TSTP Solution File: GEO300+1 by CSE---1.6
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- Process Solution
%------------------------------------------------------------------------------
% File : CSE---1.6
% Problem : GEO300+1 : TPTP v8.1.2. Released v4.1.0.
% Transfm : none
% Format : tptp:raw
% Command : java -jar /export/starexec/sandbox2/solver/bin/mcs_scs.jar %s %d
% Computer : n019.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 : 300s
% DateTime : Wed Aug 30 22:44:13 EDT 2023
% Result : Theorem 27.15s 27.21s
% Output : CNFRefutation 27.15s
% Verified :
% SZS Type : -
% Comments :
%------------------------------------------------------------------------------
%----WARNING: Could not form TPTP format derivation
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% 0.08/0.12 % Problem : GEO300+1 : TPTP v8.1.2. Released v4.1.0.
% 0.08/0.13 % Command : java -jar /export/starexec/sandbox2/solver/bin/mcs_scs.jar %s %d
% 0.13/0.34 % Computer : n019.cluster.edu
% 0.13/0.34 % Model : x86_64 x86_64
% 0.13/0.34 % CPU : Intel(R) Xeon(R) CPU E5-2620 v4 @ 2.10GHz
% 0.13/0.34 % Memory : 8042.1875MB
% 0.13/0.34 % OS : Linux 3.10.0-693.el7.x86_64
% 0.13/0.34 % CPULimit : 300
% 0.13/0.34 % WCLimit : 300
% 0.13/0.34 % DateTime : Tue Aug 29 23:20:27 EDT 2023
% 0.19/0.34 % CPUTime :
% 0.19/0.57 start to proof:theBenchmark
% 27.10/27.17 %-------------------------------------------
% 27.10/27.17 % File :CSE---1.6
% 27.10/27.17 % Problem :theBenchmark
% 27.10/27.17 % Transform :cnf
% 27.10/27.17 % Format :tptp:raw
% 27.10/27.17 % Command :java -jar mcs_scs.jar %d %s
% 27.10/27.17
% 27.10/27.17 % Result :Theorem 25.880000s
% 27.10/27.17 % Output :CNFRefutation 25.880000s
% 27.10/27.17 %-------------------------------------------
% 27.10/27.18 %------------------------------------------------------------------------------
% 27.10/27.18 % File : GEO300+1 : TPTP v8.1.2. Released v4.1.0.
% 27.10/27.18 % Domain : Geometry
% 27.10/27.18 % Problem : 331-holds(331,1260,0)
% 27.10/27.18 % Version : Especial.
% 27.10/27.18 % English :
% 27.10/27.18
% 27.10/27.18 % Refs : [EucBC] Euclid (300 BC), Elements
% 27.10/27.18 % : [Hea56] Heath (1956), The Thirteen Books of Euclid's Elements
% 27.10/27.18 % : [ADM08] Avigad et al. (2008), A Formal System for Euclid's Ele
% 27.10/27.18 % : [Kue10] Kuehlwein (2010), Email to Geoff Sutcliffe
% 27.10/27.18 % : [KC+10] Kuehlwein et al. (2010), Premise Selection in the Napr
% 27.10/27.18 % Source : [Kue10]
% 27.10/27.18 % Names :
% 27.10/27.18
% 27.10/27.18 % Status : Theorem
% 27.10/27.18 % Rating : 0.42 v8.1.0, 0.39 v7.5.0, 0.44 v7.4.0, 0.37 v7.3.0, 0.34 v7.1.0, 0.52 v7.0.0, 0.47 v6.4.0, 0.46 v6.2.0, 0.52 v6.1.0, 0.60 v6.0.0, 0.61 v5.5.0, 0.56 v5.4.0, 0.57 v5.3.0, 0.59 v5.2.0, 0.45 v5.1.0, 0.48 v5.0.0, 0.62 v4.1.0
% 27.10/27.18 % Syntax : Number of formulae : 161 ( 42 unt; 0 def)
% 27.10/27.18 % Number of atoms : 1314 ( 528 equ)
% 27.10/27.18 % Maximal formula atoms : 57 ( 8 avg)
% 27.10/27.18 % Number of connectives : 1309 ( 156 ~; 16 |;1011 &)
% 27.10/27.18 % ( 8 <=>; 118 =>; 0 <=; 0 <~>)
% 27.10/27.18 % Maximal formula depth : 46 ( 10 avg)
% 27.10/27.18 % Maximal term depth : 3 ( 1 avg)
% 27.10/27.18 % Number of predicates : 15 ( 14 usr; 0 prp; 1-3 aty)
% 27.10/27.18 % Number of functors : 24 ( 24 usr; 16 con; 0-8 aty)
% 27.10/27.18 % Number of variables : 784 ( 507 !; 277 ?)
% 27.10/27.18 % SPC : FOF_THM_RFO_SEQ
% 27.10/27.18
% 27.10/27.18 % Comments : From the Euclid in Naproche 0.46 collection, using the [Hea56]
% 27.10/27.18 % text, and axioms from [ADM08].
% 27.10/27.18 %------------------------------------------------------------------------------
% 27.10/27.18 fof('holds(331, 1260, 0)',conjecture,
% 27.10/27.18 vf(vd1185,vd1201) = vplus(vf(vd1185,vd1187),vf(vd1187,vd1201)) ).
% 27.10/27.18
% 27.10/27.18 fof('holds(330, 1259, 0)',axiom,
% 27.10/27.18 rR(vd1187,vd1185,vd1201) ).
% 27.10/27.18
% 27.10/27.18 fof('neg(323)',axiom,
% 27.10/27.18 ~ rR(vd1201,vd1185,vd1187) ).
% 27.10/27.18
% 27.10/27.18 fof('holds(320, 1251, 0)',axiom,
% 27.10/27.18 vd1201 != vd1187 ).
% 27.10/27.18
% 27.10/27.18 fof('qu(cond(axiom(180), 0), imp(cond(axiom(180), 0)))',axiom,
% 27.10/27.18 ! [Vd828,Vd829,Vd830] :
% 27.10/27.18 ( ( rR(Vd829,Vd828,Vd830)
% 27.10/27.18 & ? [Vd834] :
% 27.10/27.18 ( Vd830 = Vd834
% 27.10/27.18 & rpoint(Vd834) )
% 27.10/27.18 & ? [Vd833] :
% 27.10/27.18 ( Vd829 = Vd833
% 27.10/27.18 & rpoint(Vd833) )
% 27.10/27.18 & ? [Vd832] :
% 27.10/27.18 ( Vd828 = Vd832
% 27.10/27.18 & rpoint(Vd832) ) )
% 27.10/27.18 => vplus(vf(Vd828,Vd829),vf(Vd829,Vd830)) = vf(Vd828,Vd830) ) ).
% 27.10/27.18
% 27.10/27.18 fof('dis(321)',axiom,
% 27.10/27.18 ( rR(vd1201,vd1185,vd1187)
% 27.10/27.18 | rR(vd1187,vd1185,vd1201) ) ).
% 27.10/27.18
% 27.10/27.18 fof('qe(s3(plural(271)))',axiom,
% 27.10/27.18 ? [Vd1205] :
% 27.10/27.18 ( vd1201 = Vd1205
% 27.10/27.18 & rpoint(Vd1205) ) ).
% 27.10/27.18
% 27.10/27.18 fof('and(neg(neg(conjunct2(conjunct2(conjunct2(plural(comma_conjunct2(268))))))), and(holds(conjunct1(conjunct2(conjunct2(plural(comma_conjunct2(268))))), 1194, 0), and(holds(conjunct1(conjunct2(plural(comma_conjunct2(268)))), 1193, 0), and(holds(conjunct1(plural(comma_conjunct2(268))), 1192, 0), and(qe(s3(plural(comma_conjunct2(268)))), and(qe(s2(plural(comma_conjunct2(268)))), and(qe(s1(plural(comma_conjunct2(268)))), and(pred(comma_conjunct1(268), 9), and(pred(comma_conjunct1(268), 8), and(pred(comma_conjunct1(268), 7), and(qe(s3(plural(268))), and(qe(s2(plural(268))), qe(s1(plural(268)))))))))))))))',axiom,
% 27.10/27.18 ( ~ ? [Vd1195] :
% 27.10/27.18 ( ron(vd1187,Vd1195)
% 27.10/27.18 & ron(vd1186,Vd1195)
% 27.10/27.18 & ron(vd1185,Vd1195)
% 27.10/27.18 & rline(Vd1195) )
% 27.10/27.18 & vangle(vd1179,vd1178,vd1180) = vangle(vd1186,vd1185,vd1187)
% 27.10/27.18 & vf(vd1178,vd1180) = vf(vd1185,vd1187)
% 27.10/27.18 & vf(vd1178,vd1179) = vf(vd1185,vd1186)
% 27.10/27.18 & ? [Vd1191] :
% 27.10/27.18 ( vd1187 = Vd1191
% 27.10/27.18 & rpoint(Vd1191) )
% 27.10/27.18 & ? [Vd1190] :
% 27.10/27.18 ( vd1186 = Vd1190
% 27.10/27.18 & rpoint(Vd1190) )
% 27.10/27.18 & ? [Vd1189] :
% 27.10/27.18 ( vd1185 = Vd1189
% 27.10/27.18 & rpoint(Vd1189) )
% 27.10/27.18 & vd1179 != vd1180
% 27.10/27.18 & vd1178 != vd1180
% 27.10/27.18 & vd1178 != vd1179
% 27.10/27.18 & ? [Vd1184] :
% 27.10/27.18 ( vd1180 = Vd1184
% 27.10/27.18 & rpoint(Vd1184) )
% 27.10/27.18 & ? [Vd1183] :
% 27.10/27.18 ( vd1179 = Vd1183
% 27.10/27.18 & rpoint(Vd1183) )
% 27.10/27.18 & ? [Vd1182] :
% 27.10/27.18 ( vd1178 = Vd1182
% 27.10/27.18 & rpoint(Vd1182) ) ) ).
% 27.10/27.18
% 27.10/27.18 fof('qu(cond(axiom(162), 0), imp(cond(axiom(162), 0)))',axiom,
% 27.10/27.18 ! [Vd748,Vd749] :
% 27.10/27.18 ( ( ? [Vd752] :
% 27.10/27.18 ( Vd749 = Vd752
% 27.10/27.18 & rpoint(Vd752) )
% 27.10/27.18 & ? [Vd751] :
% 27.10/27.18 ( Vd748 = Vd751
% 27.10/27.18 & rpoint(Vd751) ) )
% 27.10/27.18 => ( vf(Vd748,Vd749) = v0
% 27.10/27.18 <=> Vd748 = Vd749 ) ) ).
% 27.10/27.18
% 27.10/27.18 fof('neg(neg(319))',axiom,
% 27.10/27.18 ~ rR(vd1185,vd1201,vd1187) ).
% 27.10/27.18
% 27.10/27.18 fof('pred(s1(plural(293)), 0)',axiom,
% 27.10/27.18 ron(vd1185,vd1232) ).
% 27.10/27.18
% 27.10/27.18 fof('pred(293, 0)',axiom,
% 27.10/27.18 rline(vd1232) ).
% 27.10/27.18
% 27.10/27.18 fof('holds(291, 1230, 0)',axiom,
% 27.10/27.18 vd1199 = vd1185 ).
% 27.10/27.18
% 27.10/27.18 fof('pred(s3(plural(274)), 0)',axiom,
% 27.10/27.18 ron(vd1185,vd1197) ).
% 27.10/27.18
% 27.10/27.18 fof('holds(comma_conjunct2(comma_conjunct2(plural(271))), 1214, 0)',axiom,
% 27.10/27.18 rS(vd1201,vd1187,vd1197) ).
% 27.10/27.18
% 27.10/27.18 fof('qe(s1(plural(271)))',axiom,
% 27.10/27.18 ? [Vd1203] :
% 27.10/27.18 ( vd1199 = Vd1203
% 27.10/27.18 & rpoint(Vd1203) ) ).
% 27.10/27.18
% 27.10/27.18 fof('neg(neg(270))',axiom,
% 27.10/27.18 ~ ron(vd1187,vd1197) ).
% 27.10/27.18
% 27.10/27.18 fof('pred(269, 0)',axiom,
% 27.10/27.18 rline(vd1197) ).
% 27.10/27.18
% 27.10/27.18 fof('qu(cond(axiom(188), 0), imp(cond(axiom(188), 0)))',axiom,
% 27.10/27.18 ! [Vd862,Vd863,Vd864,Vd865,Vd866,Vd867,Vd868,Vd869] :
% 27.10/27.18 ( ( ron(Vd864,Vd868)
% 27.10/27.18 & ron(Vd862,Vd868)
% 27.10/27.18 & Vd862 != Vd866
% 27.10/27.18 & Vd862 != Vd864
% 27.10/27.18 & Vd868 = Vd869
% 27.10/27.18 & rline(Vd869)
% 27.10/27.18 & Vd866 = Vd867
% 27.10/27.18 & rpoint(Vd867)
% 27.10/27.18 & Vd864 = Vd865
% 27.10/27.18 & rpoint(Vd865)
% 27.10/27.18 & Vd862 = Vd863
% 27.10/27.18 & rpoint(Vd863) )
% 27.10/27.18 => ( ( ~ rR(Vd862,Vd864,Vd866)
% 27.10/27.18 & ron(Vd866,Vd868) )
% 27.10/27.18 <=> vangle(Vd864,Vd862,Vd866) = v0 ) ) ).
