) (ndr1_0) (-. (c0_1 (a732))) (All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) (-. (c2_1 (a732))) ### All 270
% 0.47/0.67 272. ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) (-. (hskp10)) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (-. (c2_1 (a732))) (-. (c0_1 (a732))) (ndr1_0) (All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) ### DisjTree 271 120 62
% 0.47/0.67 273. ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((hskp0) \/ (hskp1))) (-. (hskp1)) (-. (hskp0)) (ndr1_0) (-. (c0_1 (a732))) (-. (c2_1 (a732))) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) (-. (hskp10)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) ### DisjTree 272 5 2
% 0.47/0.67 274. ((-. (hskp10)) \/ ((ndr1_0) /\ ((-. (c0_1 (a748))) /\ ((-. (c1_1 (a748))) /\ (-. (c2_1 (a748))))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (-. (c2_1 (a732))) (-. (c0_1 (a732))) (ndr1_0) (-. (hskp0)) (-. (hskp1)) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((hskp0) \/ (hskp1))) ### Or 273 78
% 0.47/0.67 275. ((ndr1_0) /\ ((c2_1 (a735)) /\ ((c3_1 (a735)) /\ (-. (c0_1 (a735)))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((hskp0) \/ (hskp1))) (-. (hskp1)) (-. (hskp0)) (ndr1_0) (-. (c0_1 (a732))) (-. (c2_1 (a732))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((-. (c0_1 (a748))) /\ ((-. (c1_1 (a748))) /\ (-. (c2_1 (a748))))))) ### ConjTree 274
% 0.47/0.67 276. ((-. (hskp5)) \/ ((ndr1_0) /\ ((c2_1 (a735)) /\ ((c3_1 (a735)) /\ (-. (c0_1 (a735))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp6) \/ (hskp4))) (-. (hskp4)) (ndr1_0) (-. (c0_1 (a732))) (-. (c2_1 (a732))) (-. (c3_1 (a732))) ((All X22, ((ndr1_0) => ((c0_1 X22) \/ ((c2_1 X22) \/ (c3_1 X22))))) \/ ((hskp5) \/ (hskp9))) ((hskp7) \/ ((hskp1) \/ (hskp4))) (-. (hskp1)) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) (-. (hskp0)) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((hskp0) \/ (hskp1))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((-. (c0_1 (a748))) /\ ((-. (c1_1 (a748))) /\ (-. (c2_1 (a748))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741))))))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738))))))) ### Or 262 275
% 0.47/0.67 277. (-. (c2_1 (a732))) (c2_1 (a732)) ### Axiom
% 0.47/0.67 278. (-. (c3_1 (a732))) (c3_1 (a732)) ### Axiom
% 0.47/0.67 279. ((ndr1_0) => ((c1_1 (a732)) \/ ((c2_1 (a732)) \/ (c3_1 (a732))))) (-. (c3_1 (a732))) (-. (c2_1 (a732))) (-. (c0_1 (a732))) (All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) (ndr1_0) ### DisjTree 8 268 277 278
% 0.47/0.67 280. (All X61, ((ndr1_0) => ((c1_1 X61) \/ ((c2_1 X61) \/ (c3_1 X61))))) (ndr1_0) (All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) (-. (c0_1 (a732))) (-. (c2_1 (a732))) (-. (c3_1 (a732))) ### All 279
% 0.47/0.67 281. (-. (hskp27)) (hskp27) ### P-NotP
% 0.47/0.67 282. ((All X61, ((ndr1_0) => ((c1_1 X61) \/ ((c2_1 X61) \/ (c3_1 X61))))) \/ ((hskp27) \/ (hskp0))) (-. (hskp0)) (-. (hskp27)) (-. (c3_1 (a732))) (-. (c2_1 (a732))) (-. (c0_1 (a732))) (All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) (ndr1_0) ### DisjTree 280 281 5
% 0.47/0.67 283. ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) (-. (hskp5)) (c1_1 (a734)) (-. (c3_1 (a734))) (-. (c0_1 (a734))) (ndr1_0) (-. (c0_1 (a732))) (-. (c2_1 (a732))) (-. (c3_1 (a732))) (-. (hskp27)) (-. (hskp0)) ((All X61, ((ndr1_0) => ((c1_1 X61) \/ ((c2_1 X61) \/ (c3_1 X61))))) \/ ((hskp27) \/ (hskp0))) ### DisjTree 282 213 18
% 0.47/0.67 284. ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) (-. (hskp5)) (c1_1 (a734)) (-. (c3_1 (a734))) (-. (c0_1 (a734))) (-. (c2_1 (a732))) (-. (c0_1 (a732))) (ndr1_0) (All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) ### DisjTree 271 213 18
% 0.47/0.67 285. (c0_1 (a750)) (-. (c0_1 (a750))) ### Axiom
% 0.47/0.67 286. (c1_1 (a750)) (-. (c1_1 (a750))) ### Axiom
% 0.47/0.67 287. (c2_1 (a750)) (-. (c2_1 (a750))) ### Axiom
% 0.47/0.67 288. ((ndr1_0) => ((-. (c0_1 (a750))) \/ ((-. (c1_1 (a750))) \/ (-. (c2_1 (a750)))))) (c2_1 (a750)) (c1_1 (a750)) (c0_1 (a750)) (ndr1_0) ### DisjTree 8 285 286 287
% 0.47/0.67 289. (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))) (ndr1_0) (c0_1 (a750)) (c1_1 (a750)) (c2_1 (a750)) ### All 288
% 0.47/0.67 290. ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) (c2_1 (a750)) (c1_1 (a750)) (c0_1 (a750)) (ndr1_0) (-. (c0_1 (a732))) (-. (c2_1 (a732))) (-. (c0_1 (a734))) (-. (c3_1 (a734))) (c1_1 (a734)) (-. (hskp5)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) ### DisjTree 284 214 289
% 0.47/0.67 291. ((ndr1_0) /\ ((c0_1 (a750)) /\ ((c1_1 (a750)) /\ (c2_1 (a750))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) (-. (hskp5)) (c1_1 (a734)) (-. (c3_1 (a734))) (-. (c0_1 (a734))) (-. (c2_1 (a732))) (-. (c0_1 (a732))) (ndr1_0) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ### ConjTree 290
% 0.47/0.67 292. ((-. (hskp27)) \/ ((ndr1_0) /\ ((c0_1 (a750)) /\ ((c1_1 (a750)) /\ (c2_1 (a750)))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((All X61, ((ndr1_0) => ((c1_1 X61) \/ ((c2_1 X61) \/ (c3_1 X61))))) \/ ((hskp27) \/ (hskp0))) (-. (hskp0)) (-. (c3_1 (a732))) (-. (c2_1 (a732))) (-. (c0_1 (a732))) (ndr1_0) (-. (c0_1 (a734))) (-. (c3_1 (a734))) (c1_1 (a734)) (-. (hskp5)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) ### Or 283 291
% 0.47/0.67 293. ((-. (hskp5)) \/ ((ndr1_0) /\ ((c2_1 (a735)) /\ ((c3_1 (a735)) /\ (-. (c0_1 (a735))))))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((-. (c0_1 (a748))) /\ ((-. (c1_1 (a748))) /\ (-. (c2_1 (a748))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((hskp0) \/ (hskp1))) (-. (hskp1)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) ((hskp0) \/ (hskp8)) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) (c1_1 (a734)) (-. (c3_1 (a734))) (-. (c0_1 (a734))) (ndr1_0) (-. (c0_1 (a732))) (-. (c2_1 (a732))) (-. (c3_1 (a732))) (-. (hskp0)) ((All X61, ((ndr1_0) => ((c1_1 X61) \/ ((c2_1 X61) \/ (c3_1 X61))))) \/ ((hskp27) \/ (hskp0))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((-. (hskp27)) \/ ((ndr1_0) /\ ((c0_1 (a750)) /\ ((c1_1 (a750)) /\ (c2_1 (a750)))))) ### Or 292 248
% 0.47/0.67 294. ((ndr1_0) /\ ((c1_1 (a734)) /\ ((-. (c0_1 (a734))) /\ (-. (c3_1 (a734)))))) ((-. (hskp27)) \/ ((ndr1_0) /\ ((c0_1 (a750)) /\ ((c1_1 (a750)) /\ (c2_1 (a750)))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((All X61, ((ndr1_0) => ((c1_1 X61) \/ ((c2_1 X61) \/ (c3_1 X61))))) \/ ((hskp27) \/ (hskp0))) (-. (hskp0)) (-. (c3_1 (a732))) (-. (c2_1 (a732))) (-. (c0_1 (a732))) (ndr1_0) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ((hskp0) \/ (hskp8)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) (-. (hskp1)) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((hskp0) \/ (hskp1))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((-. (c0_1 (a748))) /\ ((-. (c1_1 (a748))) /\ (-. (c2_1 (a748))))))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738))))))) ((-. (hskp5)) \/ ((ndr1_0) /\ ((c2_1 (a735)) /\ ((c3_1 (a735)) /\ (-. (c0_1 (a735))))))) ### ConjTree 293
% 0.47/0.67 295. ((-. (hskp4)) \/ ((ndr1_0) /\ ((c1_1 (a734)) /\ ((-. (c0_1 (a734))) /\ (-. (c3_1 (a734))))))) ((hskp0) \/ (hskp8)) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) ((All X61, ((ndr1_0) => ((c1_1 X61) \/ ((c2_1 X61) \/ (c3_1 X61))))) \/ ((hskp27) \/ (hskp0))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((-. (hskp27)) \/ ((ndr1_0) /\ ((c0_1 (a750)) /\ ((c1_1 (a750)) /\ (c2_1 (a750)))))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((-. (c0_1 (a748))) /\ ((-. (c1_1 (a748))) /\ (-. (c2_1 (a748))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((hskp0) \/ (hskp1))) (-. (hskp0)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) (-. (hskp1)) ((hskp7) \/ ((hskp1) \/ (hskp4))) ((All X22, ((ndr1_0) => ((c0_1 X22) \/ ((c2_1 X22) \/ (c3_1 X22))))) \/ ((hskp5) \/ (hskp9))) (-. (c3_1 (a732))) (-. (c2_1 (a732))) (-. (c0_1 (a732))) (ndr1_0) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp6) \/ (hskp4))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((-. (hskp5)) \/ ((ndr1_0) /\ ((c2_1 (a735)) /\ ((c3_1 (a735)) /\ (-. (c0_1 (a735))))))) ### Or 276 294
% 0.47/0.67 296. ((ndr1_0) /\ ((-. (c0_1 (a732))) /\ ((-. (c2_1 (a732))) /\ (-. (c3_1 (a732)))))) ((-. (hskp5)) \/ ((ndr1_0) /\ ((c2_1 (a735)) /\ ((c3_1 (a735)) /\ (-. (c0_1 (a735))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp6) \/ (hskp4))) ((All X22, ((ndr1_0) => ((c0_1 X22) \/ ((c2_1 X22) \/ (c3_1 X22))))) \/ ((hskp5) \/ (hskp9))) ((hskp7) \/ ((hskp1) \/ (hskp4))) (-. (hskp1)) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) (-. (hskp0)) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((hskp0) \/ (hskp1))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((-. (c0_1 (a748))) /\ ((-. (c1_1 (a748))) /\ (-. (c2_1 (a748))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741))))))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738))))))) ((-. (hskp27)) \/ ((ndr1_0) /\ ((c0_1 (a750)) /\ ((c1_1 (a750)) /\ (c2_1 (a750)))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((All X61, ((ndr1_0) => ((c1_1 X61) \/ ((c2_1 X61) \/ (c3_1 X61))))) \/ ((hskp27) \/ (hskp0))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ((hskp0) \/ (hskp8)) ((-. (hskp4)) \/ ((ndr1_0) /\ ((c1_1 (a734)) /\ ((-. (c0_1 (a734))) /\ (-. (c3_1 (a734))))))) ### ConjTree 295
% 0.47/0.67 297. ((-. (hskp2)) \/ ((ndr1_0) /\ ((-. (c0_1 (a732))) /\ ((-. (c2_1 (a732))) /\ (-. (c3_1 (a732))))))) ((All X61, ((ndr1_0) => ((c1_1 X61) \/ ((c2_1 X61) \/ (c3_1 X61))))) \/ ((hskp27) \/ (hskp0))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((-. (hskp27)) \/ ((ndr1_0) /\ ((c0_1 (a750)) /\ ((c1_1 (a750)) /\ (c2_1 (a750)))))) ((All X22, ((ndr1_0) => ((c0_1 X22) \/ ((c2_1 X22) \/ (c3_1 X22))))) \/ ((hskp5) \/ (hskp9))) ((-. (hskp5)) \/ ((ndr1_0) /\ ((c2_1 (a735)) /\ ((c3_1 (a735)) /\ (-. (c0_1 (a735))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ (hskp2))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((hskp23) \/ ((hskp24) \/ (hskp13))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741))))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((hskp1) \/ (hskp2))) ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All X21, ((ndr1_0) => ((c1_1 X21) \/ ((-. (c0_1 X21)) \/ (-. (c2_1 X21)))))) \/ (hskp4))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp6) \/ (hskp4))) (-. (hskp0)) ((hskp0) \/ (hskp8)) (-. (hskp1)) ((hskp7) \/ ((hskp1) \/ (hskp4))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((hskp0) \/ (hskp1))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((-. (c0_1 (a748))) /\ ((-. (c1_1 (a748))) /\ (-. (c2_1 (a748))))))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738))))))) ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp7))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) \/ (hskp2))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((-. (hskp4)) \/ ((ndr1_0) /\ ((c1_1 (a734)) /\ ((-. (c0_1 (a734))) /\ (-. (c3_1 (a734))))))) ### Or 251 296
% 0.47/0.67 298. (-. (hskp16)) (hskp16) ### P-NotP
% 0.47/0.67 299. (-. (hskp19)) (hskp19) ### P-NotP
% 0.47/0.67 300. ((hskp16) \/ ((hskp18) \/ (hskp19))) (-. (hskp19)) (-. (hskp18)) (-. (hskp16)) ### DisjTree 298 112 299
% 0.47/0.67 301. (-. (c0_1 (a777))) (c0_1 (a777)) ### Axiom
% 0.47/0.67 302. (-. (c3_1 (a777))) (c3_1 (a777)) ### Axiom
% 0.47/0.67 303. (c2_1 (a777)) (-. (c2_1 (a777))) ### Axiom
% 0.47/0.67 304. ((ndr1_0) => ((c0_1 (a777)) \/ ((c3_1 (a777)) \/ (-. (c2_1 (a777)))))) (c2_1 (a777)) (-. (c3_1 (a777))) (-. (c0_1 (a777))) (ndr1_0) ### DisjTree 8 301 302 303
% 0.47/0.67 305. (All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) (ndr1_0) (-. (c0_1 (a777))) (-. (c3_1 (a777))) (c2_1 (a777)) ### All 304
% 0.47/0.67 306. ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp7))) (-. (hskp7)) (c2_1 (a777)) (-. (c3_1 (a777))) (-. (c0_1 (a777))) (c3_1 (a744)) (-. (c1_1 (a744))) (-. (c0_1 (a744))) (ndr1_0) ### DisjTree 27 305 1
% 0.47/0.67 307. ((ndr1_0) /\ ((c2_1 (a777)) /\ ((-. (c0_1 (a777))) /\ (-. (c3_1 (a777)))))) (ndr1_0) (-. (c0_1 (a744))) (-. (c1_1 (a744))) (c3_1 (a744)) (-. (hskp7)) ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp7))) ### ConjTree 306
% 0.47/0.67 308. ((-. (hskp19)) \/ ((ndr1_0) /\ ((c2_1 (a777)) /\ ((-. (c0_1 (a777))) /\ (-. (c3_1 (a777))))))) ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a744)) (-. (c1_1 (a744))) (-. (c0_1 (a744))) (ndr1_0) (-. (hskp16)) (-. (hskp18)) ((hskp16) \/ ((hskp18) \/ (hskp19))) ### Or 300 307
% 0.47/0.67 309. (-. (c1_1 (a779))) (c1_1 (a779)) ### Axiom
% 0.47/0.67 310. (-. (c3_1 (a779))) (c3_1 (a779)) ### Axiom
% 0.47/0.67 311. (c2_1 (a779)) (-. (c2_1 (a779))) ### Axiom
% 0.47/0.67 312. ((ndr1_0) => ((c1_1 (a779)) \/ ((c3_1 (a779)) \/ (-. (c2_1 (a779)))))) (c2_1 (a779)) (-. (c3_1 (a779))) (-. (c1_1 (a779))) (ndr1_0) ### DisjTree 8 309 310 311
% 0.47/0.67 313. (All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) (ndr1_0) (-. (c1_1 (a779))) (-. (c3_1 (a779))) (c2_1 (a779)) ### All 312
% 0.47/0.67 314. (c0_1 (a729)) (-. (c0_1 (a729))) ### Axiom
% 0.47/0.67 315. (c1_1 (a729)) (-. (c1_1 (a729))) ### Axiom
% 0.47/0.67 316. (c2_1 (a729)) (-. (c2_1 (a729))) ### Axiom
% 0.47/0.67 317. ((ndr1_0) => ((-. (c0_1 (a729))) \/ ((-. (c1_1 (a729))) \/ (-. (c2_1 (a729)))))) (c2_1 (a729)) (c1_1 (a729)) (c0_1 (a729)) (ndr1_0) ### DisjTree 8 314 315 316
% 0.47/0.67 318. (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))) (ndr1_0) (c0_1 (a729)) (c1_1 (a729)) (c2_1 (a729)) ### All 317
% 0.47/0.67 319. (c0_1 (a729)) (-. (c0_1 (a729))) ### Axiom
% 0.47/0.67 320. (c3_1 (a729)) (-. (c3_1 (a729))) ### Axiom
% 0.47/0.67 321. ((ndr1_0) => ((c1_1 (a729)) \/ ((-. (c0_1 (a729))) \/ (-. (c3_1 (a729)))))) (c3_1 (a729)) (c2_1 (a729)) (c0_1 (a729)) (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))) (ndr1_0) ### DisjTree 8 318 319 320
% 0.47/0.67 322. (All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) (ndr1_0) (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))) (c0_1 (a729)) (c2_1 (a729)) (c3_1 (a729)) ### All 321
% 0.47/0.67 323. ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) (c3_1 (a729)) (c2_1 (a729)) (c0_1 (a729)) (All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) (c1_1 (a775)) (-. (c3_1 (a775))) (-. (c2_1 (a775))) (All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) (c2_1 (a779)) (-. (c3_1 (a779))) (-. (c1_1 (a779))) (ndr1_0) ### DisjTree 313 148 322
% 0.47/0.67 324. ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) (-. (hskp5)) (All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) (-. (c2_1 (a775))) (-. (c3_1 (a775))) (c1_1 (a775)) (c0_1 (a729)) (c2_1 (a729)) (c3_1 (a729)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) (c2_1 (a779)) (-. (c3_1 (a779))) (-. (c1_1 (a779))) (ndr1_0) ### DisjTree 313 323 18
% 0.47/0.67 325. ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) (-. (hskp9)) (-. (hskp0)) (ndr1_0) (-. (c1_1 (a779))) (-. (c3_1 (a779))) (c2_1 (a779)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) (c3_1 (a729)) (c2_1 (a729)) (c0_1 (a729)) (c1_1 (a775)) (-. (c3_1 (a775))) (-. (c2_1 (a775))) (-. (hskp5)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ### DisjTree 324 5 94
% 0.47/0.67 326. ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) (-. (hskp5)) (-. (c2_1 (a775))) (-. (c3_1 (a775))) (c1_1 (a775)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) (c2_1 (a779)) (-. (c3_1 (a779))) (-. (c1_1 (a779))) (ndr1_0) (-. (hskp0)) (-. (hskp9)) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ### ConjTree 325
% 0.47/0.67 327. ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) (-. (c1_1 (a779))) (-. (c3_1 (a779))) (c2_1 (a779)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) (-. (hskp5)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp9)) (c1_1 (a775)) (-. (c3_1 (a775))) (-. (c2_1 (a775))) (ndr1_0) (-. (hskp0)) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ### Or 150 326
% 0.47/0.67 328. ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779)))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) (-. (hskp0)) (ndr1_0) (-. (c2_1 (a775))) (-. (c3_1 (a775))) (c1_1 (a775)) (-. (hskp9)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) (-. (hskp5)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ### ConjTree 327
% 0.47/0.67 329. ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp9)) (c1_1 (a775)) (-. (c3_1 (a775))) (-. (c2_1 (a775))) (-. (hskp0)) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (-. (hskp5)) (c3_1 (a744)) (-. (c0_1 (a744))) (-. (c1_1 (a744))) (ndr1_0) (-. (hskp6)) (-. (hskp4)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp6) \/ (hskp4))) ### Or 22 328
% 0.47/0.67 330. ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775)))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp6) \/ (hskp4))) (-. (hskp4)) (-. (hskp6)) (ndr1_0) (-. (c1_1 (a744))) (-. (c0_1 (a744))) (c3_1 (a744)) (-. (hskp5)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) (-. (hskp0)) (-. (hskp9)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ### ConjTree 329
% 0.47/0.67 331. ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp9)) (-. (hskp0)) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (-. (hskp5)) (-. (hskp6)) (-. (hskp4)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp6) \/ (hskp4))) ((hskp16) \/ ((hskp18) \/ (hskp19))) (-. (hskp16)) (ndr1_0) (-. (c0_1 (a744))) (-. (c1_1 (a744))) (c3_1 (a744)) (-. (hskp7)) ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp7))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c2_1 (a777)) /\ ((-. (c0_1 (a777))) /\ (-. (c3_1 (a777))))))) ### Or 308 330
% 0.47/0.67 332. (-. (c3_1 (a764))) (c3_1 (a764)) ### Axiom
% 0.47/0.67 333. (c0_1 (a764)) (-. (c0_1 (a764))) ### Axiom
% 0.47/0.67 334. (c1_1 (a764)) (-. (c1_1 (a764))) ### Axiom
% 0.47/0.67 335. ((ndr1_0) => ((c3_1 (a764)) \/ ((-. (c0_1 (a764))) \/ (-. (c1_1 (a764)))))) (c1_1 (a764)) (c0_1 (a764)) (-. (c3_1 (a764))) (ndr1_0) ### DisjTree 8 332 333 334
% 0.47/0.67 336. (All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) (ndr1_0) (-. (c3_1 (a764))) (c0_1 (a764)) (c1_1 (a764)) ### All 335
% 0.47/0.67 337. (-. (c3_1 (a764))) (c3_1 (a764)) ### Axiom
% 0.47/0.67 338. (c2_1 (a764)) (-. (c2_1 (a764))) ### Axiom
% 0.47/0.67 339. ((ndr1_0) => ((c1_1 (a764)) \/ ((c3_1 (a764)) \/ (-. (c2_1 (a764)))))) (c2_1 (a764)) (c0_1 (a764)) (-. (c3_1 (a764))) (All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) (ndr1_0) ### DisjTree 8 336 337 338
% 0.47/0.67 340. (All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) (ndr1_0) (All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) (-. (c3_1 (a764))) (c0_1 (a764)) (c2_1 (a764)) ### All 339
% 0.47/0.67 341. ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) (-. (hskp11)) (-. (hskp18)) (c2_1 (a764)) (c0_1 (a764)) (-. (c3_1 (a764))) (ndr1_0) (All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) ### DisjTree 340 112 60
% 0.47/0.67 342. (-. (c2_1 (a731))) (c2_1 (a731)) ### Axiom
% 0.47/0.67 343. (c1_1 (a731)) (-. (c1_1 (a731))) ### Axiom
% 0.47/0.67 344. (c3_1 (a731)) (-. (c3_1 (a731))) ### Axiom
% 0.47/0.67 345. ((ndr1_0) => ((c2_1 (a731)) \/ ((-. (c1_1 (a731))) \/ (-. (c3_1 (a731)))))) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) (ndr1_0) ### DisjTree 8 342 343 344
% 0.47/0.67 346. (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) (ndr1_0) (-. (c2_1 (a731))) (c1_1 (a731)) (c3_1 (a731)) ### All 345
% 0.47/0.67 347. ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp18))) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) (ndr1_0) (-. (c3_1 (a764))) (c0_1 (a764)) (c2_1 (a764)) (-. (hskp18)) (-. (hskp11)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ### DisjTree 341 346 112
% 0.47/0.67 348. ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp9)) (-. (hskp0)) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (-. (hskp5)) (c3_1 (a744)) (-. (c0_1 (a744))) (-. (c1_1 (a744))) (-. (hskp6)) (-. (hskp4)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp6) \/ (hskp4))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) (-. (hskp11)) (c2_1 (a764)) (c0_1 (a764)) (-. (c3_1 (a764))) (ndr1_0) (-. (c2_1 (a731))) (c1_1 (a731)) (c3_1 (a731)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp18))) ### Or 347 330
% 0.47/0.67 349. ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp18))) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) (ndr1_0) (-. (hskp11)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp6) \/ (hskp4))) (-. (hskp4)) (-. (hskp6)) (-. (c1_1 (a744))) (-. (c0_1 (a744))) (c3_1 (a744)) (-. (hskp5)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) (-. (hskp0)) (-. (hskp9)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ### ConjTree 348
% 0.47/0.67 350. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) (-. (hskp11)) (-. (c2_1 (a731))) (c1_1 (a731)) (c3_1 (a731)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp18))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c2_1 (a777)) /\ ((-. (c0_1 (a777))) /\ (-. (c3_1 (a777))))))) ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a744)) (-. (c1_1 (a744))) (-. (c0_1 (a744))) (ndr1_0) ((hskp16) \/ ((hskp18) \/ (hskp19))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp6) \/ (hskp4))) (-. (hskp4)) (-. (hskp6)) (-. (hskp5)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) (-. (hskp0)) (-. (hskp9)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ### Or 331 349
% 0.47/0.67 351. ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp9)) (-. (hskp0)) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (-. (hskp5)) (-. (hskp6)) (-. (hskp4)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp6) \/ (hskp4))) ((hskp16) \/ ((hskp18) \/ (hskp19))) (ndr1_0) (-. (c0_1 (a744))) (-. (c1_1 (a744))) (c3_1 (a744)) (-. (hskp7)) ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp7))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c2_1 (a777)) /\ ((-. (c0_1 (a777))) /\ (-. (c3_1 (a777))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp18))) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ### Or 350 70
% 0.47/0.67 352. ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) (-. (c2_1 (a731))) (c1_1 (a731)) (c3_1 (a731)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp18))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c2_1 (a777)) /\ ((-. (c0_1 (a777))) /\ (-. (c3_1 (a777))))))) ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a744)) (-. (c1_1 (a744))) (-. (c0_1 (a744))) (ndr1_0) ((hskp16) \/ ((hskp18) \/ (hskp19))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp6) \/ (hskp4))) (-. (hskp4)) (-. (hskp6)) (-. (hskp5)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) (-. (hskp0)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ### Or 351 259
% 0.47/0.67 353. ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744)))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp0)) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (-. (hskp5)) (-. (hskp6)) (-. (hskp4)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp6) \/ (hskp4))) ((hskp16) \/ ((hskp18) \/ (hskp19))) (ndr1_0) (-. (hskp7)) ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp7))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c2_1 (a777)) /\ ((-. (c0_1 (a777))) /\ (-. (c3_1 (a777))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp18))) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ### ConjTree 352
% 0.47/0.67 354. ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) (-. (c2_1 (a731))) (c1_1 (a731)) (c3_1 (a731)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp18))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c2_1 (a777)) /\ ((-. (c0_1 (a777))) /\ (-. (c3_1 (a777))))))) ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp7))) (-. (hskp7)) (ndr1_0) ((hskp16) \/ ((hskp18) \/ (hskp19))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp6) \/ (hskp4))) (-. (hskp4)) (-. (hskp6)) (-. (hskp5)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) (-. (hskp0)) ((hskp0) \/ (hskp8)) ### Or 7 353
% 0.47/0.67 355. (c1_1 (a741)) (-. (c1_1 (a741))) ### Axiom
% 0.47/0.67 356. (-. (c0_1 (a741))) (c0_1 (a741)) ### Axiom
% 0.47/0.67 357. (-. (c2_1 (a741))) (c2_1 (a741)) ### Axiom
% 0.47/0.67 358. (c3_1 (a741)) (-. (c3_1 (a741))) ### Axiom
% 0.47/0.67 359. ((ndr1_0) => ((c0_1 (a741)) \/ ((c2_1 (a741)) \/ (-. (c3_1 (a741)))))) (c3_1 (a741)) (-. (c2_1 (a741))) (-. (c0_1 (a741))) (ndr1_0) ### DisjTree 8 356 357 358
% 0.47/0.67 360. (All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) (ndr1_0) (-. (c0_1 (a741))) (-. (c2_1 (a741))) (c3_1 (a741)) ### All 359
% 0.47/0.67 361. (c3_1 (a741)) (-. (c3_1 (a741))) ### Axiom
% 0.47/0.67 362. ((ndr1_0) => ((-. (c1_1 (a741))) \/ ((-. (c2_1 (a741))) \/ (-. (c3_1 (a741)))))) (c3_1 (a741)) (-. (c0_1 (a741))) (All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) (c1_1 (a741)) (ndr1_0) ### DisjTree 8 355 360 361
% 0.47/0.67 363. (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))) (ndr1_0) (c1_1 (a741)) (All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) (-. (c0_1 (a741))) (c3_1 (a741)) ### All 362
% 0.47/0.67 364. (-. (hskp22)) (hskp22) ### P-NotP
% 0.47/0.67 365. ((All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))) \/ ((hskp16) \/ (hskp22))) (-. (hskp22)) (-. (hskp16)) (c3_1 (a741)) (-. (c0_1 (a741))) (All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) (c1_1 (a741)) (ndr1_0) ### DisjTree 363 298 364
% 0.47/0.67 366. ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) (ndr1_0) (c1_1 (a741)) (-. (c0_1 (a741))) (c3_1 (a741)) (-. (hskp16)) (-. (hskp22)) ((All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))) \/ ((hskp16) \/ (hskp22))) ### DisjTree 365 223 346
% 0.47/0.67 367. (-. (c1_1 (a797))) (c1_1 (a797)) ### Axiom
% 0.47/0.67 368. (-. (c2_1 (a797))) (c2_1 (a797)) ### Axiom
% 0.47/0.67 369. (c3_1 (a797)) (-. (c3_1 (a797))) ### Axiom
% 0.47/0.67 370. ((ndr1_0) => ((c1_1 (a797)) \/ ((c2_1 (a797)) \/ (-. (c3_1 (a797)))))) (c3_1 (a797)) (-. (c2_1 (a797))) (-. (c1_1 (a797))) (ndr1_0) ### DisjTree 8 367 368 369
% 0.47/0.67 371. (All X64, ((ndr1_0) => ((c1_1 X64) \/ ((c2_1 X64) \/ (-. (c3_1 X64)))))) (ndr1_0) (-. (c1_1 (a797))) (-. (c2_1 (a797))) (c3_1 (a797)) ### All 370
% 0.47/0.67 372. ((All X64, ((ndr1_0) => ((c1_1 X64) \/ ((c2_1 X64) \/ (-. (c3_1 X64)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) (-. (hskp11)) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) (c3_1 (a797)) (-. (c2_1 (a797))) (-. (c1_1 (a797))) (ndr1_0) ### DisjTree 371 346 60
% 0.47/0.67 373. ((ndr1_0) /\ ((c3_1 (a797)) /\ ((-. (c1_1 (a797))) /\ (-. (c2_1 (a797)))))) (ndr1_0) (-. (c2_1 (a731))) (c1_1 (a731)) (c3_1 (a731)) (-. (hskp11)) ((All X64, ((ndr1_0) => ((c1_1 X64) \/ ((c2_1 X64) \/ (-. (c3_1 X64)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ### ConjTree 372
% 0.47/0.67 374. ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a797)) /\ ((-. (c1_1 (a797))) /\ (-. (c2_1 (a797))))))) ((All X64, ((ndr1_0) => ((c1_1 X64) \/ ((c2_1 X64) \/ (-. (c3_1 X64)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) (-. (hskp11)) ((All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))) \/ ((hskp16) \/ (hskp22))) (-. (hskp16)) (c3_1 (a741)) (-. (c0_1 (a741))) (c1_1 (a741)) (ndr1_0) (-. (c2_1 (a731))) (c1_1 (a731)) (c3_1 (a731)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ### Or 366 373
% 0.47/0.67 375. ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) (c3_1 (a741)) (c1_1 (a741)) (-. (c0_1 (a741))) (ndr1_0) (-. (c1_1 (a744))) (-. (c0_1 (a744))) (c3_1 (a744)) (-. (hskp5)) (-. (hskp20)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ### DisjTree 20 223 346
% 0.47/0.67 376. ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp9)) (c1_1 (a775)) (-. (c3_1 (a775))) (-. (c2_1 (a775))) (-. (hskp0)) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (-. (hskp5)) (c3_1 (a744)) (-. (c0_1 (a744))) (-. (c1_1 (a744))) (ndr1_0) (-. (c0_1 (a741))) (c1_1 (a741)) (c3_1 (a741)) (-. (c2_1 (a731))) (c1_1 (a731)) (c3_1 (a731)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ### Or 375 328
% 0.47/0.67 377. ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775)))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) (c3_1 (a741)) (c1_1 (a741)) (-. (c0_1 (a741))) (ndr1_0) (-. (c1_1 (a744))) (-. (c0_1 (a744))) (c3_1 (a744)) (-. (hskp5)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) (-. (hskp0)) (-. (hskp9)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ### ConjTree 376
% 0.47/0.67 378. ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp9)) (-. (hskp0)) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (-. (hskp5)) (c3_1 (a744)) (-. (c0_1 (a744))) (-. (c1_1 (a744))) (-. (c0_1 (a741))) (c1_1 (a741)) (c3_1 (a741)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) (-. (hskp11)) (c2_1 (a764)) (c0_1 (a764)) (-. (c3_1 (a764))) (ndr1_0) (-. (c2_1 (a731))) (c1_1 (a731)) (c3_1 (a731)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp18))) ### Or 347 377
% 0.47/0.67 379. ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp18))) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) (ndr1_0) (-. (hskp11)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) (c3_1 (a741)) (c1_1 (a741)) (-. (c0_1 (a741))) (-. (c1_1 (a744))) (-. (c0_1 (a744))) (c3_1 (a744)) (-. (hskp5)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) (-. (hskp0)) (-. (hskp9)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ### ConjTree 378
% 0.47/0.67 380. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp9)) (-. (hskp0)) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (-. (hskp5)) (c3_1 (a744)) (-. (c0_1 (a744))) (-. (c1_1 (a744))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp18))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) (ndr1_0) (c1_1 (a741)) (-. (c0_1 (a741))) (c3_1 (a741)) ((All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))) \/ ((hskp16) \/ (hskp22))) (-. (hskp11)) ((All X64, ((ndr1_0) => ((c1_1 X64) \/ ((c2_1 X64) \/ (-. (c3_1 X64)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a797)) /\ ((-. (c1_1 (a797))) /\ (-. (c2_1 (a797))))))) ### Or 374 379
% 0.47/0.67 381. (-. (c2_1 (a731))) (c2_1 (a731)) ### Axiom
% 0.47/0.67 382. (c0_1 (a731)) (-. (c0_1 (a731))) ### Axiom
% 0.47/0.67 383. (c1_1 (a731)) (-. (c1_1 (a731))) ### Axiom
% 0.47/0.67 384. ((ndr1_0) => ((c2_1 (a731)) \/ ((-. (c0_1 (a731))) \/ (-. (c1_1 (a731)))))) (c1_1 (a731)) (c0_1 (a731)) (-. (c2_1 (a731))) (ndr1_0) ### DisjTree 8 381 382 383
% 0.47/0.67 385. (All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) (ndr1_0) (-. (c2_1 (a731))) (c0_1 (a731)) (c1_1 (a731)) ### All 384
% 0.47/0.67 386. (-. (c2_1 (a731))) (c2_1 (a731)) ### Axiom
% 0.47/0.67 387. (c3_1 (a731)) (-. (c3_1 (a731))) ### Axiom
% 0.47/0.67 388. ((ndr1_0) => ((c0_1 (a731)) \/ ((c2_1 (a731)) \/ (-. (c3_1 (a731)))))) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) (All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) (ndr1_0) ### DisjTree 8 385 386 387
% 0.47/0.67 389. (All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) (ndr1_0) (All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) (-. (c2_1 (a731))) (c1_1 (a731)) (c3_1 (a731)) ### All 388
% 0.47/0.67 390. ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) (c3_1 (a741)) (c1_1 (a741)) (-. (c0_1 (a741))) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) (All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) (ndr1_0) ### DisjTree 389 223 346
% 0.47/0.67 391. (c0_1 (a731)) (-. (c0_1 (a731))) ### Axiom
% 0.47/0.67 392. (c1_1 (a731)) (-. (c1_1 (a731))) ### Axiom
% 0.47/0.67 393. (c3_1 (a731)) (-. (c3_1 (a731))) ### Axiom
% 0.47/0.67 394. ((ndr1_0) => ((-. (c0_1 (a731))) \/ ((-. (c1_1 (a731))) \/ (-. (c3_1 (a731)))))) (c3_1 (a731)) (c1_1 (a731)) (c0_1 (a731)) (ndr1_0) ### DisjTree 8 391 392 393
% 0.47/0.67 395. (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))) (ndr1_0) (c0_1 (a731)) (c1_1 (a731)) (c3_1 (a731)) ### All 394
% 0.47/0.67 396. (-. (c2_1 (a731))) (c2_1 (a731)) ### Axiom
% 0.47/0.67 397. (c3_1 (a731)) (-. (c3_1 (a731))) ### Axiom
% 0.47/0.67 398. ((ndr1_0) => ((c0_1 (a731)) \/ ((c2_1 (a731)) \/ (-. (c3_1 (a731)))))) (-. (c2_1 (a731))) (c3_1 (a731)) (c1_1 (a731)) (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))) (ndr1_0) ### DisjTree 8 395 396 397
% 0.47/0.67 399. (All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) (ndr1_0) (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))) (c1_1 (a731)) (c3_1 (a731)) (-. (c2_1 (a731))) ### All 398
% 0.47/0.67 400. ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) (c3_1 (a741)) (c1_1 (a741)) (-. (c0_1 (a741))) (-. (c2_1 (a731))) (c3_1 (a731)) (c1_1 (a731)) (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))) (ndr1_0) ### DisjTree 399 223 346
