TSTP Solution File: NUM425+1 by SuperZenon---0.0.1

View Problem - Process Solution 
%------------------------------------------------------------------------------
% File     : SuperZenon---0.0.1
% Problem  : NUM425+1 : TPTP v8.1.0. Released v4.0.0.
% Transfm  : none
% Format   : tptp:raw
% Command  : run_super_zenon -p0 -itptp -om -max-time %d %s

% Computer : n026.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 : Mon Jul 18 14:42:19 EDT 2022

% Result   : Theorem 242.01s 242.19s
% Output   : Proof 242.01s
% Verified : 
% SZS Type : -

% Comments : 
%------------------------------------------------------------------------------
%----WARNING: Could not form TPTP format derivation
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% 0.03/0.11  % Problem  : NUM425+1 : TPTP v8.1.0. Released v4.0.0.
% 0.03/0.12  % Command  : run_super_zenon -p0 -itptp -om -max-time %d %s
% 0.12/0.33  % Computer : n026.cluster.edu
% 0.12/0.33  % Model    : x86_64 x86_64
% 0.12/0.33  % CPU      : Intel(R) Xeon(R) CPU E5-2620 v4 @ 2.10GHz
% 0.12/0.33  % Memory   : 8042.1875MB
% 0.12/0.33  % OS       : Linux 3.10.0-693.el7.x86_64
% 0.12/0.33  % CPULimit : 300
% 0.12/0.33  % WCLimit  : 600
% 0.12/0.33  % DateTime : Wed Jul  6 20:46:23 EDT 2022
% 0.12/0.33  % CPUTime  : 
% 242.01/242.19  % SZS status Theorem
% 242.01/242.19  (* PROOF-FOUND *)
% 242.01/242.19  (* BEGIN-PROOF *)
% 242.01/242.19  % SZS output start Proof
% 242.01/242.19  1. (aInteger0 (xa)) (-. (aInteger0 (xa)))   ### Axiom
% 242.01/242.19  2. (aInteger0 (xb)) (-. (aInteger0 (xb)))   ### Axiom
% 242.01/242.19  3. (-. (aInteger0 (smndt0 (xb)))) (aInteger0 (smndt0 (xb)))   ### Axiom
% 242.01/242.19  4. ((aInteger0 (xb)) => (aInteger0 (smndt0 (xb)))) (-. (aInteger0 (smndt0 (xb)))) (aInteger0 (xb))   ### Imply 2 3
% 242.01/242.19  5. (All W0, ((aInteger0 W0) => (aInteger0 (smndt0 W0)))) (aInteger0 (xb)) (-. (aInteger0 (smndt0 (xb))))   ### All 4
% 242.01/242.19  6. (-. (aInteger0 (sdtpldt0 (xa) (smndt0 (xb))))) (aInteger0 (sdtpldt0 (xa) (smndt0 (xb))))   ### Axiom
% 242.01/242.19  7. (((aInteger0 (xa)) /\ (aInteger0 (smndt0 (xb)))) => (aInteger0 (sdtpldt0 (xa) (smndt0 (xb))))) (-. (aInteger0 (sdtpldt0 (xa) (smndt0 (xb))))) (aInteger0 (xb)) (All W0, ((aInteger0 W0) => (aInteger0 (smndt0 W0)))) (aInteger0 (xa))   ### DisjTree 1 5 6
