TSTP Solution File: PUZ028-5 by SOS---2.0

View Problem - Process Solution 
%------------------------------------------------------------------------------
% File     : SOS---2.0
% Problem  : PUZ028-5 : TPTP v8.1.0. Released v2.0.0.
% Transfm  : none
% Format   : tptp:raw
% Command  : sos-script %s

% Computer : n017.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 18:27:00 EDT 2022

% Result   : Unsatisfiable 4.43s 4.64s
% Output   : Refutation 4.43s
% Verified : 
% SZS Type : -

% Comments : 
%------------------------------------------------------------------------------
%----WARNING: Could not form TPTP format derivation
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% 0.03/0.12  % Problem  : PUZ028-5 : TPTP v8.1.0. Released v2.0.0.
% 0.03/0.13  % Command  : sos-script %s
% 0.12/0.34  % Computer : n017.cluster.edu
% 0.12/0.34  % Model    : x86_64 x86_64
% 0.12/0.34  % CPU      : Intel(R) Xeon(R) CPU E5-2620 v4 @ 2.10GHz
% 0.12/0.34  % Memory   : 8042.1875MB
% 0.12/0.34  % OS       : Linux 3.10.0-693.el7.x86_64
% 0.12/0.34  % CPULimit : 300
% 0.12/0.34  % WCLimit  : 600
% 0.12/0.34  % DateTime : Sat May 28 19:25:38 EDT 2022
% 0.12/0.34  % CPUTime  : 
% 0.20/0.36  ----- Otter 3.2, August 2001 -----
% 0.20/0.36  The process was started by sandbox on n017.cluster.edu,
% 0.20/0.36  Sat May 28 19:25:38 2022
% 0.20/0.36  The command was "./sos".  The process ID is 17977.
% 0.20/0.36  
% 0.20/0.36  set(prolog_style_variables).
% 0.20/0.36  set(auto).
% 0.20/0.36     dependent: set(auto1).
% 0.20/0.36     dependent: set(process_input).
% 0.20/0.36     dependent: clear(print_kept).
% 0.20/0.36     dependent: clear(print_new_demod).
% 0.20/0.36     dependent: clear(print_back_demod).
% 0.20/0.36     dependent: clear(print_back_sub).
% 0.20/0.36     dependent: set(control_memory).
% 0.20/0.36     dependent: assign(max_mem, 12000).
% 0.20/0.36     dependent: assign(pick_given_ratio, 4).
% 0.20/0.36     dependent: assign(stats_level, 1).
% 0.20/0.36     dependent: assign(pick_semantic_ratio, 3).
% 0.20/0.36     dependent: assign(sos_limit, 5000).
% 0.20/0.36     dependent: assign(max_weight, 60).
% 0.20/0.36  clear(print_given).
% 0.20/0.36  
% 0.20/0.36  list(usable).
% 0.20/0.36  
% 0.20/0.36  SCAN INPUT: prop=0, horn=0, equality=0, symmetry=0, max_lits=5.
% 0.20/0.36  
% 0.20/0.36  This is a non-Horn set without equality.  The strategy
% 0.20/0.36  will be ordered hyper_res, ur_res, unit deletion, and
% 0.20/0.36  factoring, with satellites in sos and nuclei in usable.
% 0.20/0.36  
% 0.20/0.36     dependent: set(hyper_res).
% 0.20/0.36     dependent: set(factor).
% 0.20/0.36     dependent: set(unit_deletion).