% 27.10/27.18
% 27.10/27.18 fof('qu(cond(axiom(160), 0), imp(cond(axiom(160), 0)))',axiom,
% 27.10/27.18 ! [Vd741,Vd742] :
% 27.10/27.18 ( ( ? [Vd745] :
% 27.10/27.18 ( Vd742 = Vd745
% 27.10/27.18 & rpoint(Vd745) )
% 27.10/27.18 & ? [Vd744] :
% 27.10/27.18 ( Vd741 = Vd744
% 27.10/27.18 & rpoint(Vd744) ) )
% 27.10/27.18 => ? [Vd747] :
% 27.10/27.18 ( vf(Vd741,Vd742) = Vd747
% 27.10/27.18 & rreal(Vd747) ) ) ).
% 27.10/27.18
% 27.10/27.18 fof('ass(cond(156, 0), 0)',axiom,
% 27.10/27.18 ! [Vd733,Vd734,Vd735,Vd736,Vd737,Vd738] :
% 27.10/27.18 ( ( vplus(Vd733,Vd737) = vplus(Vd735,Vd737)
% 27.10/27.18 & Vd737 = Vd738
% 27.10/27.18 & rreal(Vd738)
% 27.10/27.18 & Vd735 = Vd736
% 27.10/27.18 & rreal(Vd736)
% 27.10/27.18 & Vd733 = Vd734
% 27.10/27.18 & rreal(Vd734) )
% 27.10/27.18 => Vd733 = Vd735 ) ).
% 27.10/27.18
% 27.10/27.18 fof('qu(cond(axiom(143), 0), imp(cond(axiom(143), 0)))',axiom,
% 27.10/27.18 ! [Vd694,Vd695,Vd696,Vd697] :
% 27.10/27.18 ( ( Vd696 = Vd697
% 27.10/27.18 & rreal(Vd697)
% 27.10/27.18 & Vd694 = Vd695
% 27.10/27.18 & rreal(Vd695) )
% 27.10/27.18 => vplus(Vd694,Vd696) = vplus(Vd696,Vd694) ) ).
% 27.10/27.18
% 27.10/27.18 fof('qu(cond(axiom(141), 0), imp(cond(axiom(141), 0)))',axiom,
% 27.10/27.18 ! [Vd691,Vd692] :
% 27.10/27.18 ( ( Vd691 = Vd692
% 27.10/27.18 & rreal(Vd692) )
% 27.10/27.18 => vplus(Vd691,v0) = Vd691 ) ).
% 27.10/27.18
% 27.10/27.18 fof('pred(axiom(137), 2)',axiom,
% 27.10/27.18 v0 = vd684 ).
% 27.10/27.18
% 27.10/27.18 fof('pred(axiom(137), 1)',axiom,
% 27.10/27.18 rreal(vd684) ).
% 27.10/27.18
% 27.10/27.18 fof('qu(cond(axiom(99), 0), imp(cond(axiom(99), 0)))',axiom,
% 27.10/27.18 ! [Vd434,Vd435,Vd439,Vd440] :
% 27.10/27.18 ( ( rS(Vd434,Vd435,Vd439)
% 27.10/27.18 & Vd439 = Vd440
% 27.10/27.18 & rline(Vd440)
% 27.10/27.18 & ? [Vd438] :
% 27.10/27.18 ( Vd435 = Vd438
% 27.10/27.18 & rpoint(Vd438) )
% 27.10/27.18 & ? [Vd437] :
% 27.10/27.18 ( Vd434 = Vd437
% 27.10/27.18 & rpoint(Vd437) ) )
% 27.10/27.18 => ~ ron(Vd434,Vd439) ) ).
% 27.10/27.18
% 27.10/27.18 fof('qu(cond(axiom(91), 0), imp(cond(axiom(91), 0)))',axiom,
% 27.10/27.18 ! [Vd396,Vd397,Vd398,Vd403,Vd404] :
% 27.10/27.18 ( ( Vd403 = Vd404
% 27.10/27.18 & ron(Vd398,Vd403)
% 27.10/27.18 & ron(Vd397,Vd403)
% 27.10/27.18 & ron(Vd396,Vd403)
% 27.10/27.18 & rline(Vd404)
% 27.10/27.18 & Vd397 != Vd398
% 27.10/27.18 & Vd396 != Vd398
% 27.10/27.18 & Vd396 != Vd397
% 27.10/27.18 & ? [Vd402] :
% 27.10/27.18 ( Vd398 = Vd402
% 27.10/27.18 & rpoint(Vd402) )
% 27.10/27.18 & ? [Vd401] :
% 27.10/27.18 ( Vd397 = Vd401
% 27.10/27.18 & rpoint(Vd401) )
% 27.10/27.18 & ? [Vd400] :
% 27.10/27.19 ( Vd396 = Vd400
% 27.10/27.19 & rpoint(Vd400) ) )
% 27.10/27.19 => ( rR(Vd397,Vd396,Vd398)
% 27.10/27.19 | rR(Vd396,Vd397,Vd398)
% 27.10/27.19 | rR(Vd398,Vd396,Vd397) ) ) ).
% 27.10/27.19
% 27.10/27.19 fof('neg(316)',axiom,
% 27.10/27.19 ~ rR(vd1185,vd1201,vd1187) ).
% 27.10/27.19
% 27.10/27.19 fof('holds(314, 1247, 0)',axiom,
% 27.10/27.19 vf(vd1199,vd1201) = vf(vd1185,vd1187) ).
% 27.10/27.19
% 27.10/27.19 fof('pred(s2(plural(293)), 0)',axiom,
% 27.10/27.19 ron(vd1187,vd1232) ).
% 27.10/27.19
% 27.10/27.19 fof('ass(cond(conseq(271), 3), 0)',axiom,
% 27.10/27.19 ( vd1199 != vd1185
% 27.10/27.19 => ( rR(vd1185,vd1199,vd1186)
% 27.10/27.19 | rR(vd1199,vd1185,vd1186) ) ) ).
% 27.10/27.19
% 27.10/27.19 fof('ass(cond(conseq(271), 3), 1)',axiom,
% 27.10/27.19 ( vd1199 != vd1185
% 27.10/27.19 => ~ rR(vd1185,vd1199,vd1186) ) ).
% 27.10/27.19
% 27.10/27.19 fof('ass(cond(conseq(271), 3), 2)',axiom,
% 27.10/27.19 ( vd1199 != vd1185
% 27.10/27.19 => ~ rR(vd1199,vd1185,vd1186) ) ).
% 27.10/27.19
% 27.10/27.19 fof('ass(cond(conseq(271), 3), 3)',axiom,
% 27.10/27.19 ( vd1199 != vd1185
% 27.10/27.19 => ( rR(vd1199,vd1185,vd1186)
% 27.10/27.19 | rR(vd1185,vd1199,vd1186) ) ) ).
% 27.10/27.19
% 27.10/27.19 fof('pred(s2(plural(274)), 0)',axiom,
% 27.10/27.19 ron(vd1200,vd1197) ).
% 27.10/27.19
% 27.10/27.19 fof('neg(neg(conjunct2(conjunct2(comma_conjunct2(plural(271))))))',axiom,
% 27.10/27.19 ~ rR(vd1186,vd1199,vd1185) ).
% 27.10/27.19
% 27.10/27.19 fof('pred(conjunct1(conjunct2(comma_conjunct2(plural(271)))), 0)',axiom,
% 27.10/27.19 ron(vd1199,vd1197) ).
% 27.10/27.19
% 27.10/27.19 fof('holds(conjunct1(comma_conjunct2(plural(271))), 1212, 0)',axiom,
% 27.10/27.19 vd1200 = vd1186 ).
% 27.10/27.19
% 27.10/27.19 fof('holds(conjunct2(conjunct2(conjunct2(conjunct2(conjunct2(plural(271)))))), 1211, 0)',axiom,
% 27.10/27.19 vf(vd1178,vd1180) = vf(vd1199,vd1201) ).
% 27.10/27.19
% 27.10/27.19 fof('holds(conjunct1(conjunct2(conjunct2(conjunct2(conjunct2(plural(271)))))), 1210, 0)',axiom,
% 27.10/27.19 vf(vd1179,vd1180) = vf(vd1200,vd1201) ).
% 27.10/27.19
% 27.10/27.19 fof('holds(conjunct1(conjunct2(conjunct2(conjunct2(plural(271))))), 1209, 0)',axiom,
% 27.10/27.19 vf(vd1178,vd1179) = vf(vd1199,vd1200) ).
% 27.10/27.19
% 27.10/27.19 fof('holds(conjunct1(conjunct2(conjunct2(plural(271)))), 1208, 0)',axiom,
% 27.10/27.19 vangle(vd1201,vd1200,vd1199) = vangle(vd1180,vd1179,vd1178) ).
% 27.10/27.19
% 27.10/27.19 fof('holds(conjunct1(conjunct2(plural(271))), 1207, 0)',axiom,
% 27.10/27.19 vangle(vd1199,vd1201,vd1200) = vangle(vd1178,vd1180,vd1179) ).
% 27.15/27.19
% 27.15/27.19 fof('holds(conjunct1(plural(271)), 1206, 0)',axiom,
% 27.15/27.19 vangle(vd1200,vd1199,vd1201) = vangle(vd1179,vd1178,vd1180) ).
% 27.15/27.19
% 27.15/27.19 fof('qe(s2(plural(271)))',axiom,
% 27.15/27.19 ? [Vd1204] :
% 27.15/27.19 ( vd1200 = Vd1204
% 27.15/27.19 & rpoint(Vd1204) ) ).
% 27.15/27.19
% 27.15/27.19 fof('pred(s2(plural(269)), 0)',axiom,
% 27.15/27.19 ron(vd1186,vd1197) ).
% 27.15/27.19
% 27.15/27.19 fof('pred(s1(plural(269)), 0)',axiom,
% 27.15/27.19 ron(vd1185,vd1197) ).
% 27.15/27.19
% 27.15/27.19 fof('qu(cond(axiom(190), 0), imp(cond(axiom(190), 0)))',axiom,
% 27.15/27.19 ! [Vd874,Vd875,Vd876,Vd877,Vd883,Vd884] :
% 27.15/27.19 ( ( Vd883 != Vd884
% 27.15/27.19 & ~ ron(Vd877,Vd884)
% 27.15/27.19 & ~ ron(Vd877,Vd883)
% 27.15/27.19 & Vd874 != Vd876
% 27.15/27.19 & Vd874 != Vd875
% 27.15/27.19 & ron(Vd876,Vd884)
% 27.15/27.19 & ron(Vd875,Vd883)
% 27.15/27.19 & ron(Vd874,Vd884)
% 27.15/27.19 & ron(Vd874,Vd883)
% 27.15/27.19 & ? [Vd887] :
% 27.15/27.19 ( Vd884 = Vd887
% 27.15/27.19 & rline(Vd887) )
% 27.15/27.19 & ? [Vd886] :
% 27.15/27.19 ( Vd883 = Vd886
% 27.15/27.19 & rline(Vd886) )
% 27.15/27.19 & ? [Vd882] :
% 27.15/27.19 ( Vd877 = Vd882
% 27.15/27.19 & rpoint(Vd882) )
% 27.15/27.19 & ? [Vd881] :
% 27.15/27.19 ( Vd876 = Vd881
% 27.15/27.19 & rpoint(Vd881) )
% 27.15/27.19 & ? [Vd880] :
% 27.15/27.19 ( Vd875 = Vd880
% 27.15/27.19 & rpoint(Vd880) )
% 27.15/27.19 & ? [Vd879] :
% 27.15/27.19 ( Vd874 = Vd879
% 27.15/27.19 & rpoint(Vd879) ) )
% 27.15/27.19 => ( vangle(Vd875,Vd874,Vd876) = vplus(vangle(Vd875,Vd874,Vd877),vangle(Vd877,Vd874,Vd876))
% 27.15/27.19 <=> ( rS(Vd876,Vd877,Vd883)
% 27.15/27.19 & rS(Vd875,Vd877,Vd884) ) ) ) ).
% 27.15/27.19
% 27.15/27.19 fof('qu(cond(axiom(186), 0), imp(cond(axiom(186), 0)))',axiom,
% 27.15/27.19 ! [Vd854,Vd855,Vd859,Vd860] :
% 27.15/27.19 ( ( ron(Vd855,Vd860)
% 27.15/27.19 & rcenter(Vd859,Vd860)
% 27.15/27.19 & ? [Vd858] :
% 27.15/27.19 ( Vd855 = Vd858
% 27.15/27.19 & rpoint(Vd858) )
% 27.15/27.19 & ? [Vd857] :
% 27.15/27.19 ( Vd854 = Vd857
% 27.15/27.19 & rpoint(Vd857) ) )
% 27.15/27.19 => ( rless(vf(Vd859,Vd854),vf(Vd859,Vd855))
% 27.15/27.19 <=> rinside(Vd854,Vd860) ) ) ).
% 27.15/27.19
% 27.15/27.19 fof('qu(cond(axiom(184), 0), imp(cond(axiom(184), 0)))',axiom,
% 27.15/27.19 ! [Vd847,Vd848,Vd849,Vd850,Vd851,Vd852] :
% 27.15/27.19 ( ( ron(Vd851,Vd850)
% 27.15/27.19 & Vd851 = Vd852
% 27.15/27.19 & rpoint(Vd852)
% 27.15/27.19 & rcenter(Vd849,Vd850)
% 27.15/27.19 & Vd847 = Vd848
% 27.15/27.19 & rpoint(Vd848) )
% 27.15/27.19 => ( vf(Vd849,Vd847) = vf(Vd849,Vd851)
% 27.15/27.19 <=> ron(Vd847,Vd850) ) ) ).