% 0.47/0.67 401. ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) (-. (c2_1 (a731))) (c1_1 (a731)) (c3_1 (a731)) (-. (c0_1 (a741))) (c1_1 (a741)) (c3_1 (a741)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) (-. (c3_1 (a749))) (-. (c1_1 (a749))) (-. (c0_1 (a749))) (ndr1_0) ### DisjTree 68 390 400
% 0.47/0.67 402. ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749)))))) (ndr1_0) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) (c3_1 (a741)) (c1_1 (a741)) (-. (c0_1 (a741))) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) ### ConjTree 401
% 0.47/0.67 403. ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a797)) /\ ((-. (c1_1 (a797))) /\ (-. (c2_1 (a797))))))) ((All X64, ((ndr1_0) => ((c1_1 X64) \/ ((c2_1 X64) \/ (-. (c3_1 X64)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))) \/ ((hskp16) \/ (hskp22))) (c3_1 (a741)) (-. (c0_1 (a741))) (c1_1 (a741)) (ndr1_0) (-. (c2_1 (a731))) (c1_1 (a731)) (c3_1 (a731)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp18))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) (-. (c1_1 (a744))) (-. (c0_1 (a744))) (c3_1 (a744)) (-. (hskp5)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) (-. (hskp0)) (-. (hskp9)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ### Or 380 402
% 0.47/0.67 404. ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) (c3_1 (a741)) (c1_1 (a741)) (-. (c0_1 (a741))) (c3_1 (a746)) (-. (c2_1 (a746))) (-. (c0_1 (a746))) (ndr1_0) ### DisjTree 186 223 346
% 0.47/0.67 405. ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746)))))) (ndr1_0) (-. (c0_1 (a741))) (c1_1 (a741)) (c3_1 (a741)) (-. (c2_1 (a731))) (c1_1 (a731)) (c3_1 (a731)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ### ConjTree 404
% 0.47/0.67 406. ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp0)) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (-. (hskp5)) (c3_1 (a744)) (-. (c0_1 (a744))) (-. (c1_1 (a744))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp18))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) (ndr1_0) (c1_1 (a741)) (-. (c0_1 (a741))) (c3_1 (a741)) ((All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))) \/ ((hskp16) \/ (hskp22))) ((All X64, ((ndr1_0) => ((c1_1 X64) \/ ((c2_1 X64) \/ (-. (c3_1 X64)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a797)) /\ ((-. (c1_1 (a797))) /\ (-. (c2_1 (a797))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ### Or 403 405
% 0.47/0.67 407. ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744)))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a797)) /\ ((-. (c1_1 (a797))) /\ (-. (c2_1 (a797))))))) ((All X64, ((ndr1_0) => ((c1_1 X64) \/ ((c2_1 X64) \/ (-. (c3_1 X64)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))) \/ ((hskp16) \/ (hskp22))) (c3_1 (a741)) (-. (c0_1 (a741))) (c1_1 (a741)) (ndr1_0) (-. (c2_1 (a731))) (c1_1 (a731)) (c3_1 (a731)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp18))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) (-. (hskp5)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) (-. (hskp0)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ### ConjTree 406
% 0.47/0.67 408. ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (-. (hskp5)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp18))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) (ndr1_0) (c1_1 (a741)) (-. (c0_1 (a741))) (c3_1 (a741)) ((All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))) \/ ((hskp16) \/ (hskp22))) ((All X64, ((ndr1_0) => ((c1_1 X64) \/ ((c2_1 X64) \/ (-. (c3_1 X64)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a797)) /\ ((-. (c1_1 (a797))) /\ (-. (c2_1 (a797))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) (-. (hskp0)) ((hskp0) \/ (hskp8)) ### Or 7 407
% 0.47/0.68 409. ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741)))))) ((hskp0) \/ (hskp8)) (-. (hskp0)) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a797)) /\ ((-. (c1_1 (a797))) /\ (-. (c2_1 (a797))))))) ((All X64, ((ndr1_0) => ((c1_1 X64) \/ ((c2_1 X64) \/ (-. (c3_1 X64)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))) \/ ((hskp16) \/ (hskp22))) (ndr1_0) (-. (c2_1 (a731))) (c1_1 (a731)) (c3_1 (a731)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp18))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) (-. (hskp5)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ### ConjTree 408
% 0.47/0.68 410. ((-. (hskp7)) \/ ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))) \/ ((hskp16) \/ (hskp22))) ((All X64, ((ndr1_0) => ((c1_1 X64) \/ ((c2_1 X64) \/ (-. (c3_1 X64)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a797)) /\ ((-. (c1_1 (a797))) /\ (-. (c2_1 (a797))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) ((hskp0) \/ (hskp8)) (-. (hskp0)) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (-. (hskp5)) (-. (hskp6)) (-. (hskp4)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp6) \/ (hskp4))) ((hskp16) \/ ((hskp18) \/ (hskp19))) (ndr1_0) ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp7))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c2_1 (a777)) /\ ((-. (c0_1 (a777))) /\ (-. (c3_1 (a777))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp18))) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ### Or 354 409
% 0.47/0.68 411. ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) (-. (hskp11)) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) (c1_1 (a738)) (-. (c2_1 (a738))) (-. (c0_1 (a738))) (ndr1_0) ### DisjTree 50 346 60
% 0.47/0.68 412. ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) (-. (hskp5)) (-. (hskp4)) (ndr1_0) (-. (c0_1 (a738))) (-. (c2_1 (a738))) (c1_1 (a738)) (-. (c2_1 (a731))) (c1_1 (a731)) (c3_1 (a731)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ### Or 411 70
% 0.47/0.68 413. ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738)))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) (ndr1_0) (-. (hskp4)) (-. (hskp5)) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ### ConjTree 412
% 0.47/0.68 414. ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738))))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) (-. (c2_1 (a731))) (c1_1 (a731)) (c3_1 (a731)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp18))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c2_1 (a777)) /\ ((-. (c0_1 (a777))) /\ (-. (c3_1 (a777))))))) ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp7))) (ndr1_0) ((hskp16) \/ ((hskp18) \/ (hskp19))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp6) \/ (hskp4))) (-. (hskp4)) (-. (hskp5)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) (-. (hskp0)) ((hskp0) \/ (hskp8)) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a797)) /\ ((-. (c1_1 (a797))) /\ (-. (c2_1 (a797))))))) ((All X64, ((ndr1_0) => ((c1_1 X64) \/ ((c2_1 X64) \/ (-. (c3_1 X64)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))) \/ ((hskp16) \/ (hskp22))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741))))))) ### Or 410 413
% 0.47/0.68 415. (-. (hskp3)) (hskp3) ### P-NotP
% 0.47/0.68 416. ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp16) \/ (hskp3))) (-. (hskp3)) (-. (hskp16)) (c0_1 (a802)) (-. (c3_1 (a802))) (-. (c2_1 (a802))) (ndr1_0) ### DisjTree 92 298 415
% 0.47/0.68 417. ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802)))))) (ndr1_0) (-. (hskp16)) (-. (hskp3)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp16) \/ (hskp3))) ### ConjTree 416
% 0.47/0.68 418. ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp16) \/ (hskp3))) (-. (hskp3)) (-. (hskp16)) (ndr1_0) (-. (hskp23)) (-. (hskp13)) ((hskp23) \/ ((hskp24) \/ (hskp13))) ### Or 87 417
% 0.47/0.68 419. ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) (-. (hskp11)) (-. (hskp18)) ((hskp23) \/ ((hskp24) \/ (hskp13))) (-. (hskp13)) (ndr1_0) (-. (hskp16)) (-. (hskp3)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp16) \/ (hskp3))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ### Or 418 114
% 0.47/0.68 420. ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) (-. (c1_1 (a744))) (-. (c0_1 (a744))) (c3_1 (a744)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) (-. (hskp0)) (-. (hskp9)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp16) \/ (hskp3))) (-. (hskp3)) (-. (hskp16)) (ndr1_0) (-. (hskp13)) ((hskp23) \/ ((hskp24) \/ (hskp13))) (-. (hskp11)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ### Or 419 153
% 0.47/0.68 421. ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) (-. (c1_1 (a744))) (-. (c0_1 (a744))) (c3_1 (a744)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) (-. (hskp0)) (-. (hskp9)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) (-. (hskp11)) (c2_1 (a764)) (c0_1 (a764)) (-. (c3_1 (a764))) (ndr1_0) (-. (c2_1 (a731))) (c1_1 (a731)) (c3_1 (a731)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp18))) ### Or 347 153
% 0.47/0.68 422. ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp18))) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) (ndr1_0) (-. (hskp11)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp9)) (-. (hskp0)) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c3_1 (a744)) (-. (c0_1 (a744))) (-. (c1_1 (a744))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ### ConjTree 421
% 0.47/0.68 423. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) (-. (c2_1 (a731))) (c1_1 (a731)) (c3_1 (a731)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp18))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) (-. (hskp11)) ((hskp23) \/ ((hskp24) \/ (hskp13))) (-. (hskp13)) (ndr1_0) (-. (hskp3)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp16) \/ (hskp3))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp9)) (-. (hskp0)) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c3_1 (a744)) (-. (c0_1 (a744))) (-. (c1_1 (a744))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ### Or 420 422
% 0.47/0.68 424. (-. (c1_1 (a759))) (c1_1 (a759)) ### Axiom
% 0.47/0.68 425. (c2_1 (a759)) (-. (c2_1 (a759))) ### Axiom
% 0.47/0.68 426. (c3_1 (a759)) (-. (c3_1 (a759))) ### Axiom
% 0.47/0.68 427. ((ndr1_0) => ((c1_1 (a759)) \/ ((-. (c2_1 (a759))) \/ (-. (c3_1 (a759)))))) (c3_1 (a759)) (c2_1 (a759)) (-. (c1_1 (a759))) (ndr1_0) ### DisjTree 8 424 425 426
% 0.47/0.68 428. (All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) (ndr1_0) (-. (c1_1 (a759))) (c2_1 (a759)) (c3_1 (a759)) ### All 427
% 0.47/0.68 429. ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c3_1 (a793)) (c0_1 (a793)) (-. (c2_1 (a793))) (c3_1 (a759)) (c2_1 (a759)) (-. (c1_1 (a759))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (ndr1_0) ### DisjTree 120 428 125
% 0.47/0.68 430. ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793)))))) (ndr1_0) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) (-. (c1_1 (a759))) (c2_1 (a759)) (c3_1 (a759)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ### ConjTree 429
% 0.47/0.68 431. ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c3_1 (a759)) (c2_1 (a759)) (-. (c1_1 (a759))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) (-. (hskp0)) (ndr1_0) (-. (c2_1 (a775))) (-. (c3_1 (a775))) (c1_1 (a775)) (-. (hskp9)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ### Or 151 430
% 0.47/0.68 432. ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775)))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp9)) (ndr1_0) (-. (hskp0)) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) (-. (c1_1 (a759))) (c2_1 (a759)) (c3_1 (a759)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ### ConjTree 431
% 0.47/0.68 433. ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c3_1 (a759)) (c2_1 (a759)) (-. (c1_1 (a759))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) (-. (hskp0)) (-. (hskp9)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((hskp16) \/ ((hskp18) \/ (hskp19))) (-. (hskp16)) (ndr1_0) (-. (c0_1 (a744))) (-. (c1_1 (a744))) (c3_1 (a744)) (-. (hskp7)) ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp7))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c2_1 (a777)) /\ ((-. (c0_1 (a777))) /\ (-. (c3_1 (a777))))))) ### Or 308 432
% 0.47/0.68 434. ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c3_1 (a759)) (c2_1 (a759)) (-. (c1_1 (a759))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) (-. (hskp0)) (-. (hskp9)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) (-. (hskp11)) (c2_1 (a764)) (c0_1 (a764)) (-. (c3_1 (a764))) (ndr1_0) (-. (c2_1 (a731))) (c1_1 (a731)) (c3_1 (a731)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp18))) ### Or 347 432
% 0.47/0.68 435. ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp18))) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) (ndr1_0) (-. (hskp11)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp9)) (-. (hskp0)) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) (-. (c1_1 (a759))) (c2_1 (a759)) (c3_1 (a759)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ### ConjTree 434
% 0.47/0.68 436. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) (-. (hskp11)) (-. (c2_1 (a731))) (c1_1 (a731)) (c3_1 (a731)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp18))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c2_1 (a777)) /\ ((-. (c0_1 (a777))) /\ (-. (c3_1 (a777))))))) ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp7))) (-. (hskp7)) (c3_1 (a744)) (-. (c1_1 (a744))) (-. (c0_1 (a744))) (ndr1_0) ((hskp16) \/ ((hskp18) \/ (hskp19))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp9)) (-. (hskp0)) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) (-. (c1_1 (a759))) (c2_1 (a759)) (c3_1 (a759)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ### Or 433 435
% 0.47/0.68 437. ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759)))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) (-. (hskp0)) (-. (hskp9)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((hskp16) \/ ((hskp18) \/ (hskp19))) (ndr1_0) (-. (c0_1 (a744))) (-. (c1_1 (a744))) (c3_1 (a744)) (-. (hskp7)) ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp7))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c2_1 (a777)) /\ ((-. (c0_1 (a777))) /\ (-. (c3_1 (a777))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp18))) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) (-. (hskp11)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ### ConjTree 436
% 0.47/0.68 438. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c2_1 (a777)) /\ ((-. (c0_1 (a777))) /\ (-. (c3_1 (a777))))))) ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp7))) (-. (hskp7)) ((hskp16) \/ ((hskp18) \/ (hskp19))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) (-. (c1_1 (a744))) (-. (c0_1 (a744))) (c3_1 (a744)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) (-. (hskp0)) (-. (hskp9)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp16) \/ (hskp3))) (-. (hskp3)) (ndr1_0) ((hskp23) \/ ((hskp24) \/ (hskp13))) (-. (hskp11)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp18))) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ### Or 423 437
% 0.47/0.68 439. (c1_1 (a731)) (-. (c1_1 (a731))) ### Axiom
% 0.47/0.68 440. (c3_1 (a731)) (-. (c3_1 (a731))) ### Axiom
% 0.47/0.68 441. ((ndr1_0) => ((c0_1 (a731)) \/ ((-. (c1_1 (a731))) \/ (-. (c3_1 (a731)))))) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) (All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) (ndr1_0) ### DisjTree 8 385 439 440
% 0.47/0.68 442. (All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) (ndr1_0) (All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) (-. (c2_1 (a731))) (c1_1 (a731)) (c3_1 (a731)) ### All 441
% 0.47/0.68 443. ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) (All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) (ndr1_0) ### DisjTree 389 442 346
% 0.47/0.68 444. (-. (c2_1 (a731))) (c2_1 (a731)) ### Axiom
% 0.47/0.68 445. (-. (c0_1 (a731))) (c0_1 (a731)) ### Axiom
% 0.47/0.68 446. (c1_1 (a731)) (-. (c1_1 (a731))) ### Axiom
% 0.47/0.68 447. (c3_1 (a731)) (-. (c3_1 (a731))) ### Axiom
% 0.47/0.68 448. ((ndr1_0) => ((c0_1 (a731)) \/ ((-. (c1_1 (a731))) \/ (-. (c3_1 (a731)))))) (c3_1 (a731)) (c1_1 (a731)) (-. (c0_1 (a731))) (ndr1_0) ### DisjTree 8 445 446 447
% 0.47/0.68 449. (All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) (ndr1_0) (-. (c0_1 (a731))) (c1_1 (a731)) (c3_1 (a731)) ### All 448
% 0.47/0.68 450. (c3_1 (a731)) (-. (c3_1 (a731))) ### Axiom
% 0.47/0.68 451. ((ndr1_0) => ((c2_1 (a731)) \/ ((-. (c0_1 (a731))) \/ (-. (c3_1 (a731)))))) (c3_1 (a731)) (c1_1 (a731)) (All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) (-. (c2_1 (a731))) (ndr1_0) ### DisjTree 8 444 449 450
% 0.47/0.68 452. (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))) (ndr1_0) (-. (c2_1 (a731))) (All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) (c1_1 (a731)) (c3_1 (a731)) ### All 451
% 0.47/0.68 453. ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c3_1 (a731)) (c1_1 (a731)) (All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) (-. (c2_1 (a731))) (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (ndr1_0) ### DisjTree 120 135 452
% 0.47/0.68 454. ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) (All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (-. (c2_1 (a731))) (c3_1 (a731)) (c1_1 (a731)) (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))) (ndr1_0) ### DisjTree 399 120 453
% 0.47/0.68 455. ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) (-. (c2_1 (a731))) (c3_1 (a731)) (c1_1 (a731)) (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))) (ndr1_0) ### DisjTree 399 454 346
% 0.47/0.68 456. ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (-. (c2_1 (a731))) (c1_1 (a731)) (c3_1 (a731)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) (-. (c3_1 (a749))) (-. (c1_1 (a749))) (-. (c0_1 (a749))) (ndr1_0) ### DisjTree 68 443 455
% 0.47/0.68 457. ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749)))))) (ndr1_0) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) ### ConjTree 456
% 0.47/0.68 458. ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) (-. (c2_1 (a731))) (c1_1 (a731)) (c3_1 (a731)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp18))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((hskp23) \/ ((hskp24) \/ (hskp13))) (ndr1_0) (-. (hskp3)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp16) \/ (hskp3))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp9)) (-. (hskp0)) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c3_1 (a744)) (-. (c0_1 (a744))) (-. (c1_1 (a744))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((hskp16) \/ ((hskp18) \/ (hskp19))) (-. (hskp7)) ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp7))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c2_1 (a777)) /\ ((-. (c0_1 (a777))) /\ (-. (c3_1 (a777))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ### Or 438 457
% 0.47/0.68 459. ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp6) \/ (hskp4))) (-. (hskp4)) (-. (hskp6)) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c2_1 (a777)) /\ ((-. (c0_1 (a777))) /\ (-. (c3_1 (a777))))))) ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp7))) (-. (hskp7)) ((hskp16) \/ ((hskp18) \/ (hskp19))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) (-. (c1_1 (a744))) (-. (c0_1 (a744))) (c3_1 (a744)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) (-. (hskp0)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp16) \/ (hskp3))) (-. (hskp3)) (ndr1_0) ((hskp23) \/ ((hskp24) \/ (hskp13))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp18))) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ### Or 458 259
% 0.47/0.68 460. ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744)))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) (-. (c2_1 (a731))) (c1_1 (a731)) (c3_1 (a731)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp18))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((hskp23) \/ ((hskp24) \/ (hskp13))) (ndr1_0) (-. (hskp3)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp16) \/ (hskp3))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp0)) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((hskp16) \/ ((hskp18) \/ (hskp19))) (-. (hskp7)) ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp7))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c2_1 (a777)) /\ ((-. (c0_1 (a777))) /\ (-. (c3_1 (a777))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) (-. (hskp6)) (-. (hskp4)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp6) \/ (hskp4))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ### ConjTree 459
% 0.47/0.68 461. ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp6) \/ (hskp4))) (-. (hskp4)) (-. (hskp6)) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c2_1 (a777)) /\ ((-. (c0_1 (a777))) /\ (-. (c3_1 (a777))))))) ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp7))) (-. (hskp7)) ((hskp16) \/ ((hskp18) \/ (hskp19))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp16) \/ (hskp3))) (-. (hskp3)) (ndr1_0) ((hskp23) \/ ((hskp24) \/ (hskp13))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp18))) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) (-. (hskp0)) ((hskp0) \/ (hskp8)) ### Or 7 460
% 0.47/0.68 462. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) (-. (c1_1 (a744))) (-. (c0_1 (a744))) (c3_1 (a744)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) (-. (hskp0)) (-. (hskp9)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp18))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) (ndr1_0) (c1_1 (a741)) (-. (c0_1 (a741))) (c3_1 (a741)) ((All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))) \/ ((hskp16) \/ (hskp22))) (-. (hskp11)) ((All X64, ((ndr1_0) => ((c1_1 X64) \/ ((c2_1 X64) \/ (-. (c3_1 X64)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a797)) /\ ((-. (c1_1 (a797))) /\ (-. (c2_1 (a797))))))) ### Or 374 422
% 0.47/0.68 463. ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a797)) /\ ((-. (c1_1 (a797))) /\ (-. (c2_1 (a797))))))) ((All X64, ((ndr1_0) => ((c1_1 X64) \/ ((c2_1 X64) \/ (-. (c3_1 X64)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))) \/ ((hskp16) \/ (hskp22))) (c3_1 (a741)) (-. (c0_1 (a741))) (c1_1 (a741)) (ndr1_0) (-. (c2_1 (a731))) (c1_1 (a731)) (c3_1 (a731)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp18))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp9)) (-. (hskp0)) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c3_1 (a744)) (-. (c0_1 (a744))) (-. (c1_1 (a744))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ### Or 462 457
% 0.47/0.68 464. ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) (-. (c1_1 (a744))) (-. (c0_1 (a744))) (c3_1 (a744)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) (-. (hskp0)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp18))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) (ndr1_0) (c1_1 (a741)) (-. (c0_1 (a741))) (c3_1 (a741)) ((All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))) \/ ((hskp16) \/ (hskp22))) ((All X64, ((ndr1_0) => ((c1_1 X64) \/ ((c2_1 X64) \/ (-. (c3_1 X64)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a797)) /\ ((-. (c1_1 (a797))) /\ (-. (c2_1 (a797))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ### Or 463 405
% 0.47/0.68 465. ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744)))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a797)) /\ ((-. (c1_1 (a797))) /\ (-. (c2_1 (a797))))))) ((All X64, ((ndr1_0) => ((c1_1 X64) \/ ((c2_1 X64) \/ (-. (c3_1 X64)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))) \/ ((hskp16) \/ (hskp22))) (c3_1 (a741)) (-. (c0_1 (a741))) (c1_1 (a741)) (ndr1_0) (-. (c2_1 (a731))) (c1_1 (a731)) (c3_1 (a731)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp18))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp0)) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ### ConjTree 464
% 0.47/0.68 466. ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp18))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) (ndr1_0) (c1_1 (a741)) (-. (c0_1 (a741))) (c3_1 (a741)) ((All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))) \/ ((hskp16) \/ (hskp22))) ((All X64, ((ndr1_0) => ((c1_1 X64) \/ ((c2_1 X64) \/ (-. (c3_1 X64)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a797)) /\ ((-. (c1_1 (a797))) /\ (-. (c2_1 (a797))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) (-. (hskp0)) ((hskp0) \/ (hskp8)) ### Or 7 465
% 0.47/0.68 467. ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741)))))) ((hskp0) \/ (hskp8)) (-. (hskp0)) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a797)) /\ ((-. (c1_1 (a797))) /\ (-. (c2_1 (a797))))))) ((All X64, ((ndr1_0) => ((c1_1 X64) \/ ((c2_1 X64) \/ (-. (c3_1 X64)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))) \/ ((hskp16) \/ (hskp22))) (ndr1_0) (-. (c2_1 (a731))) (c1_1 (a731)) (c3_1 (a731)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp18))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ### ConjTree 466
% 0.47/0.68 468. ((-. (hskp7)) \/ ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741))))))) ((All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))) \/ ((hskp16) \/ (hskp22))) ((All X64, ((ndr1_0) => ((c1_1 X64) \/ ((c2_1 X64) \/ (-. (c3_1 X64)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a797)) /\ ((-. (c1_1 (a797))) /\ (-. (c2_1 (a797))))))) ((hskp0) \/ (hskp8)) (-. (hskp0)) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) (-. (c2_1 (a731))) (c1_1 (a731)) (c3_1 (a731)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp18))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((hskp23) \/ ((hskp24) \/ (hskp13))) (ndr1_0) (-. (hskp3)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp16) \/ (hskp3))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((hskp16) \/ ((hskp18) \/ (hskp19))) ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp7))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c2_1 (a777)) /\ ((-. (c0_1 (a777))) /\ (-. (c3_1 (a777))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) (-. (hskp6)) (-. (hskp4)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp6) \/ (hskp4))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ### Or 461 467
% 0.47/0.68 469. ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) (ndr1_0) (-. (c0_1 (a738))) (-. (c2_1 (a738))) (c1_1 (a738)) (-. (c2_1 (a731))) (c1_1 (a731)) (c3_1 (a731)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ### Or 411 457
% 0.47/0.68 470. ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738)))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) (ndr1_0) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ### ConjTree 469
% 0.47/0.68 471. ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738))))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp6) \/ (hskp4))) (-. (hskp4)) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c2_1 (a777)) /\ ((-. (c0_1 (a777))) /\ (-. (c3_1 (a777))))))) ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp7))) ((hskp16) \/ ((hskp18) \/ (hskp19))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp16) \/ (hskp3))) (-. (hskp3)) (ndr1_0) ((hskp23) \/ ((hskp24) \/ (hskp13))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp18))) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) (-. (hskp0)) ((hskp0) \/ (hskp8)) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a797)) /\ ((-. (c1_1 (a797))) /\ (-. (c2_1 (a797))))))) ((All X64, ((ndr1_0) => ((c1_1 X64) \/ ((c2_1 X64) \/ (-. (c3_1 X64)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))) \/ ((hskp16) \/ (hskp22))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741))))))) ### Or 468 470
% 0.47/0.68 472. ((ndr1_0) /\ ((c2_1 (a735)) /\ ((c3_1 (a735)) /\ (-. (c0_1 (a735)))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741))))))) ((All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))) \/ ((hskp16) \/ (hskp22))) ((All X64, ((ndr1_0) => ((c1_1 X64) \/ ((c2_1 X64) \/ (-. (c3_1 X64)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a797)) /\ ((-. (c1_1 (a797))) /\ (-. (c2_1 (a797))))))) ((hskp0) \/ (hskp8)) (-. (hskp0)) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) (-. (c2_1 (a731))) (c1_1 (a731)) (c3_1 (a731)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp18))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((hskp23) \/ ((hskp24) \/ (hskp13))) (ndr1_0) (-. (hskp3)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp16) \/ (hskp3))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((hskp16) \/ ((hskp18) \/ (hskp19))) ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp7))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c2_1 (a777)) /\ ((-. (c0_1 (a777))) /\ (-. (c3_1 (a777))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) (-. (hskp4)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp6) \/ (hskp4))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738))))))) ### ConjTree 471
% 0.47/0.68 473. ((-. (hskp5)) \/ ((ndr1_0) /\ ((c2_1 (a735)) /\ ((c3_1 (a735)) /\ (-. (c0_1 (a735))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp16) \/ (hskp3))) (-. (hskp3)) ((hskp23) \/ ((hskp24) \/ (hskp13))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))) \/ ((hskp16) \/ (hskp22))) ((All X64, ((ndr1_0) => ((c1_1 X64) \/ ((c2_1 X64) \/ (-. (c3_1 X64)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a797)) /\ ((-. (c1_1 (a797))) /\ (-. (c2_1 (a797))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) ((hskp0) \/ (hskp8)) (-. (hskp0)) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (-. (hskp4)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp6) \/ (hskp4))) ((hskp16) \/ ((hskp18) \/ (hskp19))) (ndr1_0) ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp7))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c2_1 (a777)) /\ ((-. (c0_1 (a777))) /\ (-. (c3_1 (a777))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp18))) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738))))))) ### Or 414 472
% 0.47/0.68 474. ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) (c3_1 (a741)) (c1_1 (a741)) (-. (c0_1 (a741))) (ndr1_0) (-. (c0_1 (a734))) (-. (c3_1 (a734))) (c1_1 (a734)) (-. (hskp0)) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ### Or 218 405
% 0.47/0.68 475. ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741)))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) (-. (hskp0)) (c1_1 (a734)) (-. (c3_1 (a734))) (-. (c0_1 (a734))) (ndr1_0) (-. (c2_1 (a731))) (c1_1 (a731)) (c3_1 (a731)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ### ConjTree 474
% 0.47/0.68 476. ((-. (hskp7)) \/ ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ((hskp0) \/ (hskp8)) (-. (hskp0)) (ndr1_0) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) (-. (hskp5)) (c1_1 (a734)) (-. (c3_1 (a734))) (-. (c0_1 (a734))) ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp7))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ### Or 217 475
% 0.47/0.68 477. ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) (-. (c2_1 (a731))) (All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) (c1_1 (a731)) (c3_1 (a731)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (c3_1 (a746)) (-. (c2_1 (a746))) (-. (c0_1 (a746))) (ndr1_0) ### DisjTree 186 120 453
% 0.47/0.68 478. ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) (-. (c0_1 (a746))) (-. (c2_1 (a746))) (c3_1 (a746)) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) (-. (c2_1 (a731))) (c3_1 (a731)) (c1_1 (a731)) (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))) (ndr1_0) ### DisjTree 399 477 346
% 0.47/0.68 479. ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (c3_1 (a746)) (-. (c2_1 (a746))) (-. (c0_1 (a746))) (-. (c2_1 (a731))) (c1_1 (a731)) (c3_1 (a731)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) (-. (c3_1 (a749))) (-. (c1_1 (a749))) (-. (c0_1 (a749))) (ndr1_0) ### DisjTree 68 443 478
% 0.47/0.68 480. ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749)))))) (ndr1_0) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) (-. (c0_1 (a746))) (-. (c2_1 (a746))) (c3_1 (a746)) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) ### ConjTree 479
% 0.47/0.68 481. ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (c3_1 (a746)) (-. (c2_1 (a746))) (-. (c0_1 (a746))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) (ndr1_0) (-. (c0_1 (a738))) (-. (c2_1 (a738))) (c1_1 (a738)) (-. (c2_1 (a731))) (c1_1 (a731)) (c3_1 (a731)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ### Or 411 480
% 0.47/0.68 482. ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746)))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) (c1_1 (a738)) (-. (c2_1 (a738))) (-. (c0_1 (a738))) (ndr1_0) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ### ConjTree 481
