TSTP Solution File: LCL636+1.005 by SOS---2.0
View Problem
- Process Solution
%------------------------------------------------------------------------------
% File : SOS---2.0
% Problem : LCL636+1.005 : TPTP v8.1.0. Released v4.0.0.
% Transfm : none
% Format : tptp:raw
% Command : sos-script %s
% Computer : n027.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 : Sun Jul 17 14:31:10 EDT 2022
% Result : Theorem 48.45s 48.64s
% Output : Refutation 48.45s
% Verified :
% SZS Type : -
% Comments :
%------------------------------------------------------------------------------
%----WARNING: Could not form TPTP format derivation
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% 0.09/0.11 % Problem : LCL636+1.005 : TPTP v8.1.0. Released v4.0.0.
% 0.09/0.12 % Command : sos-script %s
% 0.13/0.33 % Computer : n027.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 : Sat Jul 2 21:31:24 EDT 2022
% 0.13/0.33 % CPUTime :
% 3.82/4.01 ----- Otter 3.2, August 2001 -----
% 3.82/4.01 The process was started by sandbox on n027.cluster.edu,
% 3.82/4.01 Sat Jul 2 21:31:24 2022
% 3.82/4.01 The command was "./sos". The process ID is 672.
% 3.82/4.01
% 3.82/4.01 set(prolog_style_variables).
% 3.82/4.01 set(auto).
% 3.82/4.01 dependent: set(auto1).
% 3.82/4.01 dependent: set(process_input).
% 3.82/4.01 dependent: clear(print_kept).
% 3.82/4.01 dependent: clear(print_new_demod).
% 3.82/4.01 dependent: clear(print_back_demod).
% 3.82/4.01 dependent: clear(print_back_sub).
% 3.82/4.01 dependent: set(control_memory).
% 3.82/4.01 dependent: assign(max_mem, 12000).
% 3.82/4.01 dependent: assign(pick_given_ratio, 4).
% 3.82/4.01 dependent: assign(stats_level, 1).
% 3.82/4.01 dependent: assign(pick_semantic_ratio, 3).
% 3.82/4.01 dependent: assign(sos_limit, 5000).
% 3.82/4.01 dependent: assign(max_weight, 60).
% 3.82/4.01 clear(print_given).
% 3.82/4.01
% 3.82/4.01 formula_list(usable).
% 3.82/4.01
% 3.82/4.01 SCAN INPUT: prop=0, horn=0, equality=0, symmetry=0, max_lits=10.
% 3.82/4.01
% 3.82/4.01 This is a non-Horn set without equality. The strategy
% 3.82/4.01 will be ordered hyper_res, ur_res, unit deletion, and
% 3.82/4.01 factoring, with satellites in sos and nuclei in usable.
% 3.82/4.01
% 3.82/4.01 dependent: set(hyper_res).
% 3.82/4.01 dependent: set(factor).
% 3.82/4.01 dependent: set(unit_deletion).
% 3.82/4.01
% 3.82/4.01 ------------> process usable:
% 3.82/4.01 Following clause subsumed by 1 during input processing: 0 [] {-} -r1($c11,A)| -r1(A,B)| -r1(B,C)| -r1(C,D)| -r1(D,E)| -r1(E,F)| -p3(F)| -p102(F)|p3(E)| -p102(E).
% 3.82/4.01 Following clause subsumed by 1 during input processing: 0 [] {-} -r1($c11,A)| -r1(A,B)| -r1(B,C)| -r1(C,D)| -r1(D,E)|p3(E)| -p102(E)| -p3(D)| -p102(D).
% 3.82/4.01 1140 back subsumes 1131.
% 3.82/4.01 1140 back subsumes 1130.
% 3.82/4.01 1140 back subsumes 1129.
% 3.82/4.01 1140 back subsumes 1128.
% 3.82/4.01 1140 back subsumes 1127.
% 3.82/4.01 1140 back subsumes 1126.
% 3.82/4.01 1140 back subsumes 1125.
% 3.82/4.01 1140 back subsumes 1124.
% 3.82/4.01 1148 back subsumes 1146.