% 0.20/0.36  
% 0.20/0.36  ------------> process usable:
% 0.20/0.36  
% 0.20/0.36  ------------> process sos:
% 0.20/0.36  
% 0.20/0.36  ======= end of input processing =======
% 0.20/0.40  
% 0.20/0.40  Model 1 (0.00 seconds, 0 Inserts)
% 0.20/0.40  
% 0.20/0.40  Stopped by limit on number of solutions
% 0.20/0.40  
% 0.20/0.40  
% 0.20/0.40  -------------- Softie stats --------------
% 0.20/0.40  
% 0.20/0.40  UPDATE_STOP: 300
% 0.20/0.40  SFINDER_TIME_LIMIT: 2
% 0.20/0.40  SHORT_CLAUSE_CUTOFF: 4
% 0.20/0.40  number of clauses in intial UL: 7
% 0.20/0.40  number of clauses initially in problem: 18
% 0.20/0.40  percentage of clauses intially in UL: 38
% 0.20/0.40  percentage of distinct symbols occuring in initial UL: 40
% 0.20/0.40  percent of all initial clauses that are short: 100
% 0.20/0.40  absolute distinct symbol count: 10
% 0.20/0.40     distinct predicate count: 4
% 0.20/0.40     distinct function count: 0
% 0.20/0.40     distinct constant count: 6
% 0.20/0.40  
% 0.20/0.40  ---------- no more Softie stats ----------
% 0.20/0.40  
% 0.20/0.40  
% 0.20/0.40  
% 0.20/0.40  Model 2 (0.00 seconds, 0 Inserts)
% 0.20/0.40  
% 0.20/0.40  Stopped by limit on number of solutions
% 0.20/0.40  
% 0.20/0.40  =========== start of search ===========
% 4.43/4.64  
% 4.43/4.64  -------- PROOF -------- 
% 4.43/4.64  % SZS status Unsatisfiable
% 4.43/4.64  % SZS output start Refutation
% 4.43/4.64  
% 4.43/4.64  Model 3 (0.00 seconds, 0 Inserts)
% 4.43/4.64  
% 4.43/4.64  Stopped by limit on number of solutions
% 4.43/4.64  
% 4.43/4.64  Model 4 (0.00 seconds, 0 Inserts)
% 4.43/4.64  
% 4.43/4.64  Stopped by limit on number of solutions
% 4.43/4.64  
% 4.43/4.64  Model 5 (0.00 seconds, 0 Inserts)
% 4.43/4.64  
% 4.43/4.64  Stopped by limit on number of solutions
% 4.43/4.64  
% 4.43/4.64  Model 6 (0.00 seconds, 0 Inserts)
% 4.43/4.64  
% 4.43/4.64  Stopped by limit on number of solutions
% 4.43/4.64  
% 4.43/4.64  Model 7 (0.00 seconds, 0 Inserts)
% 4.43/4.64  
% 4.43/4.64  Stopped by limit on number of solutions
% 4.43/4.64  
% 4.43/4.64  Model 8 (0.00 seconds, 0 Inserts)
% 4.43/4.64  
% 4.43/4.64  Stopped by limit on number of solutions
% 4.43/4.64  
% 4.43/4.64  Stopped by limit on insertions
% 4.43/4.64  
% 4.43/4.64  Model 9 [ 1 5 174489 ] (0.00 seconds, 250000 Inserts)
% 4.43/4.64  
% 4.43/4.64  Stopped by limit on insertions
% 4.43/4.64  
% 4.43/4.64  Model 10 [ 1 2 90698 ] (0.00 seconds, 250000 Inserts)
% 4.43/4.64  
% 4.43/4.64  Stopped by limit on insertions
% 4.43/4.64  
% 4.43/4.64  Model 11 [ 1 1 462 ] (0.00 seconds, 250000 Inserts)
% 4.43/4.64  
% 4.43/4.64  Stopped by limit on insertions
% 4.43/4.64  
% 4.43/4.64  Model 12 [ 5 0 85 ] (0.00 seconds, 250000 Inserts)
% 4.43/4.64  
% 4.43/4.64  Stopped by limit on insertions
% 4.43/4.64  
% 4.43/4.64  Model 13 [ 1 1 185 ] (0.00 seconds, 250000 Inserts)
% 4.43/4.64  
% 4.43/4.64  Stopped by limit on insertions
% 4.43/4.64  
% 4.43/4.64  Model 14 [ 3 3 106994 ] (0.00 seconds, 250000 Inserts)
% 4.43/4.64  
% 4.43/4.64  Stopped by limit on insertions
% 4.43/4.64  
% 4.43/4.64  Model 15 [ 3 0 3732 ] (0.00 seconds, 250000 Inserts)
% 4.43/4.64  
% 4.43/4.64  Stopped by limit on insertions
% 4.43/4.64  
% 4.43/4.64  Model 16 [ 5 0 142 ] (0.00 seconds, 250000 Inserts)
% 4.43/4.64  
% 4.43/4.64  Stopped by limit on insertions
% 4.43/4.64  
% 4.43/4.64  Model 17 [ 3 1 278 ] (0.00 seconds, 250000 Inserts)
% 4.43/4.64  
% 4.43/4.64  Stopped by limit on insertions
% 4.43/4.64  
% 4.43/4.64  Model 18 [ 5 0 40 ] (0.00 seconds, 250000 Inserts)
