TSTP Solution File: GRP479-1 by Matita---1.0
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%------------------------------------------------------------------------------
% File : Matita---1.0
% Problem : GRP479-1 : TPTP v8.1.0. Released v2.6.0.
% Transfm : none
% Format : tptp:raw
% Command : matitaprover --timeout %d --tptppath /export/starexec/sandbox/benchmark %s
% Computer : n016.cluster.edu
% Model : x86_64 x86_64
% CPU : Intel(R) Xeon(R) CPU E5-2620 v4 2.10GHz
% Memory : 8042.1875MB
% OS : Linux 3.10.0-693.el7.x86_64
% CPULimit : 300s
% WCLimit : 600s
% DateTime : Sat Jul 16 10:30:27 EDT 2022
% Result : Unsatisfiable 34.41s 8.98s
% Output : CNFRefutation 34.41s
% Verified :
% SZS Type : -
% Comments :
%------------------------------------------------------------------------------
%----WARNING: Could not form TPTP format derivation
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% 0.00/0.11 % Problem : GRP479-1 : TPTP v8.1.0. Released v2.6.0.
% 0.00/0.12 % Command : matitaprover --timeout %d --tptppath /export/starexec/sandbox/benchmark %s
% 0.12/0.32 % Computer : n016.cluster.edu
% 0.12/0.32 % Model : x86_64 x86_64
% 0.12/0.32 % CPU : Intel(R) Xeon(R) CPU E5-2620 v4 @ 2.10GHz
% 0.12/0.32 % Memory : 8042.1875MB
% 0.12/0.32 % OS : Linux 3.10.0-693.el7.x86_64
% 0.12/0.32 % CPULimit : 300
% 0.12/0.32 % WCLimit : 600
% 0.12/0.32 % DateTime : Tue Jun 14 09:42:15 EDT 2022
% 0.12/0.33 % CPUTime :
% 0.12/0.33 14071: Facts:
% 0.12/0.33 14071: Id : 2, {_}:
% 0.12/0.33 divide
% 0.12/0.33 (inverse
% 0.12/0.33 (divide (divide (divide ?2 ?2) ?3) (divide ?4 (divide ?3 ?5))))
% 0.12/0.33 ?5
% 0.12/0.33 =>=
% 0.12/0.33 ?4
% 0.12/0.33 [5, 4, 3, 2] by single_axiom ?2 ?3 ?4 ?5
% 0.12/0.33 14071: Id : 3, {_}:
% 0.12/0.33 multiply ?7 ?8 =<= divide ?7 (inverse ?8)
% 0.12/0.33 [8, 7] by multiply ?7 ?8
% 0.12/0.33 14071: Goal:
% 0.12/0.33 14071: Id : 1, {_}:
% 0.12/0.33 multiply (multiply (inverse b2) b2) a2 =>= a2
% 0.12/0.33 [] by prove_these_axioms_2
% 34.41/8.98 Statistics :
% 34.41/8.98 Max weight : 43
% 34.41/8.98 Found proof, 8.649017s
% 34.41/8.98 % SZS status Unsatisfiable for theBenchmark.p
% 34.41/8.98 % SZS output start CNFRefutation for theBenchmark.p
% 34.41/8.98 Id : 2, {_}: divide (inverse (divide (divide (divide ?2 ?2) ?3) (divide ?4 (divide ?3 ?5)))) ?5 =>= ?4 [5, 4, 3, 2] by single_axiom ?2 ?3 ?4 ?5
% 34.41/8.98 Id : 4, {_}: divide (inverse (divide (divide (divide ?10 ?10) ?11) (divide ?12 (divide ?11 ?13)))) ?13 =>= ?12 [13, 12, 11, 10] by single_axiom ?10 ?11 ?12 ?13
% 34.41/8.98 Id : 3, {_}: multiply ?7 ?8 =<= divide ?7 (inverse ?8) [8, 7] by multiply ?7 ?8