% 3.82/4.01
% 3.82/4.01 ------------> process sos:
% 3.82/4.01
% 3.82/4.01 ======= end of input processing =======
% 7.85/8.08
% 7.85/8.08 Model 1 (0.00 seconds, 0 Inserts)
% 7.85/8.08
% 7.85/8.08 Stopped by limit on number of solutions
% 7.85/8.08
% 7.85/8.08
% 7.85/8.08 -------------- Softie stats --------------
% 7.85/8.08
% 7.85/8.08 UPDATE_STOP: 300
% 7.85/8.08 SFINDER_TIME_LIMIT: 2
% 7.85/8.08 SHORT_CLAUSE_CUTOFF: 4
% 7.85/8.08 number of clauses in intial UL: 1998
% 7.85/8.08 number of clauses initially in problem: 1999
% 7.85/8.08 percentage of clauses intially in UL: 99
% 7.85/8.08 percentage of distinct symbols occuring in initial UL: 100
% 7.85/8.08 percent of all initial clauses that are short: 100
% 7.85/8.08 absolute distinct symbol count: 73
% 7.85/8.08 distinct predicate count: 14
% 7.85/8.08 distinct function count: 50
% 7.85/8.08 distinct constant count: 9
% 7.85/8.08
% 7.85/8.08 ---------- no more Softie stats ----------
% 7.85/8.08
% 7.85/8.08
% 7.85/8.08
% 7.85/8.08 Stopped by limit on insertions
% 7.85/8.08
% 7.85/8.08 =========== start of search ===========
% 48.45/48.64
% 48.45/48.64 -- HEY sandbox, WE HAVE A PROOF!! --
% 48.45/48.64
% 48.45/48.64 Stopped by limit on insertions
% 48.45/48.64
% 48.45/48.64 Model 2 [ 1 9 7402 ] (0.00 seconds, 250000 Inserts)
% 48.45/48.64
% 48.45/48.64 Stopped by limit on insertions
% 48.45/48.64
% 48.45/48.64 Model 3 [ 1 8 7405 ] (0.00 seconds, 250000 Inserts)
% 48.45/48.64
% 48.45/48.64 Stopped by limit on insertions
% 48.45/48.64
% 48.45/48.64 Model 4 [ 1 10 7450 ] (0.00 seconds, 250000 Inserts)
% 48.45/48.64
% 48.45/48.64 Stopped by limit on insertions
% 48.45/48.64
% 48.45/48.64 Model 5 [ 1 10 7564 ] (0.00 seconds, 250000 Inserts)
% 48.45/48.64
% 48.45/48.64 Stopped by limit on insertions
% 48.45/48.64
% 48.45/48.64 Model 6 [ 1 16 14789 ] (0.00 seconds, 250000 Inserts)
% 48.45/48.64
% 48.45/48.64 Stopped by limit on insertions
% 48.45/48.64
% 48.45/48.64 Model 7 [ 4 166 168661 ] (0.00 seconds, 250000 Inserts)
% 48.45/48.64
% 48.45/48.64 Stopped by limit on insertions
% 48.45/48.64
% 48.45/48.64 Model 8 [ 1 9 7475 ] (0.00 seconds, 250000 Inserts)
% 48.45/48.64
% 48.45/48.64 Stopped by limit on insertions
% 48.45/48.64
% 48.45/48.64 Model 9 [ 1 10 33840 ] (0.00 seconds, 250000 Inserts)
% 48.45/48.64
% 48.45/48.64 Stopped by limit on insertions
% 48.45/48.64
% 48.45/48.64 Model 10 [ 3 115 106500 ] (0.00 seconds, 250000 Inserts)
% 48.45/48.64
% 48.45/48.64 Stopped by limit on insertions
% 48.45/48.64
% 48.45/48.64 Model 11 [ 5 22 21127 ] (0.00 seconds, 250000 Inserts)
% 48.45/48.64
% 48.45/48.64 Stopped by limit on insertions
% 48.45/48.64
% 48.45/48.64 Model 12 [ 6 51 205071 ] (0.00 seconds, 250000 Inserts)