% 27.15/27.19
% 27.15/27.19 fof('qu(cond(axiom(135), 0), imp(cond(axiom(135), 0)))',axiom,
% 27.15/27.19 ! [Vd676,Vd677,Vd681,Vd682] :
% 27.15/27.19 ( ( ron(Vd677,Vd682)
% 27.15/27.19 & rinside(Vd676,Vd682)
% 27.15/27.19 & rinside(Vd677,Vd681)
% 27.15/27.19 & ron(Vd676,Vd681)
% 27.15/27.19 & ? [Vd680] :
% 27.15/27.19 ( Vd677 = Vd680
% 27.15/27.19 & rpoint(Vd680) )
% 27.15/27.19 & ? [Vd679] :
% 27.15/27.19 ( Vd676 = Vd679
% 27.15/27.19 & rpoint(Vd679) ) )
% 27.15/27.19 => rintersect(Vd681,Vd682) ) ).
% 27.15/27.19
% 27.15/27.19 fof('qu(cond(axiom(133), 0), imp(cond(axiom(133), 0)))',axiom,
% 27.15/27.19 ! [Vd666,Vd667,Vd671,Vd672] :
% 27.15/27.19 ( ( ~ rinside(Vd667,Vd672)
% 27.15/27.19 & ~ ron(Vd667,Vd672)
% 27.15/27.19 & rinside(Vd666,Vd672)
% 27.15/27.19 & ( ron(Vd667,Vd671)
% 27.15/27.19 | rinside(Vd667,Vd671) )
% 27.15/27.19 & ron(Vd666,Vd671)
% 27.15/27.19 & ? [Vd675] :
% 27.15/27.19 ( Vd672 = Vd675
% 27.15/27.19 & rcircle(Vd675) )
% 27.15/27.19 & ? [Vd674] :
% 27.15/27.19 ( Vd671 = Vd674
% 27.15/27.19 & rcircle(Vd674) )
% 27.15/27.19 & ? [Vd670] :
% 27.15/27.19 ( Vd667 = Vd670
% 27.15/27.19 & rpoint(Vd670) )
% 27.15/27.19 & ? [Vd669] :
% 27.15/27.19 ( Vd666 = Vd669
% 27.15/27.19 & rpoint(Vd669) ) )
% 27.15/27.19 => rintersect(Vd671,Vd672) ) ).
% 27.15/27.19
% 27.15/27.19 fof('qu(cond(axiom(79), 0), imp(cond(axiom(79), 0)))',axiom,
% 27.15/27.19 ! [Vd336,Vd337,Vd338,Vd339] :
% 27.15/27.19 ( ( rinside(Vd336,Vd338)
% 27.15/27.19 & Vd338 = Vd339
% 27.15/27.19 & rcircle(Vd339)
% 27.15/27.19 & Vd336 = Vd337
% 27.15/27.19 & rpoint(Vd337) )
% 27.15/27.19 => ~ ron(Vd336,Vd338) ) ).
% 27.15/27.19
% 27.15/27.19 fof('qu(cond(axiom(67), 0), imp(cond(axiom(67), 0)))',axiom,
% 27.15/27.19 ! [Vd280,Vd281] :
% 27.15/27.19 ( ( rintersect(Vd280,Vd281)
% 27.15/27.19 & ? [Vd284] :
% 27.15/27.19 ( Vd281 = Vd284
% 27.15/27.19 & rcircle(Vd284) )
% 27.15/27.19 & ? [Vd283] :
% 27.15/27.19 ( Vd280 = Vd283
% 27.15/27.19 & rcircle(Vd283) ) )
% 27.15/27.19 => ? [Vd285,Vd286] :
% 27.15/27.19 ( Vd285 != Vd286
% 27.15/27.19 & ron(Vd286,Vd281)
% 27.15/27.19 & ron(Vd286,Vd280)
% 27.15/27.19 & rpoint(Vd286)
% 27.15/27.19 & ron(Vd285,Vd281)
% 27.15/27.19 & ron(Vd285,Vd280)
% 27.15/27.19 & rpoint(Vd285) ) ) ).
% 27.15/27.19
% 27.15/27.19 fof('qu(cond(axiom(61), 0), imp(cond(axiom(61), 0)))',axiom,
% 27.15/27.19 ! [Vd253,Vd254,Vd255,Vd256,Vd257,Vd258,Vd259,Vd260] :
% 27.15/27.19 ( ( ron(Vd259,Vd255)
% 27.15/27.19 & ~ ron(Vd259,Vd253)
% 27.15/27.19 & ~ rinside(Vd259,Vd253)
% 27.15/27.19 & Vd259 = Vd260
% 27.15/27.19 & rpoint(Vd260)
% 27.15/27.19 & ron(Vd257,Vd255)
% 27.15/27.19 & rinside(Vd257,Vd253)
% 27.15/27.19 & Vd257 = Vd258
% 27.15/27.19 & rpoint(Vd258)
% 27.15/27.19 & Vd255 = Vd256
% 27.15/27.19 & rline(Vd256)
% 27.15/27.19 & Vd253 = Vd254
% 27.15/27.19 & rcircle(Vd254) )
% 27.15/27.19 => ? [Vd261] :
% 27.15/27.19 ( rR(Vd261,Vd257,Vd259)
% 27.15/27.19 & ron(Vd261,Vd253)
% 27.15/27.19 & ron(Vd261,Vd255)
% 27.15/27.19 & rpoint(Vd261) ) ) ).
% 27.15/27.19
% 27.15/27.19 fof('qu(cond(axiom(53), 0), imp(cond(axiom(53), 0)))',axiom,
% 27.15/27.19 ! [Vd225,Vd226] :
% 27.15/27.19 ( ( Vd225 != Vd226
% 27.15/27.19 & ? [Vd230] :
% 27.15/27.19 ( Vd226 = Vd230
% 27.15/27.19 & rpoint(Vd230) )
% 27.15/27.19 & ? [Vd229] :
% 27.15/27.19 ( Vd225 = Vd229
% 27.15/27.19 & rpoint(Vd229) ) )
% 27.15/27.19 => ? [Vd231] :
% 27.15/27.19 ( ron(Vd226,Vd231)
% 27.15/27.19 & rcenter(Vd225,Vd231)
% 27.15/27.19 & rcircle(Vd231) ) ) ).
% 27.15/27.19
% 27.15/27.19 fof('pred(313, 0)',axiom,
% 27.15/27.19 ron(vd1201,vd1232) ).
% 27.15/27.19
% 27.15/27.19 fof('ass(cond(conseq(271), 9), 0)',axiom,
% 27.15/27.19 ( ~ ron(vd1201,vd1232)
% 27.15/27.19 => ( rS(vd1200,vd1187,vd1234)
% 27.15/27.19 | rS(vd1186,vd1201,vd1232) ) ) ).
% 27.15/27.19
% 27.15/27.19 fof('ass(cond(conseq(271), 9), 1)',axiom,
% 27.15/27.19 ( ~ ron(vd1201,vd1232)
% 27.15/27.19 => ~ rS(vd1200,vd1187,vd1234) ) ).
% 27.15/27.19
% 27.15/27.19 fof('ass(cond(conseq(271), 9), 2)',axiom,
% 27.15/27.19 ( ~ ron(vd1201,vd1232)
% 27.15/27.19 => ~ rS(vd1186,vd1201,vd1232) ) ).
% 27.15/27.19
% 27.15/27.19 fof('pred(s2(plural(294)), 0)',axiom,
% 27.15/27.19 ron(vd1201,vd1234) ).
% 27.15/27.19
% 27.15/27.19 fof('pred(s1(plural(294)), 0)',axiom,
% 27.15/27.19 ron(vd1185,vd1234) ).
% 27.15/27.19
% 27.15/27.19 fof('pred(294, 0)',axiom,
% 27.15/27.19 rline(vd1234) ).
% 27.15/27.19
% 27.15/27.19 fof('holds(292, 1231, 0)',axiom,
% 27.15/27.19 vangle(vd1200,vd1199,vd1201) = vangle(vd1186,vd1185,vd1187) ).
% 27.15/27.19
% 27.15/27.19 fof('pred(s1(plural(274)), 0)',axiom,
% 27.15/27.19 ron(vd1199,vd1197) ).
% 27.15/27.19
% 27.15/27.19 fof('holds(273, 1215, 0)',axiom,
% 27.15/27.19 vf(vd1199,vd1200) = vf(vd1185,vd1186) ).
% 27.15/27.19
% 27.15/27.19 fof('qu(cond(axiom(178), 0), imp(cond(axiom(178), 0)))',axiom,
% 27.15/27.19 ! [Vd808,Vd809,Vd810,Vd811,Vd812,Vd813] :
% 27.15/27.19 ( ( vangle(Vd810,Vd808,Vd809) = vangle(Vd813,Vd811,Vd812)
% 27.15/27.19 & vangle(Vd809,Vd810,Vd808) = vangle(Vd812,Vd813,Vd811)
% 27.15/27.19 & vangle(Vd808,Vd809,Vd810) = vangle(Vd811,Vd812,Vd813)
% 27.15/27.19 & vf(Vd810,Vd808) = vf(Vd813,Vd811)
% 27.15/27.19 & vf(Vd809,Vd810) = vf(Vd812,Vd813)
% 27.15/27.19 & vf(Vd808,Vd809) = vf(Vd811,Vd812)
% 27.15/27.19 & ? [Vd820] :
% 27.15/27.19 ( Vd813 = Vd820
% 27.15/27.19 & rpoint(Vd820) )
% 27.15/27.19 & ? [Vd819] :
% 27.15/27.19 ( Vd812 = Vd819
% 27.15/27.19 & rpoint(Vd819) )
% 27.15/27.19 & ? [Vd818] :
% 27.15/27.19 ( Vd811 = Vd818
% 27.15/27.19 & rpoint(Vd818) )
% 27.15/27.19 & ? [Vd817] :
% 27.15/27.19 ( Vd810 = Vd817
% 27.15/27.19 & rpoint(Vd817) )
% 27.15/27.19 & ? [Vd816] :
% 27.15/27.19 ( Vd809 = Vd816
% 27.15/27.19 & rpoint(Vd816) )
% 27.15/27.19 & ? [Vd815] :
% 27.15/27.19 ( Vd808 = Vd815
% 27.15/27.19 & rpoint(Vd815) ) )
% 27.15/27.19 => vg(Vd808,Vd809,Vd810) = vg(Vd811,Vd812,Vd813) ) ).
% 27.15/27.19
% 27.15/27.19 fof('qu(cond(axiom(166), 0), imp(cond(axiom(166), 0)))',axiom,
% 27.15/27.19 ! [Vd761,Vd762] :
% 27.15/27.19 ( ( ? [Vd765] :
% 27.15/27.19 ( Vd762 = Vd765
% 27.15/27.19 & rpoint(Vd765) )
% 27.15/27.19 & ? [Vd764] :
% 27.15/27.19 ( Vd761 = Vd764
% 27.15/27.19 & rpoint(Vd764) ) )
% 27.15/27.19 => vf(Vd761,Vd762) = vf(Vd762,Vd761) ) ).
% 27.15/27.19
% 27.15/27.19 fof('qu(cond(axiom(153), 0), imp(cond(axiom(153), 0)))',axiom,
% 27.15/27.19 ! [Vd725,Vd726,Vd727,Vd728,Vd729,Vd730] :
% 27.15/27.19 ( ( rless(Vd725,Vd727)
% 27.15/27.19 & Vd729 = Vd730
% 27.15/27.19 & rreal(Vd730)
% 27.15/27.19 & Vd727 = Vd728
% 27.15/27.19 & rreal(Vd728)
% 27.15/27.19 & Vd725 = Vd726
% 27.15/27.19 & rreal(Vd726) )
% 27.15/27.19 => rless(vplus(Vd725,Vd729),vplus(Vd727,Vd729)) ) ).
% 27.15/27.19
% 27.15/27.19 fof('qu(cond(axiom(151), 0), imp(cond(axiom(151), 0)))',axiom,
% 27.15/27.19 ! [Vd716,Vd717,Vd718,Vd719,Vd720,Vd721] :
% 27.15/27.19 ( ( rless(Vd718,Vd720)
% 27.15/27.19 & rless(Vd716,Vd718)
% 27.15/27.19 & Vd720 = Vd721
% 27.15/27.19 & rreal(Vd721)
% 27.15/27.19 & Vd718 = Vd719
% 27.15/27.19 & rreal(Vd719)
% 27.15/27.19 & Vd716 = Vd717
% 27.15/27.19 & rreal(Vd717) )
% 27.15/27.19 => rless(Vd716,Vd720) ) ).
% 27.15/27.19
% 27.15/27.19 fof('qu(cond(axiom(149), 0), imp(cond(axiom(149), 0)))',axiom,
% 27.15/27.19 ! [Vd713,Vd714] :
% 27.15/27.19 ( ( Vd713 = Vd714
% 27.15/27.19 & rreal(Vd714) )
% 27.15/27.19 => ~ rless(Vd713,Vd713) ) ).
% 27.15/27.19
% 27.15/27.19 fof('qu(cond(axiom(147), 0), imp(cond(axiom(147), 0)))',axiom,
% 27.15/27.19 ! [Vd706,Vd707,Vd708,Vd709] :
% 27.15/27.19 ( ( rless(Vd706,Vd708)
% 27.15/27.19 & Vd708 = Vd709
% 27.15/27.20 & rreal(Vd709)
% 27.15/27.20 & Vd706 = Vd707
% 27.15/27.20 & rreal(Vd707) )
% 27.15/27.20 => ( ~ rless(Vd708,Vd706)
% 27.15/27.20 | Vd706 = Vd708 ) ) ).