% 242.01/242.19  8. (All W1, (((aInteger0 (xa)) /\ (aInteger0 W1)) => (aInteger0 (sdtpldt0 (xa) W1)))) (aInteger0 (xa)) (All W0, ((aInteger0 W0) => (aInteger0 (smndt0 W0)))) (aInteger0 (xb)) (-. (aInteger0 (sdtpldt0 (xa) (smndt0 (xb)))))   ### All 7
% 242.01/242.19  9. (All W0, (All W1, (((aInteger0 W0) /\ (aInteger0 W1)) => (aInteger0 (sdtpldt0 W0 W1))))) (-. (aInteger0 (sdtpldt0 (xa) (smndt0 (xb))))) (aInteger0 (xb)) (All W0, ((aInteger0 W0) => (aInteger0 (smndt0 W0)))) (aInteger0 (xa))   ### All 8
% 242.01/242.19  10. (aInteger0 (xa)) (-. (aInteger0 (xa)))   ### Axiom
% 242.01/242.19  11. (aInteger0 (xb)) (-. (aInteger0 (xb)))   ### Axiom
% 242.01/242.19  12. (aInteger0 (xq)) (-. (aInteger0 (xq)))   ### Axiom
% 242.01/242.19  13. ((xq) != (sz00)) ((xq) = (sz00))   ### Axiom
% 242.01/242.19  14. (sdteqdtlpzmzozddtrp0 (xa) (xb) (xq)) (-. (sdteqdtlpzmzozddtrp0 (xa) (xb) (xq)))   ### Axiom
% 242.01/242.19  15. (aDivisorOf0 (xq) (sdtpldt0 (xa) (smndt0 (xb)))) (-. (aDivisorOf0 (xq) (sdtpldt0 (xa) (smndt0 (xb)))))   ### Axiom
% 242.01/242.19  16. (-. (Ex W0, ((aInteger0 W0) /\ ((sdtasdt0 (xq) W0) = (sdtpldt0 (xa) (smndt0 (xb))))))) (Ex W0, ((aInteger0 W0) /\ ((sdtasdt0 (xq) W0) = (sdtpldt0 (xa) (smndt0 (xb))))))   ### Axiom
% 242.01/242.19  17. ((aInteger0 (xq)) /\ (((xq) != (sz00)) /\ (Ex W0, ((aInteger0 W0) /\ ((sdtasdt0 (xq) W0) = (sdtpldt0 (xa) (smndt0 (xb)))))))) (-. (Ex W0, ((aInteger0 W0) /\ ((sdtasdt0 (xq) W0) = (sdtpldt0 (xa) (smndt0 (xb)))))))   ### ConjTree 16
% 242.01/242.19  18. ((aDivisorOf0 (xq) (sdtpldt0 (xa) (smndt0 (xb)))) <=> ((aInteger0 (xq)) /\ (((xq) != (sz00)) /\ (Ex W0, ((aInteger0 W0) /\ ((sdtasdt0 (xq) W0) = (sdtpldt0 (xa) (smndt0 (xb))))))))) (-. (Ex W0, ((aInteger0 W0) /\ ((sdtasdt0 (xq) W0) = (sdtpldt0 (xa) (smndt0 (xb))))))) (aDivisorOf0 (xq) (sdtpldt0 (xa) (smndt0 (xb))))   ### Equiv 15 17
% 242.01/242.19  19. (All W1, ((aDivisorOf0 W1 (sdtpldt0 (xa) (smndt0 (xb)))) <=> ((aInteger0 W1) /\ ((W1 != (sz00)) /\ (Ex W2, ((aInteger0 W2) /\ ((sdtasdt0 W1 W2) = (sdtpldt0 (xa) (smndt0 (xb)))))))))) (aDivisorOf0 (xq) (sdtpldt0 (xa) (smndt0 (xb)))) (-. (Ex W0, ((aInteger0 W0) /\ ((sdtasdt0 (xq) W0) = (sdtpldt0 (xa) (smndt0 (xb)))))))   ### All 18
% 242.01/242.19  20. ((sdteqdtlpzmzozddtrp0 (xa) (xb) (xq)) <=> (aDivisorOf0 (xq) (sdtpldt0 (xa) (smndt0 (xb))))) (-. (Ex W0, ((aInteger0 W0) /\ ((sdtasdt0 (xq) W0) = (sdtpldt0 (xa) (smndt0 (xb))))))) (All W1, ((aDivisorOf0 W1 (sdtpldt0 (xa) (smndt0 (xb)))) <=> ((aInteger0 W1) /\ ((W1 != (sz00)) /\ (Ex W2, ((aInteger0 W2) /\ ((sdtasdt0 W1 W2) = (sdtpldt0 (xa) (smndt0 (xb)))))))))) (sdteqdtlpzmzozddtrp0 (xa) (xb) (xq))   ### Equiv 14 19