% 48.45/48.64
% 48.45/48.64 Stopped by limit on insertions
% 48.45/48.64
% 48.45/48.64 Model 13 [ 7 10 7476 ] (0.00 seconds, 250000 Inserts)
% 48.45/48.64
% 48.45/48.64 Stopped by limit on insertions
% 48.45/48.64
% 48.45/48.64 Model 14 [ 3 37 36688 ] (0.00 seconds, 250000 Inserts)
% 48.45/48.64
% 48.45/48.64 Stopped by limit on insertions
% 48.45/48.64
% 48.45/48.64 Model 15 [ 6 8 7402 ] (0.00 seconds, 250000 Inserts)
% 48.45/48.64
% 48.45/48.64 Stopped by limit on insertions
% 48.45/48.64
% 48.45/48.64 Model 16 [ 2 54 51250 ] (0.00 seconds, 250000 Inserts)
% 48.45/48.64
% 48.45/48.64 Stopped by limit on insertions
% 48.45/48.64
% 48.45/48.64 Model 17 [ 2 265 246746 ] (0.00 seconds, 250000 Inserts)
% 48.45/48.64
% 48.45/48.64 Stopped by limit on insertions
% 48.45/48.64
% 48.45/48.64 Model 18 [ 6 13 119206 ] (0.00 seconds, 250000 Inserts)
% 48.45/48.64
% 48.45/48.64 Stopped by limit on insertions
% 48.45/48.64
% 48.45/48.64 Model 19 [ 1 140 142413 ] (0.00 seconds, 250000 Inserts)
% 48.45/48.64
% 48.45/48.64 ----> UNIT CONFLICT at 48.02 sec ----> 6918 [binary,6917.1,337.1] {-} $F.
% 48.45/48.64
% 48.45/48.64 Length of proof is 42. Level of proof is 25.
% 48.45/48.64
% 48.45/48.64 ---------------- PROOF ----------------
% 48.45/48.64 % SZS status Theorem
% 48.45/48.64 % SZS output start Refutation
% 48.45/48.64
% 48.45/48.64 1 [] {+} -r1($c11,A)| -r1(A,B)| -r1(B,C)| -r1(C,D)| -r1(D,E)|p3(E).
% 48.45/48.64 54 [] {+} -r1($c11,A)| -r1(A,B)| -r1(B,C)| -r1(C,D)| -r1(D,E)|p104(E)| -p105(E).
% 48.45/48.64 55 [] {+} -r1($c11,A)| -r1(A,B)| -r1(B,C)| -r1(C,D)| -r1(D,E)|p103(E)| -p104(E).
% 48.45/48.64 56 [] {+} -r1($c11,A)| -r1(A,B)| -r1(B,C)| -r1(C,D)| -r1(D,E)|p102(E)| -p103(E).
% 48.45/48.64 63 [] {+} -r1($c11,A)| -r1(A,B)| -r1(B,C)| -r1(C,D)|r1(D,$f12(A,B,C,D))|p105(D)| -p104(D).
% 48.45/48.64 66 [] {+} -r1($c11,A)| -r1(A,B)| -r1(B,C)| -r1(C,D)|p105($f12(A,B,C,D))|p105(D)| -p104(D).
% 48.45/48.64 105 [] {+} -r1($c11,A)| -r1(A,B)| -r1(B,C)| -r1(C,D)| -r1(D,E)| -p3(E)| -p102(E)|p3(D)| -p102(D).
% 48.45/48.64 112 [] {+} -r1($c11,A)| -r1(A,B)| -r1(B,C)| -r1(C,D)|p103(D)| -p104(D).
% 48.45/48.64 113 [] {+} -r1($c11,A)| -r1(A,B)| -r1(B,C)| -r1(C,D)|p102(D)| -p103(D).
% 48.45/48.64 128 [] {+} -r1($c11,A)| -r1(A,B)| -r1(B,C)|r1(C,$f24(A,B,C))|p104(C)| -p103(C).
% 48.45/48.64 130 [] {+} -r1($c11,A)| -r1(A,B)| -r1(B,C)| -p105($f24(A,B,C))|p104(C)| -p103(C).
% 48.45/48.64 131 [] {+} -r1($c11,A)| -r1(A,B)| -r1(B,C)|p104($f24(A,B,C))|p104(C)| -p103(C).
% 48.45/48.64 162 [] {+} -r1($c11,A)| -r1(A,B)| -r1(B,C)| -r1(C,D)| -p3(D)| -p102(D)|p3(C)| -p102(C).
% 48.45/48.64 171 [] {+} -r1($c11,A)| -r1(A,B)| -r1(B,C)|p102(C)| -p103(C).