% 27.15/27.20
% 27.15/27.20 fof('qu(cond(axiom(145), 0), imp(cond(axiom(145), 0)))',axiom,
% 27.15/27.20 ! [Vd699,Vd700,Vd701,Vd702] :
% 27.15/27.20 ( ( Vd701 = Vd702
% 27.15/27.20 & rreal(Vd702)
% 27.15/27.20 & Vd699 = Vd700
% 27.15/27.20 & rreal(Vd700) )
% 27.15/27.20 => ( rless(Vd699,Vd701)
% 27.15/27.20 | Vd699 = Vd701
% 27.15/27.20 | rless(Vd701,Vd699) ) ) ).
% 27.15/27.20
% 27.15/27.20 fof('qu(cond(axiom(139), 0), imp(cond(axiom(139), 0)))',axiom,
% 27.15/27.20 ! [Vd685,Vd686,Vd687,Vd688] :
% 27.15/27.20 ( ( Vd687 = Vd688
% 27.15/27.20 & rreal(Vd688)
% 27.15/27.20 & Vd685 = Vd686
% 27.15/27.20 & rreal(Vd686) )
% 27.15/27.20 => ? [Vd690] :
% 27.15/27.20 ( vplus(Vd685,Vd687) = Vd690
% 27.15/27.20 & rreal(Vd690) ) ) ).
% 27.15/27.20
% 27.15/27.20 fof('qu(cond(axiom(131), 0), imp(cond(axiom(131), 0)))',axiom,
% 27.15/27.20 ! [Vd660,Vd661,Vd662,Vd663,Vd664,Vd665] :
% 27.15/27.20 ( ( ron(Vd660,Vd664)
% 27.15/27.20 & rinside(Vd660,Vd662)
% 27.15/27.20 & Vd664 = Vd665
% 27.15/27.20 & rline(Vd665)
% 27.15/27.20 & Vd662 = Vd663
% 27.15/27.20 & rcircle(Vd663)
% 27.15/27.20 & Vd660 = Vd661
% 27.15/27.20 & rpoint(Vd661) )
% 27.15/27.20 => rintersect(Vd664,Vd662) ) ).
% 27.15/27.20
% 27.15/27.20 fof('qu(cond(axiom(129), 0), imp(cond(axiom(129), 0)))',axiom,
% 27.15/27.20 ! [Vd647,Vd648,Vd652,Vd653] :
% 27.15/27.20 ( ( ~ ? [Vd657] : rS(Vd647,Vd648,Vd657)
% 27.15/27.20 & ( ron(Vd648,Vd652)
% 27.15/27.20 | rinside(Vd648,Vd652) )
% 27.15/27.20 & ( ron(Vd647,Vd652)
% 27.15/27.20 | rinside(Vd647,Vd652) )
% 27.15/27.20 & ? [Vd656] :
% 27.15/27.20 ( Vd653 = Vd656
% 27.15/27.20 & rcircle(Vd656) )
% 27.15/27.20 & ? [Vd655] :
% 27.15/27.20 ( Vd652 = Vd655
% 27.15/27.20 & rcircle(Vd655) )
% 27.15/27.20 & ? [Vd651] :
% 27.15/27.20 ( Vd648 = Vd651
% 27.15/27.20 & rpoint(Vd651) )
% 27.15/27.20 & ? [Vd650] :
% 27.15/27.20 ( Vd647 = Vd650
% 27.15/27.20 & rpoint(Vd650) ) )
% 27.15/27.20 => ? [Vd659] : rintersect(Vd659,Vd652) ) ).
% 27.15/27.20
% 27.15/27.20 fof('qu(cond(axiom(127), 0), imp(cond(axiom(127), 0)))',axiom,
% 27.15/27.20 ! [Vd636,Vd637,Vd641,Vd642,Vd644,Vd645] :
% 27.15/27.20 ( ( Vd641 = Vd642
% 27.15/27.20 & Vd644 = Vd645
% 27.15/27.20 & ron(Vd637,Vd644)
% 27.15/27.20 & ron(Vd636,Vd644)
% 27.15/27.20 & rline(Vd645)
% 27.15/27.20 & ~ rS(Vd636,Vd637,Vd641)
% 27.15/27.20 & rline(Vd642)
% 27.15/27.20 & ? [Vd640] :
% 27.15/27.20 ( Vd637 = Vd640
% 27.15/27.20 & rpoint(Vd640) )
% 27.15/27.20 & ? [Vd639] :
% 27.15/27.20 ( Vd636 = Vd639
% 27.15/27.20 & rpoint(Vd639) ) )
% 27.15/27.20 => rintersect(Vd641,Vd644) ) ).
% 27.15/27.20
% 27.15/27.20 fof('qu(cond(axiom(125), 0), imp(cond(axiom(125), 0)))',axiom,
% 27.15/27.20 ! [Vd616,Vd617,Vd622,Vd623,Vd630,Vd631,Vd632,Vd633] :
% 27.15/27.20 ( ( ron(Vd631,Vd632)
% 27.15/27.20 & ron(Vd630,Vd632)
% 27.15/27.20 & Vd632 = Vd633
% 27.15/27.20 & rline(Vd633)
% 27.15/27.20 & rcenter(Vd631,Vd617)
% 27.15/27.20 & rcenter(Vd630,Vd616)
% 27.15/27.20 & Vd622 != Vd623
% 27.15/27.20 & ron(Vd623,Vd617)
% 27.15/27.20 & ron(Vd623,Vd616)
% 27.15/27.20 & ron(Vd622,Vd617)
% 27.15/27.20 & ron(Vd622,Vd616)
% 27.15/27.20 & ? [Vd626] :
% 27.15/27.20 ( Vd623 = Vd626
% 27.15/27.20 & rpoint(Vd626) )
% 27.15/27.20 & ? [Vd625] :
% 27.15/27.20 ( Vd622 = Vd625
% 27.15/27.20 & rpoint(Vd625) )
% 27.15/27.20 & rintersect(Vd616,Vd617)
% 27.15/27.20 & Vd616 != Vd617
% 27.15/27.20 & ? [Vd620] :
% 27.15/27.20 ( Vd617 = Vd620
% 27.15/27.20 & rcircle(Vd620) )
% 27.15/27.20 & ? [Vd619] :
% 27.15/27.20 ( Vd616 = Vd619
% 27.15/27.20 & rcircle(Vd619) ) )
% 27.15/27.20 => ~ rS(Vd622,Vd623,Vd632) ) ).
% 27.15/27.20
% 27.15/27.20 fof('qu(cond(axiom(123), 0), imp(cond(axiom(123), 0)))',axiom,
% 27.15/27.20 ! [Vd606,Vd607,Vd608,Vd613,Vd614] :
% 27.15/27.20 ( ( rR(Vd608,Vd606,Vd607)
% 27.15/27.20 & ~ rinside(Vd608,Vd613)
% 27.15/27.20 & ( ron(Vd606,Vd613)
% 27.15/27.20 | rinside(Vd606,Vd613) )
% 27.15/27.20 & Vd613 = Vd614
% 27.15/27.20 & rcircle(Vd614)
% 27.15/27.20 & ? [Vd612] :
% 27.15/27.20 ( Vd608 = Vd612
% 27.15/27.20 & rpoint(Vd612) )
% 27.15/27.20 & ? [Vd611] :
% 27.15/27.20 ( Vd607 = Vd611
% 27.15/27.20 & rpoint(Vd611) )
% 27.15/27.20 & ? [Vd610] :
% 27.15/27.20 ( Vd606 = Vd610
% 27.15/27.20 & rpoint(Vd610) ) )
% 27.15/27.20 => ( ~ ron(Vd607,Vd613)
% 27.15/27.20 & ~ ron(Vd607,Vd613) ) ) ).
% 27.15/27.20
% 27.15/27.20 fof('qu(cond(axiom(121), 0), imp(cond(axiom(121), 0)))',axiom,
% 27.15/27.20 ! [Vd594,Vd595,Vd596,Vd601,Vd602,Vd603,Vd604] :
% 27.15/27.20 ( ( rR(Vd596,Vd594,Vd595)
% 27.15/27.20 & ( ron(Vd595,Vd603)
% 27.15/27.20 | rinside(Vd595,Vd603) )
% 27.15/27.20 & ( ron(Vd594,Vd603)
% 27.15/27.20 | rinside(Vd594,Vd603) )
% 27.15/27.20 & Vd603 = Vd604
% 27.15/27.20 & rcircle(Vd604)
% 27.15/27.20 & Vd601 = Vd602
% 27.15/27.20 & rline(Vd602)
% 27.15/27.20 & ? [Vd600] :
% 27.15/27.20 ( Vd596 = Vd600
% 27.15/27.20 & rpoint(Vd600) )
% 27.15/27.20 & ? [Vd599] :
% 27.15/27.20 ( Vd595 = Vd599
% 27.15/27.20 & rpoint(Vd599) )
% 27.15/27.20 & ? [Vd598] :
% 27.15/27.20 ( Vd594 = Vd598
% 27.15/27.20 & rpoint(Vd598) ) )
% 27.15/27.20 => rinside(Vd596,Vd603) ) ).
% 27.15/27.20
% 27.15/27.20 fof('qu(cond(axiom(119), 0), imp(cond(axiom(119), 0)))',axiom,
% 27.15/27.20 ! [Vd581,Vd582,Vd583,Vd588,Vd589,Vd590,Vd591] :
% 27.15/27.20 ( ( Vd582 != Vd583
% 27.15/27.20 & ron(Vd583,Vd590)
% 27.15/27.20 & ron(Vd582,Vd590)
% 27.15/27.20 & rinside(Vd581,Vd590)
% 27.15/27.20 & ron(Vd583,Vd588)
% 27.15/27.20 & ron(Vd582,Vd588)
% 27.15/27.20 & ron(Vd581,Vd588)
% 27.15/27.20 & Vd590 = Vd591
% 27.15/27.20 & rcircle(Vd591)
% 27.15/27.20 & Vd588 = Vd589
% 27.15/27.20 & rline(Vd589)
% 27.15/27.20 & ? [Vd587] :
% 27.15/27.20 ( Vd583 = Vd587
% 27.15/27.20 & rpoint(Vd587) )
% 27.15/27.20 & ? [Vd586] :
% 27.15/27.20 ( Vd582 = Vd586
% 27.15/27.20 & rpoint(Vd586) )
% 27.15/27.20 & ? [Vd585] :
% 27.15/27.20 ( Vd581 = Vd585
% 27.15/27.20 & rpoint(Vd585) ) )
% 27.15/27.20 => rR(Vd581,Vd582,Vd583) ) ).
% 27.15/27.20
% 27.15/27.20 fof('qu(cond(axiom(117), 0), imp(cond(axiom(117), 0)))',axiom,
% 27.15/27.20 ! [Vd558,Vd559,Vd560,Vd565,Vd566,Vd567,Vd568,Vd577] :
% 27.15/27.20 ( ( rS(Vd567,Vd577,Vd560)
% 27.15/27.20 & rS(Vd568,Vd577,Vd559)
% 27.15/27.20 & rS(Vd566,Vd567,Vd560)
% 27.15/27.20 & rS(Vd567,Vd568,Vd558)
% 27.15/27.20 & ron(Vd568,Vd560)
% 27.15/27.20 & ron(Vd567,Vd559)
% 27.15/27.20 & ron(Vd566,Vd558)
% 27.15/27.20 & ron(Vd565,Vd560)
% 27.15/27.20 & ron(Vd565,Vd559)
% 27.15/27.20 & ron(Vd565,Vd558)
% 27.15/27.20 & ? [Vd573] :
% 27.15/27.20 ( Vd568 = Vd573
% 27.15/27.20 & rpoint(Vd573) )
% 27.15/27.20 & ? [Vd572] :
% 27.15/27.20 ( Vd567 = Vd572
% 27.15/27.20 & rpoint(Vd572) )
% 27.15/27.20 & ? [Vd571] :
% 27.15/27.20 ( Vd566 = Vd571
% 27.15/27.20 & rpoint(Vd571) )
% 27.15/27.20 & ? [Vd570] :
% 27.15/27.20 ( Vd565 = Vd570
% 27.15/27.20 & rpoint(Vd570) )
% 27.15/27.20 & ? [Vd564] :
% 27.15/27.20 ( Vd560 = Vd564
% 27.15/27.20 & rline(Vd564) )
% 27.15/27.20 & ? [Vd563] :
% 27.15/27.20 ( Vd559 = Vd563
% 27.15/27.20 & rline(Vd563) )
% 27.15/27.20 & ? [Vd562] :
% 27.15/27.20 ( Vd558 = Vd562
% 27.15/27.20 & rline(Vd562) ) )
% 27.15/27.20 => rS(Vd567,Vd577,Vd558) ) ).