% 34.41/8.98 Id : 6, {_}: divide (inverse (divide (divide (divide ?22 ?22) ?23) ?24)) ?25 =?= inverse (divide (divide (divide ?26 ?26) ?27) (divide ?24 (divide ?27 (divide ?23 ?25)))) [27, 26, 25, 24, 23, 22] by Super 4 with 2 at 2,1,1,2
% 34.41/8.98 Id : 2529, {_}: divide (divide (inverse (divide (divide (divide ?16362 ?16362) ?16363) ?16364)) ?16365) (divide ?16363 ?16365) =>= ?16364 [16365, 16364, 16363, 16362] by Super 2 with 6 at 1,2
% 34.41/8.98 Id : 4650, {_}: divide (divide (divide (inverse (divide (divide (divide ?26896 ?26896) ?26897) ?26898)) ?26899) ?26900) (divide ?26901 ?26900) =>= divide ?26898 (divide ?26901 (divide ?26897 ?26899)) [26901, 26900, 26899, 26898, 26897, 26896] by Super 2529 with 6 at 1,1,2
% 34.41/8.98 Id : 5916, {_}: divide (divide (divide (inverse (divide (multiply (divide ?34927 ?34927) ?34928) ?34929)) ?34930) ?34931) (divide ?34932 ?34931) =>= divide ?34929 (divide ?34932 (divide (inverse ?34928) ?34930)) [34932, 34931, 34930, 34929, 34928, 34927] by Super 4650 with 3 at 1,1,1,1,1,2
% 34.41/8.98 Id : 9, {_}: divide (inverse (divide (divide (multiply (inverse ?36) ?36) ?37) (divide ?38 (divide ?37 ?39)))) ?39 =>= ?38 [39, 38, 37, 36] by Super 2 with 3 at 1,1,1,1,2
% 34.41/8.98 Id : 28, {_}: divide (inverse (divide (divide (divide ?98 ?98) (inverse (divide (divide (multiply (inverse ?99) ?99) ?100) (divide ?101 (divide ?100 ?102))))) (divide ?103 ?101))) ?102 =>= ?103 [103, 102, 101, 100, 99, 98] by Super 2 with 9 at 2,2,1,1,2
% 34.41/8.98 Id : 40, {_}: divide (inverse (divide (multiply (divide ?98 ?98) (divide (divide (multiply (inverse ?99) ?99) ?100) (divide ?101 (divide ?100 ?102)))) (divide ?103 ?101))) ?102 =>= ?103 [103, 102, 101, 100, 99, 98] by Demod 28 with 3 at 1,1,1,2
% 34.41/8.98 Id : 5963, {_}: divide (divide ?35370 ?35371) (divide ?35372 ?35371) =?= divide (divide ?35370 ?35373) (divide ?35372 (divide (inverse (divide (divide (multiply (inverse ?35374) ?35374) ?35375) (divide ?35373 (divide ?35375 ?35376)))) ?35376)) [35376, 35375, 35374, 35373, 35372, 35371, 35370] by Super 5916 with 40 at 1,1,2
% 34.41/8.98 Id : 6096, {_}: divide (divide ?35370 ?35371) (divide ?35372 ?35371) =?= divide (divide ?35370 ?35373) (divide ?35372 ?35373) [35373, 35372, 35371, 35370] by Demod 5963 with 9 at 2,2,3
% 34.41/8.98 Id : 6160, {_}: divide (inverse (divide (divide (divide ?35778 ?35778) ?35779) (divide ?35780 (divide ?35779 ?35781)))) ?35781 =?= inverse (divide (divide (divide ?35782 ?35782) ?35783) (divide (divide ?35780 ?35784) (divide ?35783 ?35784))) [35784, 35783, 35782, 35781, 35780, 35779, 35778] by Super 6 with 6096 at 2,1,3
% 34.41/8.98 Id : 6793, {_}: ?39406 =<= inverse (divide (divide (divide ?39407 ?39407) ?39408) (divide (divide ?39406 ?39409) (divide ?39408 ?39409))) [39409, 39408, 39407, 39406] by Demod 6160 with 2 at 2