% 0.47/0.68 483. ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) (-. (c0_1 (a738))) (-. (c2_1 (a738))) (c1_1 (a738)) (-. (c2_1 (a731))) (c1_1 (a731)) (c3_1 (a731)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) (ndr1_0) (-. (c0_1 (a734))) (-. (c3_1 (a734))) (c1_1 (a734)) (-. (hskp0)) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ### Or 218 482
% 0.47/0.68 484. ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738)))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) (-. (hskp0)) (c1_1 (a734)) (-. (c3_1 (a734))) (-. (c0_1 (a734))) (ndr1_0) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ### ConjTree 483
% 0.47/0.68 485. ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) (-. (c2_1 (a731))) (c1_1 (a731)) (c3_1 (a731)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((hskp0) \/ (hskp8)) (-. (hskp0)) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) (c1_1 (a734)) (-. (c3_1 (a734))) (-. (c0_1 (a734))) (ndr1_0) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ### Or 246 484
% 0.47/0.68 486. ((ndr1_0) /\ ((c2_1 (a735)) /\ ((c3_1 (a735)) /\ (-. (c0_1 (a735)))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) (ndr1_0) (-. (c0_1 (a734))) (-. (c3_1 (a734))) (c1_1 (a734)) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) (-. (hskp0)) ((hskp0) \/ (hskp8)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738))))))) ### ConjTree 485
% 0.47/0.68 487. ((-. (hskp5)) \/ ((ndr1_0) /\ ((c2_1 (a735)) /\ ((c3_1 (a735)) /\ (-. (c0_1 (a735))))))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp7))) (-. (c0_1 (a734))) (-. (c3_1 (a734))) (c1_1 (a734)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) (ndr1_0) (-. (hskp0)) ((hskp0) \/ (hskp8)) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) (-. (c2_1 (a731))) (c1_1 (a731)) (c3_1 (a731)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741))))))) ### Or 476 486
% 0.47/0.68 488. ((ndr1_0) /\ ((c1_1 (a734)) /\ ((-. (c0_1 (a734))) /\ (-. (c3_1 (a734)))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ((hskp0) \/ (hskp8)) (-. (hskp0)) (ndr1_0) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp7))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738))))))) ((-. (hskp5)) \/ ((ndr1_0) /\ ((c2_1 (a735)) /\ ((c3_1 (a735)) /\ (-. (c0_1 (a735))))))) ### ConjTree 487
% 0.47/0.68 489. ((-. (hskp4)) \/ ((ndr1_0) /\ ((c1_1 (a734)) /\ ((-. (c0_1 (a734))) /\ (-. (c3_1 (a734))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738))))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) (-. (c2_1 (a731))) (c1_1 (a731)) (c3_1 (a731)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp18))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c2_1 (a777)) /\ ((-. (c0_1 (a777))) /\ (-. (c3_1 (a777))))))) ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp7))) (ndr1_0) ((hskp16) \/ ((hskp18) \/ (hskp19))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp6) \/ (hskp4))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) (-. (hskp0)) ((hskp0) \/ (hskp8)) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a797)) /\ ((-. (c1_1 (a797))) /\ (-. (c2_1 (a797))))))) ((All X64, ((ndr1_0) => ((c1_1 X64) \/ ((c2_1 X64) \/ (-. (c3_1 X64)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))) \/ ((hskp16) \/ (hskp22))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((hskp23) \/ ((hskp24) \/ (hskp13))) (-. (hskp3)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp16) \/ (hskp3))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ((-. (hskp5)) \/ ((ndr1_0) /\ ((c2_1 (a735)) /\ ((c3_1 (a735)) /\ (-. (c0_1 (a735))))))) ### Or 473 488
% 0.47/0.68 490. (-. (c0_1 (a733))) (c0_1 (a733)) ### Axiom
% 0.47/0.68 491. (-. (c1_1 (a733))) (c1_1 (a733)) ### Axiom
% 0.47/0.68 492. (c2_1 (a733)) (-. (c2_1 (a733))) ### Axiom
% 0.47/0.68 493. ((ndr1_0) => ((c0_1 (a733)) \/ ((c1_1 (a733)) \/ (-. (c2_1 (a733)))))) (c2_1 (a733)) (-. (c1_1 (a733))) (-. (c0_1 (a733))) (ndr1_0) ### DisjTree 8 490 491 492
% 0.47/0.68 494. (All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) (ndr1_0) (-. (c0_1 (a733))) (-. (c1_1 (a733))) (c2_1 (a733)) ### All 493
% 0.47/0.68 495. (-. (hskp26)) (hskp26) ### P-NotP
% 0.47/0.68 496. ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((hskp26) \/ (hskp6))) (-. (hskp6)) (-. (hskp26)) (c2_1 (a733)) (-. (c1_1 (a733))) (-. (c0_1 (a733))) (ndr1_0) ### DisjTree 494 495 21
% 0.47/0.68 497. (c1_1 (a737)) (-. (c1_1 (a737))) ### Axiom
% 0.47/0.68 498. (c2_1 (a737)) (-. (c2_1 (a737))) ### Axiom
% 0.47/0.68 499. (c3_1 (a737)) (-. (c3_1 (a737))) ### Axiom
% 0.47/0.68 500. ((ndr1_0) => ((-. (c1_1 (a737))) \/ ((-. (c2_1 (a737))) \/ (-. (c3_1 (a737)))))) (c3_1 (a737)) (c2_1 (a737)) (c1_1 (a737)) (ndr1_0) ### DisjTree 8 497 498 499
% 0.47/0.68 501. (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))) (ndr1_0) (c1_1 (a737)) (c2_1 (a737)) (c3_1 (a737)) ### All 500
% 0.47/0.68 502. ((All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))) \/ ((hskp16) \/ (hskp22))) (-. (hskp22)) (-. (hskp16)) (c3_1 (a737)) (c2_1 (a737)) (c1_1 (a737)) (ndr1_0) ### DisjTree 501 298 364
% 0.47/0.68 503. ((ndr1_0) /\ ((c1_1 (a737)) /\ ((c2_1 (a737)) /\ (c3_1 (a737))))) (ndr1_0) (-. (hskp16)) (-. (hskp22)) ((All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))) \/ ((hskp16) \/ (hskp22))) ### ConjTree 502
% 0.47/0.68 504. ((-. (hskp26)) \/ ((ndr1_0) /\ ((c1_1 (a737)) /\ ((c2_1 (a737)) /\ (c3_1 (a737)))))) ((All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))) \/ ((hskp16) \/ (hskp22))) (-. (hskp22)) (-. (hskp16)) (ndr1_0) (-. (c0_1 (a733))) (-. (c1_1 (a733))) (c2_1 (a733)) (-. (hskp6)) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((hskp26) \/ (hskp6))) ### Or 496 503
% 0.47/0.68 505. ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a797)) /\ ((-. (c1_1 (a797))) /\ (-. (c2_1 (a797))))))) ((All X64, ((ndr1_0) => ((c1_1 X64) \/ ((c2_1 X64) \/ (-. (c3_1 X64)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) (-. (hskp11)) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((hskp26) \/ (hskp6))) (-. (hskp6)) (c2_1 (a733)) (-. (c1_1 (a733))) (-. (c0_1 (a733))) (ndr1_0) (-. (hskp16)) ((All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))) \/ ((hskp16) \/ (hskp22))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c1_1 (a737)) /\ ((c2_1 (a737)) /\ (c3_1 (a737)))))) ### Or 504 373
% 0.47/0.68 506. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp9)) (-. (hskp0)) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (-. (hskp5)) (c3_1 (a744)) (-. (c0_1 (a744))) (-. (c1_1 (a744))) (-. (hskp4)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp6) \/ (hskp4))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp18))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c1_1 (a737)) /\ ((c2_1 (a737)) /\ (c3_1 (a737)))))) ((All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))) \/ ((hskp16) \/ (hskp22))) (ndr1_0) (-. (c0_1 (a733))) (-. (c1_1 (a733))) (c2_1 (a733)) (-. (hskp6)) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((hskp26) \/ (hskp6))) (-. (c2_1 (a731))) (c1_1 (a731)) (c3_1 (a731)) (-. (hskp11)) ((All X64, ((ndr1_0) => ((c1_1 X64) \/ ((c2_1 X64) \/ (-. (c3_1 X64)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a797)) /\ ((-. (c1_1 (a797))) /\ (-. (c2_1 (a797))))))) ### Or 505 349
% 0.47/0.68 507. ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a797)) /\ ((-. (c1_1 (a797))) /\ (-. (c2_1 (a797))))))) ((All X64, ((ndr1_0) => ((c1_1 X64) \/ ((c2_1 X64) \/ (-. (c3_1 X64)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((hskp26) \/ (hskp6))) (-. (hskp6)) (c2_1 (a733)) (-. (c1_1 (a733))) (-. (c0_1 (a733))) (ndr1_0) ((All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))) \/ ((hskp16) \/ (hskp22))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c1_1 (a737)) /\ ((c2_1 (a737)) /\ (c3_1 (a737)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp18))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp6) \/ (hskp4))) (-. (hskp4)) (-. (c1_1 (a744))) (-. (c0_1 (a744))) (c3_1 (a744)) (-. (hskp5)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) (-. (hskp0)) (-. (hskp9)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ### Or 506 70
% 0.47/0.68 508. ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp0)) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (-. (hskp5)) (c3_1 (a744)) (-. (c0_1 (a744))) (-. (c1_1 (a744))) (-. (hskp4)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp6) \/ (hskp4))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp18))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c1_1 (a737)) /\ ((c2_1 (a737)) /\ (c3_1 (a737)))))) ((All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))) \/ ((hskp16) \/ (hskp22))) (ndr1_0) (-. (c0_1 (a733))) (-. (c1_1 (a733))) (c2_1 (a733)) (-. (hskp6)) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((hskp26) \/ (hskp6))) (-. (c2_1 (a731))) (c1_1 (a731)) (c3_1 (a731)) ((All X64, ((ndr1_0) => ((c1_1 X64) \/ ((c2_1 X64) \/ (-. (c3_1 X64)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a797)) /\ ((-. (c1_1 (a797))) /\ (-. (c2_1 (a797))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ### Or 507 259
% 0.47/0.69 509. ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744)))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a797)) /\ ((-. (c1_1 (a797))) /\ (-. (c2_1 (a797))))))) ((All X64, ((ndr1_0) => ((c1_1 X64) \/ ((c2_1 X64) \/ (-. (c3_1 X64)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((hskp26) \/ (hskp6))) (-. (hskp6)) (c2_1 (a733)) (-. (c1_1 (a733))) (-. (c0_1 (a733))) (ndr1_0) ((All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))) \/ ((hskp16) \/ (hskp22))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c1_1 (a737)) /\ ((c2_1 (a737)) /\ (c3_1 (a737)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp18))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp6) \/ (hskp4))) (-. (hskp4)) (-. (hskp5)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) (-. (hskp0)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ### ConjTree 508
% 0.47/0.69 510. ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (-. (hskp5)) (-. (hskp4)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp6) \/ (hskp4))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp18))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c1_1 (a737)) /\ ((c2_1 (a737)) /\ (c3_1 (a737)))))) ((All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))) \/ ((hskp16) \/ (hskp22))) (ndr1_0) (-. (c0_1 (a733))) (-. (c1_1 (a733))) (c2_1 (a733)) (-. (hskp6)) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((hskp26) \/ (hskp6))) (-. (c2_1 (a731))) (c1_1 (a731)) (c3_1 (a731)) ((All X64, ((ndr1_0) => ((c1_1 X64) \/ ((c2_1 X64) \/ (-. (c3_1 X64)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a797)) /\ ((-. (c1_1 (a797))) /\ (-. (c2_1 (a797))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) (-. (hskp0)) ((hskp0) \/ (hskp8)) ### Or 7 509
% 0.47/0.69 511. ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738))))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((hskp0) \/ (hskp8)) (-. (hskp0)) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a797)) /\ ((-. (c1_1 (a797))) /\ (-. (c2_1 (a797))))))) ((All X64, ((ndr1_0) => ((c1_1 X64) \/ ((c2_1 X64) \/ (-. (c3_1 X64)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((hskp26) \/ (hskp6))) (c2_1 (a733)) (-. (c1_1 (a733))) (-. (c0_1 (a733))) (ndr1_0) ((All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))) \/ ((hskp16) \/ (hskp22))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c1_1 (a737)) /\ ((c2_1 (a737)) /\ (c3_1 (a737)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp18))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp6) \/ (hskp4))) (-. (hskp4)) (-. (hskp5)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ### Or 510 413
% 0.47/0.69 512. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) (-. (c1_1 (a744))) (-. (c0_1 (a744))) (c3_1 (a744)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) (-. (hskp0)) (-. (hskp9)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp18))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c1_1 (a737)) /\ ((c2_1 (a737)) /\ (c3_1 (a737)))))) ((All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))) \/ ((hskp16) \/ (hskp22))) (ndr1_0) (-. (c0_1 (a733))) (-. (c1_1 (a733))) (c2_1 (a733)) (-. (hskp6)) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((hskp26) \/ (hskp6))) (-. (c2_1 (a731))) (c1_1 (a731)) (c3_1 (a731)) (-. (hskp11)) ((All X64, ((ndr1_0) => ((c1_1 X64) \/ ((c2_1 X64) \/ (-. (c3_1 X64)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a797)) /\ ((-. (c1_1 (a797))) /\ (-. (c2_1 (a797))))))) ### Or 505 422
% 0.47/0.69 513. ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) (c3_1 (a737)) (c2_1 (a737)) (c1_1 (a737)) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (-. (c2_1 (a731))) (c3_1 (a731)) (c1_1 (a731)) (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))) (ndr1_0) ### DisjTree 399 120 501
% 0.47/0.69 514. ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) (c1_1 (a737)) (c2_1 (a737)) (c3_1 (a737)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) (-. (c2_1 (a731))) (c1_1 (a731)) (c3_1 (a731)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) (-. (c3_1 (a749))) (-. (c1_1 (a749))) (-. (c0_1 (a749))) (ndr1_0) ### DisjTree 68 443 513
% 0.47/0.69 515. ((ndr1_0) /\ ((c1_1 (a737)) /\ ((c2_1 (a737)) /\ (c3_1 (a737))))) (ndr1_0) (-. (c0_1 (a749))) (-. (c1_1 (a749))) (-. (c3_1 (a749))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) ### ConjTree 514
% 0.47/0.69 516. ((-. (hskp26)) \/ ((ndr1_0) /\ ((c1_1 (a737)) /\ ((c2_1 (a737)) /\ (c3_1 (a737)))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) (-. (c2_1 (a731))) (c1_1 (a731)) (c3_1 (a731)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) (-. (c3_1 (a749))) (-. (c1_1 (a749))) (-. (c0_1 (a749))) (ndr1_0) (-. (c0_1 (a733))) (-. (c1_1 (a733))) (c2_1 (a733)) (-. (hskp6)) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((hskp26) \/ (hskp6))) ### Or 496 515
% 0.47/0.69 517. ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749)))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((hskp26) \/ (hskp6))) (-. (hskp6)) (c2_1 (a733)) (-. (c1_1 (a733))) (-. (c0_1 (a733))) (ndr1_0) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c1_1 (a737)) /\ ((c2_1 (a737)) /\ (c3_1 (a737)))))) ### ConjTree 516
% 0.47/0.69 518. ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a797)) /\ ((-. (c1_1 (a797))) /\ (-. (c2_1 (a797))))))) ((All X64, ((ndr1_0) => ((c1_1 X64) \/ ((c2_1 X64) \/ (-. (c3_1 X64)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((hskp26) \/ (hskp6))) (-. (hskp6)) (c2_1 (a733)) (-. (c1_1 (a733))) (-. (c0_1 (a733))) (ndr1_0) ((All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))) \/ ((hskp16) \/ (hskp22))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c1_1 (a737)) /\ ((c2_1 (a737)) /\ (c3_1 (a737)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp18))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp9)) (-. (hskp0)) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c3_1 (a744)) (-. (c0_1 (a744))) (-. (c1_1 (a744))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ### Or 512 517
% 0.47/0.69 519. ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) (-. (c1_1 (a744))) (-. (c0_1 (a744))) (c3_1 (a744)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) (-. (hskp0)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp18))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c1_1 (a737)) /\ ((c2_1 (a737)) /\ (c3_1 (a737)))))) ((All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))) \/ ((hskp16) \/ (hskp22))) (ndr1_0) (-. (c0_1 (a733))) (-. (c1_1 (a733))) (c2_1 (a733)) (-. (hskp6)) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((hskp26) \/ (hskp6))) (-. (c2_1 (a731))) (c1_1 (a731)) (c3_1 (a731)) ((All X64, ((ndr1_0) => ((c1_1 X64) \/ ((c2_1 X64) \/ (-. (c3_1 X64)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a797)) /\ ((-. (c1_1 (a797))) /\ (-. (c2_1 (a797))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ### Or 518 190
% 0.47/0.69 520. ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744)))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a797)) /\ ((-. (c1_1 (a797))) /\ (-. (c2_1 (a797))))))) ((All X64, ((ndr1_0) => ((c1_1 X64) \/ ((c2_1 X64) \/ (-. (c3_1 X64)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((hskp26) \/ (hskp6))) (-. (hskp6)) (c2_1 (a733)) (-. (c1_1 (a733))) (-. (c0_1 (a733))) (ndr1_0) ((All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))) \/ ((hskp16) \/ (hskp22))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c1_1 (a737)) /\ ((c2_1 (a737)) /\ (c3_1 (a737)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp18))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp0)) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ### ConjTree 519
% 0.47/0.69 521. ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp18))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c1_1 (a737)) /\ ((c2_1 (a737)) /\ (c3_1 (a737)))))) ((All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))) \/ ((hskp16) \/ (hskp22))) (ndr1_0) (-. (c0_1 (a733))) (-. (c1_1 (a733))) (c2_1 (a733)) (-. (hskp6)) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((hskp26) \/ (hskp6))) (-. (c2_1 (a731))) (c1_1 (a731)) (c3_1 (a731)) ((All X64, ((ndr1_0) => ((c1_1 X64) \/ ((c2_1 X64) \/ (-. (c3_1 X64)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a797)) /\ ((-. (c1_1 (a797))) /\ (-. (c2_1 (a797))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) (-. (hskp0)) ((hskp0) \/ (hskp8)) ### Or 7 520
% 0.47/0.69 522. ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ (hskp0))) (-. (hskp0)) (c1_1 (a738)) (-. (c2_1 (a738))) (-. (c0_1 (a738))) (c2_1 (a733)) (-. (c1_1 (a733))) (-. (c0_1 (a733))) (ndr1_0) ### DisjTree 494 50 5
% 0.47/0.69 523. ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738)))))) (ndr1_0) (-. (c0_1 (a733))) (-. (c1_1 (a733))) (c2_1 (a733)) (-. (hskp0)) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ (hskp0))) ### ConjTree 522
% 0.47/0.69 524. ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ (hskp0))) ((hskp0) \/ (hskp8)) (-. (hskp0)) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a797)) /\ ((-. (c1_1 (a797))) /\ (-. (c2_1 (a797))))))) ((All X64, ((ndr1_0) => ((c1_1 X64) \/ ((c2_1 X64) \/ (-. (c3_1 X64)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((hskp26) \/ (hskp6))) (c2_1 (a733)) (-. (c1_1 (a733))) (-. (c0_1 (a733))) (ndr1_0) ((All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))) \/ ((hskp16) \/ (hskp22))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c1_1 (a737)) /\ ((c2_1 (a737)) /\ (c3_1 (a737)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp18))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ### Or 521 523
% 0.47/0.69 525. ((ndr1_0) /\ ((c2_1 (a735)) /\ ((c3_1 (a735)) /\ (-. (c0_1 (a735)))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp18))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c1_1 (a737)) /\ ((c2_1 (a737)) /\ (c3_1 (a737)))))) ((All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))) \/ ((hskp16) \/ (hskp22))) (ndr1_0) (-. (c0_1 (a733))) (-. (c1_1 (a733))) (c2_1 (a733)) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((hskp26) \/ (hskp6))) (-. (c2_1 (a731))) (c1_1 (a731)) (c3_1 (a731)) ((All X64, ((ndr1_0) => ((c1_1 X64) \/ ((c2_1 X64) \/ (-. (c3_1 X64)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a797)) /\ ((-. (c1_1 (a797))) /\ (-. (c2_1 (a797))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) (-. (hskp0)) ((hskp0) \/ (hskp8)) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ (hskp0))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738))))))) ### ConjTree 524
% 0.47/0.69 526. ((-. (hskp5)) \/ ((ndr1_0) /\ ((c2_1 (a735)) /\ ((c3_1 (a735)) /\ (-. (c0_1 (a735))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ (hskp0))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (-. (hskp4)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp6) \/ (hskp4))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp18))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c1_1 (a737)) /\ ((c2_1 (a737)) /\ (c3_1 (a737)))))) ((All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))) \/ ((hskp16) \/ (hskp22))) (ndr1_0) (-. (c0_1 (a733))) (-. (c1_1 (a733))) (c2_1 (a733)) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((hskp26) \/ (hskp6))) (-. (c2_1 (a731))) (c1_1 (a731)) (c3_1 (a731)) ((All X64, ((ndr1_0) => ((c1_1 X64) \/ ((c2_1 X64) \/ (-. (c3_1 X64)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a797)) /\ ((-. (c1_1 (a797))) /\ (-. (c2_1 (a797))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) (-. (hskp0)) ((hskp0) \/ (hskp8)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738))))))) ### Or 511 525
% 0.47/0.69 527. ((-. (hskp4)) \/ ((ndr1_0) /\ ((c1_1 (a734)) /\ ((-. (c0_1 (a734))) /\ (-. (c3_1 (a734))))))) ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp7))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741))))))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738))))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((hskp0) \/ (hskp8)) (-. (hskp0)) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a797)) /\ ((-. (c1_1 (a797))) /\ (-. (c2_1 (a797))))))) ((All X64, ((ndr1_0) => ((c1_1 X64) \/ ((c2_1 X64) \/ (-. (c3_1 X64)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((hskp26) \/ (hskp6))) (c2_1 (a733)) (-. (c1_1 (a733))) (-. (c0_1 (a733))) (ndr1_0) ((All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))) \/ ((hskp16) \/ (hskp22))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c1_1 (a737)) /\ ((c2_1 (a737)) /\ (c3_1 (a737)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp18))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp6) \/ (hskp4))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ (hskp0))) ((-. (hskp5)) \/ ((ndr1_0) /\ ((c2_1 (a735)) /\ ((c3_1 (a735)) /\ (-. (c0_1 (a735))))))) ### Or 526 488
% 0.47/0.69 528. ((ndr1_0) /\ ((c2_1 (a733)) /\ ((-. (c0_1 (a733))) /\ (-. (c1_1 (a733)))))) ((-. (hskp5)) \/ ((ndr1_0) /\ ((c2_1 (a735)) /\ ((c3_1 (a735)) /\ (-. (c0_1 (a735))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ (hskp0))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp6) \/ (hskp4))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp18))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c1_1 (a737)) /\ ((c2_1 (a737)) /\ (c3_1 (a737)))))) ((All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))) \/ ((hskp16) \/ (hskp22))) (ndr1_0) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((hskp26) \/ (hskp6))) (-. (c2_1 (a731))) (c1_1 (a731)) (c3_1 (a731)) ((All X64, ((ndr1_0) => ((c1_1 X64) \/ ((c2_1 X64) \/ (-. (c3_1 X64)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a797)) /\ ((-. (c1_1 (a797))) /\ (-. (c2_1 (a797))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) (-. (hskp0)) ((hskp0) \/ (hskp8)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741))))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp7))) ((-. (hskp4)) \/ ((ndr1_0) /\ ((c1_1 (a734)) /\ ((-. (c0_1 (a734))) /\ (-. (c3_1 (a734))))))) ### ConjTree 527
% 0.47/0.69 529. ((-. (hskp3)) \/ ((ndr1_0) /\ ((c2_1 (a733)) /\ ((-. (c0_1 (a733))) /\ (-. (c1_1 (a733))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((hskp26) \/ (hskp6))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c1_1 (a737)) /\ ((c2_1 (a737)) /\ (c3_1 (a737)))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ (hskp0))) ((-. (hskp5)) \/ ((ndr1_0) /\ ((c2_1 (a735)) /\ ((c3_1 (a735)) /\ (-. (c0_1 (a735))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp16) \/ (hskp3))) ((hskp23) \/ ((hskp24) \/ (hskp13))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))) \/ ((hskp16) \/ (hskp22))) ((All X64, ((ndr1_0) => ((c1_1 X64) \/ ((c2_1 X64) \/ (-. (c3_1 X64)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a797)) /\ ((-. (c1_1 (a797))) /\ (-. (c2_1 (a797))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) ((hskp0) \/ (hskp8)) (-. (hskp0)) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp6) \/ (hskp4))) ((hskp16) \/ ((hskp18) \/ (hskp19))) (ndr1_0) ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp7))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c2_1 (a777)) /\ ((-. (c0_1 (a777))) /\ (-. (c3_1 (a777))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp18))) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738))))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) ((-. (hskp4)) \/ ((ndr1_0) /\ ((c1_1 (a734)) /\ ((-. (c0_1 (a734))) /\ (-. (c3_1 (a734))))))) ### Or 489 528
% 0.47/0.69 530. ((ndr1_0) /\ ((c1_1 (a731)) /\ ((c3_1 (a731)) /\ (-. (c2_1 (a731)))))) ((-. (hskp4)) \/ ((ndr1_0) /\ ((c1_1 (a734)) /\ ((-. (c0_1 (a734))) /\ (-. (c3_1 (a734))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738))))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp18))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c2_1 (a777)) /\ ((-. (c0_1 (a777))) /\ (-. (c3_1 (a777))))))) ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp7))) ((hskp16) \/ ((hskp18) \/ (hskp19))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp6) \/ (hskp4))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) (-. (hskp0)) ((hskp0) \/ (hskp8)) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a797)) /\ ((-. (c1_1 (a797))) /\ (-. (c2_1 (a797))))))) ((All X64, ((ndr1_0) => ((c1_1 X64) \/ ((c2_1 X64) \/ (-. (c3_1 X64)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))) \/ ((hskp16) \/ (hskp22))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((hskp23) \/ ((hskp24) \/ (hskp13))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp16) \/ (hskp3))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ((-. (hskp5)) \/ ((ndr1_0) /\ ((c2_1 (a735)) /\ ((c3_1 (a735)) /\ (-. (c0_1 (a735))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ (hskp0))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c1_1 (a737)) /\ ((c2_1 (a737)) /\ (c3_1 (a737)))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((hskp26) \/ (hskp6))) ((-. (hskp3)) \/ ((ndr1_0) /\ ((c2_1 (a733)) /\ ((-. (c0_1 (a733))) /\ (-. (c1_1 (a733))))))) ### ConjTree 529
% 0.47/0.69 531. ((-. (hskp1)) \/ ((ndr1_0) /\ ((c1_1 (a731)) /\ ((c3_1 (a731)) /\ (-. (c2_1 (a731))))))) ((-. (hskp3)) \/ ((ndr1_0) /\ ((c2_1 (a733)) /\ ((-. (c0_1 (a733))) /\ (-. (c1_1 (a733))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((hskp26) \/ (hskp6))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c1_1 (a737)) /\ ((c2_1 (a737)) /\ (c3_1 (a737)))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ (hskp0))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp16) \/ (hskp3))) ((All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))) \/ ((hskp16) \/ (hskp22))) ((All X64, ((ndr1_0) => ((c1_1 X64) \/ ((c2_1 X64) \/ (-. (c3_1 X64)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a797)) /\ ((-. (c1_1 (a797))) /\ (-. (c2_1 (a797))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((hskp16) \/ ((hskp18) \/ (hskp19))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c2_1 (a777)) /\ ((-. (c0_1 (a777))) /\ (-. (c3_1 (a777))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp18))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((-. (hskp4)) \/ ((ndr1_0) /\ ((c1_1 (a734)) /\ ((-. (c0_1 (a734))) /\ (-. (c3_1 (a734))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) \/ (hskp2))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp7))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((-. (c0_1 (a748))) /\ ((-. (c1_1 (a748))) /\ (-. (c2_1 (a748))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((hskp0) \/ (hskp1))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((hskp7) \/ ((hskp1) \/ (hskp4))) ((hskp0) \/ (hskp8)) (-. (hskp0)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp6) \/ (hskp4))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All X21, ((ndr1_0) => ((c1_1 X21) \/ ((-. (c0_1 X21)) \/ (-. (c2_1 X21)))))) \/ (hskp4))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((hskp1) \/ (hskp2))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((hskp23) \/ ((hskp24) \/ (hskp13))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ (hskp2))) ((-. (hskp5)) \/ ((ndr1_0) /\ ((c2_1 (a735)) /\ ((c3_1 (a735)) /\ (-. (c0_1 (a735))))))) ((All X22, ((ndr1_0) => ((c0_1 X22) \/ ((c2_1 X22) \/ (c3_1 X22))))) \/ ((hskp5) \/ (hskp9))) ((-. (hskp27)) \/ ((ndr1_0) /\ ((c0_1 (a750)) /\ ((c1_1 (a750)) /\ (c2_1 (a750)))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((All X61, ((ndr1_0) => ((c1_1 X61) \/ ((c2_1 X61) \/ (c3_1 X61))))) \/ ((hskp27) \/ (hskp0))) ((-. (hskp2)) \/ ((ndr1_0) /\ ((-. (c0_1 (a732))) /\ ((-. (c2_1 (a732))) /\ (-. (c3_1 (a732))))))) ### Or 297 530
% 0.47/0.69 532. (c0_1 (a730)) (-. (c0_1 (a730))) ### Axiom
% 0.47/0.69 533. (-. (c1_1 (a730))) (c1_1 (a730)) ### Axiom
% 0.47/0.69 534. (-. (c2_1 (a730))) (c2_1 (a730)) ### Axiom
% 0.47/0.69 535. (c0_1 (a730)) (-. (c0_1 (a730))) ### Axiom
% 0.47/0.69 536. ((ndr1_0) => ((c1_1 (a730)) \/ ((c2_1 (a730)) \/ (-. (c0_1 (a730)))))) (c0_1 (a730)) (-. (c2_1 (a730))) (-. (c1_1 (a730))) (ndr1_0) ### DisjTree 8 533 534 535
% 0.47/0.69 537. (All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) (ndr1_0) (-. (c1_1 (a730))) (-. (c2_1 (a730))) (c0_1 (a730)) ### All 536
% 0.47/0.69 538. (c3_1 (a730)) (-. (c3_1 (a730))) ### Axiom
% 0.47/0.69 539. ((ndr1_0) => ((-. (c0_1 (a730))) \/ ((-. (c2_1 (a730))) \/ (-. (c3_1 (a730)))))) (c3_1 (a730)) (-. (c1_1 (a730))) (All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) (c0_1 (a730)) (ndr1_0) ### DisjTree 8 532 537 538
% 0.47/0.69 540. (All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) (ndr1_0) (c0_1 (a730)) (All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) (-. (c1_1 (a730))) (c3_1 (a730)) ### All 539
% 0.47/0.69 541. ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (-. (hskp1)) (c3_1 (a730)) (-. (c1_1 (a730))) (All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) (c0_1 (a730)) (c1_1 (a798)) (c0_1 (a798)) (-. (c3_1 (a798))) (ndr1_0) ### DisjTree 111 540 2
% 0.47/0.69 542. ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) \/ (hskp2))) (-. (hskp2)) (-. (c3_1 (a798))) (c0_1 (a798)) (c1_1 (a798)) (c0_1 (a730)) (-. (c1_1 (a730))) (c3_1 (a730)) (-. (hskp1)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (c3_1 (a741)) (c1_1 (a741)) (-. (c0_1 (a741))) (ndr1_0) ### DisjTree 223 541 38
% 0.47/0.69 543. ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798)))))) (ndr1_0) (-. (c0_1 (a741))) (c1_1 (a741)) (c3_1 (a741)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (-. (hskp1)) (c3_1 (a730)) (-. (c1_1 (a730))) (c0_1 (a730)) (-. (hskp2)) ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) \/ (hskp2))) ### ConjTree 542
% 0.47/0.69 544. ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) \/ (hskp2))) (-. (hskp2)) (c0_1 (a730)) (-. (c1_1 (a730))) (c3_1 (a730)) (-. (hskp1)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (c3_1 (a741)) (c1_1 (a741)) (-. (c0_1 (a741))) ((hskp23) \/ ((hskp24) \/ (hskp13))) (-. (hskp13)) (ndr1_0) (-. (hskp16)) (-. (hskp3)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp16) \/ (hskp3))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ### Or 418 543
% 0.47/0.69 545. ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (-. (hskp1)) (c3_1 (a729)) (c2_1 (a729)) (c0_1 (a729)) (c2_1 (a764)) (c0_1 (a764)) (-. (c3_1 (a764))) (ndr1_0) (All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) ### DisjTree 340 100 2
% 0.47/0.69 546. (-. (c1_1 (a730))) (c1_1 (a730)) ### Axiom
% 0.47/0.69 547. (c0_1 (a730)) (-. (c0_1 (a730))) ### Axiom
% 0.47/0.69 548. (c3_1 (a730)) (-. (c3_1 (a730))) ### Axiom
% 0.47/0.69 549. ((ndr1_0) => ((c1_1 (a730)) \/ ((-. (c0_1 (a730))) \/ (-. (c3_1 (a730)))))) (c3_1 (a730)) (c0_1 (a730)) (-. (c1_1 (a730))) (ndr1_0) ### DisjTree 8 546 547 548
% 0.47/0.69 550. (All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) (ndr1_0) (-. (c1_1 (a730))) (c0_1 (a730)) (c3_1 (a730)) ### All 549
% 0.47/0.69 551. ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) (-. (hskp5)) (c3_1 (a730)) (c0_1 (a730)) (-. (c1_1 (a730))) (ndr1_0) (-. (c3_1 (a764))) (c0_1 (a764)) (c2_1 (a764)) (c0_1 (a729)) (c2_1 (a729)) (c3_1 (a729)) (-. (hskp1)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) ### DisjTree 545 550 18
% 0.47/0.69 552. ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729))))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (-. (hskp1)) (c2_1 (a764)) (c0_1 (a764)) (-. (c3_1 (a764))) (ndr1_0) (-. (c1_1 (a730))) (c0_1 (a730)) (c3_1 (a730)) (-. (hskp5)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ### ConjTree 551