% 48.45/48.64 194 [] {+} -r1($c11,A)| -r1(A,B)|r1(B,$f36(A,B))|p103(B)| -p102(B).
% 48.45/48.64 196 [] {+} -r1($c11,A)| -r1(A,B)| -p104($f36(A,B))|p103(B)| -p102(B).
% 48.45/48.64 197 [] {+} -r1($c11,A)| -r1(A,B)|p103($f36(A,B))|p103(B)| -p102(B).
% 48.45/48.64 220 [] {+} -r1($c11,A)| -r1(A,B)| -r1(B,C)| -p3(C)| -p102(C)|p3(B)| -p102(B).
% 48.45/48.64 256 [] {+} -r1($c11,A)|r1(A,$f47(A))|p102(A)| -p101(A).
% 48.45/48.64 257 [] {+} -r1($c11,A)| -p3($f47(A))|p102(A)| -p101(A).
% 48.45/48.64 258 [] {+} -r1($c11,A)| -p103($f47(A))|p102(A)| -p101(A).
% 48.45/48.64 259 [] {+} -r1($c11,A)|p102($f47(A))|p102(A)| -p101(A).
% 48.45/48.64 318 [] {+} r1($c11,$c10)|p101($c11)| -p100($c11).
% 48.45/48.64 320 [] {+} -p102($c10)|p101($c11)| -p100($c11).
% 48.45/48.64 321 [] {+} p101($c10)|p101($c11)| -p100($c11).
% 48.45/48.64 337 [] {+} -p101($c11).
% 48.45/48.64 2008 [] {-} p100($c11).
% 48.45/48.64 2009 [hyper,2008,321,unit_del,337] {+} p101($c10).
% 48.45/48.64 2011 [hyper,2008,318,unit_del,337] {+} r1($c11,$c10).
% 48.45/48.64 2018 [hyper,2011,259,2009] {+} p102($f47($c10))|p102($c10).
% 48.45/48.64 2019 [hyper,2011,256,2009] {+} r1($c10,$f47($c10))|p102($c10).
% 48.45/48.64 2027 [hyper,2018,320,2008,unit_del,337] {+} p102($f47($c10)).
% 48.45/48.64 2038 [hyper,2019,320,2008,unit_del,337] {+} r1($c10,$f47($c10)).
% 48.45/48.64 2040 [hyper,2038,197,2011,2027] {+} p103($f36($c10,$f47($c10)))|p103($f47($c10)).
% 48.45/48.64 2042 [hyper,2038,194,2011,2027] {+} r1($f47($c10),$f36($c10,$f47($c10)))|p103($f47($c10)).
% 48.45/48.64 2082 [hyper,2040,258,2011,2009] {+} p103($f36($c10,$f47($c10)))|p102($c10).
% 48.45/48.64 2106 [hyper,2042,258,2011,2009] {+} r1($f47($c10),$f36($c10,$f47($c10)))|p102($c10).
% 48.45/48.64 2204 [hyper,2106,320,2008,unit_del,337] {+} r1($f47($c10),$f36($c10,$f47($c10))).
% 48.45/48.64 2205 [hyper,2204,171,2011,2038,2082] {+} p102($f36($c10,$f47($c10)))|p102($c10).
% 48.45/48.64 2207 [hyper,2204,131,2011,2038,2082] {+} p104($f24($c10,$f47($c10),$f36($c10,$f47($c10))))|p104($f36($c10,$f47($c10)))|p102($c10).
% 48.45/48.64 2208 [hyper,2204,131,2011,2038,2040] {+} p104($f24($c10,$f47($c10),$f36($c10,$f47($c10))))|p104($f36($c10,$f47($c10)))|p103($f47($c10)).
% 48.45/48.64 2212 [hyper,2204,128,2011,2038,2040] {+} r1($f36($c10,$f47($c10)),$f24($c10,$f47($c10),$f36($c10,$f47($c10))))|p104($f36($c10,$f47($c10)))|p103($f47($c10)).
% 48.45/48.64 2224 [hyper,2205,320,2008,unit_del,337] {+} p102($f36($c10,$f47($c10))).
% 48.45/48.64 2857 [hyper,2208,196,2011,2038,2027,factor_simp] {+} p104($f24($c10,$f47($c10),$f36($c10,$f47($c10))))|p103($f47($c10)).