% 34.41/8.98 Id : 7705, {_}: ?44450 =<= inverse (divide (divide (multiply (inverse ?44451) ?44451) ?44452) (divide (divide ?44450 ?44453) (divide ?44452 ?44453))) [44453, 44452, 44451, 44450] by Super 6793 with 3 at 1,1,1,3
% 34.41/8.98 Id : 7819, {_}: ?45286 =<= inverse (divide (multiply (multiply (inverse ?45287) ?45287) ?45288) (divide (divide ?45286 ?45289) (divide (inverse ?45288) ?45289))) [45289, 45288, 45287, 45286] by Super 7705 with 3 at 1,1,3
% 34.41/8.98 Id : 2549, {_}: divide (divide (inverse (divide (divide (multiply (inverse ?16524) ?16524) ?16525) ?16526)) ?16527) (divide ?16525 ?16527) =>= ?16526 [16527, 16526, 16525, 16524] by Super 2529 with 3 at 1,1,1,1,1,2
% 34.41/8.98 Id : 6346, {_}: divide (divide (inverse (divide (divide (multiply (inverse ?37232) ?37232) ?37233) (divide ?37234 ?37233))) ?37235) (divide ?37236 ?37235) =>= divide ?37234 ?37236 [37236, 37235, 37234, 37233, 37232] by Super 2549 with 6096 at 1,1,1,2
% 34.41/8.98 Id : 2547, {_}: divide (divide (inverse (divide (divide (divide ?16510 ?16510) ?16511) ?16512)) (inverse ?16513)) (multiply ?16511 ?16513) =>= ?16512 [16513, 16512, 16511, 16510] by Super 2529 with 3 at 2,2
% 34.41/8.98 Id : 2810, {_}: divide (multiply (inverse (divide (divide (divide ?17580 ?17580) ?17581) ?17582)) ?17583) (multiply ?17581 ?17583) =>= ?17582 [17583, 17582, 17581, 17580] by Demod 2547 with 3 at 1,2
% 34.41/8.98 Id : 2827, {_}: divide (multiply (inverse (divide (divide (multiply (inverse ?17721) ?17721) ?17722) ?17723)) ?17724) (multiply ?17722 ?17724) =>= ?17723 [17724, 17723, 17722, 17721] by Super 2810 with 3 at 1,1,1,1,1,2
% 34.41/8.98 Id : 6354, {_}: divide (multiply (inverse (divide (divide (multiply (inverse ?37278) ?37278) ?37279) (divide ?37280 ?37279))) ?37281) (multiply ?37282 ?37281) =>= divide ?37280 ?37282 [37282, 37281, 37280, 37279, 37278] by Super 2827 with 6096 at 1,1,1,2
% 34.41/8.98 Id : 2594, {_}: divide (multiply (inverse (divide (divide (divide ?16510 ?16510) ?16511) ?16512)) ?16513) (multiply ?16511 ?16513) =>= ?16512 [16513, 16512, 16511, 16510] by Demod 2547 with 3 at 1,2
% 34.41/8.98 Id : 6830, {_}: ?39693 =<= inverse (divide (divide (divide ?39694 ?39694) ?39695) (divide (divide ?39693 (inverse ?39696)) (multiply ?39695 ?39696))) [39696, 39695, 39694, 39693] by Super 6793 with 3 at 2,2,1,3
% 34.41/8.98 Id : 6935, {_}: ?39693 =<= inverse (divide (divide (divide ?39694 ?39694) ?39695) (divide (multiply ?39693 ?39696) (multiply ?39695 ?39696))) [39696, 39695, 39694, 39693] by Demod 6830 with 3 at 1,2,1,3
% 34.41/8.98 Id : 7024, {_}: divide (multiply ?40690 ?40691) (multiply ?40692 ?40691) =?= divide (multiply ?40690 ?40693) (multiply ?40692 ?40693) [40693, 40692, 40691, 40690] by Super 2594 with 6935 at 1,1,2