% 0.47/0.69 553. ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) (-. (hskp5)) (c3_1 (a730)) (c0_1 (a730)) (-. (c1_1 (a730))) (-. (c3_1 (a764))) (c0_1 (a764)) (c2_1 (a764)) (-. (hskp1)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (ndr1_0) (-. (c2_1 (a802))) (-. (c3_1 (a802))) (c0_1 (a802)) (-. (hskp9)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ### Or 95 552
% 0.47/0.69 554. ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802)))))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp9)) (ndr1_0) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (-. (hskp1)) (c2_1 (a764)) (c0_1 (a764)) (-. (c3_1 (a764))) (-. (c1_1 (a730))) (c0_1 (a730)) (c3_1 (a730)) (-. (hskp5)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ### ConjTree 553
% 0.47/0.69 555. ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) (-. (hskp5)) (c3_1 (a730)) (c0_1 (a730)) (-. (c1_1 (a730))) (-. (c3_1 (a764))) (c0_1 (a764)) (c2_1 (a764)) (-. (hskp1)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (ndr1_0) (-. (hskp9)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp23)) (-. (hskp13)) ((hskp23) \/ ((hskp24) \/ (hskp13))) ### Or 87 554
% 0.47/0.69 556. ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) \/ (hskp2))) (-. (hskp2)) (c3_1 (a741)) (c1_1 (a741)) (-. (c0_1 (a741))) ((hskp23) \/ ((hskp24) \/ (hskp13))) (-. (hskp13)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp9)) (ndr1_0) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (-. (hskp1)) (c2_1 (a764)) (c0_1 (a764)) (-. (c3_1 (a764))) (-. (c1_1 (a730))) (c0_1 (a730)) (c3_1 (a730)) (-. (hskp5)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ### Or 555 543
% 0.47/0.69 557. ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) (-. (hskp5)) (c3_1 (a730)) (c0_1 (a730)) (-. (c1_1 (a730))) (-. (hskp1)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (ndr1_0) (-. (hskp9)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp13)) ((hskp23) \/ ((hskp24) \/ (hskp13))) (-. (c0_1 (a741))) (c1_1 (a741)) (c3_1 (a741)) (-. (hskp2)) ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) \/ (hskp2))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ### ConjTree 556
% 0.47/0.69 558. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp9)) (-. (hskp5)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp16) \/ (hskp3))) (-. (hskp3)) (ndr1_0) (-. (hskp13)) ((hskp23) \/ ((hskp24) \/ (hskp13))) (-. (c0_1 (a741))) (c1_1 (a741)) (c3_1 (a741)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (-. (hskp1)) (c3_1 (a730)) (-. (c1_1 (a730))) (c0_1 (a730)) (-. (hskp2)) ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) \/ (hskp2))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ### Or 544 557
% 0.47/0.69 559. ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (-. (hskp20)) (-. (hskp5)) (c3_1 (a759)) (c2_1 (a759)) (-. (c1_1 (a759))) (ndr1_0) ### DisjTree 428 18 19
% 0.47/0.69 560. ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) (-. (hskp5)) (c3_1 (a730)) (c0_1 (a730)) (-. (c1_1 (a730))) (c2_1 (a779)) (-. (c3_1 (a779))) (-. (c1_1 (a779))) (ndr1_0) ### DisjTree 313 550 18
% 0.47/0.69 561. ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779)))))) (ndr1_0) (-. (c1_1 (a730))) (c0_1 (a730)) (c3_1 (a730)) (-. (hskp5)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ### ConjTree 560
% 0.47/0.69 562. ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) (c3_1 (a730)) (c0_1 (a730)) (-. (c1_1 (a730))) (ndr1_0) (-. (c1_1 (a759))) (c2_1 (a759)) (c3_1 (a759)) (-. (hskp5)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ### Or 559 561
% 0.47/0.69 563. ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759)))))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (-. (hskp5)) (ndr1_0) (-. (c1_1 (a730))) (c0_1 (a730)) (c3_1 (a730)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ### ConjTree 562
% 0.47/0.69 564. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) \/ (hskp2))) (-. (hskp2)) (c0_1 (a730)) (-. (c1_1 (a730))) (c3_1 (a730)) (-. (hskp1)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (c3_1 (a741)) (c1_1 (a741)) (-. (c0_1 (a741))) ((hskp23) \/ ((hskp24) \/ (hskp13))) (ndr1_0) (-. (hskp3)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp16) \/ (hskp3))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) (-. (hskp5)) (-. (hskp9)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ### Or 558 563
% 0.47/0.69 565. (-. (c1_1 (a729))) (c1_1 (a729)) ### Axiom
% 0.47/0.69 566. (c2_1 (a729)) (-. (c2_1 (a729))) ### Axiom
% 0.47/0.69 567. (c3_1 (a729)) (-. (c3_1 (a729))) ### Axiom
% 0.47/0.69 568. ((ndr1_0) => ((c1_1 (a729)) \/ ((-. (c2_1 (a729))) \/ (-. (c3_1 (a729)))))) (c3_1 (a729)) (c2_1 (a729)) (-. (c1_1 (a729))) (ndr1_0) ### DisjTree 8 565 566 567
% 0.47/0.69 569. (All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) (ndr1_0) (-. (c1_1 (a729))) (c2_1 (a729)) (c3_1 (a729)) ### All 568
% 0.47/0.69 570. (c2_1 (a729)) (-. (c2_1 (a729))) ### Axiom
% 0.47/0.69 571. (c3_1 (a729)) (-. (c3_1 (a729))) ### Axiom
% 0.47/0.69 572. ((ndr1_0) => ((-. (c1_1 (a729))) \/ ((-. (c2_1 (a729))) \/ (-. (c3_1 (a729)))))) (c3_1 (a729)) (c2_1 (a729)) (All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) (ndr1_0) ### DisjTree 8 569 570 571
% 0.47/0.69 573. (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))) (ndr1_0) (All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) (c2_1 (a729)) (c3_1 (a729)) ### All 572
% 0.47/0.69 574. ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (-. (hskp20)) (-. (hskp5)) (c3_1 (a729)) (c2_1 (a729)) (ndr1_0) (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))) ### DisjTree 573 18 19
% 0.47/0.69 575. ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) (c2_1 (a729)) (c3_1 (a729)) (-. (hskp5)) (-. (hskp20)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (c1_1 (a741)) (c3_1 (a741)) (-. (c0_1 (a741))) (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) (c3_1 (a746)) (-. (c2_1 (a746))) (-. (c0_1 (a746))) (ndr1_0) ### DisjTree 186 59 574
% 0.47/0.69 576. ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (-. (hskp20)) (-. (hskp5)) (c3_1 (a729)) (c2_1 (a729)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) (c3_1 (a741)) (c1_1 (a741)) (-. (c0_1 (a741))) (c3_1 (a746)) (-. (c2_1 (a746))) (-. (c0_1 (a746))) (ndr1_0) ### DisjTree 186 223 575
% 0.47/0.69 577. ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729))))) (ndr1_0) (-. (c0_1 (a746))) (-. (c2_1 (a746))) (c3_1 (a746)) (-. (c0_1 (a741))) (c1_1 (a741)) (c3_1 (a741)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) (-. (hskp5)) (-. (hskp20)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ### ConjTree 576
% 0.47/0.69 578. ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (-. (hskp20)) (-. (hskp5)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) (c3_1 (a741)) (c1_1 (a741)) (-. (c0_1 (a741))) (ndr1_0) (-. (c0_1 (a746))) (-. (c2_1 (a746))) (c3_1 (a746)) (-. (hskp6)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) ### Or 187 577
% 0.47/0.69 579. ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) (c3_1 (a730)) (c0_1 (a730)) (-. (c1_1 (a730))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) (-. (hskp6)) (c3_1 (a746)) (-. (c2_1 (a746))) (-. (c0_1 (a746))) (ndr1_0) (-. (c0_1 (a741))) (c1_1 (a741)) (c3_1 (a741)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) (-. (hskp5)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ### Or 578 561
% 0.47/0.69 580. ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746)))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (-. (hskp5)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) (c3_1 (a741)) (c1_1 (a741)) (-. (c0_1 (a741))) (ndr1_0) (-. (hskp6)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) (-. (c1_1 (a730))) (c0_1 (a730)) (c3_1 (a730)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ### ConjTree 579
% 0.47/0.69 581. ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) (-. (hskp6)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp5)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp16) \/ (hskp3))) (-. (hskp3)) (ndr1_0) ((hskp23) \/ ((hskp24) \/ (hskp13))) (-. (c0_1 (a741))) (c1_1 (a741)) (c3_1 (a741)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (-. (hskp1)) (c3_1 (a730)) (-. (c1_1 (a730))) (c0_1 (a730)) (-. (hskp2)) ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) \/ (hskp2))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ### Or 564 580
% 0.47/0.69 582. ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741)))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) \/ (hskp2))) (-. (hskp2)) (c0_1 (a730)) (-. (c1_1 (a730))) (c3_1 (a730)) (-. (hskp1)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) ((hskp23) \/ ((hskp24) \/ (hskp13))) (ndr1_0) (-. (hskp3)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp16) \/ (hskp3))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) (-. (hskp5)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) (-. (hskp6)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ### ConjTree 581
% 0.47/0.69 583. ((-. (hskp7)) \/ ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) (-. (hskp6)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp5)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp16) \/ (hskp3))) (-. (hskp3)) (ndr1_0) ((hskp23) \/ ((hskp24) \/ (hskp13))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (c3_1 (a730)) (-. (c1_1 (a730))) (c0_1 (a730)) (-. (hskp2)) ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) \/ (hskp2))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) (-. (hskp1)) (-. (hskp4)) ((hskp7) \/ ((hskp1) \/ (hskp4))) ### Or 4 582
% 0.47/0.69 584. ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp16) \/ (hskp3))) (-. (hskp3)) (-. (hskp16)) (c1_1 (a775)) (-. (c3_1 (a775))) (-. (c2_1 (a775))) (ndr1_0) (All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) ### DisjTree 148 298 415
% 0.47/0.69 585. ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) (-. (hskp5)) (-. (c2_1 (a775))) (-. (c3_1 (a775))) (c1_1 (a775)) (-. (hskp16)) (-. (hskp3)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp16) \/ (hskp3))) (c1_1 (a738)) (-. (c2_1 (a738))) (-. (c0_1 (a738))) (ndr1_0) ### DisjTree 50 584 18
% 0.47/0.69 586. ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775)))))) (ndr1_0) (-. (c0_1 (a738))) (-. (c2_1 (a738))) (c1_1 (a738)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp16) \/ (hskp3))) (-. (hskp3)) (-. (hskp16)) (-. (hskp5)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) ### ConjTree 585
% 0.47/0.69 587. ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) (-. (hskp5)) (c1_1 (a738)) (-. (c2_1 (a738))) (-. (c0_1 (a738))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp16) \/ (hskp3))) (-. (hskp3)) (-. (hskp16)) (ndr1_0) (-. (hskp13)) ((hskp23) \/ ((hskp24) \/ (hskp13))) (-. (hskp11)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ### Or 419 586
% 0.47/0.69 588. ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) (-. (hskp25)) (c3_1 (a730)) (c0_1 (a730)) (-. (c1_1 (a730))) (-. (c2_1 (a748))) (-. (c1_1 (a748))) (-. (c0_1 (a748))) (ndr1_0) ### DisjTree 76 550 93
% 0.47/0.69 589. ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) (-. (hskp5)) (-. (c3_1 (a764))) (c0_1 (a764)) (c2_1 (a764)) (-. (hskp1)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (ndr1_0) (-. (c0_1 (a748))) (-. (c1_1 (a748))) (-. (c2_1 (a748))) (-. (c1_1 (a730))) (c0_1 (a730)) (c3_1 (a730)) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) ### Or 588 552
% 0.47/0.69 590. ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764)))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) (c3_1 (a730)) (c0_1 (a730)) (-. (c1_1 (a730))) (-. (c2_1 (a748))) (-. (c1_1 (a748))) (-. (c0_1 (a748))) (ndr1_0) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (-. (hskp1)) (-. (hskp5)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ### ConjTree 589
% 0.47/0.69 591. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) (-. (hskp1)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (-. (c0_1 (a748))) (-. (c1_1 (a748))) (-. (c2_1 (a748))) (-. (c1_1 (a730))) (c0_1 (a730)) (c3_1 (a730)) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) (-. (hskp11)) ((hskp23) \/ ((hskp24) \/ (hskp13))) (-. (hskp13)) (ndr1_0) (-. (hskp3)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp16) \/ (hskp3))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) (-. (c0_1 (a738))) (-. (c2_1 (a738))) (c1_1 (a738)) (-. (hskp5)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ### Or 587 590
% 0.47/0.69 592. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) (-. (hskp5)) (c1_1 (a738)) (-. (c2_1 (a738))) (-. (c0_1 (a738))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp16) \/ (hskp3))) (-. (hskp3)) (ndr1_0) ((hskp23) \/ ((hskp24) \/ (hskp13))) (-. (hskp11)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) (c3_1 (a730)) (c0_1 (a730)) (-. (c1_1 (a730))) (-. (c2_1 (a748))) (-. (c1_1 (a748))) (-. (c0_1 (a748))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (-. (hskp1)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ### Or 591 563
% 0.47/0.69 593. ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) (-. (hskp4)) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) (-. (hskp1)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (-. (c0_1 (a748))) (-. (c1_1 (a748))) (-. (c2_1 (a748))) (-. (c1_1 (a730))) (c0_1 (a730)) (c3_1 (a730)) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((hskp23) \/ ((hskp24) \/ (hskp13))) (ndr1_0) (-. (hskp3)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp16) \/ (hskp3))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) (-. (c0_1 (a738))) (-. (c2_1 (a738))) (c1_1 (a738)) (-. (hskp5)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ### Or 592 70
% 0.47/0.69 594. ((ndr1_0) /\ ((-. (c0_1 (a748))) /\ ((-. (c1_1 (a748))) /\ (-. (c2_1 (a748)))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) (-. (hskp5)) (c1_1 (a738)) (-. (c2_1 (a738))) (-. (c0_1 (a738))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp16) \/ (hskp3))) (-. (hskp3)) (ndr1_0) ((hskp23) \/ ((hskp24) \/ (hskp13))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) (c3_1 (a730)) (c0_1 (a730)) (-. (c1_1 (a730))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (-. (hskp1)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) (-. (hskp4)) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ### ConjTree 593
% 0.47/0.69 595. ((-. (hskp10)) \/ ((ndr1_0) /\ ((-. (c0_1 (a748))) /\ ((-. (c1_1 (a748))) /\ (-. (c2_1 (a748))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) (-. (hskp1)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (-. (c1_1 (a730))) (c0_1 (a730)) (c3_1 (a730)) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((hskp23) \/ ((hskp24) \/ (hskp13))) (-. (hskp3)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp16) \/ (hskp3))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) (-. (c0_1 (a741))) (c3_1 (a741)) (c1_1 (a741)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) (c1_1 (a738)) (-. (c2_1 (a738))) (-. (c0_1 (a738))) (ndr1_0) (-. (hskp4)) (-. (hskp5)) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ### Or 71 594
% 0.47/0.69 596. ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741)))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) (-. (hskp5)) (-. (hskp4)) (ndr1_0) (-. (c0_1 (a738))) (-. (c2_1 (a738))) (c1_1 (a738)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp16) \/ (hskp3))) (-. (hskp3)) ((hskp23) \/ ((hskp24) \/ (hskp13))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) (c3_1 (a730)) (c0_1 (a730)) (-. (c1_1 (a730))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (-. (hskp1)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((-. (c0_1 (a748))) /\ ((-. (c1_1 (a748))) /\ (-. (c2_1 (a748))))))) ### ConjTree 595
% 0.47/0.69 597. ((-. (hskp7)) \/ ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((-. (c0_1 (a748))) /\ ((-. (c1_1 (a748))) /\ (-. (c2_1 (a748))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (-. (c1_1 (a730))) (c0_1 (a730)) (c3_1 (a730)) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((hskp23) \/ ((hskp24) \/ (hskp13))) (-. (hskp3)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp16) \/ (hskp3))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) (c1_1 (a738)) (-. (c2_1 (a738))) (-. (c0_1 (a738))) (ndr1_0) (-. (hskp5)) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) (-. (hskp1)) (-. (hskp4)) ((hskp7) \/ ((hskp1) \/ (hskp4))) ### Or 4 596
% 0.47/0.69 598. ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738)))))) ((hskp7) \/ ((hskp1) \/ (hskp4))) (-. (hskp4)) (-. (hskp1)) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) (-. (hskp5)) (ndr1_0) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp16) \/ (hskp3))) (-. (hskp3)) ((hskp23) \/ ((hskp24) \/ (hskp13))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) (c3_1 (a730)) (c0_1 (a730)) (-. (c1_1 (a730))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((-. (c0_1 (a748))) /\ ((-. (c1_1 (a748))) /\ (-. (c2_1 (a748))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741))))))) ### ConjTree 597
% 0.47/0.69 599. ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((-. (c0_1 (a748))) /\ ((-. (c1_1 (a748))) /\ (-. (c2_1 (a748))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((hskp7) \/ ((hskp1) \/ (hskp4))) (-. (hskp4)) (-. (hskp1)) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) \/ (hskp2))) (-. (hskp2)) (c0_1 (a730)) (-. (c1_1 (a730))) (c3_1 (a730)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) ((hskp23) \/ ((hskp24) \/ (hskp13))) (ndr1_0) (-. (hskp3)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp16) \/ (hskp3))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) (-. (hskp5)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741))))))) ### Or 583 598
% 0.47/0.69 600. (-. (c0_1 (a735))) (c0_1 (a735)) ### Axiom
% 0.47/0.69 601. (c1_1 (a735)) (-. (c1_1 (a735))) ### Axiom
% 0.47/0.69 602. (c2_1 (a735)) (-. (c2_1 (a735))) ### Axiom
% 0.47/0.69 603. ((ndr1_0) => ((c0_1 (a735)) \/ ((-. (c1_1 (a735))) \/ (-. (c2_1 (a735)))))) (c2_1 (a735)) (c1_1 (a735)) (-. (c0_1 (a735))) (ndr1_0) ### DisjTree 8 600 601 602
% 0.47/0.69 604. (All X16, ((ndr1_0) => ((c0_1 X16) \/ ((-. (c1_1 X16)) \/ (-. (c2_1 X16)))))) (ndr1_0) (-. (c0_1 (a735))) (c1_1 (a735)) (c2_1 (a735)) ### All 603
% 0.47/0.69 605. (c2_1 (a735)) (-. (c2_1 (a735))) ### Axiom
% 0.47/0.69 606. (c3_1 (a735)) (-. (c3_1 (a735))) ### Axiom
% 0.47/0.69 607. ((ndr1_0) => ((c1_1 (a735)) \/ ((-. (c2_1 (a735))) \/ (-. (c3_1 (a735)))))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (All X16, ((ndr1_0) => ((c0_1 X16) \/ ((-. (c1_1 X16)) \/ (-. (c2_1 X16)))))) (ndr1_0) ### DisjTree 8 604 605 606
% 0.47/0.69 608. (All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) (ndr1_0) (All X16, ((ndr1_0) => ((c0_1 X16) \/ ((-. (c1_1 X16)) \/ (-. (c2_1 X16)))))) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) ### All 607
% 0.47/0.69 609. (c0_1 (a730)) (-. (c0_1 (a730))) ### Axiom
% 0.47/0.69 610. (-. (c2_1 (a730))) (c2_1 (a730)) ### Axiom
% 0.47/0.69 611. (c0_1 (a730)) (-. (c0_1 (a730))) ### Axiom
% 0.47/0.69 612. (c3_1 (a730)) (-. (c3_1 (a730))) ### Axiom
% 0.47/0.69 613. ((ndr1_0) => ((c2_1 (a730)) \/ ((-. (c0_1 (a730))) \/ (-. (c3_1 (a730)))))) (c3_1 (a730)) (c0_1 (a730)) (-. (c2_1 (a730))) (ndr1_0) ### DisjTree 8 610 611 612
% 0.47/0.69 614. (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))) (ndr1_0) (-. (c2_1 (a730))) (c0_1 (a730)) (c3_1 (a730)) ### All 613
% 0.47/0.69 615. (c3_1 (a730)) (-. (c3_1 (a730))) ### Axiom
% 0.47/0.69 616. ((ndr1_0) => ((-. (c0_1 (a730))) \/ ((-. (c2_1 (a730))) \/ (-. (c3_1 (a730)))))) (c3_1 (a730)) (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))) (c0_1 (a730)) (ndr1_0) ### DisjTree 8 609 614 615
% 0.47/0.69 617. (All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) (ndr1_0) (c0_1 (a730)) (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))) (c3_1 (a730)) ### All 616
% 0.47/0.69 618. ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (-. (hskp21)) (c3_1 (a730)) (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))) (c0_1 (a730)) (ndr1_0) ### Or 617 101
% 0.47/0.70 619. ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c0_1 (a730)) (c3_1 (a730)) (-. (hskp21)) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (All X16, ((ndr1_0) => ((c0_1 X16) \/ ((-. (c1_1 X16)) \/ (-. (c2_1 X16)))))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (ndr1_0) ### DisjTree 120 608 618
% 0.47/0.70 620. ((All X16, ((ndr1_0) => ((c0_1 X16) \/ ((-. (c1_1 X16)) \/ (-. (c2_1 X16)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp16))) (-. (hskp16)) (c3_1 (a729)) (c2_1 (a729)) (c0_1 (a729)) (ndr1_0) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (-. (hskp21)) (c3_1 (a730)) (c0_1 (a730)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ### DisjTree 619 100 298
% 0.47/0.70 621. ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729))))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c0_1 (a730)) (c3_1 (a730)) (-. (hskp21)) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (ndr1_0) (-. (hskp16)) ((All X16, ((ndr1_0) => ((c0_1 X16) \/ ((-. (c1_1 X16)) \/ (-. (c2_1 X16)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp16))) ### ConjTree 620
% 0.47/0.70 622. ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X16, ((ndr1_0) => ((c0_1 X16) \/ ((-. (c1_1 X16)) \/ (-. (c2_1 X16)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp16))) (-. (hskp16)) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (-. (hskp21)) (c3_1 (a730)) (c0_1 (a730)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (ndr1_0) (-. (c2_1 (a802))) (-. (c3_1 (a802))) (c0_1 (a802)) (-. (hskp9)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ### Or 95 621
% 0.47/0.70 623. ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802)))))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp9)) (ndr1_0) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c0_1 (a730)) (c3_1 (a730)) (-. (hskp21)) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (-. (hskp16)) ((All X16, ((ndr1_0) => ((c0_1 X16) \/ ((-. (c1_1 X16)) \/ (-. (c2_1 X16)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp16))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ### ConjTree 622
% 0.47/0.70 624. ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X16, ((ndr1_0) => ((c0_1 X16) \/ ((-. (c1_1 X16)) \/ (-. (c2_1 X16)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp16))) (-. (hskp16)) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (-. (hskp21)) (c3_1 (a730)) (c0_1 (a730)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (ndr1_0) (-. (hskp9)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp23)) (-. (hskp13)) ((hskp23) \/ ((hskp24) \/ (hskp13))) ### Or 87 623
% 0.47/0.70 625. (-. (c0_1 (a735))) (c0_1 (a735)) ### Axiom
% 0.47/0.70 626. (c1_1 (a735)) (-. (c1_1 (a735))) ### Axiom
% 0.47/0.70 627. (c3_1 (a735)) (-. (c3_1 (a735))) ### Axiom
% 0.47/0.70 628. ((ndr1_0) => ((c0_1 (a735)) \/ ((-. (c1_1 (a735))) \/ (-. (c3_1 (a735)))))) (c3_1 (a735)) (c1_1 (a735)) (-. (c0_1 (a735))) (ndr1_0) ### DisjTree 8 625 626 627
% 0.47/0.70 629. (All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) (ndr1_0) (-. (c0_1 (a735))) (c1_1 (a735)) (c3_1 (a735)) ### All 628
% 0.47/0.70 630. (c2_1 (a735)) (-. (c2_1 (a735))) ### Axiom
% 0.47/0.70 631. (c3_1 (a735)) (-. (c3_1 (a735))) ### Axiom
% 0.47/0.70 632. ((ndr1_0) => ((c1_1 (a735)) \/ ((-. (c2_1 (a735))) \/ (-. (c3_1 (a735)))))) (c2_1 (a735)) (c3_1 (a735)) (-. (c0_1 (a735))) (All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) (ndr1_0) ### DisjTree 8 629 630 631
% 0.47/0.70 633. (All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) (ndr1_0) (All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) (-. (c0_1 (a735))) (c3_1 (a735)) (c2_1 (a735)) ### All 632
% 0.47/0.70 634. ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c0_1 (a730)) (c3_1 (a730)) (-. (hskp21)) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (ndr1_0) ### DisjTree 120 633 618
% 0.47/0.70 635. ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) \/ (hskp2))) (-. (hskp2)) (-. (c3_1 (a798))) (c0_1 (a798)) (c1_1 (a798)) (-. (c1_1 (a730))) (-. (hskp1)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (ndr1_0) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (-. (hskp21)) (c3_1 (a730)) (c0_1 (a730)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ### DisjTree 634 541 38
% 0.47/0.70 636. ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798)))))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c0_1 (a730)) (c3_1 (a730)) (-. (hskp21)) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (ndr1_0) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (-. (hskp1)) (-. (c1_1 (a730))) (-. (hskp2)) ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) \/ (hskp2))) ### ConjTree 635
% 0.47/0.70 637. ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) \/ (hskp2))) (-. (hskp2)) (-. (c1_1 (a730))) (-. (hskp1)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) ((hskp23) \/ ((hskp24) \/ (hskp13))) (-. (hskp13)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp9)) (ndr1_0) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c0_1 (a730)) (c3_1 (a730)) (-. (hskp21)) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (-. (hskp16)) ((All X16, ((ndr1_0) => ((c0_1 X16) \/ ((-. (c1_1 X16)) \/ (-. (c2_1 X16)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp16))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ### Or 624 636
% 0.47/0.70 638. ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c3_1 (a793)) (c0_1 (a793)) (-. (c2_1 (a793))) (All X16, ((ndr1_0) => ((c0_1 X16) \/ ((-. (c1_1 X16)) \/ (-. (c2_1 X16)))))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (ndr1_0) ### DisjTree 120 608 125
% 0.47/0.70 639. ((All X16, ((ndr1_0) => ((c0_1 X16) \/ ((-. (c1_1 X16)) \/ (-. (c2_1 X16)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp16))) (-. (hskp16)) (c3_1 (a729)) (c2_1 (a729)) (c0_1 (a729)) (ndr1_0) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) (-. (c2_1 (a793))) (c0_1 (a793)) (c3_1 (a793)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ### DisjTree 638 100 298
% 0.47/0.70 640. ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729))))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c3_1 (a793)) (c0_1 (a793)) (-. (c2_1 (a793))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (ndr1_0) (-. (hskp16)) ((All X16, ((ndr1_0) => ((c0_1 X16) \/ ((-. (c1_1 X16)) \/ (-. (c2_1 X16)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp16))) ### ConjTree 639
% 0.47/0.70 641. ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X16, ((ndr1_0) => ((c0_1 X16) \/ ((-. (c1_1 X16)) \/ (-. (c2_1 X16)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp16))) (-. (hskp16)) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) (-. (c2_1 (a793))) (c0_1 (a793)) (c3_1 (a793)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (ndr1_0) (-. (c2_1 (a802))) (-. (c3_1 (a802))) (c0_1 (a802)) (-. (hskp9)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ### Or 95 640
% 0.47/0.70 642. ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802)))))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp9)) (ndr1_0) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c3_1 (a793)) (c0_1 (a793)) (-. (c2_1 (a793))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (-. (hskp16)) ((All X16, ((ndr1_0) => ((c0_1 X16) \/ ((-. (c1_1 X16)) \/ (-. (c2_1 X16)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp16))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ### ConjTree 641
% 0.47/0.70 643. ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X16, ((ndr1_0) => ((c0_1 X16) \/ ((-. (c1_1 X16)) \/ (-. (c2_1 X16)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp16))) (-. (hskp16)) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) (-. (c2_1 (a793))) (c0_1 (a793)) (c3_1 (a793)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (ndr1_0) (-. (hskp9)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp23)) (-. (hskp13)) ((hskp23) \/ ((hskp24) \/ (hskp13))) ### Or 87 642
% 0.47/0.70 644. ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c3_1 (a793)) (c0_1 (a793)) (-. (c2_1 (a793))) (All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (ndr1_0) ### DisjTree 120 633 125
% 0.47/0.70 645. ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) \/ (hskp2))) (-. (hskp2)) (-. (c3_1 (a798))) (c0_1 (a798)) (c1_1 (a798)) (c0_1 (a730)) (-. (c1_1 (a730))) (c3_1 (a730)) (-. (hskp1)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (ndr1_0) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) (-. (c2_1 (a793))) (c0_1 (a793)) (c3_1 (a793)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ### DisjTree 644 541 38
% 0.47/0.70 646. ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798)))))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c3_1 (a793)) (c0_1 (a793)) (-. (c2_1 (a793))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (ndr1_0) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (-. (hskp1)) (c3_1 (a730)) (-. (c1_1 (a730))) (c0_1 (a730)) (-. (hskp2)) ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) \/ (hskp2))) ### ConjTree 645
% 0.47/0.70 647. ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) \/ (hskp2))) (-. (hskp2)) (c0_1 (a730)) (-. (c1_1 (a730))) (c3_1 (a730)) (-. (hskp1)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) ((hskp23) \/ ((hskp24) \/ (hskp13))) (-. (hskp13)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp9)) (ndr1_0) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c3_1 (a793)) (c0_1 (a793)) (-. (c2_1 (a793))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (-. (hskp16)) ((All X16, ((ndr1_0) => ((c0_1 X16) \/ ((-. (c1_1 X16)) \/ (-. (c2_1 X16)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp16))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ### Or 643 646
% 0.47/0.70 648. ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X16, ((ndr1_0) => ((c0_1 X16) \/ ((-. (c1_1 X16)) \/ (-. (c2_1 X16)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp16))) (-. (hskp16)) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (ndr1_0) (-. (hskp9)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp13)) ((hskp23) \/ ((hskp24) \/ (hskp13))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (-. (hskp1)) (c3_1 (a730)) (-. (c1_1 (a730))) (c0_1 (a730)) (-. (hskp2)) ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) \/ (hskp2))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ### ConjTree 647
% 0.47/0.70 649. ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X16, ((ndr1_0) => ((c0_1 X16) \/ ((-. (c1_1 X16)) \/ (-. (c2_1 X16)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp16))) (-. (hskp16)) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (c3_1 (a730)) (c0_1 (a730)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (ndr1_0) (-. (hskp9)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp13)) ((hskp23) \/ ((hskp24) \/ (hskp13))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (-. (hskp1)) (-. (c1_1 (a730))) (-. (hskp2)) ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) \/ (hskp2))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ### Or 637 648
% 0.47/0.70 650. (c2_1 (a729)) (-. (c2_1 (a729))) ### Axiom
% 0.47/0.70 651. (c3_1 (a729)) (-. (c3_1 (a729))) ### Axiom
% 0.47/0.70 652. ((ndr1_0) => ((c1_1 (a729)) \/ ((-. (c2_1 (a729))) \/ (-. (c3_1 (a729)))))) (c3_1 (a729)) (c2_1 (a729)) (c0_1 (a729)) (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))) (ndr1_0) ### DisjTree 8 318 650 651
% 0.47/0.70 653. (All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) (ndr1_0) (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))) (c0_1 (a729)) (c2_1 (a729)) (c3_1 (a729)) ### All 652
% 0.47/0.70 654. ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) (All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) (c0_1 (a802)) (-. (c3_1 (a802))) (-. (c2_1 (a802))) (ndr1_0) (-. (c3_1 (a764))) (c0_1 (a764)) (c2_1 (a764)) (c0_1 (a729)) (c2_1 (a729)) (c3_1 (a729)) (-. (hskp1)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) ### DisjTree 545 92 653
% 0.47/0.70 655. ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c0_1 (a730)) (c3_1 (a730)) (-. (hskp21)) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (-. (hskp1)) (c3_1 (a729)) (c2_1 (a729)) (c0_1 (a729)) (c2_1 (a764)) (c0_1 (a764)) (-. (c3_1 (a764))) (-. (c2_1 (a802))) (-. (c3_1 (a802))) (c0_1 (a802)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (ndr1_0) ### DisjTree 120 654 618