% 4.43/4.64  
% 4.43/4.64  Stopped by limit on insertions
% 4.43/4.64  
% 4.43/4.64  Model 19 [ 5 3 102790 ] (0.00 seconds, 250000 Inserts)
% 4.43/4.64  
% 4.43/4.64  Stopped by limit on insertions
% 4.43/4.64  
% 4.43/4.64  Model 20 [ 6 1 140 ] (0.00 seconds, 250000 Inserts)
% 4.43/4.64  
% 4.43/4.64  Stopped by limit on insertions
% 4.43/4.64  
% 4.43/4.64  Model 21 [ 5 0 2411 ] (0.00 seconds, 250000 Inserts)
% 4.43/4.64  
% 4.43/4.64  Stopped by limit on insertions
% 4.43/4.64  
% 4.43/4.64  Model 22 [ 4 6 140270 ] (0.00 seconds, 250000 Inserts)
% 4.43/4.64  
% 4.43/4.64  Stopped by limit on insertions
% 4.43/4.64  
% 4.43/4.64  Model 23 [ 5 1 386 ] (0.00 seconds, 250000 Inserts)
% 4.43/4.64  
% 4.43/4.64  Stopped by limit on insertions
% 4.43/4.64  
% 4.43/4.64  Model 24 [ 6 0 476 ] (0.00 seconds, 250000 Inserts)
% 4.43/4.64  
% 4.43/4.64  Stopped by limit on insertions
% 4.43/4.64  
% 4.43/4.64  Model 25 [ 9 1 8484 ] (0.00 seconds, 250000 Inserts)
% 4.43/4.64  
% 4.43/4.64  Stopped by limit on insertions
% 4.43/4.64  
% 4.43/4.64  Model 26 [ 7 4 91738 ] (0.00 seconds, 250000 Inserts)
% 4.43/4.64  
% 4.43/4.64  Stopped by limit on insertions
% 4.43/4.64  
% 4.43/4.64  Model 27 [ 8 0 153 ] (0.00 seconds, 250000 Inserts)
% 4.43/4.64  
% 4.43/4.64  Stopped by limit on insertions
% 4.43/4.64  
% 4.43/4.64  Model 28 [ 7 12 219003 ] (0.00 seconds, 250000 Inserts)
% 4.43/4.64  
% 4.43/4.64  Stopped by limit on insertions
% 4.43/4.64  
% 4.43/4.64  Model 29 [ 9 12 194624 ] (0.00 seconds, 250000 Inserts)
% 4.43/4.64  
% 4.43/4.64  Stopped by limit on insertions
% 4.43/4.64  
% 4.43/4.64  Model 30 [ 8 1 4397 ] (0.00 seconds, 250000 Inserts)
% 4.43/4.64  
% 4.43/4.64  Stopped by limit on insertions
% 4.43/4.64  
% 4.43/4.64  Model 31 [ 6 1 891 ] (0.00 seconds, 250000 Inserts)
% 4.43/4.64  
% 4.43/4.64  Stopped by limit on insertions
% 4.43/4.64  
% 4.43/4.64  Model 32 [ 7 5 88379 ] (0.00 seconds, 250000 Inserts)
% 4.43/4.64  
% 4.43/4.64  Stopped by limit on insertions
% 4.43/4.64  
% 4.43/4.64  Model 33 [ 11 1 9740 ] (0.00 seconds, 250000 Inserts)
% 4.43/4.64  
% 4.43/4.64  Stopped by limit on insertions
% 4.43/4.64  
% 4.43/4.64  Model 34 [ 9 4 64541 ] (0.00 seconds, 250000 Inserts)
% 4.43/4.64  
% 4.43/4.64  Stopped by limit on insertions
% 4.43/4.64  
% 4.43/4.64  Model 35 [ 8 5 76887 ] (0.00 seconds, 250000 Inserts)
% 4.43/4.64  
% 4.43/4.64  Stopped by limit on insertions
% 4.43/4.64  
% 4.43/4.64  Model 36 [ 9 2 28397 ] (0.00 seconds, 250000 Inserts)
% 4.43/4.64  
% 4.43/4.64  Stopped by limit on insertions
% 4.43/4.64  
% 4.43/4.64  Model 37 [ 11 4 51733 ] (0.00 seconds, 250000 Inserts)
% 4.43/4.64  
% 4.43/4.64  -----> EMPTY CLAUSE at   4.20 sec ----> 1237 [hyper,1233,3,1220,1236] {-} $F.
% 4.43/4.64  
% 4.43/4.64  Length of proof is 144.  Level of proof is 26.
% 4.43/4.64  
% 4.43/4.64  ---------------- PROOF ----------------
% 4.43/4.64  % SZS status Unsatisfiable
% 4.43/4.64  % SZS output start Refutation
% 4.43/4.64  
% 4.43/4.64  1 [] {+} after(A,B)| -after(A,C)| -after(C,B).
% 4.43/4.64  2 [] {+} familiar(A,B)|not_familiar(A,B)| -person(A)| -person(B)| -after(A,B).
% 4.43/4.64  3 [] {+} -familiar(A,B)| -familiar(B,C)| -familiar(A,C).
% 4.43/4.64  4 [] {+} -not_familiar(A,B)| -not_familiar(B,C)| -not_familiar(A,C).
% 4.43/4.64  8 [] {+} person(one).
% 4.43/4.64  9 [] {+} person(two).
% 4.43/4.64  10 [] {+} person(three).
% 4.43/4.64  11 [] {+} person(four).
% 4.43/4.64  12 [] {+} person(five).
% 4.43/4.64  13 [] {+} person(six).