% 48.45/48.64 3016 [hyper,2212,196,2011,2038,2027,factor_simp] {+} r1($f36($c10,$f47($c10)),$f24($c10,$f47($c10),$f36($c10,$f47($c10))))|p103($f47($c10)).
% 48.45/48.64 3017 [hyper,3016,258,2011,2009] {+} r1($f36($c10,$f47($c10)),$f24($c10,$f47($c10),$f36($c10,$f47($c10))))|p102($c10).
% 48.45/48.64 3023 [hyper,3017,320,2008,unit_del,337] {+} r1($f36($c10,$f47($c10)),$f24($c10,$f47($c10),$f36($c10,$f47($c10)))).
% 48.45/48.64 3024 [hyper,3023,112,2011,2038,2204,2857] {+} p103($f24($c10,$f47($c10),$f36($c10,$f47($c10))))|p103($f47($c10)).
% 48.45/48.64 3027 [hyper,3023,66,2011,2038,2204,2207] {+} p105($f12($c10,$f47($c10),$f36($c10,$f47($c10)),$f24($c10,$f47($c10),$f36($c10,$f47($c10)))))|p105($f24($c10,$f47($c10),$f36($c10,$f47($c10))))|p104($f36($c10,$f47($c10)))|p102($c10).
% 48.45/48.64 3031 [hyper,3023,63,2011,2038,2204,2207] {+} r1($f24($c10,$f47($c10),$f36($c10,$f47($c10))),$f12($c10,$f47($c10),$f36($c10,$f47($c10)),$f24($c10,$f47($c10),$f36($c10,$f47($c10)))))|p105($f24($c10,$f47($c10),$f36($c10,$f47($c10))))|p104($f36($c10,$f47($c10)))|p102($c10).
% 48.45/48.64 3041 [hyper,3024,258,2011,2009] {+} p103($f24($c10,$f47($c10),$f36($c10,$f47($c10))))|p102($c10).
% 48.45/48.64 3053 [hyper,3041,113,2011,2038,2204,3023] {+} p102($c10)|p102($f24($c10,$f47($c10),$f36($c10,$f47($c10)))).
% 48.45/48.64 3059 [hyper,3053,320,2008,unit_del,337] {+} p102($f24($c10,$f47($c10),$f36($c10,$f47($c10)))).
% 48.45/48.64 5691 [hyper,3027,130,2011,2038,2204,2082,factor_simp,factor_simp] {+} p105($f12($c10,$f47($c10),$f36($c10,$f47($c10)),$f24($c10,$f47($c10),$f36($c10,$f47($c10)))))|p104($f36($c10,$f47($c10)))|p102($c10).
% 48.45/48.64 5702 [hyper,3031,130,2011,2038,2204,2082,factor_simp,factor_simp] {+} r1($f24($c10,$f47($c10),$f36($c10,$f47($c10))),$f12($c10,$f47($c10),$f36($c10,$f47($c10)),$f24($c10,$f47($c10),$f36($c10,$f47($c10)))))|p104($f36($c10,$f47($c10)))|p102($c10).
% 48.45/48.64 6841 [hyper,5702,196,2011,2038,2027] {+} r1($f24($c10,$f47($c10),$f36($c10,$f47($c10))),$f12($c10,$f47($c10),$f36($c10,$f47($c10)),$f24($c10,$f47($c10),$f36($c10,$f47($c10)))))|p102($c10)|p103($f47($c10)).
% 48.45/48.64 6847 [hyper,6841,258,2011,2009,factor_simp] {+} r1($f24($c10,$f47($c10),$f36($c10,$f47($c10))),$f12($c10,$f47($c10),$f36($c10,$f47($c10)),$f24($c10,$f47($c10),$f36($c10,$f47($c10)))))|p102($c10).
% 48.45/48.64 6848 [hyper,6847,320,2008,unit_del,337] {+} r1($f24($c10,$f47($c10),$f36($c10,$f47($c10))),$f12($c10,$f47($c10),$f36($c10,$f47($c10)),$f24($c10,$f47($c10),$f36($c10,$f47($c10))))).
% 48.45/48.64 6849 [hyper,6848,54,2011,2038,2204,3023,5691] {+} p104($f12($c10,$f47($c10),$f36($c10,$f47($c10)),$f24($c10,$f47($c10),$f36($c10,$f47($c10)))))|p104($f36($c10,$f47($c10)))|p102($c10).