% 242.01/242.19  21. (((aInteger0 (xa)) /\ ((aInteger0 (xb)) /\ ((aInteger0 (xq)) /\ ((xq) != (sz00))))) => ((sdteqdtlpzmzozddtrp0 (xa) (xb) (xq)) <=> (aDivisorOf0 (xq) (sdtpldt0 (xa) (smndt0 (xb)))))) (sdteqdtlpzmzozddtrp0 (xa) (xb) (xq)) (All W1, ((aDivisorOf0 W1 (sdtpldt0 (xa) (smndt0 (xb)))) <=> ((aInteger0 W1) /\ ((W1 != (sz00)) /\ (Ex W2, ((aInteger0 W2) /\ ((sdtasdt0 W1 W2) = (sdtpldt0 (xa) (smndt0 (xb)))))))))) (-. (Ex W0, ((aInteger0 W0) /\ ((sdtasdt0 (xq) W0) = (sdtpldt0 (xa) (smndt0 (xb))))))) ((xq) != (sz00)) (aInteger0 (xq)) (aInteger0 (xb)) (aInteger0 (xa))   ### DisjTree 10 11 12 13 20
% 242.01/242.19  22. (All W2, (((aInteger0 (xa)) /\ ((aInteger0 (xb)) /\ ((aInteger0 W2) /\ (W2 != (sz00))))) => ((sdteqdtlpzmzozddtrp0 (xa) (xb) W2) <=> (aDivisorOf0 W2 (sdtpldt0 (xa) (smndt0 (xb))))))) (aInteger0 (xa)) (aInteger0 (xb)) (aInteger0 (xq)) ((xq) != (sz00)) (-. (Ex W0, ((aInteger0 W0) /\ ((sdtasdt0 (xq) W0) = (sdtpldt0 (xa) (smndt0 (xb))))))) (All W1, ((aDivisorOf0 W1 (sdtpldt0 (xa) (smndt0 (xb)))) <=> ((aInteger0 W1) /\ ((W1 != (sz00)) /\ (Ex W2, ((aInteger0 W2) /\ ((sdtasdt0 W1 W2) = (sdtpldt0 (xa) (smndt0 (xb)))))))))) (sdteqdtlpzmzozddtrp0 (xa) (xb) (xq))   ### All 21
% 242.01/242.19  23. (All W1, (All W2, (((aInteger0 (xa)) /\ ((aInteger0 W1) /\ ((aInteger0 W2) /\ (W2 != (sz00))))) => ((sdteqdtlpzmzozddtrp0 (xa) W1 W2) <=> (aDivisorOf0 W2 (sdtpldt0 (xa) (smndt0 W1))))))) (sdteqdtlpzmzozddtrp0 (xa) (xb) (xq)) (All W1, ((aDivisorOf0 W1 (sdtpldt0 (xa) (smndt0 (xb)))) <=> ((aInteger0 W1) /\ ((W1 != (sz00)) /\ (Ex W2, ((aInteger0 W2) /\ ((sdtasdt0 W1 W2) = (sdtpldt0 (xa) (smndt0 (xb)))))))))) (-. (Ex W0, ((aInteger0 W0) /\ ((sdtasdt0 (xq) W0) = (sdtpldt0 (xa) (smndt0 (xb))))))) ((xq) != (sz00)) (aInteger0 (xq)) (aInteger0 (xb)) (aInteger0 (xa))   ### All 22
% 242.01/242.19  24. (All W0, (All W1, (All W2, (((aInteger0 W0) /\ ((aInteger0 W1) /\ ((aInteger0 W2) /\ (W2 != (sz00))))) => ((sdteqdtlpzmzozddtrp0 W0 W1 W2) <=> (aDivisorOf0 W2 (sdtpldt0 W0 (smndt0 W1)))))))) (aInteger0 (xa)) (aInteger0 (xb)) (aInteger0 (xq)) ((xq) != (sz00)) (-. (Ex W0, ((aInteger0 W0) /\ ((sdtasdt0 (xq) W0) = (sdtpldt0 (xa) (smndt0 (xb))))))) (All W1, ((aDivisorOf0 W1 (sdtpldt0 (xa) (smndt0 (xb)))) <=> ((aInteger0 W1) /\ ((W1 != (sz00)) /\ (Ex W2, ((aInteger0 W2) /\ ((sdtasdt0 W1 W2) = (sdtpldt0 (xa) (smndt0 (xb)))))))))) (sdteqdtlpzmzozddtrp0 (xa) (xb) (xq))   ### All 23