% 0.47/0.70 656. ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729))))) (ndr1_0) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) (c0_1 (a802)) (-. (c3_1 (a802))) (-. (c2_1 (a802))) (-. (c3_1 (a764))) (c0_1 (a764)) (c2_1 (a764)) (-. (hskp1)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (-. (hskp21)) (c3_1 (a730)) (c0_1 (a730)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ### ConjTree 655
% 0.47/0.70 657. ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c0_1 (a730)) (c3_1 (a730)) (-. (hskp21)) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (-. (hskp1)) (c2_1 (a764)) (c0_1 (a764)) (-. (c3_1 (a764))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (ndr1_0) (-. (c2_1 (a802))) (-. (c3_1 (a802))) (c0_1 (a802)) (-. (hskp9)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ### Or 95 656
% 0.47/0.70 658. ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802)))))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp9)) (ndr1_0) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) (-. (c3_1 (a764))) (c0_1 (a764)) (c2_1 (a764)) (-. (hskp1)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (-. (hskp21)) (c3_1 (a730)) (c0_1 (a730)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ### ConjTree 657
% 0.47/0.70 659. ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c0_1 (a730)) (c3_1 (a730)) (-. (hskp21)) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (-. (hskp1)) (c2_1 (a764)) (c0_1 (a764)) (-. (c3_1 (a764))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (ndr1_0) (-. (hskp9)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp23)) (-. (hskp13)) ((hskp23) \/ ((hskp24) \/ (hskp13))) ### Or 87 658
% 0.47/0.70 660. ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) \/ (hskp2))) (-. (hskp2)) (-. (c1_1 (a730))) ((hskp23) \/ ((hskp24) \/ (hskp13))) (-. (hskp13)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp9)) (ndr1_0) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) (-. (c3_1 (a764))) (c0_1 (a764)) (c2_1 (a764)) (-. (hskp1)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (-. (hskp21)) (c3_1 (a730)) (c0_1 (a730)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ### Or 659 636
% 0.47/0.70 661. ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c3_1 (a793)) (c0_1 (a793)) (-. (c2_1 (a793))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (-. (hskp1)) (c3_1 (a729)) (c2_1 (a729)) (c0_1 (a729)) (c2_1 (a764)) (c0_1 (a764)) (-. (c3_1 (a764))) (-. (c2_1 (a802))) (-. (c3_1 (a802))) (c0_1 (a802)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (ndr1_0) ### DisjTree 120 654 125
% 0.47/0.70 662. ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729))))) (ndr1_0) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) (c0_1 (a802)) (-. (c3_1 (a802))) (-. (c2_1 (a802))) (-. (c3_1 (a764))) (c0_1 (a764)) (c2_1 (a764)) (-. (hskp1)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (-. (c2_1 (a793))) (c0_1 (a793)) (c3_1 (a793)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ### ConjTree 661
% 0.47/0.70 663. ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c3_1 (a793)) (c0_1 (a793)) (-. (c2_1 (a793))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (-. (hskp1)) (c2_1 (a764)) (c0_1 (a764)) (-. (c3_1 (a764))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (ndr1_0) (-. (c2_1 (a802))) (-. (c3_1 (a802))) (c0_1 (a802)) (-. (hskp9)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ### Or 95 662
% 0.47/0.70 664. ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802)))))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp9)) (ndr1_0) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) (-. (c3_1 (a764))) (c0_1 (a764)) (c2_1 (a764)) (-. (hskp1)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (-. (c2_1 (a793))) (c0_1 (a793)) (c3_1 (a793)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ### ConjTree 663
% 0.47/0.70 665. ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c3_1 (a793)) (c0_1 (a793)) (-. (c2_1 (a793))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (-. (hskp1)) (c2_1 (a764)) (c0_1 (a764)) (-. (c3_1 (a764))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (ndr1_0) (-. (hskp9)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp23)) (-. (hskp13)) ((hskp23) \/ ((hskp24) \/ (hskp13))) ### Or 87 664
% 0.47/0.70 666. ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) \/ (hskp2))) (-. (hskp2)) (c0_1 (a730)) (-. (c1_1 (a730))) (c3_1 (a730)) ((hskp23) \/ ((hskp24) \/ (hskp13))) (-. (hskp13)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp9)) (ndr1_0) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) (-. (c3_1 (a764))) (c0_1 (a764)) (c2_1 (a764)) (-. (hskp1)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (-. (c2_1 (a793))) (c0_1 (a793)) (c3_1 (a793)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ### Or 665 646
% 0.47/0.70 667. ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (-. (hskp1)) (c2_1 (a764)) (c0_1 (a764)) (-. (c3_1 (a764))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (ndr1_0) (-. (hskp9)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp13)) ((hskp23) \/ ((hskp24) \/ (hskp13))) (c3_1 (a730)) (-. (c1_1 (a730))) (c0_1 (a730)) (-. (hskp2)) ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) \/ (hskp2))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ### ConjTree 666
% 0.47/0.70 668. ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c0_1 (a730)) (c3_1 (a730)) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (-. (hskp1)) (c2_1 (a764)) (c0_1 (a764)) (-. (c3_1 (a764))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (ndr1_0) (-. (hskp9)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp13)) ((hskp23) \/ ((hskp24) \/ (hskp13))) (-. (c1_1 (a730))) (-. (hskp2)) ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) \/ (hskp2))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ### Or 660 667
% 0.47/0.70 669. ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) \/ (hskp2))) (-. (hskp2)) (-. (c1_1 (a730))) ((hskp23) \/ ((hskp24) \/ (hskp13))) (-. (hskp13)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp9)) (ndr1_0) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) (-. (hskp1)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (c3_1 (a730)) (c0_1 (a730)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ### ConjTree 668
% 0.47/0.70 670. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) \/ (hskp2))) (-. (hskp2)) (-. (c1_1 (a730))) (-. (hskp1)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) ((hskp23) \/ ((hskp24) \/ (hskp13))) (-. (hskp13)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp9)) (ndr1_0) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c0_1 (a730)) (c3_1 (a730)) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) ((All X16, ((ndr1_0) => ((c0_1 X16) \/ ((-. (c1_1 X16)) \/ (-. (c2_1 X16)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp16))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ### Or 649 669
% 0.47/0.70 671. ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c0_1 (a730)) (c3_1 (a730)) (-. (hskp21)) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (c3_1 (a759)) (c2_1 (a759)) (-. (c1_1 (a759))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (ndr1_0) ### DisjTree 120 428 618
% 0.47/0.70 672. ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) (ndr1_0) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) (-. (c1_1 (a759))) (c2_1 (a759)) (c3_1 (a759)) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (c3_1 (a730)) (c0_1 (a730)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ### Or 671 430
% 0.47/0.70 673. ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759)))))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c0_1 (a730)) (c3_1 (a730)) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (ndr1_0) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ### ConjTree 672
% 0.47/0.70 674. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X16, ((ndr1_0) => ((c0_1 X16) \/ ((-. (c1_1 X16)) \/ (-. (c2_1 X16)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp16))) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (c3_1 (a730)) (c0_1 (a730)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (ndr1_0) (-. (hskp9)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((hskp23) \/ ((hskp24) \/ (hskp13))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (-. (hskp1)) (-. (c1_1 (a730))) (-. (hskp2)) ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) \/ (hskp2))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ### Or 670 673
% 0.47/0.70 675. ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c0_1 (a730)) (c3_1 (a730)) (-. (hskp21)) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (ndr1_0) ### DisjTree 120 135 618
% 0.47/0.70 676. ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (-. (hskp21)) (c3_1 (a730)) (c0_1 (a730)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (c3_1 (a746)) (-. (c2_1 (a746))) (-. (c0_1 (a746))) (ndr1_0) ### DisjTree 186 120 675
% 0.47/0.70 677. ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) (-. (c2_1 (a793))) (c0_1 (a793)) (c3_1 (a793)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (c3_1 (a746)) (-. (c2_1 (a746))) (-. (c0_1 (a746))) (ndr1_0) ### DisjTree 186 120 136
% 0.47/0.70 678. ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793)))))) (ndr1_0) (-. (c0_1 (a746))) (-. (c2_1 (a746))) (c3_1 (a746)) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ### ConjTree 677
% 0.54/0.70 679. ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) (ndr1_0) (-. (c0_1 (a746))) (-. (c2_1 (a746))) (c3_1 (a746)) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c0_1 (a730)) (c3_1 (a730)) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ### Or 676 678
% 0.54/0.70 680. ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746)))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (c3_1 (a730)) (c0_1 (a730)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (ndr1_0) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ### ConjTree 679
% 0.54/0.70 681. ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) \/ (hskp2))) (-. (hskp2)) (-. (c1_1 (a730))) (-. (hskp1)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) ((hskp23) \/ ((hskp24) \/ (hskp13))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (ndr1_0) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c0_1 (a730)) (c3_1 (a730)) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) ((All X16, ((ndr1_0) => ((c0_1 X16) \/ ((-. (c1_1 X16)) \/ (-. (c2_1 X16)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp16))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ### Or 674 680
% 0.54/0.70 682. ((ndr1_0) /\ ((c2_1 (a735)) /\ ((c3_1 (a735)) /\ (-. (c0_1 (a735)))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X16, ((ndr1_0) => ((c0_1 X16) \/ ((-. (c1_1 X16)) \/ (-. (c2_1 X16)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp16))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (c3_1 (a730)) (c0_1 (a730)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (ndr1_0) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((hskp23) \/ ((hskp24) \/ (hskp13))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (-. (hskp1)) (-. (c1_1 (a730))) (-. (hskp2)) ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) \/ (hskp2))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ### ConjTree 681
% 0.54/0.70 683. ((-. (hskp5)) \/ ((ndr1_0) /\ ((c2_1 (a735)) /\ ((c3_1 (a735)) /\ (-. (c0_1 (a735))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((All X16, ((ndr1_0) => ((c0_1 X16) \/ ((-. (c1_1 X16)) \/ (-. (c2_1 X16)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp16))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp16) \/ (hskp3))) (-. (hskp3)) (ndr1_0) ((hskp23) \/ ((hskp24) \/ (hskp13))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (c3_1 (a730)) (-. (c1_1 (a730))) (c0_1 (a730)) (-. (hskp2)) ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) \/ (hskp2))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) (-. (hskp1)) (-. (hskp4)) ((hskp7) \/ ((hskp1) \/ (hskp4))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((-. (c0_1 (a748))) /\ ((-. (c1_1 (a748))) /\ (-. (c2_1 (a748))))))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738))))))) ### Or 599 682
% 0.54/0.70 684. (c0_1 (a729)) (-. (c0_1 (a729))) ### Axiom
% 0.54/0.70 685. (c1_1 (a729)) (-. (c1_1 (a729))) ### Axiom
% 0.54/0.70 686. (c3_1 (a729)) (-. (c3_1 (a729))) ### Axiom
% 0.54/0.70 687. ((ndr1_0) => ((-. (c0_1 (a729))) \/ ((-. (c1_1 (a729))) \/ (-. (c3_1 (a729)))))) (c3_1 (a729)) (c1_1 (a729)) (c0_1 (a729)) (ndr1_0) ### DisjTree 8 684 685 686
% 0.54/0.70 688. (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))) (ndr1_0) (c0_1 (a729)) (c1_1 (a729)) (c3_1 (a729)) ### All 687
% 0.54/0.70 689. (c2_1 (a729)) (-. (c2_1 (a729))) ### Axiom
% 0.54/0.70 690. (c3_1 (a729)) (-. (c3_1 (a729))) ### Axiom
% 0.54/0.70 691. ((ndr1_0) => ((c1_1 (a729)) \/ ((-. (c2_1 (a729))) \/ (-. (c3_1 (a729)))))) (c2_1 (a729)) (c3_1 (a729)) (c0_1 (a729)) (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))) (ndr1_0) ### DisjTree 8 688 689 690
% 0.54/0.70 692. (All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) (ndr1_0) (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))) (c0_1 (a729)) (c3_1 (a729)) (c2_1 (a729)) ### All 691
% 0.54/0.70 693. ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (-. (hskp20)) (-. (hskp5)) (c2_1 (a729)) (c3_1 (a729)) (c0_1 (a729)) (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))) (ndr1_0) ### DisjTree 692 18 19
% 0.54/0.70 694. (-. (hskp15)) (hskp15) ### P-NotP
% 0.54/0.70 695. ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ ((All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))) \/ (hskp15))) (-. (hskp15)) (c0_1 (a729)) (c3_1 (a729)) (c2_1 (a729)) (-. (hskp5)) (-. (hskp20)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (c1_1 (a734)) (-. (c3_1 (a734))) (-. (c0_1 (a734))) (ndr1_0) (All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) ### DisjTree 208 693 694
% 0.54/0.70 696. ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) (ndr1_0) (-. (c0_1 (a734))) (-. (c3_1 (a734))) (c1_1 (a734)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (-. (hskp20)) (-. (hskp5)) (c2_1 (a729)) (c3_1 (a729)) (c0_1 (a729)) (-. (hskp15)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ ((All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))) \/ (hskp15))) ### DisjTree 695 213 18
% 0.54/0.70 697. ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ ((All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))) \/ (hskp15))) (-. (hskp15)) (-. (hskp5)) (-. (hskp20)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (c1_1 (a734)) (-. (c3_1 (a734))) (-. (c0_1 (a734))) (ndr1_0) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) ### ConjTree 696
% 0.54/0.70 698. ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) (-. (c0_1 (a734))) (-. (c3_1 (a734))) (c1_1 (a734)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (-. (hskp20)) (-. (hskp5)) (-. (hskp15)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ ((All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))) \/ (hskp15))) (ndr1_0) (-. (c2_1 (a802))) (-. (c3_1 (a802))) (c0_1 (a802)) (-. (hskp9)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ### Or 95 697
% 0.54/0.70 699. ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802)))))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp9)) (ndr1_0) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ ((All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))) \/ (hskp15))) (-. (hskp15)) (-. (hskp5)) (-. (hskp20)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (c1_1 (a734)) (-. (c3_1 (a734))) (-. (c0_1 (a734))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ### ConjTree 698
% 0.54/0.70 700. ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) (-. (c0_1 (a734))) (-. (c3_1 (a734))) (c1_1 (a734)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (-. (hskp20)) (-. (hskp5)) (-. (hskp15)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ ((All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))) \/ (hskp15))) (ndr1_0) (-. (hskp9)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp23)) (-. (hskp13)) ((hskp23) \/ ((hskp24) \/ (hskp13))) ### Or 87 699
% 0.54/0.70 701. ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) (-. (hskp11)) (-. (hskp18)) ((hskp23) \/ ((hskp24) \/ (hskp13))) (-. (hskp13)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp9)) (ndr1_0) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ ((All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))) \/ (hskp15))) (-. (hskp15)) (-. (hskp5)) (-. (hskp20)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (c1_1 (a734)) (-. (c3_1 (a734))) (-. (c0_1 (a734))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ### Or 700 114
% 0.54/0.70 702. ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) (c3_1 (a730)) (c0_1 (a730)) (-. (c1_1 (a730))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) (-. (c0_1 (a734))) (-. (c3_1 (a734))) (c1_1 (a734)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (-. (hskp5)) (-. (hskp15)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ ((All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))) \/ (hskp15))) (ndr1_0) (-. (hskp9)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp13)) ((hskp23) \/ ((hskp24) \/ (hskp13))) (-. (hskp18)) (-. (hskp11)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ### Or 701 561
% 0.54/0.70 703. (-. (c2_1 (a775))) (c2_1 (a775)) ### Axiom
% 0.54/0.70 704. (-. (c0_1 (a775))) (c0_1 (a775)) ### Axiom
% 0.54/0.70 705. (-. (c2_1 (a775))) (c2_1 (a775)) ### Axiom
% 0.54/0.70 706. (c1_1 (a775)) (-. (c1_1 (a775))) ### Axiom
% 0.54/0.70 707. ((ndr1_0) => ((c0_1 (a775)) \/ ((c2_1 (a775)) \/ (-. (c1_1 (a775)))))) (c1_1 (a775)) (-. (c2_1 (a775))) (-. (c0_1 (a775))) (ndr1_0) ### DisjTree 8 704 705 706
% 0.54/0.70 708. (All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) (ndr1_0) (-. (c0_1 (a775))) (-. (c2_1 (a775))) (c1_1 (a775)) ### All 707
% 0.54/0.70 709. (c1_1 (a775)) (-. (c1_1 (a775))) ### Axiom
% 0.54/0.70 710. ((ndr1_0) => ((c2_1 (a775)) \/ ((-. (c0_1 (a775))) \/ (-. (c1_1 (a775)))))) (c1_1 (a775)) (All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) (-. (c2_1 (a775))) (ndr1_0) ### DisjTree 8 703 708 709
% 0.54/0.70 711. (All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) (ndr1_0) (-. (c2_1 (a775))) (All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) (c1_1 (a775)) ### All 710
% 0.54/0.70 712. ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (hskp13))) (-. (hskp13)) (c1_1 (a775)) (All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) (-. (c2_1 (a775))) (c1_1 (a734)) (-. (c3_1 (a734))) (-. (c0_1 (a734))) (ndr1_0) ### DisjTree 213 711 86
% 0.54/0.70 713. ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) (-. (hskp5)) (ndr1_0) (-. (c0_1 (a734))) (-. (c3_1 (a734))) (c1_1 (a734)) (-. (c2_1 (a775))) (c1_1 (a775)) (-. (hskp13)) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (hskp13))) ### DisjTree 712 213 18
% 0.54/0.70 714. ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775)))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (hskp13))) (-. (hskp13)) (c1_1 (a734)) (-. (c3_1 (a734))) (-. (c0_1 (a734))) (ndr1_0) (-. (hskp5)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) ### ConjTree 713
% 0.54/0.70 715. ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (hskp13))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) (-. (hskp11)) ((hskp23) \/ ((hskp24) \/ (hskp13))) (-. (hskp13)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp9)) (ndr1_0) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ ((All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))) \/ (hskp15))) (-. (hskp15)) (-. (hskp5)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (c1_1 (a734)) (-. (c3_1 (a734))) (-. (c0_1 (a734))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) (-. (c1_1 (a730))) (c0_1 (a730)) (c3_1 (a730)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ### Or 702 714
% 0.54/0.70 716. (-. (c2_1 (a763))) (c2_1 (a763)) ### Axiom
% 0.54/0.70 717. (c0_1 (a763)) (-. (c0_1 (a763))) ### Axiom
% 0.54/0.70 718. (c1_1 (a763)) (-. (c1_1 (a763))) ### Axiom
% 0.54/0.70 719. ((ndr1_0) => ((c2_1 (a763)) \/ ((-. (c0_1 (a763))) \/ (-. (c1_1 (a763)))))) (c1_1 (a763)) (c0_1 (a763)) (-. (c2_1 (a763))) (ndr1_0) ### DisjTree 8 716 717 718
% 0.54/0.70 720. (All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) (ndr1_0) (-. (c2_1 (a763))) (c0_1 (a763)) (c1_1 (a763)) ### All 719
% 0.54/0.70 721. ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (hskp13))) (-. (hskp13)) (c1_1 (a763)) (c0_1 (a763)) (-. (c2_1 (a763))) (c1_1 (a734)) (-. (c3_1 (a734))) (-. (c0_1 (a734))) (ndr1_0) ### DisjTree 213 720 86
% 0.54/0.70 722. ((ndr1_0) /\ ((c0_1 (a763)) /\ ((c1_1 (a763)) /\ (-. (c2_1 (a763)))))) (ndr1_0) (-. (c0_1 (a734))) (-. (c3_1 (a734))) (c1_1 (a734)) (-. (hskp13)) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (hskp13))) ### ConjTree 721
% 0.54/0.70 723. ((-. (hskp15)) \/ ((ndr1_0) /\ ((c0_1 (a763)) /\ ((c1_1 (a763)) /\ (-. (c2_1 (a763))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) (c3_1 (a730)) (c0_1 (a730)) (-. (c1_1 (a730))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) (-. (c0_1 (a734))) (-. (c3_1 (a734))) (c1_1 (a734)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (-. (hskp5)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ ((All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))) \/ (hskp15))) (ndr1_0) (-. (hskp9)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp13)) ((hskp23) \/ ((hskp24) \/ (hskp13))) (-. (hskp11)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (hskp13))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ### Or 715 722
% 0.54/0.70 724. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (hskp13))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) (-. (hskp11)) ((hskp23) \/ ((hskp24) \/ (hskp13))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp9)) (ndr1_0) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ ((All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))) \/ (hskp15))) (-. (hskp5)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (c1_1 (a734)) (-. (c3_1 (a734))) (-. (c0_1 (a734))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) (-. (c1_1 (a730))) (c0_1 (a730)) (c3_1 (a730)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c0_1 (a763)) /\ ((c1_1 (a763)) /\ (-. (c2_1 (a763))))))) ### Or 723 563
% 0.54/0.70 725. (-. (c0_1 (a749))) (c0_1 (a749)) ### Axiom
% 0.54/0.70 726. (-. (c1_1 (a749))) (c1_1 (a749)) ### Axiom
% 0.54/0.70 727. (-. (c3_1 (a749))) (c3_1 (a749)) ### Axiom
% 0.54/0.70 728. (c2_1 (a749)) (-. (c2_1 (a749))) ### Axiom
% 0.54/0.70 729. ((ndr1_0) => ((c1_1 (a749)) \/ ((c3_1 (a749)) \/ (-. (c2_1 (a749)))))) (c2_1 (a749)) (-. (c3_1 (a749))) (-. (c1_1 (a749))) (ndr1_0) ### DisjTree 8 726 727 728
% 0.54/0.70 730. (All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) (ndr1_0) (-. (c1_1 (a749))) (-. (c3_1 (a749))) (c2_1 (a749)) ### All 729
% 0.54/0.70 731. (-. (c3_1 (a749))) (c3_1 (a749)) ### Axiom
% 0.54/0.70 732. ((ndr1_0) => ((c0_1 (a749)) \/ ((c2_1 (a749)) \/ (c3_1 (a749))))) (-. (c3_1 (a749))) (-. (c1_1 (a749))) (All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) (-. (c0_1 (a749))) (ndr1_0) ### DisjTree 8 725 730 731
% 0.54/0.70 733. (All X22, ((ndr1_0) => ((c0_1 X22) \/ ((c2_1 X22) \/ (c3_1 X22))))) (ndr1_0) (-. (c0_1 (a749))) (All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) (-. (c1_1 (a749))) (-. (c3_1 (a749))) ### All 732
% 0.54/0.70 734. ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) (-. (hskp5)) (c3_1 (a730)) (c0_1 (a730)) (-. (c1_1 (a730))) (-. (c3_1 (a749))) (-. (c1_1 (a749))) (-. (c0_1 (a749))) (ndr1_0) (All X22, ((ndr1_0) => ((c0_1 X22) \/ ((c2_1 X22) \/ (c3_1 X22))))) ### DisjTree 733 550 18
% 0.54/0.70 735. ((All X22, ((ndr1_0) => ((c0_1 X22) \/ ((c2_1 X22) \/ (c3_1 X22))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp8))) (-. (hskp8)) (-. (c0_1 (a734))) (-. (c3_1 (a734))) (c1_1 (a734)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) (ndr1_0) (-. (c0_1 (a749))) (-. (c1_1 (a749))) (-. (c3_1 (a749))) (-. (c1_1 (a730))) (c0_1 (a730)) (c3_1 (a730)) (-. (hskp5)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ### DisjTree 734 214 6
% 0.54/0.70 736. ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) (-. (hskp5)) (c3_1 (a730)) (c0_1 (a730)) (-. (c1_1 (a730))) (ndr1_0) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) (c1_1 (a734)) (-. (c3_1 (a734))) (-. (c0_1 (a734))) (-. (hskp8)) ((All X22, ((ndr1_0) => ((c0_1 X22) \/ ((c2_1 X22) \/ (c3_1 X22))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp8))) ### ConjTree 735
% 0.54/0.70 737. ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((All X22, ((ndr1_0) => ((c0_1 X22) \/ ((c2_1 X22) \/ (c3_1 X22))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp8))) (-. (hskp8)) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c0_1 (a763)) /\ ((c1_1 (a763)) /\ (-. (c2_1 (a763))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) (c3_1 (a730)) (c0_1 (a730)) (-. (c1_1 (a730))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) (-. (c0_1 (a734))) (-. (c3_1 (a734))) (c1_1 (a734)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (-. (hskp5)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ ((All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))) \/ (hskp15))) (ndr1_0) (-. (hskp9)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((hskp23) \/ ((hskp24) \/ (hskp13))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (hskp13))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ### Or 724 736
% 0.54/0.70 738. ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) (-. (c0_1 (a734))) (-. (c3_1 (a734))) (c1_1 (a734)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (-. (hskp20)) (-. (hskp5)) (-. (hskp15)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ ((All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))) \/ (hskp15))) (ndr1_0) (-. (c0_1 (a746))) (-. (c2_1 (a746))) (c3_1 (a746)) (-. (hskp6)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) ### Or 187 697
% 0.54/0.70 739. ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) (c3_1 (a730)) (c0_1 (a730)) (-. (c1_1 (a730))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) (-. (hskp6)) (c3_1 (a746)) (-. (c2_1 (a746))) (-. (c0_1 (a746))) (ndr1_0) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ ((All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))) \/ (hskp15))) (-. (hskp15)) (-. (hskp5)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (c1_1 (a734)) (-. (c3_1 (a734))) (-. (c0_1 (a734))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ### Or 738 561
% 0.54/0.70 740. ((-. (hskp15)) \/ ((ndr1_0) /\ ((c0_1 (a763)) /\ ((c1_1 (a763)) /\ (-. (c2_1 (a763))))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (hskp13))) (-. (hskp13)) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) (-. (c0_1 (a734))) (-. (c3_1 (a734))) (c1_1 (a734)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (-. (hskp5)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ ((All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))) \/ (hskp15))) (ndr1_0) (-. (c0_1 (a746))) (-. (c2_1 (a746))) (c3_1 (a746)) (-. (hskp6)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) (-. (c1_1 (a730))) (c0_1 (a730)) (c3_1 (a730)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ### Or 739 722
% 0.54/0.70 741. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) (c3_1 (a730)) (c0_1 (a730)) (-. (c1_1 (a730))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) (-. (hskp6)) (c3_1 (a746)) (-. (c2_1 (a746))) (-. (c0_1 (a746))) (ndr1_0) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ ((All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))) \/ (hskp15))) (-. (hskp5)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (c1_1 (a734)) (-. (c3_1 (a734))) (-. (c0_1 (a734))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (hskp13))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c0_1 (a763)) /\ ((c1_1 (a763)) /\ (-. (c2_1 (a763))))))) ### Or 740 563
% 0.54/0.70 742. ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746)))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c0_1 (a763)) /\ ((c1_1 (a763)) /\ (-. (c2_1 (a763))))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (hskp13))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) (-. (c0_1 (a734))) (-. (c3_1 (a734))) (c1_1 (a734)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (-. (hskp5)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ ((All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))) \/ (hskp15))) (ndr1_0) (-. (hskp6)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) (-. (c1_1 (a730))) (c0_1 (a730)) (c3_1 (a730)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ### ConjTree 741
% 0.54/0.70 743. ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) (-. (hskp6)) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (hskp13))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((hskp23) \/ ((hskp24) \/ (hskp13))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (ndr1_0) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ ((All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))) \/ (hskp15))) (-. (hskp5)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (c1_1 (a734)) (-. (c3_1 (a734))) (-. (c0_1 (a734))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) (-. (c1_1 (a730))) (c0_1 (a730)) (c3_1 (a730)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c0_1 (a763)) /\ ((c1_1 (a763)) /\ (-. (c2_1 (a763))))))) (-. (hskp8)) ((All X22, ((ndr1_0) => ((c0_1 X22) \/ ((c2_1 X22) \/ (c3_1 X22))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp8))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ### Or 737 742
% 0.54/0.70 744. ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp7))) (-. (hskp7)) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((All X22, ((ndr1_0) => ((c0_1 X22) \/ ((c2_1 X22) \/ (c3_1 X22))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp8))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c0_1 (a763)) /\ ((c1_1 (a763)) /\ (-. (c2_1 (a763))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) (c3_1 (a730)) (c0_1 (a730)) (-. (c1_1 (a730))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) (-. (c0_1 (a734))) (-. (c3_1 (a734))) (c1_1 (a734)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (-. (hskp5)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ ((All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))) \/ (hskp15))) (ndr1_0) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((hskp23) \/ ((hskp24) \/ (hskp13))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (hskp13))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) (-. (hskp6)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ### Or 743 216
% 0.54/0.70 745. ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) \/ (hskp2))) (-. (hskp2)) (c0_1 (a730)) (-. (c1_1 (a730))) (c3_1 (a730)) (-. (hskp1)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (c3_1 (a741)) (c1_1 (a741)) (-. (c0_1 (a741))) ((hskp23) \/ ((hskp24) \/ (hskp13))) (-. (hskp13)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp9)) (ndr1_0) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ ((All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))) \/ (hskp15))) (-. (hskp15)) (-. (hskp5)) (-. (hskp20)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (c1_1 (a734)) (-. (c3_1 (a734))) (-. (c0_1 (a734))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ### Or 700 543
% 0.54/0.70 746. ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) (-. (c0_1 (a734))) (-. (c3_1 (a734))) (c1_1 (a734)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (-. (hskp5)) (-. (hskp15)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ ((All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))) \/ (hskp15))) (ndr1_0) (-. (hskp9)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp13)) ((hskp23) \/ ((hskp24) \/ (hskp13))) (-. (c0_1 (a741))) (c1_1 (a741)) (c3_1 (a741)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (-. (hskp1)) (c3_1 (a730)) (-. (c1_1 (a730))) (c0_1 (a730)) (-. (hskp2)) ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) \/ (hskp2))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ### Or 745 561