% 27.15/27.20
% 27.15/27.20 fof('qu(cond(axiom(115), 0), imp(cond(axiom(115), 0)))',axiom,
% 27.15/27.20 ! [Vd537,Vd538,Vd539,Vd544,Vd545,Vd546,Vd547] :
% 27.15/27.20 ( ( Vd545 != Vd544
% 27.15/27.20 & ~ ron(Vd547,Vd538)
% 27.15/27.20 & ~ rS(Vd545,Vd547,Vd538)
% 27.15/27.20 & rS(Vd546,Vd547,Vd537)
% 27.15/27.20 & ron(Vd547,Vd539)
% 27.15/27.20 & ron(Vd546,Vd538)
% 27.15/27.20 & ron(Vd545,Vd537)
% 27.15/27.20 & ron(Vd544,Vd539)
% 27.15/27.20 & ron(Vd544,Vd538)
% 27.15/27.20 & ron(Vd544,Vd537)
% 27.15/27.20 & ? [Vd552] :
% 27.15/27.20 ( Vd547 = Vd552
% 27.15/27.20 & rpoint(Vd552) )
% 27.15/27.20 & ? [Vd551] :
% 27.15/27.20 ( Vd546 = Vd551
% 27.15/27.20 & rpoint(Vd551) )
% 27.15/27.20 & ? [Vd550] :
% 27.15/27.20 ( Vd545 = Vd550
% 27.15/27.20 & rpoint(Vd550) )
% 27.15/27.20 & ? [Vd549] :
% 27.15/27.20 ( Vd544 = Vd549
% 27.15/27.20 & rpoint(Vd549) )
% 27.15/27.20 & ? [Vd543] :
% 27.15/27.20 ( Vd539 = Vd543
% 27.15/27.20 & rline(Vd543) )
% 27.15/27.20 & ? [Vd542] :
% 27.15/27.20 ( Vd538 = Vd542
% 27.15/27.20 & rline(Vd542) )
% 27.15/27.20 & ? [Vd541] :
% 27.15/27.20 ( Vd537 = Vd541
% 27.15/27.20 & rline(Vd541) ) )
% 27.15/27.20 => rS(Vd545,Vd546,Vd539) ) ).
% 27.15/27.20
% 27.15/27.20 fof('qu(cond(axiom(113), 0), imp(cond(axiom(113), 0)))',axiom,
% 27.15/27.20 ! [Vd516,Vd517,Vd518,Vd523,Vd524,Vd525,Vd526] :
% 27.15/27.20 ( ( rS(Vd524,Vd525,Vd518)
% 27.15/27.20 & rS(Vd525,Vd526,Vd516)
% 27.15/27.20 & ron(Vd526,Vd518)
% 27.15/27.20 & ron(Vd525,Vd518)
% 27.15/27.20 & ron(Vd524,Vd516)
% 27.15/27.20 & ron(Vd523,Vd518)
% 27.15/27.20 & ron(Vd523,Vd517)
% 27.15/27.20 & ron(Vd523,Vd516)
% 27.15/27.20 & ? [Vd531] :
% 27.15/27.20 ( Vd526 = Vd531
% 27.15/27.20 & rpoint(Vd531) )
% 27.15/27.20 & ? [Vd530] :
% 27.15/27.20 ( Vd525 = Vd530
% 27.15/27.20 & rpoint(Vd530) )
% 27.15/27.20 & ? [Vd529] :
% 27.15/27.20 ( Vd524 = Vd529
% 27.15/27.20 & rpoint(Vd529) )
% 27.15/27.20 & ? [Vd528] :
% 27.15/27.20 ( Vd523 = Vd528
% 27.15/27.20 & rpoint(Vd528) )
% 27.15/27.20 & ? [Vd522] :
% 27.15/27.20 ( Vd518 = Vd522
% 27.15/27.20 & rline(Vd522) )
% 27.15/27.20 & ? [Vd521] :
% 27.15/27.20 ( Vd517 = Vd521
% 27.15/27.20 & rline(Vd521) )
% 27.15/27.20 & ? [Vd520] :
% 27.15/27.20 ( Vd516 = Vd520
% 27.15/27.20 & rline(Vd520) ) )
% 27.15/27.20 => ~ rS(Vd524,Vd526,Vd517) ) ).
% 27.15/27.20
% 27.15/27.20 fof('qu(cond(axiom(111), 0), imp(cond(axiom(111), 0)))',axiom,
% 27.15/27.20 ! [Vd500,Vd501,Vd502,Vd507,Vd508] :
% 27.15/27.20 ( ( ron(Vd501,Vd507)
% 27.15/27.20 & ron(Vd501,Vd508)
% 27.15/27.20 & ~ rS(Vd500,Vd502,Vd507)
% 27.15/27.20 & ron(Vd502,Vd508)
% 27.15/27.20 & ron(Vd500,Vd508)
% 27.15/27.20 & Vd507 != Vd508
% 27.15/27.20 & ? [Vd511] :
% 27.15/27.20 ( Vd508 = Vd511
% 27.15/27.20 & rline(Vd511) )
% 27.15/27.20 & ? [Vd510] :
% 27.15/27.20 ( Vd507 = Vd510
% 27.15/27.20 & rline(Vd510) )
% 27.15/27.20 & Vd501 != Vd502
% 27.15/27.20 & Vd500 != Vd502
% 27.15/27.20 & Vd500 != Vd501
% 27.15/27.20 & ? [Vd506] :
% 27.15/27.20 ( Vd502 = Vd506
% 27.15/27.20 & rpoint(Vd506) )
% 27.15/27.20 & ? [Vd505] :
% 27.15/27.20 ( Vd501 = Vd505
% 27.15/27.20 & rpoint(Vd505) )
% 27.15/27.20 & ? [Vd504] :
% 27.15/27.20 ( Vd500 = Vd504
% 27.15/27.20 & rpoint(Vd504) ) )
% 27.15/27.20 => rR(Vd501,Vd500,Vd502) ) ).
% 27.15/27.20
% 27.15/27.20 fof('qu(cond(axiom(109), 0), imp(cond(axiom(109), 0)))',axiom,
% 27.15/27.20 ! [Vd489,Vd490,Vd491,Vd496,Vd497] :
% 27.15/27.20 ( ( ron(Vd490,Vd496)
% 27.15/27.20 & rR(Vd490,Vd489,Vd491)
% 27.15/27.20 & Vd496 = Vd497
% 27.15/27.20 & rline(Vd497)
% 27.15/27.20 & ? [Vd495] :
% 27.15/27.20 ( Vd491 = Vd495
% 27.15/27.20 & rpoint(Vd495) )
% 27.15/27.20 & ? [Vd494] :
% 27.15/27.20 ( Vd490 = Vd494
% 27.15/27.20 & rpoint(Vd494) )
% 27.15/27.20 & ? [Vd493] :
% 27.15/27.20 ( Vd489 = Vd493
% 27.15/27.20 & rpoint(Vd493) ) )
% 27.15/27.20 => ~ rS(Vd489,Vd491,Vd496) ) ).
% 27.15/27.20
% 27.15/27.20 fof('qu(cond(axiom(107), 0), imp(cond(axiom(107), 0)))',axiom,
% 27.15/27.20 ! [Vd478,Vd479,Vd480,Vd485,Vd486] :
% 27.15/27.20 ( ( ~ ron(Vd479,Vd485)
% 27.15/27.20 & ron(Vd478,Vd485)
% 27.15/27.20 & rR(Vd479,Vd478,Vd480)
% 27.15/27.20 & Vd485 = Vd486
% 27.15/27.20 & rline(Vd486)
% 27.15/27.20 & ? [Vd484] :
% 27.15/27.20 ( Vd480 = Vd484
% 27.15/27.20 & rpoint(Vd484) )
% 27.15/27.20 & ? [Vd483] :
% 27.15/27.20 ( Vd479 = Vd483
% 27.15/27.20 & rpoint(Vd483) )
% 27.15/27.20 & ? [Vd482] :
% 27.15/27.20 ( Vd478 = Vd482
% 27.15/27.20 & rpoint(Vd482) ) )
% 27.15/27.20 => rS(Vd479,Vd480,Vd485) ) ).
% 27.15/27.20
% 27.15/27.20 fof('qu(cond(axiom(105), 0), imp(cond(axiom(105), 0)))',axiom,
% 27.15/27.20 ! [Vd466,Vd467,Vd468,Vd473,Vd474] :
% 27.15/27.20 ( ( rS(Vd466,Vd468,Vd473)
% 27.15/27.20 & rR(Vd467,Vd466,Vd468)
% 27.15/27.20 & Vd473 = Vd474
% 27.15/27.20 & rline(Vd474)
% 27.15/27.20 & ? [Vd472] :
% 27.15/27.20 ( Vd468 = Vd472
% 27.15/27.20 & rpoint(Vd472) )
% 27.15/27.20 & ? [Vd471] :
% 27.15/27.20 ( Vd467 = Vd471
% 27.15/27.20 & rpoint(Vd471) )
% 27.15/27.20 & ? [Vd470] :
% 27.15/27.20 ( Vd466 = Vd470
% 27.15/27.20 & rpoint(Vd470) ) )
% 27.15/27.20 => rS(Vd466,Vd467,Vd473) ) ).
% 27.15/27.20
% 27.15/27.20 fof('qu(cond(axiom(103), 0), imp(cond(axiom(103), 0)))',axiom,
% 27.15/27.20 ! [Vd454,Vd455,Vd456,Vd461,Vd462] :
% 27.15/27.20 ( ( ~ rS(Vd454,Vd455,Vd461)
% 27.15/27.20 & ~ ron(Vd456,Vd461)
% 27.15/27.20 & ~ ron(Vd455,Vd461)
% 27.15/27.20 & ~ ron(Vd454,Vd461)
% 27.15/27.20 & Vd461 = Vd462
% 27.15/27.20 & rline(Vd462)
% 27.15/27.20 & ? [Vd460] :
% 27.15/27.20 ( Vd456 = Vd460
% 27.15/27.20 & rpoint(Vd460) )
% 27.15/27.20 & ? [Vd459] :
% 27.15/27.20 ( Vd455 = Vd459
% 27.15/27.20 & rpoint(Vd459) )
% 27.15/27.20 & ? [Vd458] :
% 27.15/27.20 ( Vd454 = Vd458
% 27.15/27.20 & rpoint(Vd458) ) )
% 27.15/27.20 => ( rS(Vd454,Vd456,Vd461)
% 27.15/27.20 | rS(Vd455,Vd456,Vd461) ) ) ).
% 27.15/27.20
% 27.15/27.20 fof('qu(cond(axiom(101), 0), imp(cond(axiom(101), 0)))',axiom,
% 27.15/27.20 ! [Vd442,Vd443,Vd444,Vd449,Vd450] :
% 27.15/27.20 ( ( rS(Vd442,Vd444,Vd449)
% 27.15/27.20 & rS(Vd442,Vd443,Vd449)
% 27.15/27.20 & Vd449 = Vd450
% 27.15/27.20 & rline(Vd450)
% 27.15/27.20 & ? [Vd448] :
% 27.15/27.20 ( Vd444 = Vd448
% 27.15/27.20 & rpoint(Vd448) )
% 27.15/27.20 & ? [Vd447] :
% 27.15/27.20 ( Vd443 = Vd447
% 27.15/27.20 & rpoint(Vd447) )
% 27.15/27.20 & ? [Vd446] :
% 27.15/27.20 ( Vd442 = Vd446
% 27.15/27.20 & rpoint(Vd446) ) )
% 27.15/27.20 => rS(Vd443,Vd444,Vd449) ) ).
% 27.15/27.20
% 27.15/27.20 fof('qu(cond(axiom(97), 0), imp(cond(axiom(97), 0)))',axiom,
% 27.15/27.20 ! [Vd425,Vd426,Vd430,Vd431] :
% 27.15/27.20 ( ( rS(Vd425,Vd426,Vd430)
% 27.15/27.20 & Vd430 = Vd431
% 27.15/27.20 & rline(Vd431)
% 27.15/27.20 & ? [Vd429] :
% 27.15/27.20 ( Vd426 = Vd429
% 27.15/27.20 & rpoint(Vd429) )
% 27.15/27.20 & ? [Vd428] :
% 27.15/27.20 ( Vd425 = Vd428
% 27.15/27.20 & rpoint(Vd428) ) )
% 27.15/27.20 => rS(Vd426,Vd425,Vd430) ) ).
% 27.15/27.20
% 27.15/27.20 fof('qu(cond(axiom(95), 0), imp(cond(axiom(95), 0)))',axiom,
% 27.15/27.20 ! [Vd420,Vd421,Vd422,Vd423] :
% 27.15/27.20 ( ( ~ ron(Vd420,Vd422)
% 27.15/27.20 & Vd422 = Vd423
% 27.15/27.20 & rline(Vd423)
% 27.15/27.20 & Vd420 = Vd421
% 27.15/27.20 & rpoint(Vd421) )
% 27.15/27.20 => rS(Vd420,Vd420,Vd422) ) ).
% 27.15/27.20
% 27.15/27.20 fof('qu(cond(axiom(93), 0), imp(cond(axiom(93), 0)))',axiom,
% 27.15/27.20 ! [Vd408,Vd409,Vd410,Vd411] :
% 27.15/27.20 ( ( rR(Vd409,Vd408,Vd411)
% 27.15/27.20 & rR(Vd409,Vd408,Vd410)
% 27.15/27.20 & ? [Vd416] :
% 27.15/27.20 ( Vd411 = Vd416
% 27.15/27.20 & rpoint(Vd416) )
% 27.15/27.20 & ? [Vd415] :
% 27.15/27.20 ( Vd410 = Vd415
% 27.15/27.20 & rpoint(Vd415) )
% 27.15/27.20 & ? [Vd414] :
% 27.15/27.20 ( Vd409 = Vd414
% 27.15/27.20 & rpoint(Vd414) )
% 27.15/27.20 & ? [Vd413] :
% 27.15/27.20 ( Vd408 = Vd413
% 27.15/27.20 & rpoint(Vd413) ) )
% 27.15/27.20 => ~ rR(Vd409,Vd410,Vd411) ) ).