% 242.01/242.19  25. ((aInteger0 (sdtpldt0 (xa) (smndt0 (xb)))) => (All W1, ((aDivisorOf0 W1 (sdtpldt0 (xa) (smndt0 (xb)))) <=> ((aInteger0 W1) /\ ((W1 != (sz00)) /\ (Ex W2, ((aInteger0 W2) /\ ((sdtasdt0 W1 W2) = (sdtpldt0 (xa) (smndt0 (xb))))))))))) (sdteqdtlpzmzozddtrp0 (xa) (xb) (xq)) (-. (Ex W0, ((aInteger0 W0) /\ ((sdtasdt0 (xq) W0) = (sdtpldt0 (xa) (smndt0 (xb))))))) ((xq) != (sz00)) (aInteger0 (xq)) (All W0, (All W1, (All W2, (((aInteger0 W0) /\ ((aInteger0 W1) /\ ((aInteger0 W2) /\ (W2 != (sz00))))) => ((sdteqdtlpzmzozddtrp0 W0 W1 W2) <=> (aDivisorOf0 W2 (sdtpldt0 W0 (smndt0 W1)))))))) (aInteger0 (xa)) (All W0, ((aInteger0 W0) => (aInteger0 (smndt0 W0)))) (aInteger0 (xb)) (All W0, (All W1, (((aInteger0 W0) /\ (aInteger0 W1)) => (aInteger0 (sdtpldt0 W0 W1)))))   ### Imply 9 24
% 242.01/242.19  26. (All W0, ((aInteger0 W0) => (All W1, ((aDivisorOf0 W1 W0) <=> ((aInteger0 W1) /\ ((W1 != (sz00)) /\ (Ex W2, ((aInteger0 W2) /\ ((sdtasdt0 W1 W2) = W0))))))))) (All W0, (All W1, (((aInteger0 W0) /\ (aInteger0 W1)) => (aInteger0 (sdtpldt0 W0 W1))))) (aInteger0 (xb)) (All W0, ((aInteger0 W0) => (aInteger0 (smndt0 W0)))) (aInteger0 (xa)) (All W0, (All W1, (All W2, (((aInteger0 W0) /\ ((aInteger0 W1) /\ ((aInteger0 W2) /\ (W2 != (sz00))))) => ((sdteqdtlpzmzozddtrp0 W0 W1 W2) <=> (aDivisorOf0 W2 (sdtpldt0 W0 (smndt0 W1)))))))) (aInteger0 (xq)) ((xq) != (sz00)) (-. (Ex W0, ((aInteger0 W0) /\ ((sdtasdt0 (xq) W0) = (sdtpldt0 (xa) (smndt0 (xb))))))) (sdteqdtlpzmzozddtrp0 (xa) (xb) (xq))   ### All 25
% 242.01/242.19  27. ((aInteger0 (xa)) /\ ((aInteger0 (xb)) /\ ((aInteger0 (xq)) /\ ((xq) != (sz00))))) (sdteqdtlpzmzozddtrp0 (xa) (xb) (xq)) (-. (Ex W0, ((aInteger0 W0) /\ ((sdtasdt0 (xq) W0) = (sdtpldt0 (xa) (smndt0 (xb))))))) (All W0, (All W1, (All W2, (((aInteger0 W0) /\ ((aInteger0 W1) /\ ((aInteger0 W2) /\ (W2 != (sz00))))) => ((sdteqdtlpzmzozddtrp0 W0 W1 W2) <=> (aDivisorOf0 W2 (sdtpldt0 W0 (smndt0 W1)))))))) (All W0, ((aInteger0 W0) => (aInteger0 (smndt0 W0)))) (All W0, (All W1, (((aInteger0 W0) /\ (aInteger0 W1)) => (aInteger0 (sdtpldt0 W0 W1))))) (All W0, ((aInteger0 W0) => (All W1, ((aDivisorOf0 W1 W0) <=> ((aInteger0 W1) /\ ((W1 != (sz00)) /\ (Ex W2, ((aInteger0 W2) /\ ((sdtasdt0 W1 W2) = W0)))))))))   ### ConjTree 26
% 242.01/242.19  % SZS output end Proof
% 242.01/242.19  (* END-PROOF *)
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