% 0.54/0.70 747. ((-. (hskp15)) \/ ((ndr1_0) /\ ((c0_1 (a763)) /\ ((c1_1 (a763)) /\ (-. (c2_1 (a763))))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (hskp13))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) \/ (hskp2))) (-. (hskp2)) (c0_1 (a730)) (-. (c1_1 (a730))) (c3_1 (a730)) (-. (hskp1)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (c3_1 (a741)) (c1_1 (a741)) (-. (c0_1 (a741))) ((hskp23) \/ ((hskp24) \/ (hskp13))) (-. (hskp13)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp9)) (ndr1_0) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ ((All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))) \/ (hskp15))) (-. (hskp5)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (c1_1 (a734)) (-. (c3_1 (a734))) (-. (c0_1 (a734))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ### Or 746 722
% 0.54/0.70 748. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) (-. (c0_1 (a734))) (-. (c3_1 (a734))) (c1_1 (a734)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (-. (hskp5)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ ((All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))) \/ (hskp15))) (ndr1_0) (-. (hskp9)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((hskp23) \/ ((hskp24) \/ (hskp13))) (-. (c0_1 (a741))) (c1_1 (a741)) (c3_1 (a741)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (-. (hskp1)) (c3_1 (a730)) (-. (c1_1 (a730))) (c0_1 (a730)) (-. (hskp2)) ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) \/ (hskp2))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (hskp13))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c0_1 (a763)) /\ ((c1_1 (a763)) /\ (-. (c2_1 (a763))))))) ### Or 747 563
% 0.54/0.70 749. ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) (-. (hskp6)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c0_1 (a763)) /\ ((c1_1 (a763)) /\ (-. (c2_1 (a763))))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (hskp13))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) \/ (hskp2))) (-. (hskp2)) (c0_1 (a730)) (-. (c1_1 (a730))) (c3_1 (a730)) (-. (hskp1)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (c3_1 (a741)) (c1_1 (a741)) (-. (c0_1 (a741))) ((hskp23) \/ ((hskp24) \/ (hskp13))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (ndr1_0) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ ((All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))) \/ (hskp15))) (-. (hskp5)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (c1_1 (a734)) (-. (c3_1 (a734))) (-. (c0_1 (a734))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ### Or 748 580
% 0.54/0.70 750. ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741)))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) (-. (c0_1 (a734))) (-. (c3_1 (a734))) (c1_1 (a734)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (-. (hskp5)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ ((All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))) \/ (hskp15))) (ndr1_0) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((hskp23) \/ ((hskp24) \/ (hskp13))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (-. (hskp1)) (c3_1 (a730)) (-. (c1_1 (a730))) (c0_1 (a730)) (-. (hskp2)) ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) \/ (hskp2))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (hskp13))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c0_1 (a763)) /\ ((c1_1 (a763)) /\ (-. (c2_1 (a763))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) (-. (hskp6)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ### ConjTree 749
% 0.54/0.70 751. ((-. (hskp7)) \/ ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) \/ (hskp2))) (-. (hskp2)) (-. (hskp1)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) (-. (hskp6)) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (hskp13))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((hskp23) \/ ((hskp24) \/ (hskp13))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (ndr1_0) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ ((All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))) \/ (hskp15))) (-. (hskp5)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (c1_1 (a734)) (-. (c3_1 (a734))) (-. (c0_1 (a734))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) (-. (c1_1 (a730))) (c0_1 (a730)) (c3_1 (a730)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c0_1 (a763)) /\ ((c1_1 (a763)) /\ (-. (c2_1 (a763))))))) ((All X22, ((ndr1_0) => ((c0_1 X22) \/ ((c2_1 X22) \/ (c3_1 X22))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp8))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp7))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ### Or 744 750
% 0.54/0.70 752. ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738))))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp7))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((All X22, ((ndr1_0) => ((c0_1 X22) \/ ((c2_1 X22) \/ (c3_1 X22))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp8))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c0_1 (a763)) /\ ((c1_1 (a763)) /\ (-. (c2_1 (a763))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) (c3_1 (a730)) (c0_1 (a730)) (-. (c1_1 (a730))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) (-. (c0_1 (a734))) (-. (c3_1 (a734))) (c1_1 (a734)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (-. (hskp5)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ ((All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))) \/ (hskp15))) (ndr1_0) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((hskp23) \/ ((hskp24) \/ (hskp13))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (hskp13))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (-. (hskp1)) (-. (hskp2)) ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) \/ (hskp2))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741))))))) ### Or 751 242
% 0.54/0.70 753. ((-. (hskp5)) \/ ((ndr1_0) /\ ((c2_1 (a735)) /\ ((c3_1 (a735)) /\ (-. (c0_1 (a735))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((All X16, ((ndr1_0) => ((c0_1 X16) \/ ((-. (c1_1 X16)) \/ (-. (c2_1 X16)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp16))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) \/ (hskp2))) (-. (hskp2)) (-. (hskp1)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (hskp13))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((hskp23) \/ ((hskp24) \/ (hskp13))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (ndr1_0) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ ((All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))) \/ (hskp15))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (c1_1 (a734)) (-. (c3_1 (a734))) (-. (c0_1 (a734))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) (-. (c1_1 (a730))) (c0_1 (a730)) (c3_1 (a730)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c0_1 (a763)) /\ ((c1_1 (a763)) /\ (-. (c2_1 (a763))))))) ((All X22, ((ndr1_0) => ((c0_1 X22) \/ ((c2_1 X22) \/ (c3_1 X22))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp8))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp7))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738))))))) ### Or 752 682
% 0.54/0.70 754. ((ndr1_0) /\ ((c1_1 (a734)) /\ ((-. (c0_1 (a734))) /\ (-. (c3_1 (a734)))))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738))))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp7))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((All X22, ((ndr1_0) => ((c0_1 X22) \/ ((c2_1 X22) \/ (c3_1 X22))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp8))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c0_1 (a763)) /\ ((c1_1 (a763)) /\ (-. (c2_1 (a763))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) (c3_1 (a730)) (c0_1 (a730)) (-. (c1_1 (a730))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ ((All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))) \/ (hskp15))) (ndr1_0) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((hskp23) \/ ((hskp24) \/ (hskp13))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (hskp13))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (-. (hskp1)) (-. (hskp2)) ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) \/ (hskp2))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((All X16, ((ndr1_0) => ((c0_1 X16) \/ ((-. (c1_1 X16)) \/ (-. (c2_1 X16)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp16))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((-. (hskp5)) \/ ((ndr1_0) /\ ((c2_1 (a735)) /\ ((c3_1 (a735)) /\ (-. (c0_1 (a735))))))) ### ConjTree 753
% 0.54/0.70 755. ((-. (hskp4)) \/ ((ndr1_0) /\ ((c1_1 (a734)) /\ ((-. (c0_1 (a734))) /\ (-. (c3_1 (a734))))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (hskp13))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ ((All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))) \/ (hskp15))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c0_1 (a763)) /\ ((c1_1 (a763)) /\ (-. (c2_1 (a763))))))) ((All X22, ((ndr1_0) => ((c0_1 X22) \/ ((c2_1 X22) \/ (c3_1 X22))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp8))) ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp7))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((-. (c0_1 (a748))) /\ ((-. (c1_1 (a748))) /\ (-. (c2_1 (a748))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((hskp7) \/ ((hskp1) \/ (hskp4))) (-. (hskp1)) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) \/ (hskp2))) (-. (hskp2)) (c0_1 (a730)) (-. (c1_1 (a730))) (c3_1 (a730)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) ((hskp23) \/ ((hskp24) \/ (hskp13))) (ndr1_0) (-. (hskp3)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp16) \/ (hskp3))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((All X16, ((ndr1_0) => ((c0_1 X16) \/ ((-. (c1_1 X16)) \/ (-. (c2_1 X16)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp16))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((-. (hskp5)) \/ ((ndr1_0) /\ ((c2_1 (a735)) /\ ((c3_1 (a735)) /\ (-. (c0_1 (a735))))))) ### Or 683 754
% 0.54/0.71 756. ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((hskp1) \/ (hskp2))) (-. (hskp2)) (-. (hskp1)) (c2_1 (a733)) (-. (c1_1 (a733))) (-. (c0_1 (a733))) (ndr1_0) ### DisjTree 494 2 38
% 0.54/0.71 757. ((ndr1_0) /\ ((c2_1 (a733)) /\ ((-. (c0_1 (a733))) /\ (-. (c1_1 (a733)))))) (ndr1_0) (-. (hskp1)) (-. (hskp2)) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((hskp1) \/ (hskp2))) ### ConjTree 756
% 0.54/0.71 758. ((-. (hskp3)) \/ ((ndr1_0) /\ ((c2_1 (a733)) /\ ((-. (c0_1 (a733))) /\ (-. (c1_1 (a733))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((hskp1) \/ (hskp2))) ((-. (hskp5)) \/ ((ndr1_0) /\ ((c2_1 (a735)) /\ ((c3_1 (a735)) /\ (-. (c0_1 (a735))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((All X16, ((ndr1_0) => ((c0_1 X16) \/ ((-. (c1_1 X16)) \/ (-. (c2_1 X16)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp16))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp16) \/ (hskp3))) (ndr1_0) ((hskp23) \/ ((hskp24) \/ (hskp13))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (c3_1 (a730)) (-. (c1_1 (a730))) (c0_1 (a730)) (-. (hskp2)) ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) \/ (hskp2))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) (-. (hskp1)) ((hskp7) \/ ((hskp1) \/ (hskp4))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((-. (c0_1 (a748))) /\ ((-. (c1_1 (a748))) /\ (-. (c2_1 (a748))))))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738))))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp7))) ((All X22, ((ndr1_0) => ((c0_1 X22) \/ ((c2_1 X22) \/ (c3_1 X22))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp8))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c0_1 (a763)) /\ ((c1_1 (a763)) /\ (-. (c2_1 (a763))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ ((All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))) \/ (hskp15))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (hskp13))) ((-. (hskp4)) \/ ((ndr1_0) /\ ((c1_1 (a734)) /\ ((-. (c0_1 (a734))) /\ (-. (c3_1 (a734))))))) ### Or 755 757
% 0.54/0.71 759. ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) (c3_1 (a730)) (c0_1 (a730)) (-. (c1_1 (a730))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) (-. (hskp6)) (-. (c0_1 (a741))) (c1_1 (a741)) (c3_1 (a741)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) (ndr1_0) (-. (c0_1 (a732))) (-. (c2_1 (a732))) (-. (c3_1 (a732))) (-. (hskp5)) ((All X22, ((ndr1_0) => ((c0_1 X22) \/ ((c2_1 X22) \/ (c3_1 X22))))) \/ ((hskp5) \/ (hskp9))) ### Or 257 580
% 0.54/0.71 760. ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741)))))) ((All X22, ((ndr1_0) => ((c0_1 X22) \/ ((c2_1 X22) \/ (c3_1 X22))))) \/ ((hskp5) \/ (hskp9))) (-. (hskp5)) (-. (c3_1 (a732))) (-. (c2_1 (a732))) (-. (c0_1 (a732))) (ndr1_0) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) (-. (hskp6)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) (-. (c1_1 (a730))) (c0_1 (a730)) (c3_1 (a730)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ### ConjTree 759
% 0.54/0.71 761. ((-. (hskp7)) \/ ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) (c3_1 (a730)) (c0_1 (a730)) (-. (c1_1 (a730))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) (-. (hskp6)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) (ndr1_0) (-. (c0_1 (a732))) (-. (c2_1 (a732))) (-. (c3_1 (a732))) (-. (hskp5)) ((All X22, ((ndr1_0) => ((c0_1 X22) \/ ((c2_1 X22) \/ (c3_1 X22))))) \/ ((hskp5) \/ (hskp9))) (-. (hskp1)) (-. (hskp4)) ((hskp7) \/ ((hskp1) \/ (hskp4))) ### Or 4 760
% 0.54/0.71 762. ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) (-. (hskp10)) (-. (c0_1 (a738))) (-. (c2_1 (a738))) (c1_1 (a738)) (-. (c0_1 (a741))) (c3_1 (a741)) (c1_1 (a741)) (-. (hskp11)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) (-. (c2_1 (a732))) (-. (c0_1 (a732))) (ndr1_0) (All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) ### DisjTree 271 61 62
% 0.54/0.71 763. ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) (-. (hskp25)) (c3_1 (a730)) (c0_1 (a730)) (-. (c1_1 (a730))) (ndr1_0) (-. (c0_1 (a732))) (-. (c2_1 (a732))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) (-. (hskp11)) (c1_1 (a741)) (c3_1 (a741)) (-. (c0_1 (a741))) (c1_1 (a738)) (-. (c2_1 (a738))) (-. (c0_1 (a738))) (-. (hskp10)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) ### DisjTree 762 550 93
% 0.54/0.71 764. ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) (-. (hskp11)) (-. (c0_1 (a746))) (-. (c2_1 (a746))) (c3_1 (a746)) (-. (c0_1 (a741))) (c3_1 (a741)) (c1_1 (a741)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (-. (hskp20)) (-. (hskp5)) (c3_1 (a729)) (c2_1 (a729)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) (c1_1 (a738)) (-. (c2_1 (a738))) (-. (c0_1 (a738))) (ndr1_0) ### DisjTree 50 575 60
% 0.54/0.71 765. ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729))))) (ndr1_0) (-. (c0_1 (a738))) (-. (c2_1 (a738))) (c1_1 (a738)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) (-. (hskp5)) (-. (hskp20)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (c1_1 (a741)) (c3_1 (a741)) (-. (c0_1 (a741))) (c3_1 (a746)) (-. (c2_1 (a746))) (-. (c0_1 (a746))) (-. (hskp11)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ### ConjTree 764
% 0.54/0.71 766. ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) (-. (c0_1 (a746))) (-. (c2_1 (a746))) (c3_1 (a746)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (-. (hskp20)) (-. (hskp5)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) (-. (hskp10)) (-. (c0_1 (a738))) (-. (c2_1 (a738))) (c1_1 (a738)) (-. (c0_1 (a741))) (c3_1 (a741)) (c1_1 (a741)) (-. (hskp11)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) (-. (c2_1 (a732))) (-. (c0_1 (a732))) (ndr1_0) (-. (c1_1 (a730))) (c0_1 (a730)) (c3_1 (a730)) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) ### Or 763 765
% 0.54/0.71 767. ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) (c3_1 (a730)) (c0_1 (a730)) (-. (c1_1 (a730))) (ndr1_0) (-. (c0_1 (a732))) (-. (c2_1 (a732))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) (-. (hskp11)) (c1_1 (a741)) (c3_1 (a741)) (-. (c0_1 (a741))) (c1_1 (a738)) (-. (c2_1 (a738))) (-. (c0_1 (a738))) (-. (hskp10)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) (-. (hskp5)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (c3_1 (a746)) (-. (c2_1 (a746))) (-. (c0_1 (a746))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ### Or 766 561
% 0.54/0.71 768. ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) (-. (hskp4)) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) (-. (c0_1 (a746))) (-. (c2_1 (a746))) (c3_1 (a746)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (-. (hskp5)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) (-. (hskp10)) (-. (c0_1 (a738))) (-. (c2_1 (a738))) (c1_1 (a738)) (-. (c0_1 (a741))) (c3_1 (a741)) (c1_1 (a741)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) (-. (c2_1 (a732))) (-. (c0_1 (a732))) (ndr1_0) (-. (c1_1 (a730))) (c0_1 (a730)) (c3_1 (a730)) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ### Or 767 70
% 0.54/0.71 769. ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) (-. (hskp11)) (-. (c0_1 (a746))) (-. (c2_1 (a746))) (c3_1 (a746)) (-. (c0_1 (a741))) (c3_1 (a741)) (c1_1 (a741)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (-. (hskp20)) (-. (hskp5)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) (c1_1 (a738)) (-. (c2_1 (a738))) (-. (c0_1 (a738))) (ndr1_0) (-. (c0_1 (a748))) (-. (c1_1 (a748))) (-. (c2_1 (a748))) (-. (c1_1 (a730))) (c0_1 (a730)) (c3_1 (a730)) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) ### Or 588 765
% 0.54/0.71 770. ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) (c3_1 (a730)) (c0_1 (a730)) (-. (c1_1 (a730))) (-. (c2_1 (a748))) (-. (c1_1 (a748))) (-. (c0_1 (a748))) (ndr1_0) (-. (c0_1 (a738))) (-. (c2_1 (a738))) (c1_1 (a738)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) (-. (hskp5)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (c1_1 (a741)) (c3_1 (a741)) (-. (c0_1 (a741))) (c3_1 (a746)) (-. (c2_1 (a746))) (-. (c0_1 (a746))) (-. (hskp11)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ### Or 769 561
% 0.54/0.71 771. ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) (-. (hskp4)) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) (-. (c0_1 (a746))) (-. (c2_1 (a746))) (c3_1 (a746)) (-. (c0_1 (a741))) (c3_1 (a741)) (c1_1 (a741)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (-. (hskp5)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) (c1_1 (a738)) (-. (c2_1 (a738))) (-. (c0_1 (a738))) (ndr1_0) (-. (c0_1 (a748))) (-. (c1_1 (a748))) (-. (c2_1 (a748))) (-. (c1_1 (a730))) (c0_1 (a730)) (c3_1 (a730)) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ### Or 770 70
% 0.54/0.71 772. ((ndr1_0) /\ ((-. (c0_1 (a748))) /\ ((-. (c1_1 (a748))) /\ (-. (c2_1 (a748)))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) (c3_1 (a730)) (c0_1 (a730)) (-. (c1_1 (a730))) (ndr1_0) (-. (c0_1 (a738))) (-. (c2_1 (a738))) (c1_1 (a738)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) (-. (hskp5)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (c1_1 (a741)) (c3_1 (a741)) (-. (c0_1 (a741))) (c3_1 (a746)) (-. (c2_1 (a746))) (-. (c0_1 (a746))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) (-. (hskp4)) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ### ConjTree 771
% 0.54/0.71 773. ((-. (hskp10)) \/ ((ndr1_0) /\ ((-. (c0_1 (a748))) /\ ((-. (c1_1 (a748))) /\ (-. (c2_1 (a748))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) (c3_1 (a730)) (c0_1 (a730)) (-. (c1_1 (a730))) (ndr1_0) (-. (c0_1 (a732))) (-. (c2_1 (a732))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) (c1_1 (a741)) (c3_1 (a741)) (-. (c0_1 (a741))) (c1_1 (a738)) (-. (c2_1 (a738))) (-. (c0_1 (a738))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) (-. (hskp5)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (c3_1 (a746)) (-. (c2_1 (a746))) (-. (c0_1 (a746))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) (-. (hskp4)) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ### Or 768 772
% 0.54/0.71 774. ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746)))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) (-. (hskp4)) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (-. (hskp5)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) (-. (c0_1 (a738))) (-. (c2_1 (a738))) (c1_1 (a738)) (-. (c0_1 (a741))) (c3_1 (a741)) (c1_1 (a741)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) (-. (c2_1 (a732))) (-. (c0_1 (a732))) (ndr1_0) (-. (c1_1 (a730))) (c0_1 (a730)) (c3_1 (a730)) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((-. (c0_1 (a748))) /\ ((-. (c1_1 (a748))) /\ (-. (c2_1 (a748))))))) ### ConjTree 773
% 0.54/0.71 775. ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((-. (c0_1 (a748))) /\ ((-. (c1_1 (a748))) /\ (-. (c2_1 (a748))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) (c3_1 (a730)) (c0_1 (a730)) (-. (c1_1 (a730))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) (c1_1 (a741)) (c3_1 (a741)) (-. (c0_1 (a741))) (c1_1 (a738)) (-. (c2_1 (a738))) (-. (c0_1 (a738))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) (-. (hskp4)) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) (ndr1_0) (-. (c0_1 (a732))) (-. (c2_1 (a732))) (-. (c3_1 (a732))) (-. (hskp5)) ((All X22, ((ndr1_0) => ((c0_1 X22) \/ ((c2_1 X22) \/ (c3_1 X22))))) \/ ((hskp5) \/ (hskp9))) ### Or 257 774
% 0.54/0.71 776. ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741)))))) ((All X22, ((ndr1_0) => ((c0_1 X22) \/ ((c2_1 X22) \/ (c3_1 X22))))) \/ ((hskp5) \/ (hskp9))) (-. (hskp5)) (-. (c3_1 (a732))) (-. (c2_1 (a732))) (-. (c0_1 (a732))) (ndr1_0) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) (-. (hskp4)) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) (-. (c0_1 (a738))) (-. (c2_1 (a738))) (c1_1 (a738)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) (-. (c1_1 (a730))) (c0_1 (a730)) (c3_1 (a730)) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((-. (c0_1 (a748))) /\ ((-. (c1_1 (a748))) /\ (-. (c2_1 (a748))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ### ConjTree 775
% 0.54/0.71 777. ((-. (hskp7)) \/ ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((-. (c0_1 (a748))) /\ ((-. (c1_1 (a748))) /\ (-. (c2_1 (a748))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) (c3_1 (a730)) (c0_1 (a730)) (-. (c1_1 (a730))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) (c1_1 (a738)) (-. (c2_1 (a738))) (-. (c0_1 (a738))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) (ndr1_0) (-. (c0_1 (a732))) (-. (c2_1 (a732))) (-. (c3_1 (a732))) (-. (hskp5)) ((All X22, ((ndr1_0) => ((c0_1 X22) \/ ((c2_1 X22) \/ (c3_1 X22))))) \/ ((hskp5) \/ (hskp9))) (-. (hskp1)) (-. (hskp4)) ((hskp7) \/ ((hskp1) \/ (hskp4))) ### Or 4 776
% 0.54/0.71 778. ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738)))))) ((hskp7) \/ ((hskp1) \/ (hskp4))) (-. (hskp4)) (-. (hskp1)) ((All X22, ((ndr1_0) => ((c0_1 X22) \/ ((c2_1 X22) \/ (c3_1 X22))))) \/ ((hskp5) \/ (hskp9))) (-. (hskp5)) (-. (c3_1 (a732))) (-. (c2_1 (a732))) (-. (c0_1 (a732))) (ndr1_0) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) (-. (c1_1 (a730))) (c0_1 (a730)) (c3_1 (a730)) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((-. (c0_1 (a748))) /\ ((-. (c1_1 (a748))) /\ (-. (c2_1 (a748))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741))))))) ### ConjTree 777
% 0.54/0.71 779. ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((-. (c0_1 (a748))) /\ ((-. (c1_1 (a748))) /\ (-. (c2_1 (a748))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((hskp7) \/ ((hskp1) \/ (hskp4))) (-. (hskp4)) (-. (hskp1)) ((All X22, ((ndr1_0) => ((c0_1 X22) \/ ((c2_1 X22) \/ (c3_1 X22))))) \/ ((hskp5) \/ (hskp9))) (-. (hskp5)) (-. (c3_1 (a732))) (-. (c2_1 (a732))) (-. (c0_1 (a732))) (ndr1_0) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) (-. (c1_1 (a730))) (c0_1 (a730)) (c3_1 (a730)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741))))))) ### Or 761 778
% 0.54/0.71 780. ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) (-. (hskp25)) (c3_1 (a730)) (c0_1 (a730)) (-. (c1_1 (a730))) (ndr1_0) (-. (c0_1 (a732))) (-. (c2_1 (a732))) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) (-. (hskp10)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) ### DisjTree 272 550 93
% 0.54/0.71 781. ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (-. (hskp1)) (c3_1 (a729)) (c2_1 (a729)) (c0_1 (a729)) (c1_1 (a798)) (c0_1 (a798)) (-. (c3_1 (a798))) (ndr1_0) ### DisjTree 111 100 2
% 0.54/0.71 782. ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729))))) (ndr1_0) (-. (c3_1 (a798))) (c0_1 (a798)) (c1_1 (a798)) (-. (hskp1)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) ### ConjTree 781
% 0.54/0.71 783. ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (-. (hskp1)) (c1_1 (a798)) (c0_1 (a798)) (-. (c3_1 (a798))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) (-. (hskp10)) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (-. (c2_1 (a732))) (-. (c0_1 (a732))) (ndr1_0) (-. (c1_1 (a730))) (c0_1 (a730)) (c3_1 (a730)) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) ### Or 780 782
% 0.54/0.71 784. ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798)))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) (c3_1 (a730)) (c0_1 (a730)) (-. (c1_1 (a730))) (ndr1_0) (-. (c0_1 (a732))) (-. (c2_1 (a732))) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) (-. (hskp10)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) (-. (hskp1)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ### ConjTree 783
% 0.54/0.71 785. ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (-. (hskp1)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) (-. (hskp10)) (-. (c2_1 (a732))) (-. (c0_1 (a732))) (-. (c1_1 (a730))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) ((hskp23) \/ ((hskp24) \/ (hskp13))) (-. (hskp13)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp9)) (ndr1_0) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c0_1 (a730)) (c3_1 (a730)) (-. (hskp21)) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (-. (hskp16)) ((All X16, ((ndr1_0) => ((c0_1 X16) \/ ((-. (c1_1 X16)) \/ (-. (c2_1 X16)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp16))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ### Or 624 784
% 0.54/0.71 786. ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (-. (hskp1)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) (-. (hskp10)) (-. (c2_1 (a732))) (-. (c0_1 (a732))) (-. (c1_1 (a730))) (c0_1 (a730)) (c3_1 (a730)) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) ((hskp23) \/ ((hskp24) \/ (hskp13))) (-. (hskp13)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp9)) (ndr1_0) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c3_1 (a793)) (c0_1 (a793)) (-. (c2_1 (a793))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (-. (hskp16)) ((All X16, ((ndr1_0) => ((c0_1 X16) \/ ((-. (c1_1 X16)) \/ (-. (c2_1 X16)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp16))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ### Or 643 784
% 0.54/0.71 787. ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X16, ((ndr1_0) => ((c0_1 X16) \/ ((-. (c1_1 X16)) \/ (-. (c2_1 X16)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp16))) (-. (hskp16)) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (ndr1_0) (-. (hskp9)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp13)) ((hskp23) \/ ((hskp24) \/ (hskp13))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) (c3_1 (a730)) (c0_1 (a730)) (-. (c1_1 (a730))) (-. (c0_1 (a732))) (-. (c2_1 (a732))) (-. (hskp10)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) (-. (hskp1)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ### ConjTree 786
% 0.54/0.71 788. ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X16, ((ndr1_0) => ((c0_1 X16) \/ ((-. (c1_1 X16)) \/ (-. (c2_1 X16)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp16))) (-. (hskp16)) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (c3_1 (a730)) (c0_1 (a730)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (ndr1_0) (-. (hskp9)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp13)) ((hskp23) \/ ((hskp24) \/ (hskp13))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) (-. (c1_1 (a730))) (-. (c0_1 (a732))) (-. (c2_1 (a732))) (-. (hskp10)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) (-. (hskp1)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ### Or 785 787
% 0.54/0.71 789. ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) (-. (hskp10)) (-. (c2_1 (a732))) (-. (c0_1 (a732))) (-. (c1_1 (a730))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) ((hskp23) \/ ((hskp24) \/ (hskp13))) (-. (hskp13)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp9)) (ndr1_0) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) (-. (c3_1 (a764))) (c0_1 (a764)) (c2_1 (a764)) (-. (hskp1)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (-. (hskp21)) (c3_1 (a730)) (c0_1 (a730)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ### Or 659 784
% 0.54/0.71 790. ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) (-. (hskp10)) (-. (c2_1 (a732))) (-. (c0_1 (a732))) (-. (c1_1 (a730))) (c0_1 (a730)) (c3_1 (a730)) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) ((hskp23) \/ ((hskp24) \/ (hskp13))) (-. (hskp13)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp9)) (ndr1_0) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) (-. (c3_1 (a764))) (c0_1 (a764)) (c2_1 (a764)) (-. (hskp1)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (-. (c2_1 (a793))) (c0_1 (a793)) (c3_1 (a793)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ### Or 665 784
% 0.54/0.71 791. ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (-. (hskp1)) (c2_1 (a764)) (c0_1 (a764)) (-. (c3_1 (a764))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (ndr1_0) (-. (hskp9)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp13)) ((hskp23) \/ ((hskp24) \/ (hskp13))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) (c3_1 (a730)) (c0_1 (a730)) (-. (c1_1 (a730))) (-. (c0_1 (a732))) (-. (c2_1 (a732))) (-. (hskp10)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ### ConjTree 790
% 0.54/0.71 792. ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c0_1 (a730)) (c3_1 (a730)) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (-. (hskp1)) (c2_1 (a764)) (c0_1 (a764)) (-. (c3_1 (a764))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (ndr1_0) (-. (hskp9)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp13)) ((hskp23) \/ ((hskp24) \/ (hskp13))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) (-. (c1_1 (a730))) (-. (c0_1 (a732))) (-. (c2_1 (a732))) (-. (hskp10)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ### Or 789 791
% 0.54/0.71 793. ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) (-. (hskp10)) (-. (c2_1 (a732))) (-. (c0_1 (a732))) (-. (c1_1 (a730))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) ((hskp23) \/ ((hskp24) \/ (hskp13))) (-. (hskp13)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp9)) (ndr1_0) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) (-. (hskp1)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (c3_1 (a730)) (c0_1 (a730)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ### ConjTree 792
% 0.54/0.71 794. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (-. (hskp1)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) (-. (hskp10)) (-. (c2_1 (a732))) (-. (c0_1 (a732))) (-. (c1_1 (a730))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) ((hskp23) \/ ((hskp24) \/ (hskp13))) (-. (hskp13)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp9)) (ndr1_0) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c0_1 (a730)) (c3_1 (a730)) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) ((All X16, ((ndr1_0) => ((c0_1 X16) \/ ((-. (c1_1 X16)) \/ (-. (c2_1 X16)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp16))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ### Or 788 793
% 0.54/0.71 795. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X16, ((ndr1_0) => ((c0_1 X16) \/ ((-. (c1_1 X16)) \/ (-. (c2_1 X16)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp16))) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (c3_1 (a730)) (c0_1 (a730)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (ndr1_0) (-. (hskp9)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((hskp23) \/ ((hskp24) \/ (hskp13))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) (-. (c1_1 (a730))) (-. (c0_1 (a732))) (-. (c2_1 (a732))) (-. (hskp10)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) (-. (hskp1)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ### Or 794 673
% 0.54/0.71 796. ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (-. (hskp1)) (c1_1 (a798)) (c0_1 (a798)) (-. (c3_1 (a798))) (ndr1_0) (-. (c0_1 (a748))) (-. (c1_1 (a748))) (-. (c2_1 (a748))) (-. (c1_1 (a730))) (c0_1 (a730)) (c3_1 (a730)) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) ### Or 588 782