% 27.15/27.20
% 27.15/27.20 fof('qu(cond(axiom(89), 0), imp(cond(axiom(89), 0)))',axiom,
% 27.15/27.20 ! [Vd384,Vd385,Vd386,Vd387] :
% 27.15/27.20 ( ( rR(Vd386,Vd385,Vd387)
% 27.15/27.20 & rR(Vd385,Vd384,Vd386)
% 27.15/27.20 & ? [Vd392] :
% 27.15/27.20 ( Vd387 = Vd392
% 27.15/27.20 & rpoint(Vd392) )
% 27.15/27.20 & ? [Vd391] :
% 27.15/27.20 ( Vd386 = Vd391
% 27.15/27.20 & rpoint(Vd391) )
% 27.15/27.20 & ? [Vd390] :
% 27.15/27.20 ( Vd385 = Vd390
% 27.15/27.20 & rpoint(Vd390) )
% 27.15/27.20 & ? [Vd389] :
% 27.15/27.20 ( Vd384 = Vd389
% 27.15/27.20 & rpoint(Vd389) ) )
% 27.15/27.20 => rR(Vd385,Vd384,Vd387) ) ).
% 27.15/27.20
% 27.15/27.20 fof('qu(cond(axiom(87), 0), imp(cond(axiom(87), 0)))',axiom,
% 27.15/27.20 ! [Vd372,Vd373,Vd374,Vd375] :
% 27.15/27.20 ( ( rR(Vd375,Vd372,Vd373)
% 27.15/27.20 & rR(Vd373,Vd372,Vd374)
% 27.15/27.20 & ? [Vd380] :
% 27.15/27.20 ( Vd375 = Vd380
% 27.15/27.20 & rpoint(Vd380) )
% 27.15/27.20 & ? [Vd379] :
% 27.15/27.20 ( Vd374 = Vd379
% 27.15/27.20 & rpoint(Vd379) )
% 27.15/27.20 & ? [Vd378] :
% 27.15/27.20 ( Vd373 = Vd378
% 27.15/27.20 & rpoint(Vd378) )
% 27.15/27.20 & ? [Vd377] :
% 27.15/27.20 ( Vd372 = Vd377
% 27.15/27.20 & rpoint(Vd377) ) )
% 27.15/27.20 => rR(Vd375,Vd372,Vd374) ) ).
% 27.15/27.20
% 27.15/27.20 fof('qu(cond(axiom(85), 0), imp(cond(axiom(85), 0)))',axiom,
% 27.15/27.20 ! [Vd362,Vd363,Vd364,Vd369,Vd370] :
% 27.15/27.20 ( ( Vd369 = Vd370
% 27.15/27.20 & ron(Vd364,Vd369)
% 27.15/27.20 & ron(Vd362,Vd369)
% 27.15/27.20 & rR(Vd363,Vd362,Vd364)
% 27.15/27.20 & rline(Vd370)
% 27.15/27.20 & ? [Vd368] :
% 27.15/27.20 ( Vd364 = Vd368
% 27.15/27.20 & rpoint(Vd368) )
% 27.15/27.20 & ? [Vd367] :
% 27.15/27.20 ( Vd363 = Vd367
% 27.15/27.20 & rpoint(Vd367) )
% 27.15/27.20 & ? [Vd366] :
% 27.15/27.20 ( Vd362 = Vd366
% 27.15/27.20 & rpoint(Vd366) ) )
% 27.15/27.20 => ron(Vd363,Vd369) ) ).
% 27.15/27.20
% 27.15/27.20 fof('qu(cond(axiom(83), 0), imp(cond(axiom(83), 0)))',axiom,
% 27.15/27.20 ! [Vd352,Vd353,Vd354,Vd359,Vd360] :
% 27.15/27.20 ( ( Vd359 = Vd360
% 27.15/27.20 & ron(Vd353,Vd359)
% 27.15/27.20 & ron(Vd352,Vd359)
% 27.15/27.20 & rR(Vd353,Vd352,Vd354)
% 27.15/27.20 & rline(Vd360)
% 27.15/27.20 & ? [Vd358] :
% 27.15/27.20 ( Vd354 = Vd358
% 27.15/27.20 & rpoint(Vd358) )
% 27.15/27.20 & ? [Vd357] :
% 27.15/27.20 ( Vd353 = Vd357
% 27.15/27.20 & rpoint(Vd357) )
% 27.15/27.20 & ? [Vd356] :
% 27.15/27.20 ( Vd352 = Vd356
% 27.15/27.20 & rpoint(Vd356) ) )
% 27.15/27.20 => ron(Vd354,Vd359) ) ).
% 27.15/27.20
% 27.15/27.20 fof('qu(cond(axiom(81), 0), imp(cond(axiom(81), 0)))',axiom,
% 27.15/27.20 ! [Vd340,Vd341,Vd342] :
% 27.15/27.20 ( ( rR(Vd341,Vd340,Vd342)
% 27.15/27.20 & ? [Vd346] :
% 27.15/27.20 ( Vd342 = Vd346
% 27.15/27.20 & rpoint(Vd346) )
% 27.15/27.20 & ? [Vd345] :
% 27.15/27.20 ( Vd341 = Vd345
% 27.15/27.20 & rpoint(Vd345) )
% 27.15/27.20 & ? [Vd344] :
% 27.15/27.20 ( Vd340 = Vd344
% 27.15/27.20 & rpoint(Vd344) ) )
% 27.15/27.20 => ( ~ rR(Vd340,Vd341,Vd342)
% 27.15/27.20 & Vd340 != Vd342
% 27.15/27.20 & Vd340 != Vd341
% 27.15/27.20 & rR(Vd341,Vd342,Vd340) ) ) ).
% 27.15/27.20
% 27.15/27.20 fof('qu(cond(axiom(77), 0), imp(cond(axiom(77), 0)))',axiom,
% 27.15/27.20 ! [Vd334,Vd335] :
% 27.15/27.20 ( rcenter(Vd334,Vd335)
% 27.15/27.20 => rinside(Vd334,Vd335) ) ).
% 27.15/27.20
% 27.15/27.20 fof('qu(cond(axiom(75), 0), imp(cond(axiom(75), 0)))',axiom,
% 27.15/27.20 ! [Vd328,Vd329,Vd331,Vd332] :
% 27.15/27.20 ( ( rcenter(Vd332,Vd328)
% 27.15/27.20 & rcenter(Vd331,Vd328)
% 27.15/27.20 & Vd328 = Vd329
% 27.15/27.20 & rcircle(Vd329) )
% 27.15/27.20 => Vd331 = Vd332 ) ).
% 27.15/27.20
% 27.15/27.20 fof('qu(cond(axiom(73), 0), imp(cond(axiom(73), 0)))',axiom,
% 27.15/27.20 ! [Vd314,Vd315,Vd319,Vd320] :
% 27.15/27.20 ( ( ron(Vd315,Vd320)
% 27.15/27.20 & ron(Vd315,Vd319)
% 27.15/27.20 & ron(Vd314,Vd320)
% 27.15/27.20 & ron(Vd314,Vd319)
% 27.15/27.20 & ? [Vd324] :
% 27.15/27.20 ( Vd320 = Vd324
% 27.15/27.20 & rline(Vd324) )
% 27.15/27.20 & ? [Vd323] :
% 27.15/27.20 ( Vd319 = Vd323
% 27.15/27.20 & rline(Vd323) )
% 27.15/27.20 & Vd314 != Vd315
% 27.15/27.20 & ? [Vd318] :
% 27.15/27.20 ( Vd315 = Vd318
% 27.15/27.20 & rpoint(Vd318) )
% 27.15/27.20 & ? [Vd317] :
% 27.15/27.20 ( Vd314 = Vd317
% 27.15/27.20 & rpoint(Vd317) ) )
% 27.15/27.20 => Vd319 = Vd320 ) ).
% 27.15/27.20
% 27.15/27.20 fof('qu(cond(axiom(71), 0), imp(cond(axiom(71), 0)))',axiom,
% 27.15/27.20 ! [Vd301,Vd302,Vd306,Vd307,Vd308,Vd309,Vd311] :
% 27.15/27.20 ( ( ~ ron(Vd311,Vd306)
% 27.15/27.20 & ron(Vd309,Vd306)
% 27.15/27.20 & ron(Vd308,Vd306)
% 27.15/27.20 & rcenter(Vd309,Vd302)
% 27.15/27.20 & rcenter(Vd308,Vd301)
% 27.15/27.20 & rintersect(Vd301,Vd302)
% 27.15/27.20 & Vd306 = Vd307
% 27.15/27.20 & rline(Vd307)
% 27.15/27.20 & ? [Vd305] :
% 27.15/27.20 ( Vd302 = Vd305
% 27.15/27.20 & rcircle(Vd305) )
% 27.15/27.20 & ? [Vd304] :
% 27.15/27.20 ( Vd301 = Vd304
% 27.15/27.20 & rcircle(Vd304) ) )
% 27.15/27.20 => ? [Vd312] :
% 27.15/27.20 ( ~ rS(Vd312,Vd311,Vd306)
% 27.15/27.20 & ron(Vd312,Vd302)
% 27.15/27.20 & ron(Vd312,Vd301)
% 27.15/27.20 & rpoint(Vd312) ) ) ).
% 27.15/27.20
% 27.15/27.20 fof('qu(cond(axiom(69), 0), imp(cond(axiom(69), 0)))',axiom,
% 27.15/27.20 ! [Vd288,Vd289,Vd293,Vd294,Vd295,Vd296,Vd298] :
% 27.15/27.20 ( ( ~ ron(Vd298,Vd293)
% 27.15/27.20 & ron(Vd296,Vd293)
% 27.15/27.20 & ron(Vd295,Vd293)
% 27.15/27.20 & rcenter(Vd296,Vd289)
% 27.15/27.20 & rcenter(Vd295,Vd288)
% 27.15/27.20 & rintersect(Vd288,Vd289)
% 27.15/27.20 & Vd293 = Vd294
% 27.15/27.20 & rline(Vd294)
% 27.15/27.20 & ? [Vd292] :
% 27.15/27.20 ( Vd289 = Vd292
% 27.15/27.20 & rcircle(Vd292) )
% 27.15/27.20 & ? [Vd291] :
% 27.15/27.20 ( Vd288 = Vd291
% 27.15/27.20 & rcircle(Vd291) ) )
% 27.15/27.20 => ? [Vd299] :
% 27.15/27.20 ( rS(Vd299,Vd298,Vd293)
% 27.15/27.20 & ron(Vd299,Vd289)
% 27.15/27.20 & ron(Vd299,Vd288)
% 27.15/27.20 & rpoint(Vd299) ) ) ).
% 27.15/27.20
% 27.15/27.20 fof('qu(cond(axiom(65), 0), imp(cond(axiom(65), 0)))',axiom,
% 27.15/27.20 ! [Vd275,Vd276,Vd277,Vd278] :
% 27.15/27.20 ( ( rintersect(Vd275,Vd277)
% 27.15/27.20 & Vd277 = Vd278
% 27.15/27.20 & rcircle(Vd278)
% 27.15/27.20 & Vd275 = Vd276
% 27.15/27.20 & rcircle(Vd276) )
% 27.15/27.20 => ? [Vd279] :
% 27.15/27.20 ( ron(Vd279,Vd277)
% 27.15/27.20 & ron(Vd279,Vd275)
% 27.15/27.20 & rpoint(Vd279) ) ) ).
% 27.15/27.20
% 27.15/27.20 fof('qu(cond(axiom(63), 0), imp(cond(axiom(63), 0)))',axiom,
% 27.15/27.20 ! [Vd263,Vd264,Vd265,Vd266,Vd267,Vd268,Vd269,Vd270] :
% 27.15/27.20 ( ( Vd269 != Vd267
% 27.15/27.20 & ron(Vd269,Vd265)
% 27.15/27.20 & Vd269 = Vd270
% 27.15/27.20 & rpoint(Vd270)
% 27.15/27.20 & ron(Vd267,Vd265)
% 27.15/27.20 & rinside(Vd267,Vd263)
% 27.15/27.20 & Vd267 = Vd268
% 27.15/27.20 & rpoint(Vd268)
% 27.15/27.20 & Vd265 = Vd266
% 27.15/27.20 & rline(Vd266)
% 27.15/27.20 & Vd263 = Vd264
% 27.15/27.20 & rcircle(Vd264) )
% 27.15/27.20 => ? [Vd272] :
% 27.15/27.20 ( rR(Vd267,Vd272,Vd269)
% 27.15/27.20 & ron(Vd272,Vd265)
% 27.15/27.20 & ron(Vd272,Vd263)
% 27.15/27.20 & rpoint(Vd272) ) ) ).
% 27.15/27.20
% 27.15/27.20 fof('qu(cond(axiom(59), 0), imp(cond(axiom(59), 0)))',axiom,
% 27.15/27.20 ! [Vd244,Vd245,Vd246,Vd247] :
% 27.15/27.20 ( ( rintersect(Vd246,Vd244)
% 27.15/27.20 & Vd246 = Vd247
% 27.15/27.20 & rline(Vd247)
% 27.15/27.20 & Vd244 = Vd245
% 27.15/27.20 & rcircle(Vd245) )
% 27.15/27.20 => ? [Vd248,Vd250] :
% 27.15/27.20 ( Vd248 != Vd250
% 27.15/27.20 & ron(Vd250,Vd244)
% 27.15/27.20 & ron(Vd250,Vd246)
% 27.15/27.20 & rpoint(Vd250)
% 27.15/27.20 & ron(Vd248,Vd244)
% 27.15/27.20 & ron(Vd248,Vd246)
% 27.15/27.20 & rpoint(Vd248) ) ) ).