% 34.41/8.98 Id : 8, {_}: divide (inverse (divide (divide (divide ?31 ?31) ?32) (divide ?33 (multiply ?32 ?34)))) (inverse ?34) =>= ?33 [34, 33, 32, 31] by Super 2 with 3 at 2,2,1,1,2
% 34.41/8.98 Id : 18, {_}: multiply (inverse (divide (divide (divide ?62 ?62) ?63) (divide ?64 (multiply ?63 ?65)))) ?65 =>= ?64 [65, 64, 63, 62] by Demod 8 with 3 at 2
% 34.41/8.98 Id : 22, {_}: multiply (inverse (divide (multiply (divide ?86 ?86) ?87) (divide ?88 (multiply (inverse ?87) ?89)))) ?89 =>= ?88 [89, 88, 87, 86] by Super 18 with 3 at 1,1,1,2
% 34.41/8.98 Id : 69, {_}: multiply (inverse (divide (divide (multiply (inverse ?280) ?280) ?281) (divide ?282 (multiply ?281 ?283)))) ?283 =>= ?282 [283, 282, 281, 280] by Super 18 with 3 at 1,1,1,1,2
% 34.41/8.98 Id : 75, {_}: multiply (inverse (divide (multiply (multiply (inverse ?320) ?320) ?321) (divide ?322 (multiply (inverse ?321) ?323)))) ?323 =>= ?322 [323, 322, 321, 320] by Super 69 with 3 at 1,1,1,2
% 34.41/8.98 Id : 127, {_}: multiply (inverse (divide (multiply (divide ?536 ?536) (divide (multiply (multiply (inverse ?537) ?537) ?538) (divide ?539 (multiply (inverse ?538) ?540)))) (divide ?541 ?539))) ?540 =>= ?541 [541, 540, 539, 538, 537, 536] by Super 22 with 75 at 2,2,1,1,2
% 34.41/8.98 Id : 2081, {_}: divide (divide (inverse (divide (divide (divide ?14113 ?14113) ?14114) ?14115)) ?14116) (divide ?14114 ?14116) =>= ?14115 [14116, 14115, 14114, 14113] by Super 2 with 6 at 1,2
% 34.41/8.98 Id : 2499, {_}: divide (inverse (divide ?16117 (divide ?16118 (divide (divide ?16119 (inverse (divide (divide (divide ?16120 ?16120) ?16119) ?16117))) ?16121)))) ?16121 =>= ?16118 [16121, 16120, 16119, 16118, 16117] by Super 2 with 2081 at 1,1,1,2
% 34.41/8.98 Id : 2569, {_}: divide (inverse (divide ?16117 (divide ?16118 (divide (multiply ?16119 (divide (divide (divide ?16120 ?16120) ?16119) ?16117)) ?16121)))) ?16121 =>= ?16118 [16121, 16120, 16119, 16118, 16117] by Demod 2499 with 3 at 1,2,2,1,1,2
% 34.41/8.98 Id : 93223, {_}: divide ?493953 (divide ?493954 ?493955) =<= divide ?493953 (divide (multiply ?493956 (divide (divide (divide ?493957 ?493957) ?493956) (divide (divide ?493958 ?493958) ?493954))) ?493955) [493958, 493957, 493956, 493955, 493954, 493953] by Super 2081 with 2569 at 1,2
% 34.41/8.98 Id : 6390, {_}: divide (divide ?37532 ?37533) (divide ?37534 ?37533) =?= divide (divide ?37532 ?37535) (divide ?37534 ?37535) [37535, 37534, 37533, 37532] by Demod 5963 with 9 at 2,2,3
% 34.41/8.98 Id : 6407, {_}: divide (divide ?37673 ?37674) (divide (divide (inverse (divide (divide (divide ?37675 ?37675) ?37676) ?37677)) ?37678) ?37674) =>= divide (divide ?37673 (divide ?37676 ?37678)) ?37677 [37678, 37677, 37676, 37675, 37674, 37673] by Super 6390 with 2081 at 2,3