% 4.43/4.64  14 [] {+} after(one,two).
% 4.43/4.64  15 [] {+} after(two,three).
% 4.43/4.64  16 [] {+} after(three,four).
% 4.43/4.64  17 [] {+} after(four,five).
% 4.43/4.64  18 [] {+} after(five,six).
% 4.43/4.64  19 [hyper,14,2,8,9] {+} familiar(one,two)|not_familiar(one,two).
% 4.43/4.64  20 [hyper,15,2,9,10] {+} familiar(two,three)|not_familiar(two,three).
% 4.43/4.64  21 [hyper,15,1,14] {+} after(one,three).
% 4.43/4.64  22 [hyper,16,2,10,11] {+} familiar(three,four)|not_familiar(three,four).
% 4.43/4.64  23 [hyper,16,1,15] {+} after(two,four).
% 4.43/4.64  24 [hyper,17,2,11,12] {+} familiar(four,five)|not_familiar(four,five).
% 4.43/4.64  25 [hyper,17,1,16] {+} after(three,five).
% 4.43/4.64  26 [hyper,18,2,12,13] {+} familiar(five,six)|not_familiar(five,six).
% 4.43/4.64  27 [hyper,18,1,17] {+} after(four,six).
% 4.43/4.64  28 [hyper,21,2,8,10] {+} familiar(one,three)|not_familiar(one,three).
% 4.43/4.64  29 [hyper,21,1,16] {+} after(one,four).
% 4.43/4.64  30 [hyper,23,2,9,11] {+} familiar(two,four)|not_familiar(two,four).
% 4.43/4.64  31 [hyper,23,1,17] {+} after(two,five).
% 4.43/4.64  32 [hyper,25,2,10,12] {+} familiar(three,five)|not_familiar(three,five).
% 4.43/4.64  33 [hyper,25,1,21] {+} after(one,five).
% 4.43/4.64  34 [hyper,25,1,18] {+} after(three,six).
% 4.43/4.64  35 [hyper,27,2,11,13] {+} familiar(four,six)|not_familiar(four,six).
% 4.43/4.64  36 [hyper,27,1,23] {+} after(two,six).
% 4.43/4.64  37 [hyper,29,2,8,11] {+} familiar(one,four)|not_familiar(one,four).
% 4.43/4.64  38 [hyper,29,1,27] {+} after(one,six).
% 4.43/4.64  39 [hyper,31,2,9,12] {+} familiar(two,five)|not_familiar(two,five).
% 4.43/4.64  40 [hyper,34,2,10,13] {+} familiar(three,six)|not_familiar(three,six).
% 4.43/4.64  41 [hyper,28,4,19,20] {-} familiar(one,three)|familiar(one,two)|familiar(two,three).
% 4.43/4.64  42 [hyper,33,2,8,12] {+} familiar(one,five)|not_familiar(one,five).
% 4.43/4.64  43 [hyper,30,4,20,22] {-} familiar(two,four)|familiar(two,three)|familiar(three,four).
% 4.43/4.64  44 [hyper,32,4,22,24] {-} familiar(three,five)|familiar(three,four)|familiar(four,five).
% 4.43/4.64  45 [hyper,35,4,24,26] {-} familiar(four,six)|familiar(four,five)|familiar(five,six).
% 4.43/4.64  46 [hyper,36,2,9,13] {+} familiar(two,six)|not_familiar(two,six).
% 4.43/4.64  47 [hyper,39,4,30,24] {-} familiar(two,five)|familiar(two,four)|familiar(four,five).
% 4.43/4.64  48 [hyper,39,4,20,32] {-} familiar(two,five)|familiar(two,three)|familiar(three,five).
% 4.43/4.64  49 [hyper,37,4,28,22] {-} familiar(one,four)|familiar(one,three)|familiar(three,four).
% 4.43/4.64  50 [hyper,37,4,19,30] {-} familiar(one,four)|familiar(one,two)|familiar(two,four).
% 4.43/4.64  51 [hyper,38,2,8,13] {+} familiar(one,six)|not_familiar(one,six).
% 4.43/4.64  52 [hyper,40,4,32,26] {-} familiar(three,six)|familiar(three,five)|familiar(five,six).
% 4.43/4.64  53 [hyper,40,4,22,35] {-} familiar(three,six)|familiar(three,four)|familiar(four,six).
% 4.43/4.64  54 [hyper,42,4,37,24] {+} familiar(one,five)|familiar(one,four)|familiar(four,five).
% 4.43/4.64  55 [hyper,42,4,28,32] {+} familiar(one,five)|familiar(one,three)|familiar(three,five).
% 4.43/4.64  56 [hyper,42,4,19,39] {+} familiar(one,five)|familiar(one,two)|familiar(two,five).
% 4.43/4.64  57 [hyper,47,3,43,44,factor_simp,factor_simp,factor_simp] {-} familiar(two,four)|familiar(four,five)|familiar(three,four).