% 27.15/27.20
% 27.15/27.20 fof('qu(cond(axiom(57), 0), imp(cond(axiom(57), 0)))',axiom,
% 27.15/27.21 ! [Vd238,Vd239,Vd240,Vd241] :
% 27.15/27.21 ( ( rintersect(Vd240,Vd238)
% 27.15/27.21 & Vd240 = Vd241
% 27.15/27.21 & rline(Vd241)
% 27.15/27.21 & Vd238 = Vd239
% 27.15/27.21 & rcircle(Vd239) )
% 27.15/27.21 => ? [Vd242] :
% 27.15/27.21 ( ron(Vd242,Vd238)
% 27.15/27.21 & ron(Vd242,Vd240)
% 27.15/27.21 & rpoint(Vd242) ) ) ).
% 27.15/27.21
% 27.15/27.21 fof('qu(cond(axiom(55), 0), imp(cond(axiom(55), 0)))',axiom,
% 27.15/27.21 ! [Vd232,Vd233,Vd234,Vd235] :
% 27.15/27.21 ( ( rintersect(Vd232,Vd234)
% 27.15/27.21 & Vd234 = Vd235
% 27.15/27.21 & rline(Vd235)
% 27.15/27.21 & Vd232 = Vd233
% 27.15/27.21 & rline(Vd233) )
% 27.15/27.21 => ? [Vd236] :
% 27.15/27.21 ( ron(Vd236,Vd234)
% 27.15/27.21 & ron(Vd236,Vd232)
% 27.15/27.21 & rpoint(Vd236) ) ) ).
% 27.15/27.21
% 27.15/27.21 fof('qu(cond(axiom(51), 0), imp(cond(axiom(51), 0)))',axiom,
% 27.15/27.21 ! [Vd217,Vd218] :
% 27.15/27.21 ( ( Vd217 != Vd218
% 27.15/27.21 & ? [Vd221] :
% 27.15/27.21 ( Vd218 = Vd221
% 27.15/27.21 & rpoint(Vd221) )
% 27.15/27.21 & ? [Vd220] :
% 27.15/27.21 ( Vd217 = Vd220
% 27.15/27.21 & rpoint(Vd220) ) )
% 27.15/27.21 => ? [Vd223] :
% 27.15/27.21 ( ron(Vd218,Vd223)
% 27.15/27.21 & ron(Vd217,Vd223)
% 27.15/27.21 & rline(Vd223) ) ) ).
% 27.15/27.21
% 27.15/27.21 fof('qu(cond(axiom(49), 0), imp(cond(axiom(49), 0)))',axiom,
% 27.15/27.21 ! [Vd214,Vd215] :
% 27.15/27.21 ( ( Vd214 = Vd215
% 27.15/27.21 & rcircle(Vd215) )
% 27.15/27.21 => ? [Vd216] :
% 27.15/27.21 ( ~ ron(Vd216,Vd214)
% 27.15/27.21 & ~ rinside(Vd216,Vd214)
% 27.15/27.21 & rpoint(Vd216) ) ) ).
% 27.15/27.21
% 27.15/27.21 fof('qu(cond(axiom(47), 0), imp(cond(axiom(47), 0)))',axiom,
% 27.15/27.21 ! [Vd211,Vd212] :
% 27.15/27.21 ( ( Vd211 = Vd212
% 27.15/27.21 & rcircle(Vd212) )
% 27.15/27.21 => ? [Vd213] :
% 27.15/27.21 ( rinside(Vd213,Vd211)
% 27.15/27.21 & rpoint(Vd213) ) ) ).
% 27.15/27.21
% 27.15/27.21 fof('qu(cond(axiom(45), 0), imp(cond(axiom(45), 0)))',axiom,
% 27.15/27.21 ! [Vd200,Vd201,Vd202,Vd203] :
% 27.15/27.21 ( ( ron(Vd203,Vd200)
% 27.15/27.21 & ron(Vd202,Vd200)
% 27.15/27.21 & ? [Vd206] :
% 27.15/27.21 ( Vd203 = Vd206
% 27.15/27.21 & rpoint(Vd206) )
% 27.15/27.21 & ? [Vd205] :
% 27.15/27.21 ( Vd202 = Vd205
% 27.15/27.21 & rpoint(Vd205) )
% 27.15/27.21 & Vd200 = Vd201
% 27.15/27.21 & rcircle(Vd201) )
% 27.15/27.21 => ? [Vd208] :
% 27.15/27.21 ( Vd208 != Vd203
% 27.15/27.21 & Vd208 != Vd202
% 27.15/27.21 & ron(Vd208,Vd200)
% 27.15/27.21 & rpoint(Vd208) ) ) ).
% 27.15/27.21
% 27.15/27.21 fof('qu(cond(axiom(43), 0), imp(cond(axiom(43), 0)))',axiom,
% 27.15/27.21 ! [Vd194,Vd195,Vd196,Vd197] :
% 27.15/27.21 ( ( ron(Vd196,Vd194)
% 27.15/27.21 & Vd196 = Vd197
% 27.15/27.21 & rpoint(Vd197)
% 27.15/27.21 & Vd194 = Vd195
% 27.15/27.21 & rcircle(Vd195) )
% 27.15/27.21 => ? [Vd198] :
% 27.15/27.21 ( Vd198 != Vd196
% 27.15/27.21 & ron(Vd198,Vd194)
% 27.15/27.21 & rpoint(Vd198) ) ) ).
% 27.15/27.21
% 27.15/27.21 fof('qu(cond(axiom(41), 0), imp(cond(axiom(41), 0)))',axiom,
% 27.15/27.21 ! [Vd191,Vd192] :
% 27.15/27.21 ( ( Vd191 = Vd192
% 27.15/27.21 & rcircle(Vd192) )
% 27.15/27.21 => ? [Vd193] :
% 27.15/27.21 ( ron(Vd193,Vd191)
% 27.15/27.21 & rpoint(Vd193) ) ) ).
% 27.15/27.21
% 27.15/27.21 fof('qu(cond(axiom(39), 0), imp(cond(axiom(39), 0)))',axiom,
% 27.15/27.21 ! [Vd185,Vd186,Vd187,Vd188] :
% 27.15/27.21 ( ( Vd187 = Vd188
% 27.15/27.21 & ~ ron(Vd187,Vd185)
% 27.15/27.21 & rpoint(Vd188)
% 27.15/27.21 & Vd185 = Vd186
% 27.15/27.21 & rline(Vd186) )
% 27.15/27.21 => ? [Vd189] :
% 27.15/27.21 ( ~ rS(Vd189,Vd187,Vd185)
% 27.15/27.21 & rpoint(Vd189) ) ) ).
% 27.15/27.21
% 27.15/27.21 fof('qu(cond(axiom(37), 0), imp(cond(axiom(37), 0)))',axiom,
% 27.15/27.21 ! [Vd170,Vd171,Vd172,Vd173,Vd174,Vd175,Vd177,Vd178] :
% 27.15/27.21 ( ( Vd172 = Vd173
% 27.15/27.21 & Vd174 = Vd175
% 27.15/27.21 & Vd177 = Vd178
% 27.15/27.21 & rS(Vd177,Vd172,Vd170)
% 27.15/27.21 & rpoint(Vd178)
% 27.15/27.21 & rS(Vd174,Vd172,Vd170)
% 27.15/27.21 & rpoint(Vd175)
% 27.15/27.21 & ~ ron(Vd172,Vd170)
% 27.15/27.21 & rpoint(Vd173)
% 27.15/27.21 & Vd170 = Vd171
% 27.15/27.21 & rline(Vd171) )
% 27.15/27.21 => ? [Vd180] :
% 27.15/27.21 ( Vd180 != Vd177
% 27.15/27.21 & Vd180 != Vd174
% 27.15/27.21 & Vd180 != Vd172
% 27.15/27.21 & rS(Vd180,Vd172,Vd170)
% 27.15/27.21 & rpoint(Vd180) ) ) ).
% 27.15/27.21
% 27.15/27.21 fof('qu(cond(axiom(35), 0), imp(cond(axiom(35), 0)))',axiom,
% 27.15/27.21 ! [Vd159,Vd160,Vd161,Vd162,Vd163,Vd164] :
% 27.15/27.21 ( ( Vd161 = Vd162
% 27.15/27.21 & Vd163 = Vd164
% 27.15/27.21 & rS(Vd163,Vd161,Vd159)
% 27.15/27.21 & rpoint(Vd164)
% 27.15/27.21 & ~ ron(Vd161,Vd159)
% 27.15/27.21 & rpoint(Vd162)
% 27.15/27.21 & Vd159 = Vd160
% 27.15/27.21 & rline(Vd160) )
% 27.15/27.21 => ? [Vd166] :
% 27.15/27.21 ( Vd166 != Vd163
% 27.15/27.21 & Vd166 != Vd161
% 27.15/27.21 & rS(Vd166,Vd161,Vd159)
% 27.15/27.21 & rpoint(Vd166) ) ) ).
% 27.15/27.21
% 27.15/27.21 fof('qu(cond(axiom(33), 0), imp(cond(axiom(33), 0)))',axiom,
% 27.15/27.21 ! [Vd152,Vd153,Vd154,Vd155] :
% 27.15/27.21 ( ( Vd154 = Vd155
% 27.15/27.21 & ~ ron(Vd154,Vd152)
% 27.15/27.21 & rpoint(Vd155)
% 27.15/27.21 & Vd152 = Vd153
% 27.15/27.21 & rline(Vd153) )
% 27.15/27.21 => ? [Vd156] :
% 27.15/27.21 ( Vd156 != Vd154
% 27.15/27.21 & rS(Vd156,Vd154,Vd152)
% 27.15/27.21 & rpoint(Vd156) ) ) ).
% 27.15/27.21
% 27.15/27.21 fof('qu(cond(axiom(31), 0), imp(cond(axiom(31), 0)))',axiom,
% 27.15/27.21 ! [Vd138,Vd139,Vd140,Vd141,Vd146,Vd147] :
% 27.15/27.21 ( ( Vd146 = Vd147
% 27.15/27.21 & rR(Vd141,Vd140,Vd146)
% 27.15/27.21 & rpoint(Vd147)
% 27.15/27.21 & ron(Vd141,Vd138)
% 27.15/27.21 & ron(Vd140,Vd138)
% 27.15/27.21 & ? [Vd144] :
% 27.15/27.21 ( Vd141 = Vd144
% 27.15/27.21 & rpoint(Vd144) )
% 27.15/27.21 & ? [Vd143] :
% 27.15/27.21 ( Vd140 = Vd143
% 27.15/27.21 & rpoint(Vd143) )
% 27.15/27.21 & Vd138 = Vd139
% 27.15/27.21 & rline(Vd139) )
% 27.15/27.21 => ? [Vd149] :
% 27.15/27.21 ( Vd149 != Vd146
% 27.15/27.21 & rR(Vd141,Vd140,Vd149)
% 27.15/27.21 & rpoint(Vd149) ) ) ).
% 27.15/27.21
% 27.15/27.21 fof('qu(cond(axiom(29), 0), imp(cond(axiom(29), 0)))',axiom,
% 27.15/27.21 ! [Vd127,Vd128,Vd129,Vd130] :
% 27.15/27.21 ( ( Vd129 != Vd130
% 27.15/27.21 & ron(Vd130,Vd127)
% 27.15/27.21 & ron(Vd129,Vd127)
% 27.15/27.21 & ? [Vd133] :
% 27.15/27.21 ( Vd130 = Vd133
% 27.15/27.21 & rpoint(Vd133) )
% 27.15/27.21 & ? [Vd132] :
% 27.15/27.21 ( Vd129 = Vd132
% 27.15/27.21 & rpoint(Vd132) )
% 27.15/27.21 & Vd127 = Vd128
% 27.15/27.21 & rline(Vd128) )
% 27.15/27.21 => ? [Vd136] :
% 27.15/27.21 ( rR(Vd130,Vd129,Vd136)
% 27.15/27.21 & rpoint(Vd136) ) ) ).
% 27.15/27.21
% 27.15/27.21 fof('qu(cond(axiom(27), 0), imp(cond(axiom(27), 0)))',axiom,
% 27.15/27.21 ! [Vd109,Vd110,Vd111,Vd112,Vd113,Vd114] :
% 27.15/27.21 ( ( rR(Vd114,Vd111,Vd112)
% 27.15/27.21 & rR(Vd113,Vd111,Vd112)
% 27.15/27.21 & ron(Vd113,Vd109)
% 27.15/27.21 & ron(Vd112,Vd109)
% 27.15/27.21 & ron(Vd111,Vd109)
% 27.15/27.21 & ? [Vd119] :
% 27.15/27.21 ( Vd114 = Vd119
% 27.15/27.21 & rpoint(Vd119) )
% 27.15/27.21 & ? [Vd118] :
% 27.15/27.21 ( Vd113 = Vd118
% 27.15/27.21 & rpoint(Vd118) )
% 27.15/27.21 & ? [Vd117] :
% 27.15/27.21 ( Vd112 = Vd117
% 27.15/27.21 & rpoint(Vd117) )
% 27.15/27.21 & ? [Vd116] :
% 27.15/27.21 ( Vd111 = Vd116
% 27.15/27.21 & rpoint(Vd116) )
% 27.15/27.21 & Vd109 = Vd110
% 27.15/27.21 & rline(Vd110) )
% 27.15/27.21 => ? [Vd123] :
% 27.15/27.21 ( Vd123 != Vd114
% 27.15/27.21 & Vd123 != Vd113
% 27.15/27.21 & rR(Vd123,Vd111,Vd112)
% 27.15/27.21 & rpoint(Vd123) ) ) ).