% 48.45/48.64 6852 [hyper,6848,1,2011,2038,2204,3023] {+} p3($f12($c10,$f47($c10),$f36($c10,$f47($c10)),$f24($c10,$f47($c10),$f36($c10,$f47($c10))))).
% 48.45/48.64 6883 [hyper,6849,196,2011,2038,2027] {+} p104($f12($c10,$f47($c10),$f36($c10,$f47($c10)),$f24($c10,$f47($c10),$f36($c10,$f47($c10)))))|p102($c10)|p103($f47($c10)).
% 48.45/48.64 6889 [hyper,6883,55,2011,2038,2204,3023,6848] {+} p102($c10)|p103($f47($c10))|p103($f12($c10,$f47($c10),$f36($c10,$f47($c10)),$f24($c10,$f47($c10),$f36($c10,$f47($c10))))).
% 48.45/48.64 6893 [hyper,6889,258,2011,2009,factor_simp] {+} p102($c10)|p103($f12($c10,$f47($c10),$f36($c10,$f47($c10)),$f24($c10,$f47($c10),$f36($c10,$f47($c10))))).
% 48.45/48.64 6903 [hyper,6893,56,2011,2038,2204,3023,6848] {+} p102($c10)|p102($f12($c10,$f47($c10),$f36($c10,$f47($c10)),$f24($c10,$f47($c10),$f36($c10,$f47($c10))))).
% 48.45/48.64 6908 [hyper,6903,105,2011,2038,2204,3023,6848,6852,3059] {+} p102($c10)|p3($f24($c10,$f47($c10),$f36($c10,$f47($c10)))).
% 48.45/48.64 6910 [hyper,6908,162,2011,2038,2204,3023,3059,2224] {+} p102($c10)|p3($f36($c10,$f47($c10))).
% 48.45/48.64 6911 [hyper,6910,220,2011,2038,2204,2224,2027] {+} p102($c10)|p3($f47($c10)).
% 48.45/48.64 6916 [hyper,6911,257,2011,2009,factor_simp] {+} p102($c10).
% 48.45/48.64 6917 [hyper,6916,320,2008] {-} p101($c11).
% 48.45/48.64 6918 [binary,6917.1,337.1] {-} $F.
% 48.45/48.64
% 48.45/48.64 % SZS output end Refutation
% 48.45/48.64 ------------ end of proof -------------
% 48.45/48.64
% 48.45/48.64
% 48.45/48.64 Search stopped by max_proofs option.
% 48.45/48.64
% 48.45/48.64
% 48.45/48.64 Search stopped by max_proofs option.
% 48.45/48.64
% 48.45/48.64 ============ end of search ============
% 48.45/48.64
% 48.45/48.64 ----------- soft-scott stats ----------
% 48.45/48.64
% 48.45/48.64 true clauses given 2001 (94.0%)
% 48.45/48.64 false clauses given 127
% 48.45/48.64
% 48.45/48.64 FALSE TRUE
% 48.45/48.64 17 0 1
% 48.45/48.64 25 0 1
% 48.45/48.64 29 0 1
% 48.45/48.64 32 0 92
% 48.45/48.64 33 0 25
% 48.45/48.64 34 0 36
% 48.45/48.64 36 0 324
% 48.45/48.64 37 0 4
% 48.45/48.64 40 0 224
% 48.45/48.64 41 0 4
% 48.45/48.64 43 0 96
% 48.45/48.64 44 0 96
% 48.45/48.64 45 0 48
% 48.45/48.64 48 0 46
% 48.45/48.64 50 0 24
% 48.45/48.64 51 0 128
% 48.45/48.64 52 0 46
% 48.45/48.64 53 0 92
% 48.45/48.64 59 0 42
% 48.45/48.64 tot: 0 1330 (100.0% true)
% 48.45/48.64
% 48.45/48.64
% 48.45/48.64 Model 19 [ 1 140 142413 ] (0.00 seconds, 250000 Inserts)
% 48.45/48.64
% 48.45/48.64 That finishes the proof of the theorem.
% 48.45/48.64
% 48.45/48.64 Process 672 finished Sat Jul 2 21:32:12 2022
%------------------------------------------------------------------------------