% 4.43/4.64  61 [hyper,48,3,44,47,factor_simp,factor_simp,factor_simp] {-} familiar(two,five)|familiar(three,five)|familiar(four,five).
% 4.43/4.64  63 [hyper,46,4,39,26] {-} familiar(two,six)|familiar(two,five)|familiar(five,six).
% 4.43/4.64  64 [hyper,46,4,30,35] {-} familiar(two,six)|familiar(two,four)|familiar(four,six).
% 4.43/4.64  65 [hyper,46,4,20,40] {-} familiar(two,six)|familiar(two,three)|familiar(three,six).
% 4.43/4.64  67 [hyper,49,3,41,43,factor_simp,factor_simp,factor_simp] {-} familiar(one,three)|familiar(three,four)|familiar(two,three).
% 4.43/4.64  71 [hyper,50,3,41,43,factor_simp,factor_simp,factor_simp] {-} familiar(one,two)|familiar(two,four)|familiar(two,three).
% 4.43/4.64  73 [hyper,50,3,43,49,factor_simp,factor_simp,factor_simp] {-} familiar(one,four)|familiar(two,four)|familiar(three,four).
% 4.43/4.64  75 [hyper,50,3,41,49,factor_simp,factor_simp,factor_simp] {-} familiar(one,four)|familiar(one,two)|familiar(one,three).
% 4.43/4.64  78 [hyper,52,3,44,45,factor_simp,factor_simp,factor_simp] {-} familiar(three,five)|familiar(five,six)|familiar(four,five).
% 4.43/4.64  83 [hyper,51,4,42,26] {+} familiar(one,six)|familiar(one,five)|familiar(five,six).
% 4.43/4.64  84 [hyper,51,4,37,35] {+} familiar(one,six)|familiar(one,four)|familiar(four,six).
% 4.43/4.64  85 [hyper,51,4,28,40] {+} familiar(one,six)|familiar(one,three)|familiar(three,six).
% 4.43/4.64  86 [hyper,51,4,19,46] {+} familiar(one,six)|familiar(one,two)|familiar(two,six).
% 4.43/4.64  88 [hyper,53,3,44,45,factor_simp,factor_simp,factor_simp] {-} familiar(three,four)|familiar(four,six)|familiar(four,five).
% 4.43/4.64  92 [hyper,53,3,45,52,factor_simp,factor_simp,factor_simp] {-} familiar(three,six)|familiar(four,six)|familiar(five,six).
% 4.43/4.64  94 [hyper,53,3,44,52,factor_simp,factor_simp,factor_simp] {-} familiar(three,six)|familiar(three,four)|familiar(three,five).
% 4.43/4.64  97 [hyper,54,3,50,47,factor_simp,factor_simp,factor_simp] {-} familiar(one,four)|familiar(four,five)|familiar(two,four).
% 4.43/4.64  123 [hyper,63,3,48,52,factor_simp,factor_simp,factor_simp] {-} familiar(two,five)|familiar(five,six)|familiar(three,five).
% 4.43/4.64  124 [hyper,63,3,47,45,factor_simp,factor_simp,factor_simp] {-} familiar(two,five)|familiar(five,six)|familiar(four,five).
% 4.43/4.64  159 [hyper,64,3,47,63,factor_simp,factor_simp,factor_simp] {-} familiar(two,six)|familiar(two,four)|familiar(two,five).
% 4.43/4.64  167 [hyper,65,3,48,52,factor_simp,factor_simp,factor_simp] {-} familiar(two,three)|familiar(three,six)|familiar(three,five).
% 4.43/4.64  169 [hyper,65,3,53,64,factor_simp,factor_simp,factor_simp] {-} familiar(two,six)|familiar(three,six)|familiar(four,six).
% 4.43/4.64  170 [hyper,65,3,52,63,factor_simp,factor_simp,factor_simp] {-} familiar(two,six)|familiar(three,six)|familiar(five,six).
% 4.43/4.64  178 [hyper,65,3,48,63,factor_simp,factor_simp,factor_simp] {-} familiar(two,six)|familiar(two,three)|familiar(two,five).
% 4.43/4.64  179 [hyper,65,3,43,64,factor_simp,factor_simp,factor_simp] {-} familiar(two,six)|familiar(two,three)|familiar(two,four).
% 4.43/4.64  190 [hyper,55,3,49,44,factor_simp,factor_simp,factor_simp] {-} familiar(one,three)|familiar(three,five)|familiar(three,four).
% 4.43/4.64  194 [hyper,55,3,41,48,factor_simp,factor_simp,factor_simp] {-} familiar(one,three)|familiar(three,five)|familiar(two,three).
% 4.43/4.64  200 [hyper,55,3,44,54,factor_simp,factor_simp,factor_simp] {+} familiar(one,five)|familiar(three,five)|familiar(four,five).