% 0.54/0.71 797. ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798)))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) (c3_1 (a730)) (c0_1 (a730)) (-. (c1_1 (a730))) (-. (c2_1 (a748))) (-. (c1_1 (a748))) (-. (c0_1 (a748))) (ndr1_0) (-. (hskp1)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ### ConjTree 796
% 0.54/0.71 798. ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (-. (hskp1)) (-. (c0_1 (a748))) (-. (c1_1 (a748))) (-. (c2_1 (a748))) (-. (c1_1 (a730))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) ((hskp23) \/ ((hskp24) \/ (hskp13))) (-. (hskp13)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp9)) (ndr1_0) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c0_1 (a730)) (c3_1 (a730)) (-. (hskp21)) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (-. (hskp16)) ((All X16, ((ndr1_0) => ((c0_1 X16) \/ ((-. (c1_1 X16)) \/ (-. (c2_1 X16)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp16))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ### Or 624 797
% 0.54/0.71 799. ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (-. (hskp1)) (-. (c0_1 (a748))) (-. (c1_1 (a748))) (-. (c2_1 (a748))) (-. (c1_1 (a730))) (c0_1 (a730)) (c3_1 (a730)) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) ((hskp23) \/ ((hskp24) \/ (hskp13))) (-. (hskp13)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp9)) (ndr1_0) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c3_1 (a793)) (c0_1 (a793)) (-. (c2_1 (a793))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (-. (hskp16)) ((All X16, ((ndr1_0) => ((c0_1 X16) \/ ((-. (c1_1 X16)) \/ (-. (c2_1 X16)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp16))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ### Or 643 797
% 0.54/0.71 800. ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X16, ((ndr1_0) => ((c0_1 X16) \/ ((-. (c1_1 X16)) \/ (-. (c2_1 X16)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp16))) (-. (hskp16)) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (ndr1_0) (-. (hskp9)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp13)) ((hskp23) \/ ((hskp24) \/ (hskp13))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) (c3_1 (a730)) (c0_1 (a730)) (-. (c1_1 (a730))) (-. (c2_1 (a748))) (-. (c1_1 (a748))) (-. (c0_1 (a748))) (-. (hskp1)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ### ConjTree 799
% 0.54/0.71 801. ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X16, ((ndr1_0) => ((c0_1 X16) \/ ((-. (c1_1 X16)) \/ (-. (c2_1 X16)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp16))) (-. (hskp16)) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (c3_1 (a730)) (c0_1 (a730)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (ndr1_0) (-. (hskp9)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp13)) ((hskp23) \/ ((hskp24) \/ (hskp13))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) (-. (c1_1 (a730))) (-. (c2_1 (a748))) (-. (c1_1 (a748))) (-. (c0_1 (a748))) (-. (hskp1)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ### Or 798 800
% 0.54/0.71 802. ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) (-. (c0_1 (a748))) (-. (c1_1 (a748))) (-. (c2_1 (a748))) (-. (c1_1 (a730))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) ((hskp23) \/ ((hskp24) \/ (hskp13))) (-. (hskp13)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp9)) (ndr1_0) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) (-. (c3_1 (a764))) (c0_1 (a764)) (c2_1 (a764)) (-. (hskp1)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (-. (hskp21)) (c3_1 (a730)) (c0_1 (a730)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ### Or 659 797
% 0.54/0.71 803. ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) (-. (c0_1 (a748))) (-. (c1_1 (a748))) (-. (c2_1 (a748))) (-. (c1_1 (a730))) (c0_1 (a730)) (c3_1 (a730)) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) ((hskp23) \/ ((hskp24) \/ (hskp13))) (-. (hskp13)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp9)) (ndr1_0) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) (-. (c3_1 (a764))) (c0_1 (a764)) (c2_1 (a764)) (-. (hskp1)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (-. (c2_1 (a793))) (c0_1 (a793)) (c3_1 (a793)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ### Or 665 797
% 0.54/0.71 804. ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (-. (hskp1)) (c2_1 (a764)) (c0_1 (a764)) (-. (c3_1 (a764))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (ndr1_0) (-. (hskp9)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp13)) ((hskp23) \/ ((hskp24) \/ (hskp13))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) (c3_1 (a730)) (c0_1 (a730)) (-. (c1_1 (a730))) (-. (c2_1 (a748))) (-. (c1_1 (a748))) (-. (c0_1 (a748))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ### ConjTree 803
% 0.54/0.71 805. ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c0_1 (a730)) (c3_1 (a730)) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (-. (hskp1)) (c2_1 (a764)) (c0_1 (a764)) (-. (c3_1 (a764))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (ndr1_0) (-. (hskp9)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp13)) ((hskp23) \/ ((hskp24) \/ (hskp13))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) (-. (c1_1 (a730))) (-. (c2_1 (a748))) (-. (c1_1 (a748))) (-. (c0_1 (a748))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ### Or 802 804
% 0.54/0.71 806. ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764)))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) (-. (c0_1 (a748))) (-. (c1_1 (a748))) (-. (c2_1 (a748))) (-. (c1_1 (a730))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) ((hskp23) \/ ((hskp24) \/ (hskp13))) (-. (hskp13)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp9)) (ndr1_0) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) (-. (hskp1)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (c3_1 (a730)) (c0_1 (a730)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ### ConjTree 805
% 0.54/0.71 807. ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (-. (hskp1)) (-. (c0_1 (a748))) (-. (c1_1 (a748))) (-. (c2_1 (a748))) (-. (c1_1 (a730))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) ((hskp23) \/ ((hskp24) \/ (hskp13))) (-. (hskp13)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp9)) (ndr1_0) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c0_1 (a730)) (c3_1 (a730)) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) ((All X16, ((ndr1_0) => ((c0_1 X16) \/ ((-. (c1_1 X16)) \/ (-. (c2_1 X16)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp16))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ### Or 801 806
% 0.54/0.71 808. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X16, ((ndr1_0) => ((c0_1 X16) \/ ((-. (c1_1 X16)) \/ (-. (c2_1 X16)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp16))) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (c3_1 (a730)) (c0_1 (a730)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (ndr1_0) (-. (hskp9)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((hskp23) \/ ((hskp24) \/ (hskp13))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) (-. (c1_1 (a730))) (-. (c2_1 (a748))) (-. (c1_1 (a748))) (-. (c0_1 (a748))) (-. (hskp1)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ### Or 807 673
% 0.54/0.71 809. ((ndr1_0) /\ ((-. (c0_1 (a748))) /\ ((-. (c1_1 (a748))) /\ (-. (c2_1 (a748)))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (-. (hskp1)) (-. (c1_1 (a730))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) ((hskp23) \/ ((hskp24) \/ (hskp13))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp9)) (ndr1_0) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c0_1 (a730)) (c3_1 (a730)) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) ((All X16, ((ndr1_0) => ((c0_1 X16) \/ ((-. (c1_1 X16)) \/ (-. (c2_1 X16)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp16))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ### ConjTree 808
% 0.54/0.72 810. ((-. (hskp10)) \/ ((ndr1_0) /\ ((-. (c0_1 (a748))) /\ ((-. (c1_1 (a748))) /\ (-. (c2_1 (a748))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (-. (hskp1)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) (-. (c2_1 (a732))) (-. (c0_1 (a732))) (-. (c1_1 (a730))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) ((hskp23) \/ ((hskp24) \/ (hskp13))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (-. (hskp9)) (ndr1_0) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c0_1 (a730)) (c3_1 (a730)) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) ((All X16, ((ndr1_0) => ((c0_1 X16) \/ ((-. (c1_1 X16)) \/ (-. (c2_1 X16)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp16))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ### Or 795 809
% 0.54/0.72 811. ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X16, ((ndr1_0) => ((c0_1 X16) \/ ((-. (c1_1 X16)) \/ (-. (c2_1 X16)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp16))) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (c3_1 (a730)) (c0_1 (a730)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (ndr1_0) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((hskp23) \/ ((hskp24) \/ (hskp13))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) (-. (c1_1 (a730))) (-. (c0_1 (a732))) (-. (c2_1 (a732))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) (-. (hskp1)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((-. (c0_1 (a748))) /\ ((-. (c1_1 (a748))) /\ (-. (c2_1 (a748))))))) ### Or 810 680
% 0.54/0.72 812. ((ndr1_0) /\ ((c2_1 (a735)) /\ ((c3_1 (a735)) /\ (-. (c0_1 (a735)))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((-. (c0_1 (a748))) /\ ((-. (c1_1 (a748))) /\ (-. (c2_1 (a748))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (-. (hskp1)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) (-. (c2_1 (a732))) (-. (c0_1 (a732))) (-. (c1_1 (a730))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) ((hskp23) \/ ((hskp24) \/ (hskp13))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) (ndr1_0) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c0_1 (a730)) (c3_1 (a730)) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((All X16, ((ndr1_0) => ((c0_1 X16) \/ ((-. (c1_1 X16)) \/ (-. (c2_1 X16)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp16))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ### ConjTree 811
% 0.54/0.72 813. ((-. (hskp5)) \/ ((ndr1_0) /\ ((c2_1 (a735)) /\ ((c3_1 (a735)) /\ (-. (c0_1 (a735))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((All X16, ((ndr1_0) => ((c0_1 X16) \/ ((-. (c1_1 X16)) \/ (-. (c2_1 X16)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp16))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((hskp23) \/ ((hskp24) \/ (hskp13))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) (c3_1 (a730)) (c0_1 (a730)) (-. (c1_1 (a730))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) (ndr1_0) (-. (c0_1 (a732))) (-. (c2_1 (a732))) (-. (c3_1 (a732))) ((All X22, ((ndr1_0) => ((c0_1 X22) \/ ((c2_1 X22) \/ (c3_1 X22))))) \/ ((hskp5) \/ (hskp9))) (-. (hskp1)) (-. (hskp4)) ((hskp7) \/ ((hskp1) \/ (hskp4))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((-. (c0_1 (a748))) /\ ((-. (c1_1 (a748))) /\ (-. (c2_1 (a748))))))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738))))))) ### Or 779 812
% 0.54/0.72 814. ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) (c3_1 (a730)) (c0_1 (a730)) (-. (c1_1 (a730))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) (-. (hskp6)) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ ((All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))) \/ (hskp15))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (c1_1 (a734)) (-. (c3_1 (a734))) (-. (c0_1 (a734))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (hskp13))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c0_1 (a763)) /\ ((c1_1 (a763)) /\ (-. (c2_1 (a763))))))) (ndr1_0) (-. (c0_1 (a732))) (-. (c2_1 (a732))) (-. (c3_1 (a732))) (-. (hskp5)) ((All X22, ((ndr1_0) => ((c0_1 X22) \/ ((c2_1 X22) \/ (c3_1 X22))))) \/ ((hskp5) \/ (hskp9))) ### Or 257 742
% 0.54/0.72 815. ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738))))))) ((All X22, ((ndr1_0) => ((c0_1 X22) \/ ((c2_1 X22) \/ (c3_1 X22))))) \/ ((hskp5) \/ (hskp9))) (-. (hskp5)) (-. (c3_1 (a732))) (-. (c2_1 (a732))) (-. (c0_1 (a732))) (ndr1_0) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c0_1 (a763)) /\ ((c1_1 (a763)) /\ (-. (c2_1 (a763))))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (hskp13))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) (-. (c0_1 (a734))) (-. (c3_1 (a734))) (c1_1 (a734)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ ((All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))) \/ (hskp15))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) (-. (c1_1 (a730))) (c0_1 (a730)) (c3_1 (a730)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ### Or 814 242
% 0.54/0.72 816. ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) (-. (hskp10)) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (c1_1 (a734)) (-. (c3_1 (a734))) (All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) (-. (c0_1 (a734))) (ndr1_0) ### DisjTree 208 120 62
% 0.54/0.72 817. ((All X22, ((ndr1_0) => ((c0_1 X22) \/ ((c2_1 X22) \/ (c3_1 X22))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp8))) (-. (hskp8)) (-. (c0_1 (a734))) (-. (c3_1 (a734))) (c1_1 (a734)) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) (-. (hskp10)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) (-. (c3_1 (a732))) (-. (c2_1 (a732))) (-. (c0_1 (a732))) (ndr1_0) ### DisjTree 256 816 6
% 0.54/0.72 818. ((-. (hskp10)) \/ ((ndr1_0) /\ ((-. (c0_1 (a748))) /\ ((-. (c1_1 (a748))) /\ (-. (c2_1 (a748))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X16, ((ndr1_0) => ((c0_1 X16) \/ ((-. (c1_1 X16)) \/ (-. (c2_1 X16)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp16))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (c3_1 (a730)) (c0_1 (a730)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (-. (hskp9)) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((hskp23) \/ ((hskp24) \/ (hskp13))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) (-. (c1_1 (a730))) (-. (hskp1)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) (ndr1_0) (-. (c0_1 (a732))) (-. (c2_1 (a732))) (-. (c3_1 (a732))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (c1_1 (a734)) (-. (c3_1 (a734))) (-. (c0_1 (a734))) (-. (hskp8)) ((All X22, ((ndr1_0) => ((c0_1 X22) \/ ((c2_1 X22) \/ (c3_1 X22))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp8))) ### Or 817 809
% 0.54/0.72 819. ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X22, ((ndr1_0) => ((c0_1 X22) \/ ((c2_1 X22) \/ (c3_1 X22))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp8))) (-. (hskp8)) (-. (c0_1 (a734))) (-. (c3_1 (a734))) (c1_1 (a734)) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) (-. (c3_1 (a732))) (-. (c2_1 (a732))) (-. (c0_1 (a732))) (ndr1_0) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (-. (hskp1)) (-. (c1_1 (a730))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) ((hskp23) \/ ((hskp24) \/ (hskp13))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c0_1 (a730)) (c3_1 (a730)) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((All X16, ((ndr1_0) => ((c0_1 X16) \/ ((-. (c1_1 X16)) \/ (-. (c2_1 X16)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp16))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((-. (c0_1 (a748))) /\ ((-. (c1_1 (a748))) /\ (-. (c2_1 (a748))))))) ### Or 818 680
% 0.54/0.72 820. ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c0_1 (a730)) (c3_1 (a730)) (-. (hskp21)) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (c3_1 (a744)) (-. (c0_1 (a744))) (All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) (-. (c1_1 (a744))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (ndr1_0) ### DisjTree 120 17 618
% 0.54/0.72 821. ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) (ndr1_0) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) (-. (c1_1 (a744))) (-. (c0_1 (a744))) (c3_1 (a744)) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (-. (hskp21)) (c3_1 (a730)) (c0_1 (a730)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ### DisjTree 820 120 675
% 0.54/0.72 822. ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c0_1 (a730)) (c3_1 (a730)) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (c3_1 (a744)) (-. (c0_1 (a744))) (-. (c1_1 (a744))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (ndr1_0) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ### Or 821 138
% 0.54/0.72 823. ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744)))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) (ndr1_0) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (c3_1 (a730)) (c0_1 (a730)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ### ConjTree 822
% 0.54/0.72 824. ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((-. (c0_1 (a748))) /\ ((-. (c1_1 (a748))) /\ (-. (c2_1 (a748))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X16, ((ndr1_0) => ((c0_1 X16) \/ ((-. (c1_1 X16)) \/ (-. (c2_1 X16)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp16))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (c3_1 (a730)) (c0_1 (a730)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((hskp23) \/ ((hskp24) \/ (hskp13))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) (-. (c1_1 (a730))) (-. (hskp1)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) (ndr1_0) (-. (c0_1 (a732))) (-. (c2_1 (a732))) (-. (c3_1 (a732))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (c1_1 (a734)) (-. (c3_1 (a734))) (-. (c0_1 (a734))) ((All X22, ((ndr1_0) => ((c0_1 X22) \/ ((c2_1 X22) \/ (c3_1 X22))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp8))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ### Or 819 823
% 0.54/0.72 825. ((ndr1_0) /\ ((c2_1 (a735)) /\ ((c3_1 (a735)) /\ (-. (c0_1 (a735)))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X22, ((ndr1_0) => ((c0_1 X22) \/ ((c2_1 X22) \/ (c3_1 X22))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp8))) (-. (c0_1 (a734))) (-. (c3_1 (a734))) (c1_1 (a734)) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) (-. (c3_1 (a732))) (-. (c2_1 (a732))) (-. (c0_1 (a732))) (ndr1_0) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (-. (hskp1)) (-. (c1_1 (a730))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) ((hskp23) \/ ((hskp24) \/ (hskp13))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c0_1 (a730)) (c3_1 (a730)) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((All X16, ((ndr1_0) => ((c0_1 X16) \/ ((-. (c1_1 X16)) \/ (-. (c2_1 X16)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp16))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((-. (c0_1 (a748))) /\ ((-. (c1_1 (a748))) /\ (-. (c2_1 (a748))))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ### ConjTree 824
% 0.54/0.72 826. ((-. (hskp5)) \/ ((ndr1_0) /\ ((c2_1 (a735)) /\ ((c3_1 (a735)) /\ (-. (c0_1 (a735))))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((-. (c0_1 (a748))) /\ ((-. (c1_1 (a748))) /\ (-. (c2_1 (a748))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((All X16, ((ndr1_0) => ((c0_1 X16) \/ ((-. (c1_1 X16)) \/ (-. (c2_1 X16)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp16))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((hskp23) \/ ((hskp24) \/ (hskp13))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) (-. (hskp1)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) ((All X22, ((ndr1_0) => ((c0_1 X22) \/ ((c2_1 X22) \/ (c3_1 X22))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp8))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) (c3_1 (a730)) (c0_1 (a730)) (-. (c1_1 (a730))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ ((All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))) \/ (hskp15))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (c1_1 (a734)) (-. (c3_1 (a734))) (-. (c0_1 (a734))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (hskp13))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c0_1 (a763)) /\ ((c1_1 (a763)) /\ (-. (c2_1 (a763))))))) (ndr1_0) (-. (c0_1 (a732))) (-. (c2_1 (a732))) (-. (c3_1 (a732))) ((All X22, ((ndr1_0) => ((c0_1 X22) \/ ((c2_1 X22) \/ (c3_1 X22))))) \/ ((hskp5) \/ (hskp9))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738))))))) ### Or 815 825
% 0.54/0.72 827. ((ndr1_0) /\ ((c1_1 (a734)) /\ ((-. (c0_1 (a734))) /\ (-. (c3_1 (a734)))))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738))))))) ((All X22, ((ndr1_0) => ((c0_1 X22) \/ ((c2_1 X22) \/ (c3_1 X22))))) \/ ((hskp5) \/ (hskp9))) (-. (c3_1 (a732))) (-. (c2_1 (a732))) (-. (c0_1 (a732))) (ndr1_0) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c0_1 (a763)) /\ ((c1_1 (a763)) /\ (-. (c2_1 (a763))))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (hskp13))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ ((All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))) \/ (hskp15))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) (-. (c1_1 (a730))) (c0_1 (a730)) (c3_1 (a730)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X22, ((ndr1_0) => ((c0_1 X22) \/ ((c2_1 X22) \/ (c3_1 X22))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp8))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (-. (hskp1)) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) ((hskp23) \/ ((hskp24) \/ (hskp13))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((All X16, ((ndr1_0) => ((c0_1 X16) \/ ((-. (c1_1 X16)) \/ (-. (c2_1 X16)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp16))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((-. (c0_1 (a748))) /\ ((-. (c1_1 (a748))) /\ (-. (c2_1 (a748))))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ((-. (hskp5)) \/ ((ndr1_0) /\ ((c2_1 (a735)) /\ ((c3_1 (a735)) /\ (-. (c0_1 (a735))))))) ### ConjTree 826
% 0.54/0.72 828. ((-. (hskp4)) \/ ((ndr1_0) /\ ((c1_1 (a734)) /\ ((-. (c0_1 (a734))) /\ (-. (c3_1 (a734))))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ((All X22, ((ndr1_0) => ((c0_1 X22) \/ ((c2_1 X22) \/ (c3_1 X22))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp8))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ ((All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))) \/ (hskp15))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (hskp13))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c0_1 (a763)) /\ ((c1_1 (a763)) /\ (-. (c2_1 (a763))))))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((-. (c0_1 (a748))) /\ ((-. (c1_1 (a748))) /\ (-. (c2_1 (a748))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((hskp7) \/ ((hskp1) \/ (hskp4))) (-. (hskp1)) ((All X22, ((ndr1_0) => ((c0_1 X22) \/ ((c2_1 X22) \/ (c3_1 X22))))) \/ ((hskp5) \/ (hskp9))) (-. (c3_1 (a732))) (-. (c2_1 (a732))) (-. (c0_1 (a732))) (ndr1_0) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) (-. (c1_1 (a730))) (c0_1 (a730)) (c3_1 (a730)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) ((hskp23) \/ ((hskp24) \/ (hskp13))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((All X16, ((ndr1_0) => ((c0_1 X16) \/ ((-. (c1_1 X16)) \/ (-. (c2_1 X16)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp16))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ((-. (hskp5)) \/ ((ndr1_0) /\ ((c2_1 (a735)) /\ ((c3_1 (a735)) /\ (-. (c0_1 (a735))))))) ### Or 813 827
% 0.54/0.72 829. ((ndr1_0) /\ ((-. (c0_1 (a732))) /\ ((-. (c2_1 (a732))) /\ (-. (c3_1 (a732)))))) ((-. (hskp5)) \/ ((ndr1_0) /\ ((c2_1 (a735)) /\ ((c3_1 (a735)) /\ (-. (c0_1 (a735))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((All X16, ((ndr1_0) => ((c0_1 X16) \/ ((-. (c1_1 X16)) \/ (-. (c2_1 X16)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp16))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((hskp23) \/ ((hskp24) \/ (hskp13))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) (c3_1 (a730)) (c0_1 (a730)) (-. (c1_1 (a730))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) (ndr1_0) ((All X22, ((ndr1_0) => ((c0_1 X22) \/ ((c2_1 X22) \/ (c3_1 X22))))) \/ ((hskp5) \/ (hskp9))) (-. (hskp1)) ((hskp7) \/ ((hskp1) \/ (hskp4))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((-. (c0_1 (a748))) /\ ((-. (c1_1 (a748))) /\ (-. (c2_1 (a748))))))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738))))))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c0_1 (a763)) /\ ((c1_1 (a763)) /\ (-. (c2_1 (a763))))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (hskp13))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ ((All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))) \/ (hskp15))) ((All X22, ((ndr1_0) => ((c0_1 X22) \/ ((c2_1 X22) \/ (c3_1 X22))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp8))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ((-. (hskp4)) \/ ((ndr1_0) /\ ((c1_1 (a734)) /\ ((-. (c0_1 (a734))) /\ (-. (c3_1 (a734))))))) ### ConjTree 828
% 0.54/0.72 830. ((-. (hskp2)) \/ ((ndr1_0) /\ ((-. (c0_1 (a732))) /\ ((-. (c2_1 (a732))) /\ (-. (c3_1 (a732))))))) ((All X22, ((ndr1_0) => ((c0_1 X22) \/ ((c2_1 X22) \/ (c3_1 X22))))) \/ ((hskp5) \/ (hskp9))) ((-. (hskp4)) \/ ((ndr1_0) /\ ((c1_1 (a734)) /\ ((-. (c0_1 (a734))) /\ (-. (c3_1 (a734))))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (hskp13))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ ((All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))) \/ (hskp15))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c0_1 (a763)) /\ ((c1_1 (a763)) /\ (-. (c2_1 (a763))))))) ((All X22, ((ndr1_0) => ((c0_1 X22) \/ ((c2_1 X22) \/ (c3_1 X22))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp8))) ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp7))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((-. (c0_1 (a748))) /\ ((-. (c1_1 (a748))) /\ (-. (c2_1 (a748))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((hskp7) \/ ((hskp1) \/ (hskp4))) (-. (hskp1)) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) \/ (hskp2))) (c0_1 (a730)) (-. (c1_1 (a730))) (c3_1 (a730)) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) ((hskp23) \/ ((hskp24) \/ (hskp13))) (ndr1_0) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp16) \/ (hskp3))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((All X16, ((ndr1_0) => ((c0_1 X16) \/ ((-. (c1_1 X16)) \/ (-. (c2_1 X16)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp16))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((-. (hskp5)) \/ ((ndr1_0) /\ ((c2_1 (a735)) /\ ((c3_1 (a735)) /\ (-. (c0_1 (a735))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((hskp1) \/ (hskp2))) ((-. (hskp3)) \/ ((ndr1_0) /\ ((c2_1 (a733)) /\ ((-. (c0_1 (a733))) /\ (-. (c1_1 (a733))))))) ### Or 758 829
% 0.54/0.72 831. (-. (c1_1 (a730))) (c1_1 (a730)) ### Axiom
% 0.54/0.72 832. (-. (c1_1 (a730))) (c1_1 (a730)) ### Axiom
% 0.54/0.72 833. (c2_1 (a730)) (-. (c2_1 (a730))) ### Axiom
% 0.54/0.72 834. (c3_1 (a730)) (-. (c3_1 (a730))) ### Axiom
% 0.54/0.72 835. ((ndr1_0) => ((c1_1 (a730)) \/ ((-. (c2_1 (a730))) \/ (-. (c3_1 (a730)))))) (c3_1 (a730)) (c2_1 (a730)) (-. (c1_1 (a730))) (ndr1_0) ### DisjTree 8 832 833 834
% 0.54/0.72 836. (All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) (ndr1_0) (-. (c1_1 (a730))) (c2_1 (a730)) (c3_1 (a730)) ### All 835
% 0.54/0.72 837. (c3_1 (a730)) (-. (c3_1 (a730))) ### Axiom
% 0.54/0.72 838. ((ndr1_0) => ((c1_1 (a730)) \/ ((c2_1 (a730)) \/ (-. (c3_1 (a730)))))) (c3_1 (a730)) (All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) (-. (c1_1 (a730))) (ndr1_0) ### DisjTree 8 831 836 837
% 0.54/0.72 839. (All X64, ((ndr1_0) => ((c1_1 X64) \/ ((c2_1 X64) \/ (-. (c3_1 X64)))))) (ndr1_0) (-. (c1_1 (a730))) (All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) (c3_1 (a730)) ### All 838
% 0.54/0.72 840. ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (-. (hskp20)) (-. (hskp5)) (c3_1 (a730)) (-. (c1_1 (a730))) (ndr1_0) (All X64, ((ndr1_0) => ((c1_1 X64) \/ ((c2_1 X64) \/ (-. (c3_1 X64)))))) ### DisjTree 839 18 19
% 0.54/0.72 841. ((All X64, ((ndr1_0) => ((c1_1 X64) \/ ((c2_1 X64) \/ (-. (c3_1 X64)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) (-. (hskp11)) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) (ndr1_0) (-. (c1_1 (a730))) (c3_1 (a730)) (-. (hskp5)) (-. (hskp20)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ### DisjTree 840 346 60
% 0.54/0.72 842. ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) (c0_1 (a730)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (-. (hskp5)) (c3_1 (a730)) (-. (c1_1 (a730))) (ndr1_0) (-. (c2_1 (a731))) (c1_1 (a731)) (c3_1 (a731)) (-. (hskp11)) ((All X64, ((ndr1_0) => ((c1_1 X64) \/ ((c2_1 X64) \/ (-. (c3_1 X64)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ### Or 841 561
% 0.54/0.72 843. ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) (-. (hskp4)) ((All X64, ((ndr1_0) => ((c1_1 X64) \/ ((c2_1 X64) \/ (-. (c3_1 X64)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) (ndr1_0) (-. (c1_1 (a730))) (c3_1 (a730)) (-. (hskp5)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (c0_1 (a730)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ### Or 842 70
% 0.54/0.72 844. ((All X64, ((ndr1_0) => ((c1_1 X64) \/ ((c2_1 X64) \/ (-. (c3_1 X64)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) (-. (hskp11)) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) (c3_1 (a730)) (All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) (-. (c1_1 (a730))) (ndr1_0) ### DisjTree 839 346 60
% 0.54/0.72 845. ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c0_1 (a730)) (-. (hskp21)) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (-. (c1_1 (a730))) (c3_1 (a730)) (-. (c2_1 (a731))) (c1_1 (a731)) (c3_1 (a731)) (-. (hskp11)) ((All X64, ((ndr1_0) => ((c1_1 X64) \/ ((c2_1 X64) \/ (-. (c3_1 X64)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (ndr1_0) ### DisjTree 120 844 618
% 0.54/0.72 846. ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c3_1 (a793)) (c0_1 (a793)) (-. (c2_1 (a793))) (-. (c1_1 (a730))) (c3_1 (a730)) (-. (c2_1 (a731))) (c1_1 (a731)) (c3_1 (a731)) (-. (hskp11)) ((All X64, ((ndr1_0) => ((c1_1 X64) \/ ((c2_1 X64) \/ (-. (c3_1 X64)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (ndr1_0) ### DisjTree 120 844 125
% 0.54/0.72 847. ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793)))))) (ndr1_0) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) ((All X64, ((ndr1_0) => ((c1_1 X64) \/ ((c2_1 X64) \/ (-. (c3_1 X64)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) (-. (hskp11)) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) (c3_1 (a730)) (-. (c1_1 (a730))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ### ConjTree 846
% 0.54/0.72 848. ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) (ndr1_0) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) ((All X64, ((ndr1_0) => ((c1_1 X64) \/ ((c2_1 X64) \/ (-. (c3_1 X64)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) (-. (hskp11)) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) (c3_1 (a730)) (-. (c1_1 (a730))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (c0_1 (a730)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ### Or 845 847
% 0.54/0.72 849. ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (-. (hskp21)) (c3_1 (a730)) (c0_1 (a730)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (-. (c2_1 (a731))) (c3_1 (a731)) (c1_1 (a731)) (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))) (ndr1_0) ### DisjTree 399 120 675
% 0.54/0.72 850. ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c0_1 (a730)) (c3_1 (a730)) (-. (hskp21)) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) (-. (c2_1 (a731))) (c1_1 (a731)) (c3_1 (a731)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) (-. (c3_1 (a749))) (-. (c1_1 (a749))) (-. (c0_1 (a749))) (ndr1_0) ### DisjTree 68 443 849
% 0.54/0.72 851. ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) (-. (c2_1 (a793))) (c0_1 (a793)) (c3_1 (a793)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) (All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) (ndr1_0) ### DisjTree 389 120 136
% 0.54/0.72 852. ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) (-. (c2_1 (a793))) (c0_1 (a793)) (c3_1 (a793)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (-. (c2_1 (a731))) (c3_1 (a731)) (c1_1 (a731)) (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))) (ndr1_0) ### DisjTree 399 120 136
% 0.54/0.72 853. ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) (-. (c2_1 (a731))) (c1_1 (a731)) (c3_1 (a731)) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c3_1 (a793)) (c0_1 (a793)) (-. (c2_1 (a793))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) (-. (c3_1 (a749))) (-. (c1_1 (a749))) (-. (c0_1 (a749))) (ndr1_0) ### DisjTree 68 851 852