% 34.41/8.98 Id : 93492, {_}: divide ?496524 (divide ?496525 ?496526) =<= divide ?496524 (divide (multiply ?496525 (divide (divide (divide ?496527 ?496527) (divide ?496528 (inverse (divide (divide (divide ?496529 ?496529) ?496528) ?496530)))) ?496530)) ?496526) [496530, 496529, 496528, 496527, 496526, 496525, 496524] by Super 93223 with 6407 at 2,1,2,3
% 34.41/8.98 Id : 94520, {_}: divide ?496524 (divide ?496525 ?496526) =<= divide ?496524 (divide (multiply ?496525 (divide (divide (divide ?496527 ?496527) (multiply ?496528 (divide (divide (divide ?496529 ?496529) ?496528) ?496530))) ?496530)) ?496526) [496530, 496529, 496528, 496527, 496526, 496525, 496524] by Demod 93492 with 3 at 2,1,2,1,2,3
% 34.41/8.98 Id : 2523, {_}: divide (inverse (divide (divide (divide ?16313 ?16313) ?16314) (divide (inverse (divide (divide (divide ?16315 ?16315) ?16316) ?16317)) (divide ?16314 ?16318)))) ?16318 =?= inverse (divide (divide (divide ?16319 ?16319) ?16316) ?16317) [16319, 16318, 16317, 16316, 16315, 16314, 16313] by Super 6 with 2081 at 2,1,3
% 34.41/8.98 Id : 4945, {_}: inverse (divide (divide (divide ?28523 ?28523) ?28524) ?28525) =?= inverse (divide (divide (divide ?28526 ?28526) ?28524) ?28525) [28526, 28525, 28524, 28523] by Demod 2523 with 2 at 2
% 34.41/8.98 Id : 4949, {_}: inverse (divide (divide (divide ?28550 ?28550) (divide ?28551 (inverse (divide (divide (divide ?28552 ?28552) ?28551) ?28553)))) ?28554) =>= inverse (divide ?28553 ?28554) [28554, 28553, 28552, 28551, 28550] by Super 4945 with 2081 at 1,1,3
% 34.41/8.98 Id : 4996, {_}: inverse (divide (divide (divide ?28550 ?28550) (multiply ?28551 (divide (divide (divide ?28552 ?28552) ?28551) ?28553))) ?28554) =>= inverse (divide ?28553 ?28554) [28554, 28553, 28552, 28551, 28550] by Demod 4949 with 3 at 2,1,1,2
% 34.41/8.98 Id : 11397, {_}: multiply ?63239 (divide (divide (divide ?63240 ?63240) (multiply ?63241 (divide (divide (divide ?63242 ?63242) ?63241) ?63243))) ?63244) =>= divide ?63239 (inverse (divide ?63243 ?63244)) [63244, 63243, 63242, 63241, 63240, 63239] by Super 3 with 4996 at 2,3
% 34.41/8.98 Id : 11504, {_}: multiply ?63239 (divide (divide (divide ?63240 ?63240) (multiply ?63241 (divide (divide (divide ?63242 ?63242) ?63241) ?63243))) ?63244) =>= multiply ?63239 (divide ?63243 ?63244) [63244, 63243, 63242, 63241, 63240, 63239] by Demod 11397 with 3 at 3
% 34.41/8.98 Id : 94521, {_}: divide ?496524 (divide ?496525 ?496526) =<= divide ?496524 (divide (multiply ?496525 (divide ?496530 ?496530)) ?496526) [496530, 496526, 496525, 496524] by Demod 94520 with 11504 at 1,2,3