% 4.43/4.64  205 [hyper,55,3,49,54,factor_simp,factor_simp,factor_simp] {+} familiar(one,five)|familiar(one,three)|familiar(one,four).
% 4.43/4.64  228 [hyper,78,3,75,54,factor_simp,factor_simp] {-} familiar(five,six)|familiar(four,five)|familiar(one,four)|familiar(one,two).
% 4.43/4.64  230 [hyper,78,3,71,47,factor_simp,factor_simp] {-} familiar(five,six)|familiar(four,five)|familiar(one,two)|familiar(two,four).
% 4.43/4.64  232 [hyper,78,3,75,55,factor_simp,factor_simp] {-} familiar(three,five)|familiar(five,six)|familiar(one,two)|familiar(one,three).
% 4.43/4.64  234 [hyper,78,3,71,48,factor_simp,factor_simp] {-} familiar(three,five)|familiar(five,six)|familiar(one,two)|familiar(two,three).
% 4.43/4.64  247 [hyper,56,3,50,47,factor_simp,factor_simp,factor_simp] {-} familiar(one,two)|familiar(two,five)|familiar(two,four).
% 4.43/4.64  250 [hyper,56,3,41,48,factor_simp,factor_simp,factor_simp] {-} familiar(one,two)|familiar(two,five)|familiar(two,three).
% 4.43/4.64  257 [hyper,56,3,48,55,factor_simp,factor_simp,factor_simp] {+} familiar(one,five)|familiar(two,five)|familiar(three,five).
% 4.43/4.64  274 [hyper,56,3,41,55,factor_simp,factor_simp,factor_simp] {+} familiar(one,five)|familiar(one,two)|familiar(one,three).
% 4.43/4.64  294 [hyper,97,3,73,52,factor_simp,factor_simp] {+} familiar(one,four)|familiar(two,four)|familiar(three,six)|familiar(five,six).
% 4.43/4.64  312 [hyper,83,3,55,52,factor_simp,factor_simp,factor_simp] {-} familiar(one,five)|familiar(five,six)|familiar(three,five).
% 4.43/4.64  404 [hyper,84,3,54,45,factor_simp,factor_simp,factor_simp] {-} familiar(one,four)|familiar(four,six)|familiar(four,five).
% 4.43/4.64  408 [hyper,84,3,49,53,factor_simp,factor_simp,factor_simp] {-} familiar(one,four)|familiar(four,six)|familiar(three,four).
% 4.43/4.64  427 [hyper,84,3,45,83,factor_simp,factor_simp,factor_simp] {+} familiar(one,six)|familiar(four,six)|familiar(five,six).
% 4.43/4.64  507 [hyper,85,3,49,53,factor_simp,factor_simp,factor_simp] {-} familiar(one,three)|familiar(three,six)|familiar(three,four).
% 4.43/4.64  508 [hyper,85,3,41,65,factor_simp,factor_simp,factor_simp] {-} familiar(one,three)|familiar(three,six)|familiar(two,three).
% 4.43/4.64  526 [hyper,85,3,53,84,factor_simp,factor_simp,factor_simp] {+} familiar(one,six)|familiar(three,six)|familiar(four,six).
% 4.43/4.64  527 [hyper,85,3,52,83,factor_simp,factor_simp,factor_simp] {-} familiar(one,six)|familiar(three,six)|familiar(five,six).
% 4.43/4.64  537 [hyper,85,3,55,83,factor_simp,factor_simp,factor_simp] {-} familiar(one,six)|familiar(one,three)|familiar(one,five).
% 4.43/4.64  606 [hyper,86,3,56,63,factor_simp,factor_simp,factor_simp] {-} familiar(one,two)|familiar(two,six)|familiar(two,five).
% 4.43/4.64  616 [hyper,86,3,50,64,factor_simp,factor_simp,factor_simp] {-} familiar(one,two)|familiar(two,six)|familiar(two,four).
% 4.43/4.64  620 [hyper,86,3,41,65,factor_simp,factor_simp,factor_simp] {-} familiar(one,two)|familiar(two,six)|familiar(two,three).
% 4.43/4.64  843 [hyper,228,3,124,54,factor_simp,factor_simp,factor_simp,factor_simp] {-} familiar(five,six)|familiar(four,five)|familiar(one,four).
% 4.43/4.64  849 [hyper,230,3,247,616,factor_simp,factor_simp,factor_simp,factor_simp] {-} familiar(four,five)|familiar(one,two)|familiar(two,four).
% 4.43/4.64  854 [hyper,849,3,61,200,factor_simp,factor_simp,factor_simp] {-} familiar(four,five)|familiar(two,four)|familiar(three,five).