% 0.54/0.72 854. ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793)))))) (ndr1_0) (-. (c0_1 (a749))) (-. (c1_1 (a749))) (-. (c3_1 (a749))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) ### ConjTree 853
% 0.54/0.72 855. ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) (ndr1_0) (-. (c0_1 (a749))) (-. (c1_1 (a749))) (-. (c3_1 (a749))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (c3_1 (a730)) (c0_1 (a730)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) ### Or 850 854
% 0.54/0.72 856. ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749)))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c0_1 (a730)) (c3_1 (a730)) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) (-. (c2_1 (a731))) (c1_1 (a731)) (c3_1 (a731)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) (ndr1_0) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ### ConjTree 855
% 0.54/0.72 857. ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c0_1 (a730)) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (-. (c1_1 (a730))) (c3_1 (a730)) (-. (c2_1 (a731))) (c1_1 (a731)) (c3_1 (a731)) ((All X64, ((ndr1_0) => ((c1_1 X64) \/ ((c2_1 X64) \/ (-. (c3_1 X64)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (ndr1_0) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ### Or 848 856
% 0.54/0.72 858. ((ndr1_0) /\ ((c2_1 (a735)) /\ ((c3_1 (a735)) /\ (-. (c0_1 (a735)))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) (ndr1_0) ((All X64, ((ndr1_0) => ((c1_1 X64) \/ ((c2_1 X64) \/ (-. (c3_1 X64)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) (c3_1 (a730)) (-. (c1_1 (a730))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (c0_1 (a730)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ### ConjTree 857
% 0.54/0.72 859. ((-. (hskp5)) \/ ((ndr1_0) /\ ((c2_1 (a735)) /\ ((c3_1 (a735)) /\ (-. (c0_1 (a735))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) (c0_1 (a730)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (c3_1 (a730)) (-. (c1_1 (a730))) (ndr1_0) (-. (c2_1 (a731))) (c1_1 (a731)) (c3_1 (a731)) ((All X64, ((ndr1_0) => ((c1_1 X64) \/ ((c2_1 X64) \/ (-. (c3_1 X64)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) (-. (hskp4)) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ### Or 843 858
% 0.54/0.72 860. ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (hskp13))) (-. (hskp13)) (-. (c2_1 (a731))) (c1_1 (a731)) (c3_1 (a731)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) (c1_1 (a734)) (-. (c3_1 (a734))) (-. (c0_1 (a734))) (ndr1_0) ### DisjTree 213 443 86
% 0.54/0.72 861. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) (c3_1 (a730)) (c0_1 (a730)) (-. (c1_1 (a730))) (-. (hskp5)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (ndr1_0) (-. (c0_1 (a734))) (-. (c3_1 (a734))) (c1_1 (a734)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (hskp13))) ### Or 860 563
% 0.54/0.72 862. ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (hskp13))) (-. (hskp13)) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) (All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) (c1_1 (a734)) (-. (c3_1 (a734))) (-. (c0_1 (a734))) (ndr1_0) ### DisjTree 213 389 86
% 0.54/0.72 863. ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (-. (hskp21)) (c3_1 (a730)) (c0_1 (a730)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (ndr1_0) (-. (c0_1 (a734))) (-. (c3_1 (a734))) (c1_1 (a734)) (-. (c2_1 (a731))) (c1_1 (a731)) (c3_1 (a731)) (-. (hskp13)) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (hskp13))) ### DisjTree 862 120 675
% 0.54/0.72 864. ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) (-. (c2_1 (a793))) (c0_1 (a793)) (c3_1 (a793)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (ndr1_0) (-. (c0_1 (a734))) (-. (c3_1 (a734))) (c1_1 (a734)) (-. (c2_1 (a731))) (c1_1 (a731)) (c3_1 (a731)) (-. (hskp13)) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (hskp13))) ### DisjTree 862 120 136
% 0.54/0.72 865. ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793)))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (hskp13))) (-. (hskp13)) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) (c1_1 (a734)) (-. (c3_1 (a734))) (-. (c0_1 (a734))) (ndr1_0) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ### ConjTree 864
% 0.54/0.72 866. ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (hskp13))) (-. (hskp13)) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) (c1_1 (a734)) (-. (c3_1 (a734))) (-. (c0_1 (a734))) (ndr1_0) (-. (c0_1 (a735))) (c2_1 (a735)) (c3_1 (a735)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c0_1 (a730)) (c3_1 (a730)) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ### Or 863 865
% 0.54/0.72 867. ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) (c3_1 (a730)) (c0_1 (a730)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c3_1 (a735)) (c2_1 (a735)) (-. (c0_1 (a735))) (ndr1_0) (-. (c0_1 (a734))) (-. (c3_1 (a734))) (c1_1 (a734)) (-. (c2_1 (a731))) (c1_1 (a731)) (c3_1 (a731)) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (hskp13))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ### Or 866 673
% 0.54/0.72 868. ((ndr1_0) /\ ((c2_1 (a735)) /\ ((c3_1 (a735)) /\ (-. (c0_1 (a735)))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (hskp13))) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) (c1_1 (a734)) (-. (c3_1 (a734))) (-. (c0_1 (a734))) (ndr1_0) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) (c0_1 (a730)) (c3_1 (a730)) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ### ConjTree 867
% 0.54/0.72 869. ((-. (hskp5)) \/ ((ndr1_0) /\ ((c2_1 (a735)) /\ ((c3_1 (a735)) /\ (-. (c0_1 (a735))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (hskp13))) (-. (c2_1 (a731))) (c1_1 (a731)) (c3_1 (a731)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) (c1_1 (a734)) (-. (c3_1 (a734))) (-. (c0_1 (a734))) (ndr1_0) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (-. (c1_1 (a730))) (c0_1 (a730)) (c3_1 (a730)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ### Or 861 868
% 0.54/0.72 870. ((ndr1_0) /\ ((c1_1 (a734)) /\ ((-. (c0_1 (a734))) /\ (-. (c3_1 (a734)))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) (c3_1 (a730)) (c0_1 (a730)) (-. (c1_1 (a730))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (ndr1_0) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (hskp13))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((-. (hskp5)) \/ ((ndr1_0) /\ ((c2_1 (a735)) /\ ((c3_1 (a735)) /\ (-. (c0_1 (a735))))))) ### ConjTree 869
% 0.54/0.72 871. ((-. (hskp4)) \/ ((ndr1_0) /\ ((c1_1 (a734)) /\ ((-. (c0_1 (a734))) /\ (-. (c3_1 (a734))))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (hskp13))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) ((All X64, ((ndr1_0) => ((c1_1 X64) \/ ((c2_1 X64) \/ (-. (c3_1 X64)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) (c3_1 (a731)) (c1_1 (a731)) (-. (c2_1 (a731))) (ndr1_0) (-. (c1_1 (a730))) (c3_1 (a730)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (c0_1 (a730)) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((-. (hskp5)) \/ ((ndr1_0) /\ ((c2_1 (a735)) /\ ((c3_1 (a735)) /\ (-. (c0_1 (a735))))))) ### Or 859 870
% 0.54/0.72 872. ((ndr1_0) /\ ((c1_1 (a731)) /\ ((c3_1 (a731)) /\ (-. (c2_1 (a731)))))) ((-. (hskp5)) \/ ((ndr1_0) /\ ((c2_1 (a735)) /\ ((c3_1 (a735)) /\ (-. (c0_1 (a735))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) (c0_1 (a730)) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) (c3_1 (a730)) (-. (c1_1 (a730))) (ndr1_0) ((All X64, ((ndr1_0) => ((c1_1 X64) \/ ((c2_1 X64) \/ (-. (c3_1 X64)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (hskp13))) ((-. (hskp4)) \/ ((ndr1_0) /\ ((c1_1 (a734)) /\ ((-. (c0_1 (a734))) /\ (-. (c3_1 (a734))))))) ### ConjTree 871
% 0.54/0.72 873. ((-. (hskp1)) \/ ((ndr1_0) /\ ((c1_1 (a731)) /\ ((c3_1 (a731)) /\ (-. (c2_1 (a731))))))) ((All X64, ((ndr1_0) => ((c1_1 X64) \/ ((c2_1 X64) \/ (-. (c3_1 X64)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) ((-. (hskp3)) \/ ((ndr1_0) /\ ((c2_1 (a733)) /\ ((-. (c0_1 (a733))) /\ (-. (c1_1 (a733))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((hskp1) \/ (hskp2))) ((-. (hskp5)) \/ ((ndr1_0) /\ ((c2_1 (a735)) /\ ((c3_1 (a735)) /\ (-. (c0_1 (a735))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((All X16, ((ndr1_0) => ((c0_1 X16) \/ ((-. (c1_1 X16)) \/ (-. (c2_1 X16)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp16))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741))))))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp16) \/ (hskp3))) (ndr1_0) ((hskp23) \/ ((hskp24) \/ (hskp13))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) (c3_1 (a730)) (-. (c1_1 (a730))) (c0_1 (a730)) ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) \/ (hskp2))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ((hskp7) \/ ((hskp1) \/ (hskp4))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((-. (c0_1 (a748))) /\ ((-. (c1_1 (a748))) /\ (-. (c2_1 (a748))))))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738))))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp7))) ((All X22, ((ndr1_0) => ((c0_1 X22) \/ ((c2_1 X22) \/ (c3_1 X22))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp8))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c0_1 (a763)) /\ ((c1_1 (a763)) /\ (-. (c2_1 (a763))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ ((All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))) \/ (hskp15))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (hskp13))) ((-. (hskp4)) \/ ((ndr1_0) /\ ((c1_1 (a734)) /\ ((-. (c0_1 (a734))) /\ (-. (c3_1 (a734))))))) ((All X22, ((ndr1_0) => ((c0_1 X22) \/ ((c2_1 X22) \/ (c3_1 X22))))) \/ ((hskp5) \/ (hskp9))) ((-. (hskp2)) \/ ((ndr1_0) /\ ((-. (c0_1 (a732))) /\ ((-. (c2_1 (a732))) /\ (-. (c3_1 (a732))))))) ### Or 830 872
% 0.54/0.72 874. ((ndr1_0) /\ ((c0_1 (a730)) /\ ((c3_1 (a730)) /\ (-. (c1_1 (a730)))))) ((-. (hskp2)) \/ ((ndr1_0) /\ ((-. (c0_1 (a732))) /\ ((-. (c2_1 (a732))) /\ (-. (c3_1 (a732))))))) ((All X22, ((ndr1_0) => ((c0_1 X22) \/ ((c2_1 X22) \/ (c3_1 X22))))) \/ ((hskp5) \/ (hskp9))) ((-. (hskp4)) \/ ((ndr1_0) /\ ((c1_1 (a734)) /\ ((-. (c0_1 (a734))) /\ (-. (c3_1 (a734))))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (hskp13))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ ((All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))) \/ (hskp15))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c0_1 (a763)) /\ ((c1_1 (a763)) /\ (-. (c2_1 (a763))))))) ((All X22, ((ndr1_0) => ((c0_1 X22) \/ ((c2_1 X22) \/ (c3_1 X22))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp8))) ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp7))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738))))))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((-. (c0_1 (a748))) /\ ((-. (c1_1 (a748))) /\ (-. (c2_1 (a748))))))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((hskp7) \/ ((hskp1) \/ (hskp4))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) \/ (hskp2))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) ((hskp23) \/ ((hskp24) \/ (hskp13))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp16) \/ (hskp3))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((All X16, ((ndr1_0) => ((c0_1 X16) \/ ((-. (c1_1 X16)) \/ (-. (c2_1 X16)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp16))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((-. (hskp5)) \/ ((ndr1_0) /\ ((c2_1 (a735)) /\ ((c3_1 (a735)) /\ (-. (c0_1 (a735))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((hskp1) \/ (hskp2))) ((-. (hskp3)) \/ ((ndr1_0) /\ ((c2_1 (a733)) /\ ((-. (c0_1 (a733))) /\ (-. (c1_1 (a733))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) ((All X64, ((ndr1_0) => ((c1_1 X64) \/ ((c2_1 X64) \/ (-. (c3_1 X64)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((-. (hskp1)) \/ ((ndr1_0) /\ ((c1_1 (a731)) /\ ((c3_1 (a731)) /\ (-. (c2_1 (a731))))))) ### ConjTree 873
% 0.54/0.72 875. ((-. (hskp0)) \/ ((ndr1_0) /\ ((c0_1 (a730)) /\ ((c3_1 (a730)) /\ (-. (c1_1 (a730))))))) ((All X16, ((ndr1_0) => ((c0_1 X16) \/ ((-. (c1_1 X16)) \/ (-. (c2_1 X16)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp16))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) ((All X22, ((ndr1_0) => ((c0_1 X22) \/ ((c2_1 X22) \/ (c3_1 X22))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp8))) ((-. (hskp15)) \/ ((ndr1_0) /\ ((c0_1 (a763)) /\ ((c1_1 (a763)) /\ (-. (c2_1 (a763))))))) ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ ((All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))) \/ (hskp15))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (hskp13))) ((-. (hskp2)) \/ ((ndr1_0) /\ ((-. (c0_1 (a732))) /\ ((-. (c2_1 (a732))) /\ (-. (c3_1 (a732))))))) ((All X61, ((ndr1_0) => ((c1_1 X61) \/ ((c2_1 X61) \/ (c3_1 X61))))) \/ ((hskp27) \/ (hskp0))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((-. (hskp27)) \/ ((ndr1_0) /\ ((c0_1 (a750)) /\ ((c1_1 (a750)) /\ (c2_1 (a750)))))) ((All X22, ((ndr1_0) => ((c0_1 X22) \/ ((c2_1 X22) \/ (c3_1 X22))))) \/ ((hskp5) \/ (hskp9))) ((-. (hskp5)) \/ ((ndr1_0) /\ ((c2_1 (a735)) /\ ((c3_1 (a735)) /\ (-. (c0_1 (a735))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ (hskp2))) ((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) ((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) ((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) ((hskp23) \/ ((hskp24) \/ (hskp13))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) ((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) ((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) ((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) ((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) ((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) ((-. (hskp7)) \/ ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741))))))) ((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) ((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((hskp1) \/ (hskp2))) ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All X21, ((ndr1_0) => ((c1_1 X21) \/ ((-. (c0_1 X21)) \/ (-. (c2_1 X21)))))) \/ (hskp4))) ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp6) \/ (hskp4))) ((hskp0) \/ (hskp8)) ((hskp7) \/ ((hskp1) \/ (hskp4))) ((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) ((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((hskp0) \/ (hskp1))) ((-. (hskp10)) \/ ((ndr1_0) /\ ((-. (c0_1 (a748))) /\ ((-. (c1_1 (a748))) /\ (-. (c2_1 (a748))))))) ((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738))))))) ((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp7))) ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) \/ (hskp2))) ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) ((-. (hskp4)) \/ ((ndr1_0) /\ ((c1_1 (a734)) /\ ((-. (c0_1 (a734))) /\ (-. (c3_1 (a734))))))) ((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp18))) ((-. (hskp19)) \/ ((ndr1_0) /\ ((c2_1 (a777)) /\ ((-. (c0_1 (a777))) /\ (-. (c3_1 (a777))))))) ((hskp16) \/ ((hskp18) \/ (hskp19))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) ((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) ((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a797)) /\ ((-. (c1_1 (a797))) /\ (-. (c2_1 (a797))))))) ((All X64, ((ndr1_0) => ((c1_1 X64) \/ ((c2_1 X64) \/ (-. (c3_1 X64)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) ((All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))) \/ ((hskp16) \/ (hskp22))) ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp16) \/ (hskp3))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ (hskp0))) ((-. (hskp26)) \/ ((ndr1_0) /\ ((c1_1 (a737)) /\ ((c2_1 (a737)) /\ (c3_1 (a737)))))) ((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((hskp26) \/ (hskp6))) ((-. (hskp3)) \/ ((ndr1_0) /\ ((c2_1 (a733)) /\ ((-. (c0_1 (a733))) /\ (-. (c1_1 (a733))))))) ((-. (hskp1)) \/ ((ndr1_0) /\ ((c1_1 (a731)) /\ ((c3_1 (a731)) /\ (-. (c2_1 (a731))))))) ### Or 531 874
% 0.54/0.72 876. (((-. (hskp0)) \/ ((ndr1_0) /\ ((c0_1 (a730)) /\ ((c3_1 (a730)) /\ (-. (c1_1 (a730))))))) /\ (((-. (hskp1)) \/ ((ndr1_0) /\ ((c1_1 (a731)) /\ ((c3_1 (a731)) /\ (-. (c2_1 (a731))))))) /\ (((-. (hskp2)) \/ ((ndr1_0) /\ ((-. (c0_1 (a732))) /\ ((-. (c2_1 (a732))) /\ (-. (c3_1 (a732))))))) /\ (((-. (hskp3)) \/ ((ndr1_0) /\ ((c2_1 (a733)) /\ ((-. (c0_1 (a733))) /\ (-. (c1_1 (a733))))))) /\ (((-. (hskp4)) \/ ((ndr1_0) /\ ((c1_1 (a734)) /\ ((-. (c0_1 (a734))) /\ (-. (c3_1 (a734))))))) /\ (((-. (hskp5)) \/ ((ndr1_0) /\ ((c2_1 (a735)) /\ ((c3_1 (a735)) /\ (-. (c0_1 (a735))))))) /\ (((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738))))))) /\ (((-. (hskp7)) \/ ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741))))))) /\ (((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) /\ (((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) /\ (((-. (hskp10)) \/ ((ndr1_0) /\ ((-. (c0_1 (a748))) /\ ((-. (c1_1 (a748))) /\ (-. (c2_1 (a748))))))) /\ (((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) /\ (((-. (hskp12)) \/ ((ndr1_0) /\ ((c1_1 (a755)) /\ ((c2_1 (a755)) /\ (-. (c3_1 (a755))))))) /\ (((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) /\ (((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a762)) /\ ((-. (c1_1 (a762))) /\ (-. (c2_1 (a762))))))) /\ (((-. (hskp15)) \/ ((ndr1_0) /\ ((c0_1 (a763)) /\ ((c1_1 (a763)) /\ (-. (c2_1 (a763))))))) /\ (((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) /\ (((-. (hskp17)) \/ ((ndr1_0) /\ ((c1_1 (a766)) /\ ((c2_1 (a766)) /\ (-. (c0_1 (a766))))))) /\ (((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) /\ (((-. (hskp19)) \/ ((ndr1_0) /\ ((c2_1 (a777)) /\ ((-. (c0_1 (a777))) /\ (-. (c3_1 (a777))))))) /\ (((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) /\ (((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) /\ (((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a797)) /\ ((-. (c1_1 (a797))) /\ (-. (c2_1 (a797))))))) /\ (((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) /\ (((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) /\ (((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) /\ (((-. (hskp26)) \/ ((ndr1_0) /\ ((c1_1 (a737)) /\ ((c2_1 (a737)) /\ (c3_1 (a737)))))) /\ (((-. (hskp27)) \/ ((ndr1_0) /\ ((c0_1 (a750)) /\ ((c1_1 (a750)) /\ (c2_1 (a750)))))) /\ (((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a784)) /\ ((c1_1 (a784)) /\ (c3_1 (a784)))))) /\ (((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) /\ (((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) /\ (((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((hskp0) \/ (hskp1))) /\ (((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ (hskp2))) /\ (((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X4, ((ndr1_0) => ((c2_1 X4) \/ ((c3_1 X4) \/ (-. (c1_1 X4)))))) \/ (hskp3))) /\ (((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) /\ (((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) /\ (((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ (hskp0))) /\ (((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((hskp26) \/ (hskp6))) /\ (((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((hskp1) \/ (hskp2))) /\ (((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp7))) /\ (((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All X16, ((ndr1_0) => ((c0_1 X16) \/ ((-. (c1_1 X16)) \/ (-. (c2_1 X16)))))) \/ (hskp5))) /\ (((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All X18, ((ndr1_0) => ((c1_1 X18) \/ ((c3_1 X18) \/ (-. (c0_1 X18)))))) \/ (All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))))) /\ (((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All X21, ((ndr1_0) => ((c1_1 X21) \/ ((-. (c0_1 X21)) \/ (-. (c2_1 X21)))))) \/ (hskp4))) /\ (((All X22, ((ndr1_0) => ((c0_1 X22) \/ ((c2_1 X22) \/ (c3_1 X22))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp8))) /\ (((All X22, ((ndr1_0) => ((c0_1 X22) \/ ((c2_1 X22) \/ (c3_1 X22))))) \/ ((hskp5) \/ (hskp9))) /\ (((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) /\ (((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) /\ (((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) /\ (((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))) \/ (hskp27))) /\ (((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) /\ (((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) /\ (((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ (All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))))) /\ (((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp27) \/ (hskp11))) /\ (((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) /\ (((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp12) \/ (hskp7))) /\ (((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp6) \/ (hskp4))) /\ (((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (hskp13))) /\ (((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) /\ (((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ ((All X4, ((ndr1_0) => ((c2_1 X4) \/ ((c3_1 X4) \/ (-. (c1_1 X4)))))) \/ (hskp14))) /\ (((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ ((All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))) \/ (hskp15))) /\ (((All X16, ((ndr1_0) => ((c0_1 X16) \/ ((-. (c1_1 X16)) \/ (-. (c2_1 X16)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp16))) /\ (((All X16, ((ndr1_0) => ((c0_1 X16) \/ ((-. (c1_1 X16)) \/ (-. (c2_1 X16)))))) \/ ((hskp27) \/ (hskp17))) /\ (((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) \/ (hskp2))) /\ (((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) /\ (((All X61, ((ndr1_0) => ((c1_1 X61) \/ ((c2_1 X61) \/ (c3_1 X61))))) \/ ((hskp27) \/ (hskp0))) /\ (((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp26))) /\ (((All X64, ((ndr1_0) => ((c1_1 X64) \/ ((c2_1 X64) \/ (-. (c3_1 X64)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) /\ (((All X18, ((ndr1_0) => ((c1_1 X18) \/ ((c3_1 X18) \/ (-. (c0_1 X18)))))) \/ ((hskp27) \/ (hskp5))) /\ (((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) /\ (((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) /\ (((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp18))) /\ (((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ ((hskp27) \/ (hskp19))) /\ (((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) /\ (((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) /\ (((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp16) \/ (hskp3))) /\ (((All X4, ((ndr1_0) => ((c2_1 X4) \/ ((c3_1 X4) \/ (-. (c1_1 X4)))))) \/ ((hskp28) \/ (hskp16))) /\ (((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) /\ (((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) /\ (((All X82, ((ndr1_0) => ((c3_1 X82) \/ ((-. (c1_1 X82)) \/ (-. (c2_1 X82)))))) \/ ((hskp27) \/ (hskp11))) /\ (((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ ((hskp28) \/ (hskp11))) /\ (((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) /\ (((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ ((hskp21) \/ (hskp2))) /\ (((All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))) \/ ((hskp16) \/ (hskp22))) /\ (((hskp23) \/ ((hskp21) \/ (hskp17))) /\ (((hskp23) \/ ((hskp24) \/ (hskp13))) /\ (((hskp16) \/ ((hskp18) \/ (hskp19))) /\ (((hskp0) \/ ((hskp5) \/ (hskp19))) /\ (((hskp0) \/ (hskp8)) /\ ((hskp7) \/ ((hskp1) \/ (hskp4))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))) ### ConjTree 875
% 0.54/0.73 877. (-. (-. (((-. (hskp0)) \/ ((ndr1_0) /\ ((c0_1 (a730)) /\ ((c3_1 (a730)) /\ (-. (c1_1 (a730))))))) /\ (((-. (hskp1)) \/ ((ndr1_0) /\ ((c1_1 (a731)) /\ ((c3_1 (a731)) /\ (-. (c2_1 (a731))))))) /\ (((-. (hskp2)) \/ ((ndr1_0) /\ ((-. (c0_1 (a732))) /\ ((-. (c2_1 (a732))) /\ (-. (c3_1 (a732))))))) /\ (((-. (hskp3)) \/ ((ndr1_0) /\ ((c2_1 (a733)) /\ ((-. (c0_1 (a733))) /\ (-. (c1_1 (a733))))))) /\ (((-. (hskp4)) \/ ((ndr1_0) /\ ((c1_1 (a734)) /\ ((-. (c0_1 (a734))) /\ (-. (c3_1 (a734))))))) /\ (((-. (hskp5)) \/ ((ndr1_0) /\ ((c2_1 (a735)) /\ ((c3_1 (a735)) /\ (-. (c0_1 (a735))))))) /\ (((-. (hskp6)) \/ ((ndr1_0) /\ ((c1_1 (a738)) /\ ((-. (c0_1 (a738))) /\ (-. (c2_1 (a738))))))) /\ (((-. (hskp7)) \/ ((ndr1_0) /\ ((c1_1 (a741)) /\ ((c3_1 (a741)) /\ (-. (c0_1 (a741))))))) /\ (((-. (hskp8)) \/ ((ndr1_0) /\ ((c3_1 (a744)) /\ ((-. (c0_1 (a744))) /\ (-. (c1_1 (a744))))))) /\ (((-. (hskp9)) \/ ((ndr1_0) /\ ((c3_1 (a746)) /\ ((-. (c0_1 (a746))) /\ (-. (c2_1 (a746))))))) /\ (((-. (hskp10)) \/ ((ndr1_0) /\ ((-. (c0_1 (a748))) /\ ((-. (c1_1 (a748))) /\ (-. (c2_1 (a748))))))) /\ (((-. (hskp11)) \/ ((ndr1_0) /\ ((-. (c0_1 (a749))) /\ ((-. (c1_1 (a749))) /\ (-. (c3_1 (a749))))))) /\ (((-. (hskp12)) \/ ((ndr1_0) /\ ((c1_1 (a755)) /\ ((c2_1 (a755)) /\ (-. (c3_1 (a755))))))) /\ (((-. (hskp13)) \/ ((ndr1_0) /\ ((c2_1 (a759)) /\ ((c3_1 (a759)) /\ (-. (c1_1 (a759))))))) /\ (((-. (hskp14)) \/ ((ndr1_0) /\ ((c0_1 (a762)) /\ ((-. (c1_1 (a762))) /\ (-. (c2_1 (a762))))))) /\ (((-. (hskp15)) \/ ((ndr1_0) /\ ((c0_1 (a763)) /\ ((c1_1 (a763)) /\ (-. (c2_1 (a763))))))) /\ (((-. (hskp16)) \/ ((ndr1_0) /\ ((c0_1 (a764)) /\ ((c2_1 (a764)) /\ (-. (c3_1 (a764))))))) /\ (((-. (hskp17)) \/ ((ndr1_0) /\ ((c1_1 (a766)) /\ ((c2_1 (a766)) /\ (-. (c0_1 (a766))))))) /\ (((-. (hskp18)) \/ ((ndr1_0) /\ ((c1_1 (a775)) /\ ((-. (c2_1 (a775))) /\ (-. (c3_1 (a775))))))) /\ (((-. (hskp19)) \/ ((ndr1_0) /\ ((c2_1 (a777)) /\ ((-. (c0_1 (a777))) /\ (-. (c3_1 (a777))))))) /\ (((-. (hskp20)) \/ ((ndr1_0) /\ ((c2_1 (a779)) /\ ((-. (c1_1 (a779))) /\ (-. (c3_1 (a779))))))) /\ (((-. (hskp21)) \/ ((ndr1_0) /\ ((c0_1 (a793)) /\ ((c3_1 (a793)) /\ (-. (c2_1 (a793))))))) /\ (((-. (hskp22)) \/ ((ndr1_0) /\ ((c3_1 (a797)) /\ ((-. (c1_1 (a797))) /\ (-. (c2_1 (a797))))))) /\ (((-. (hskp23)) \/ ((ndr1_0) /\ ((c0_1 (a798)) /\ ((c1_1 (a798)) /\ (-. (c3_1 (a798))))))) /\ (((-. (hskp24)) \/ ((ndr1_0) /\ ((c0_1 (a802)) /\ ((-. (c2_1 (a802))) /\ (-. (c3_1 (a802))))))) /\ (((-. (hskp25)) \/ ((ndr1_0) /\ ((c0_1 (a729)) /\ ((c2_1 (a729)) /\ (c3_1 (a729)))))) /\ (((-. (hskp26)) \/ ((ndr1_0) /\ ((c1_1 (a737)) /\ ((c2_1 (a737)) /\ (c3_1 (a737)))))) /\ (((-. (hskp27)) \/ ((ndr1_0) /\ ((c0_1 (a750)) /\ ((c1_1 (a750)) /\ (c2_1 (a750)))))) /\ (((-. (hskp28)) \/ ((ndr1_0) /\ ((c0_1 (a784)) /\ ((c1_1 (a784)) /\ (c3_1 (a784)))))) /\ (((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) /\ (((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp25))) /\ (((All U, ((ndr1_0) => ((c0_1 U) \/ ((c1_1 U) \/ (c2_1 U))))) \/ ((hskp0) \/ (hskp1))) /\ (((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ (hskp2))) /\ (((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X4, ((ndr1_0) => ((c2_1 X4) \/ ((c3_1 X4) \/ (-. (c1_1 X4)))))) \/ (hskp3))) /\ (((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))))) /\ (((All X1, ((ndr1_0) => ((c0_1 X1) \/ ((c1_1 X1) \/ (c3_1 X1))))) \/ ((hskp4) \/ (hskp5))) /\ (((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ (hskp0))) /\ (((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((hskp26) \/ (hskp6))) /\ (((All X9, ((ndr1_0) => ((c0_1 X9) \/ ((c1_1 X9) \/ (-. (c2_1 X9)))))) \/ ((hskp1) \/ (hskp2))) /\ (((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp7))) /\ (((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All X16, ((ndr1_0) => ((c0_1 X16) \/ ((-. (c1_1 X16)) \/ (-. (c2_1 X16)))))) \/ (hskp5))) /\ (((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All X18, ((ndr1_0) => ((c1_1 X18) \/ ((c3_1 X18) \/ (-. (c0_1 X18)))))) \/ (All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))))) /\ (((All X13, ((ndr1_0) => ((c0_1 X13) \/ ((c1_1 X13) \/ (-. (c3_1 X13)))))) \/ ((All X21, ((ndr1_0) => ((c1_1 X21) \/ ((-. (c0_1 X21)) \/ (-. (c2_1 X21)))))) \/ (hskp4))) /\ (((All X22, ((ndr1_0) => ((c0_1 X22) \/ ((c2_1 X22) \/ (c3_1 X22))))) \/ ((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ (hskp8))) /\ (((All X22, ((ndr1_0) => ((c0_1 X22) \/ ((c2_1 X22) \/ (c3_1 X22))))) \/ ((hskp5) \/ (hskp9))) /\ (((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ (hskp5))) /\ (((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (hskp10))) /\ (((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) /\ (((All X10, ((ndr1_0) => ((c0_1 X10) \/ ((c2_1 X10) \/ (-. (c1_1 X10)))))) \/ ((All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))) \/ (hskp27))) /\ (((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ (All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))))) /\ (((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ (All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))))) /\ (((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ (All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))))) /\ (((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp27) \/ (hskp11))) /\ (((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp25) \/ (hskp6))) /\ (((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp12) \/ (hskp7))) /\ (((All X2, ((ndr1_0) => ((c0_1 X2) \/ ((c2_1 X2) \/ (-. (c3_1 X2)))))) \/ ((hskp6) \/ (hskp4))) /\ (((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((All X6, ((ndr1_0) => ((c2_1 X6) \/ ((-. (c0_1 X6)) \/ (-. (c1_1 X6)))))) \/ (hskp13))) /\ (((All X26, ((ndr1_0) => ((c0_1 X26) \/ ((c3_1 X26) \/ (-. (c1_1 X26)))))) \/ ((hskp0) \/ (hskp9))) /\ (((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ ((All X4, ((ndr1_0) => ((c2_1 X4) \/ ((c3_1 X4) \/ (-. (c1_1 X4)))))) \/ (hskp14))) /\ (((All V, ((ndr1_0) => ((c0_1 V) \/ ((c3_1 V) \/ (-. (c2_1 V)))))) \/ ((All X7, ((ndr1_0) => ((-. (c0_1 X7)) \/ ((-. (c1_1 X7)) \/ (-. (c3_1 X7)))))) \/ (hskp15))) /\ (((All X16, ((ndr1_0) => ((c0_1 X16) \/ ((-. (c1_1 X16)) \/ (-. (c2_1 X16)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp16))) /\ (((All X16, ((ndr1_0) => ((c0_1 X16) \/ ((-. (c1_1 X16)) \/ (-. (c2_1 X16)))))) \/ ((hskp27) \/ (hskp17))) /\ (((All X34, ((ndr1_0) => ((c0_1 X34) \/ ((-. (c1_1 X34)) \/ (-. (c3_1 X34)))))) \/ ((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) \/ (hskp2))) /\ (((All X28, ((ndr1_0) => ((c0_1 X28) \/ ((-. (c2_1 X28)) \/ (-. (c3_1 X28)))))) \/ ((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ (All X60, ((ndr1_0) => ((c2_1 X60) \/ ((-. (c0_1 X60)) \/ (-. (c3_1 X60)))))))) /\ (((All X61, ((ndr1_0) => ((c1_1 X61) \/ ((c2_1 X61) \/ (c3_1 X61))))) \/ ((hskp27) \/ (hskp0))) /\ (((All X57, ((ndr1_0) => ((c1_1 X57) \/ ((c2_1 X57) \/ (-. (c0_1 X57)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp26))) /\ (((All X64, ((ndr1_0) => ((c1_1 X64) \/ ((c2_1 X64) \/ (-. (c3_1 X64)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp11))) /\ (((All X18, ((ndr1_0) => ((c1_1 X18) \/ ((c3_1 X18) \/ (-. (c0_1 X18)))))) \/ ((hskp27) \/ (hskp5))) /\ (((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ (hskp5))) /\ (((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ (All W, ((ndr1_0) => ((-. (c0_1 W)) \/ ((-. (c1_1 W)) \/ (-. (c2_1 W)))))))) /\ (((All X40, ((ndr1_0) => ((c1_1 X40) \/ ((c3_1 X40) \/ (-. (c2_1 X40)))))) \/ ((All X30, ((ndr1_0) => ((c2_1 X30) \/ ((-. (c1_1 X30)) \/ (-. (c3_1 X30)))))) \/ (hskp18))) /\ (((All Y, ((ndr1_0) => ((c1_1 Y) \/ ((-. (c0_1 Y)) \/ (-. (c3_1 Y)))))) \/ ((hskp27) \/ (hskp19))) /\ (((All X59, ((ndr1_0) => ((c1_1 X59) \/ ((-. (c2_1 X59)) \/ (-. (c3_1 X59)))))) \/ ((hskp5) \/ (hskp20))) /\ (((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp25) \/ (hskp9))) /\ (((All X70, ((ndr1_0) => ((c2_1 X70) \/ ((c3_1 X70) \/ (-. (c0_1 X70)))))) \/ ((hskp16) \/ (hskp3))) /\ (((All X4, ((ndr1_0) => ((c2_1 X4) \/ ((c3_1 X4) \/ (-. (c1_1 X4)))))) \/ ((hskp28) \/ (hskp16))) /\ (((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp1))) /\ (((All X79, ((ndr1_0) => ((c3_1 X79) \/ ((-. (c0_1 X79)) \/ (-. (c1_1 X79)))))) \/ ((hskp18) \/ (hskp11))) /\ (((All X82, ((ndr1_0) => ((c3_1 X82) \/ ((-. (c1_1 X82)) \/ (-. (c2_1 X82)))))) \/ ((hskp27) \/ (hskp11))) /\ (((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ ((hskp28) \/ (hskp11))) /\ (((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ (hskp21)) /\ (((All X54, ((ndr1_0) => ((-. (c0_1 X54)) \/ ((-. (c2_1 X54)) \/ (-. (c3_1 X54)))))) \/ ((hskp21) \/ (hskp2))) /\ (((All X38, ((ndr1_0) => ((-. (c1_1 X38)) \/ ((-. (c2_1 X38)) \/ (-. (c3_1 X38)))))) \/ ((hskp16) \/ (hskp22))) /\ (((hskp23) \/ ((hskp21) \/ (hskp17))) /\ (((hskp23) \/ ((hskp24) \/ (hskp13))) /\ (((hskp16) \/ ((hskp18) \/ (hskp19))) /\ (((hskp0) \/ ((hskp5) \/ (hskp19))) /\ (((hskp0) \/ (hskp8)) /\ ((hskp7) \/ ((hskp1) \/ (hskp4))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))) ### NotNot 876
% 0.54/0.73 % SZS output end Proof
% 0.54/0.73 (* END-PROOF *)
%------------------------------------------------------------------------------