% 34.41/8.98 Id : 95026, {_}: multiply (inverse (divide (multiply (divide ?500754 ?500754) (divide (multiply (multiply (inverse ?500755) ?500755) ?500756) (divide ?500757 (multiply (inverse ?500756) ?500758)))) (divide ?500759 ?500757))) ?500758 =?= multiply ?500759 (divide ?500760 ?500760) [500760, 500759, 500758, 500757, 500756, 500755, 500754] by Super 127 with 94521 at 1,1,2
% 34.41/8.98 Id : 95738, {_}: ?500759 =<= multiply ?500759 (divide ?500760 ?500760) [500760, 500759] by Demod 95026 with 127 at 2
% 34.41/8.98 Id : 96583, {_}: divide (multiply ?506261 ?506262) (multiply ?506263 ?506262) =?= divide (multiply ?506261 (divide ?506264 ?506264)) ?506263 [506264, 506263, 506262, 506261] by Super 7024 with 95738 at 2,3
% 34.41/8.98 Id : 96955, {_}: divide (multiply ?506261 ?506262) (multiply ?506263 ?506262) =>= divide ?506261 ?506263 [506263, 506262, 506261] by Demod 96583 with 95738 at 1,3
% 34.41/8.98 Id : 97347, {_}: divide (inverse (divide (divide (multiply (inverse ?37278) ?37278) ?37279) (divide ?37280 ?37279))) ?37282 =>= divide ?37280 ?37282 [37282, 37280, 37279, 37278] by Demod 6354 with 96955 at 2
% 34.41/8.98 Id : 97370, {_}: divide (divide ?37234 ?37235) (divide ?37236 ?37235) =>= divide ?37234 ?37236 [37236, 37235, 37234] by Demod 6346 with 97347 at 1,2
% 34.41/8.98 Id : 97407, {_}: ?45286 =<= inverse (divide (multiply (multiply (inverse ?45287) ?45287) ?45288) (divide ?45286 (inverse ?45288))) [45288, 45287, 45286] by Demod 7819 with 97370 at 2,1,3
% 34.41/8.98 Id : 97428, {_}: ?45286 =<= inverse (divide (multiply (multiply (inverse ?45287) ?45287) ?45288) (multiply ?45286 ?45288)) [45288, 45287, 45286] by Demod 97407 with 3 at 2,1,3
% 34.41/8.98 Id : 97429, {_}: ?45286 =<= inverse (divide (multiply (inverse ?45287) ?45287) ?45286) [45287, 45286] by Demod 97428 with 96955 at 1,3
% 34.41/8.98 Id : 98243, {_}: multiply ?510722 ?510723 =<= inverse (divide (inverse ?510723) ?510722) [510723, 510722] by Super 97429 with 96955 at 1,3
% 34.41/8.98 Id : 98297, {_}: multiply ?511073 (divide (multiply (inverse ?511074) ?511074) ?511075) =>= inverse (divide ?511075 ?511073) [511075, 511074, 511073] by Super 98243 with 97429 at 1,1,3
% 34.41/8.98 Id : 7034, {_}: ?40766 =<= inverse (divide (divide (divide ?40767 ?40767) ?40768) (divide (multiply ?40766 ?40769) (multiply ?40768 ?40769))) [40769, 40768, 40767, 40766] by Demod 6830 with 3 at 1,2,1,3
% 34.41/8.98 Id : 8606, {_}: ?49758 =<= inverse (divide (divide (multiply (inverse ?49759) ?49759) ?49760) (divide (multiply ?49758 ?49761) (multiply ?49760 ?49761))) [49761, 49760, 49759, 49758] by Super 7034 with 3 at 1,1,1,3
% 34.41/8.98 Id : 8672, {_}: ?50247 =<= inverse (divide (multiply (multiply (inverse ?50248) ?50248) ?50249) (divide (multiply ?50247 ?50250) (multiply (inverse ?50249) ?50250))) [50250, 50249, 50248, 50247] by Super 8606 with 3 at 1,1,3