% 4.43/4.64  858 [hyper,854,3,194,190,factor_simp,factor_simp,factor_simp] {-} familiar(four,five)|familiar(three,five)|familiar(one,three).
% 4.43/4.64  859 [hyper,854,3,167,94,factor_simp,factor_simp,factor_simp] {-} familiar(four,five)|familiar(three,five)|familiar(three,six).
% 4.43/4.64  860 [hyper,854,3,179,159,factor_simp,factor_simp,factor_simp] {-} familiar(four,five)|familiar(two,four)|familiar(two,six).
% 4.43/4.64  863 [hyper,232,3,123,55,factor_simp,factor_simp,factor_simp,factor_simp] {-} familiar(three,five)|familiar(five,six)|familiar(one,three).
% 4.43/4.64  869 [hyper,858,3,88,404,factor_simp,factor_simp,factor_simp] {-} familiar(four,five)|familiar(three,five)|familiar(four,six).
% 4.43/4.64  876 [hyper,860,3,170,169,factor_simp,factor_simp,factor_simp] {-} familiar(two,four)|familiar(two,six)|familiar(three,six).
% 4.43/4.64  883 [hyper,863,3,49,843,factor_simp,factor_simp,factor_simp] {-} familiar(five,six)|familiar(one,three)|familiar(one,four).
% 4.43/4.64  888 [hyper,234,3,250,620,factor_simp,factor_simp,factor_simp,factor_simp] {-} familiar(three,five)|familiar(one,two)|familiar(two,three).
% 4.43/4.64  900 [hyper,869,3,44,859,factor_simp,factor_simp,factor_simp,factor_simp] {-} familiar(four,five)|familiar(three,five).
% 4.43/4.64  901 [hyper,900,3,616,606,factor_simp,factor_simp] {-} familiar(three,five)|familiar(one,two)|familiar(two,six).
% 4.43/4.64  902 [hyper,900,3,179,178,factor_simp,factor_simp] {-} familiar(three,five)|familiar(two,six)|familiar(two,three).
% 4.43/4.64  921 [hyper,876,3,508,507,factor_simp,factor_simp,factor_simp] {-} familiar(two,six)|familiar(three,six)|familiar(one,three).
% 4.43/4.64  923 [hyper,883,3,205,85,factor_simp,factor_simp,factor_simp] {-} familiar(one,three)|familiar(one,four)|familiar(three,six).
% 4.43/4.64  924 [hyper,883,3,205,84,factor_simp,factor_simp,factor_simp] {-} familiar(one,three)|familiar(one,four)|familiar(four,six).
% 4.43/4.64  930 [hyper,883,3,92,85,factor_simp,factor_simp,factor_simp] {-} familiar(five,six)|familiar(one,three)|familiar(three,six).
% 4.43/4.64  958 [hyper,901,3,620,606,factor_simp,factor_simp,factor_simp,factor_simp] {-} familiar(one,two)|familiar(two,six).
% 4.43/4.64  992 [hyper,921,3,958,65,factor_simp,factor_simp,factor_simp] {-} familiar(two,six)|familiar(three,six).
% 4.43/4.64  1019 [hyper,924,3,49,923,factor_simp,factor_simp,factor_simp,factor_simp] {-} familiar(one,three)|familiar(one,four).
% 4.43/4.64  1024 [hyper,1019,3,900,54,factor_simp,factor_simp] {-} familiar(one,four)|familiar(four,five).
% 4.43/4.64  1030 [hyper,1019,3,900,55,factor_simp,factor_simp] {-} familiar(one,three)|familiar(three,five).
% 4.43/4.64  1031 [hyper,1024,3,958,860,factor_simp,factor_simp] {-} familiar(four,five)|familiar(two,six).
% 4.43/4.64  1036 [hyper,1030,3,958,902,factor_simp,factor_simp] {-} familiar(three,five)|familiar(two,six).
% 4.43/4.64  1041 [hyper,1031,3,179,178,factor_simp,factor_simp,factor_simp] {-} familiar(two,six)|familiar(two,three).
% 4.43/4.64  1044 [hyper,1031,3,57,88,factor_simp,factor_simp,factor_simp] {-} familiar(four,five)|familiar(three,four).
% 4.43/4.64  1048 [hyper,1036,3,63,992,factor_simp,factor_simp] {-} familiar(two,six)|familiar(two,five).
% 4.43/4.64  1074 [hyper,1048,3,1041,1036,factor_simp,factor_simp] {+} familiar(two,six).
% 4.43/4.64  1075 [hyper,1074,3,73,408,factor_simp,factor_simp] {+} familiar(one,four)|familiar(three,four).
% 4.43/4.64  1076 [hyper,1074,3,67,507,factor_simp,factor_simp] {+} familiar(one,three)|familiar(three,four).
% 4.43/4.64  1082 [hyper,312,3,257,1074,factor_simp,factor_simp] {-} familiar(one,five)|familiar(three,five).