% 34.41/8.98 Id : 10365, {_}: multiply ?57383 (divide (multiply (multiply (inverse ?57384) ?57384) ?57385) (divide (multiply ?57386 ?57387) (multiply (inverse ?57385) ?57387))) =>= divide ?57383 ?57386 [57387, 57386, 57385, 57384, 57383] by Super 3 with 8672 at 2,3
% 34.41/8.98 Id : 97349, {_}: multiply ?57383 (divide (multiply (multiply (inverse ?57384) ?57384) ?57385) (divide ?57386 (inverse ?57385))) =>= divide ?57383 ?57386 [57386, 57385, 57384, 57383] by Demod 10365 with 96955 at 2,2,2
% 34.41/8.98 Id : 97368, {_}: multiply ?57383 (divide (multiply (multiply (inverse ?57384) ?57384) ?57385) (multiply ?57386 ?57385)) =>= divide ?57383 ?57386 [57386, 57385, 57384, 57383] by Demod 97349 with 3 at 2,2,2
% 34.41/8.98 Id : 97369, {_}: multiply ?57383 (divide (multiply (inverse ?57384) ?57384) ?57386) =>= divide ?57383 ?57386 [57386, 57384, 57383] by Demod 97368 with 96955 at 2,2
% 34.41/8.98 Id : 98395, {_}: divide ?511073 ?511075 =<= inverse (divide ?511075 ?511073) [511075, 511073] by Demod 98297 with 97369 at 2
% 34.41/8.98 Id : 98541, {_}: multiply ?511688 (divide ?511689 ?511690) =<= divide ?511688 (divide ?511690 ?511689) [511690, 511689, 511688] by Super 3 with 98395 at 2,3
% 34.41/8.98 Id : 102023, {_}: divide (divide ?519246 ?519247) ?519248 =<= inverse (multiply ?519248 (divide ?519247 ?519246)) [519248, 519247, 519246] by Super 98395 with 98541 at 1,3
% 34.41/8.98 Id : 102090, {_}: divide (divide ?519668 ?519668) ?519669 =>= inverse ?519669 [519669, 519668] by Super 102023 with 95738 at 1,3
% 34.41/8.98 Id : 102881, {_}: multiply (divide ?520159 ?520159) ?520160 =>= inverse (inverse ?520160) [520160, 520159] by Super 3 with 102090 at 3
% 34.41/8.98 Id : 102897, {_}: divide ?520237 (divide ?520238 ?520238) =>= inverse (inverse ?520237) [520238, 520237] by Super 98395 with 102090 at 1,3
% 34.41/8.98 Id : 103240, {_}: multiply ?520237 (divide ?520238 ?520238) =>= inverse (inverse ?520237) [520238, 520237] by Demod 102897 with 98541 at 2
% 34.41/8.98 Id : 103241, {_}: ?520237 =<= inverse (inverse ?520237) [520237] by Demod 103240 with 95738 at 2
% 34.41/8.98 Id : 105053, {_}: multiply (divide ?522980 ?522980) ?522981 =>= ?522981 [522981, 522980] by Demod 102881 with 103241 at 3
% 34.41/8.98 Id : 105060, {_}: multiply (multiply (inverse ?523008) ?523008) ?523009 =>= ?523009 [523009, 523008] by Super 105053 with 3 at 1,2
% 34.41/8.98 Id : 107795, {_}: a2 === a2 [] by Demod 1 with 105060 at 2
% 34.41/8.98 Id : 1, {_}: multiply (multiply (inverse b2) b2) a2 =>= a2 [] by prove_these_axioms_2
% 34.41/8.98 % SZS output end CNFRefutation for theBenchmark.p
% 34.41/8.98 14074: solved /export/starexec/sandbox/benchmark/theBenchmark.p in 8.656895 using nrkbo
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