% 4.43/4.64  1086 [hyper,1082,3,888,48,factor_simp,factor_simp,factor_simp] {+} familiar(three,five)|familiar(two,three).
% 4.43/4.64  1108 [hyper,537,3,274,1074,factor_simp,factor_simp] {-} familiar(one,three)|familiar(one,five).
% 4.43/4.64  1112 [hyper,1108,3,1044,1024,factor_simp] {+} familiar(one,five)|familiar(four,five).
% 4.43/4.64  1121 [hyper,930,3,1108,85,factor_simp,factor_simp,factor_simp] {-} familiar(one,three)|familiar(three,six).
% 4.43/4.64  1133 [hyper,294,3,92,527,factor_simp,factor_simp,factor_simp,factor_simp] {-} familiar(two,four)|familiar(three,six)|familiar(five,six).
% 4.43/4.64  1140 [hyper,1133,3,92,1074,factor_simp,factor_simp] {-} familiar(three,six)|familiar(five,six).
% 4.43/4.64  1149 [hyper,1140,3,1044,45,factor_simp,factor_simp] {-} familiar(five,six)|familiar(four,five).
% 4.43/4.64  1150 [hyper,1140,3,1108,83,factor_simp,factor_simp] {-} familiar(five,six)|familiar(one,five).
% 4.43/4.64  1152 [hyper,1140,3,1044,53,factor_simp,factor_simp] {-} familiar(three,six)|familiar(three,four).
% 4.43/4.64  1175 [hyper,1086,3,1140,1074] {-} familiar(three,five)|familiar(five,six).
% 4.43/4.64  1181 [hyper,427,3,1076,1140,factor_simp] {-} familiar(one,six)|familiar(five,six)|familiar(one,three).
% 4.43/4.64  1187 [hyper,1181,3,1030,1121,factor_simp,factor_simp] {-} familiar(one,six)|familiar(one,three).
% 4.43/4.64  1188 [hyper,1181,3,1175,1150,factor_simp,factor_simp] {-} familiar(one,six)|familiar(five,six).
% 4.43/4.64  1207 [hyper,526,3,1112,1188,factor_simp] {-} familiar(one,six)|familiar(three,six)|familiar(one,five).
% 4.43/4.64  1208 [hyper,526,3,900,1188,factor_simp] {-} familiar(one,six)|familiar(three,six)|familiar(three,five).
% 4.43/4.64  1212 [hyper,1207,3,1082,1188,factor_simp,factor_simp] {-} familiar(one,six)|familiar(one,five).
% 4.43/4.64  1217 [hyper,1208,3,1082,1175,factor_simp,factor_simp] {-} familiar(three,six)|familiar(three,five).
% 4.43/4.64  1220 [hyper,1217,3,1086,1074,factor_simp] {+} familiar(three,five).
% 4.43/4.64  1226 [hyper,1220,3,1075,1024,factor_simp] {+} familiar(one,four).
% 4.43/4.64  1227 [hyper,1220,3,1187,1212,factor_simp] {+} familiar(one,six).
% 4.43/4.64  1232 [hyper,1152,3,1076,1227,factor_simp] {+} familiar(three,four).
% 4.43/4.64  1233 [hyper,1152,3,1121,1226,factor_simp] {+} familiar(three,six).
% 4.43/4.64  1236 [hyper,1149,3,1232,1220] {+} familiar(five,six).
% 4.43/4.64  1237 [hyper,1233,3,1220,1236] {-} $F.
% 4.43/4.64  
% 4.43/4.64  % SZS output end Refutation
% 4.43/4.64  ------------ end of proof -------------
% 4.43/4.64  
% 4.43/4.64  
% 4.43/4.64  Search stopped by max_proofs option.
% 4.43/4.64  
% 4.43/4.64  
% 4.43/4.64  Search stopped by max_proofs option.
% 4.43/4.64  
% 4.43/4.64  ============ end of search ============
% 4.43/4.64  
% 4.43/4.64  ----------- soft-scott stats ----------
% 4.43/4.64  
% 4.43/4.64  true clauses given          32      (17.3%)
% 4.43/4.64  false clauses given        153
% 4.43/4.64  
% 4.43/4.64        FALSE     TRUE
% 4.43/4.64     3  0         1
% 4.43/4.64     6  1         4
% 4.43/4.64     9  3         3
% 4.43/4.64  tot:  4         8      (66.7% true)
% 4.43/4.64  
% 4.43/4.64  
% 4.43/4.64  Model 37 [ 11 4 51733 ] (0.00 seconds, 250000 Inserts)
% 4.43/4.64  
% 4.43/4.64  That finishes the proof of the theorem.
% 4.43/4.64  
% 4.43/4.64  Process 17977 finished Sat May 28 19:25:42 2022
%------------------------------------------------------------------------------