% 27.15/27.21
% 27.15/27.21 fof('qu(cond(axiom(25), 0), imp(cond(axiom(25), 0)))',axiom,
% 27.15/27.21 ! [Vd95,Vd96,Vd97,Vd98,Vd99] :
% 27.15/27.21 ( ( rR(Vd99,Vd97,Vd98)
% 27.15/27.21 & ron(Vd98,Vd95)
% 27.15/27.21 & ron(Vd97,Vd95)
% 27.15/27.21 & ? [Vd103] :
% 27.15/27.21 ( Vd99 = Vd103
% 27.15/27.21 & rpoint(Vd103) )
% 27.15/27.21 & ? [Vd102] :
% 27.15/27.21 ( Vd98 = Vd102
% 27.15/27.21 & rpoint(Vd102) )
% 27.15/27.21 & ? [Vd101] :
% 27.15/27.21 ( Vd97 = Vd101
% 27.15/27.21 & rpoint(Vd101) )
% 27.15/27.21 & Vd95 = Vd96
% 27.15/27.21 & rline(Vd96) )
% 27.15/27.21 => ? [Vd106] :
% 27.15/27.21 ( Vd106 != Vd99
% 27.15/27.21 & rR(Vd106,Vd97,Vd98)
% 27.15/27.21 & rpoint(Vd106) ) ) ).
% 27.15/27.21
% 27.15/27.21 fof('qu(cond(axiom(23), 0), imp(cond(axiom(23), 0)))',axiom,
% 27.15/27.21 ! [Vd84,Vd85,Vd86,Vd87] :
% 27.15/27.21 ( ( Vd86 != Vd87
% 27.15/27.21 & ron(Vd87,Vd84)
% 27.15/27.21 & ron(Vd86,Vd84)
% 27.15/27.21 & ? [Vd90] :
% 27.15/27.21 ( Vd87 = Vd90
% 27.15/27.21 & rpoint(Vd90) )
% 27.15/27.21 & ? [Vd89] :
% 27.15/27.21 ( Vd86 = Vd89
% 27.15/27.21 & rpoint(Vd89) )
% 27.15/27.21 & Vd84 = Vd85
% 27.15/27.21 & rline(Vd85) )
% 27.15/27.21 => ? [Vd93] :
% 27.15/27.21 ( rR(Vd93,Vd86,Vd87)
% 27.15/27.21 & rpoint(Vd93) ) ) ).
% 27.15/27.21
% 27.15/27.21 fof('qu(cond(axiom(21), 0), imp(cond(axiom(21), 0)))',axiom,
% 27.15/27.21 ! [Vd71,Vd72,Vd73,Vd74,Vd75] :
% 27.15/27.21 ( ( ron(Vd75,Vd71)
% 27.15/27.21 & ron(Vd74,Vd71)
% 27.15/27.21 & ron(Vd73,Vd71)
% 27.15/27.21 & ? [Vd79] :
% 27.15/27.21 ( Vd75 = Vd79
% 27.15/27.21 & rpoint(Vd79) )
% 27.15/27.21 & ? [Vd78] :
% 27.15/27.21 ( Vd74 = Vd78
% 27.15/27.21 & rpoint(Vd78) )
% 27.15/27.21 & ? [Vd77] :
% 27.15/27.21 ( Vd73 = Vd77
% 27.15/27.21 & rpoint(Vd77) )
% 27.15/27.21 & Vd71 = Vd72
% 27.15/27.21 & rline(Vd72) )
% 27.15/27.21 => ? [Vd81] :
% 27.15/27.21 ( Vd81 != Vd74
% 27.15/27.21 & Vd81 != Vd73
% 27.15/27.21 & ron(Vd81,Vd71)
% 27.15/27.21 & rpoint(Vd81) ) ) ).
% 27.15/27.21
% 27.15/27.21 fof('qu(cond(axiom(19), 0), imp(cond(axiom(19), 0)))',axiom,
% 27.15/27.21 ! [Vd61,Vd62,Vd63,Vd64,Vd65,Vd66] :
% 27.15/27.21 ( ( ron(Vd65,Vd61)
% 27.15/27.21 & ron(Vd63,Vd61)
% 27.15/27.21 & Vd65 = Vd66
% 27.15/27.21 & rpoint(Vd66)
% 27.15/27.21 & Vd63 = Vd64
% 27.15/27.21 & rpoint(Vd64)
% 27.15/27.21 & Vd61 = Vd62
% 27.15/27.21 & rline(Vd62) )
% 27.15/27.21 => ? [Vd68] :
% 27.15/27.21 ( Vd68 != Vd65
% 27.15/27.21 & Vd68 != Vd63
% 27.15/27.21 & ron(Vd68,Vd61)
% 27.15/27.21 & rpoint(Vd68) ) ) ).
% 27.15/27.21
% 27.15/27.21 fof('qu(cond(axiom(17), 0), imp(cond(axiom(17), 0)))',axiom,
% 27.15/27.21 ! [Vd55,Vd56,Vd57,Vd58] :
% 27.15/27.21 ( ( ron(Vd57,Vd55)
% 27.15/27.21 & Vd57 = Vd58
% 27.15/27.21 & rpoint(Vd58)
% 27.15/27.21 & Vd55 = Vd56
% 27.15/27.21 & rline(Vd56) )
% 27.15/27.21 => ? [Vd59] :
% 27.15/27.21 ( Vd59 != Vd57
% 27.15/27.21 & ron(Vd59,Vd55)
% 27.15/27.21 & rpoint(Vd59) ) ) ).
% 27.15/27.21
% 27.15/27.21 fof('qu(cond(axiom(15), 0), imp(cond(axiom(15), 0)))',axiom,
% 27.15/27.21 ! [Vd52,Vd53] :
% 27.15/27.21 ( ( Vd52 = Vd53
% 27.15/27.21 & rline(Vd53) )
% 27.15/27.21 => ? [Vd54] :
% 27.15/27.21 ( ron(Vd54,Vd52)
% 27.15/27.21 & rpoint(Vd54) ) ) ).
% 27.15/27.21
% 27.15/27.21 fof('qu(cond(axiom(13), 0), imp(cond(axiom(13), 0)))',axiom,
% 27.15/27.21 ! [Vd38,Vd39,Vd40,Vd41] :
% 27.15/27.21 ( ( ? [Vd46] :
% 27.15/27.21 ( Vd41 = Vd46
% 27.15/27.21 & rpoint(Vd46) )
% 27.15/27.21 & ? [Vd45] :
% 27.15/27.21 ( Vd40 = Vd45
% 27.15/27.21 & rpoint(Vd45) )
% 27.15/27.21 & ? [Vd44] :
% 27.15/27.21 ( Vd39 = Vd44
% 27.15/27.21 & rpoint(Vd44) )
% 27.15/27.21 & ? [Vd43] :
% 27.15/27.21 ( Vd38 = Vd43
% 27.15/27.21 & rpoint(Vd43) ) )
% 27.15/27.21 => ? [Vd47] :
% 27.15/27.21 ( Vd47 != Vd41
% 27.15/27.21 & Vd47 != Vd40
% 27.15/27.21 & Vd47 != Vd39
% 27.15/27.21 & Vd47 != Vd38
% 27.15/27.21 & rpoint(Vd47) ) ) ).
% 27.15/27.21
% 27.15/27.21 fof('qu(cond(axiom(11), 0), imp(cond(axiom(11), 0)))',axiom,
% 27.15/27.21 ! [Vd27,Vd28,Vd29] :
% 27.15/27.21 ( ( ? [Vd33] :
% 27.15/27.21 ( Vd29 = Vd33
% 27.15/27.21 & rpoint(Vd33) )
% 27.15/27.21 & ? [Vd32] :
% 27.15/27.21 ( Vd28 = Vd32
% 27.15/27.21 & rpoint(Vd32) )
% 27.15/27.21 & ? [Vd31] :
% 27.15/27.21 ( Vd27 = Vd31
% 27.15/27.21 & rpoint(Vd31) ) )
% 27.15/27.21 => ? [Vd34] :
% 27.15/27.21 ( Vd34 != Vd29
% 27.15/27.21 & Vd34 != Vd28
% 27.15/27.21 & Vd34 != Vd27
% 27.15/27.21 & rpoint(Vd34) ) ) ).
% 27.15/27.21
% 27.15/27.21 fof('qu(cond(axiom(9), 0), imp(cond(axiom(9), 0)))',axiom,
% 27.15/27.21 ! [Vd19,Vd20] :
% 27.15/27.21 ( ( ? [Vd23] :
% 27.15/27.21 ( Vd20 = Vd23
% 27.15/27.21 & rpoint(Vd23) )
% 27.15/27.21 & ? [Vd22] :
% 27.15/27.21 ( Vd19 = Vd22
% 27.15/27.21 & rpoint(Vd22) ) )
% 27.15/27.21 => ? [Vd24] :
% 27.15/27.21 ( Vd24 != Vd20
% 27.15/27.21 & Vd24 != Vd19
% 27.15/27.21 & rpoint(Vd24) ) ) ).
% 27.15/27.21
% 27.15/27.21 fof('qu(cond(axiom(7), 0), imp(cond(axiom(7), 0)))',axiom,
% 27.15/27.21 ! [Vd15,Vd16] :
% 27.15/27.21 ( ( Vd15 = Vd16
% 27.15/27.21 & rpoint(Vd16) )
% 27.15/27.21 => ? [Vd17] :
% 27.15/27.21 ( Vd17 != Vd15
% 27.15/27.21 & rpoint(Vd17) ) ) ).
% 27.15/27.21
% 27.15/27.21 fof('pred(axiom(5), 0)',axiom,
% 27.15/27.21 rpoint(vd14) ).
% 27.15/27.21
% 27.15/27.21 fof('qu(cond(axiom(3), 0), imp(cond(axiom(3), 0)))',axiom,
% 27.15/27.21 ! [Vd5,Vd6,Vd7,Vd9] :
% 27.15/27.21 ( ( vtriangle(Vd5,Vd6,Vd7) = Vd9
% 27.15/27.21 & rtriangle(Vd9) )
% 27.15/27.21 => ( Vd6 != Vd7
% 27.15/27.21 & Vd5 != Vd7
% 27.15/27.21 & Vd5 != Vd6
% 27.15/27.21 & ? [Vd13] :
% 27.15/27.21 ( Vd7 = Vd13
% 27.15/27.21 & rpoint(Vd13) )
% 27.15/27.21 & ? [Vd12] :
% 27.15/27.21 ( Vd6 = Vd12
% 27.15/27.21 & rpoint(Vd12) )
% 27.15/27.21 & ? [Vd11] :
% 27.15/27.21 ( Vd5 = Vd11
% 27.15/27.21 & rpoint(Vd11) ) ) ) ).
% 27.15/27.21
% 27.15/27.21 fof('qu(cond(axiom(1), 0), imp(cond(axiom(1), 0)))',axiom,
% 27.15/27.21 ! [Vd1,Vd2] :
% 27.15/27.21 ( rcenter(Vd1,Vd2)
% 27.15/27.21 => ? [Vd3,Vd4] :
% 27.15/27.21 ( Vd2 = Vd4
% 27.15/27.21 & rcircle(Vd4)
% 27.15/27.21 & Vd1 = Vd3
% 27.15/27.21 & rpoint(Vd3) ) ) ).
% 27.15/27.21
% 27.15/27.21 fof('pred(s3(plural(315)), 0)',axiom,
% 27.15/27.21 ron(vd1187,vd1232) ).
% 27.15/27.21
% 27.15/27.21 fof('pred(s2(plural(315)), 0)',axiom,
% 27.15/27.21 ron(vd1201,vd1232) ).
% 27.15/27.21
% 27.15/27.21 fof('pred(s1(plural(315)), 0)',axiom,
% 27.15/27.21 ron(vd1185,vd1232) ).
% 27.15/27.21
% 27.15/27.21 fof('holds(295, 1236, 0)',axiom,
% 27.15/27.21 rS(vd1187,vd1201,vd1197) ).
% 27.15/27.21
% 27.15/27.21 fof('pred(272, 0)',axiom,
% 27.15/27.21 ron(vd1199,vd1197) ).
% 27.15/27.21
% 27.15/27.21 fof('ass(cond(goal(238), 0), 0)',axiom,
% 27.15/27.21 ! [Vd1109,Vd1110,Vd1111,Vd1112,Vd1113,Vd1114,Vd1115,Vd1116] :
% 27.15/27.21 ( ( rless(vf(Vd1113,Vd1115),vf(Vd1109,Vd1111))
% 27.15/27.21 & Vd1113 != Vd1115
% 27.15/27.21 & Vd1109 != Vd1111
% 27.15/27.21 & Vd1115 = Vd1116
% 27.15/27.21 & rpoint(Vd1116)
% 27.15/27.21 & Vd1113 = Vd1114
% 27.15/27.21 & rpoint(Vd1114)
% 27.15/27.21 & Vd1111 = Vd1112
% 27.15/27.21 & rpoint(Vd1112)
% 27.15/27.21 & Vd1109 = Vd1110
% 27.15/27.21 & rpoint(Vd1110) )
% 27.15/27.21 => vf(Vd1109,vskolem1120(Vd1109,Vd1110,Vd1111,Vd1112,Vd1113,Vd1114,Vd1115,Vd1116)) = vf(Vd1113,Vd1115) ) ).
% 27.15/27.21
% 27.15/27.21 fof('ass(cond(goal(238), 0), 1)',axiom,
% 27.15/27.21 ! [Vd1109,Vd1110,Vd1111,Vd1112,Vd1113,Vd1114,Vd1115,Vd1116] :
% 27.15/27.21 ( ( rless(vf(Vd1113,Vd1115),vf(Vd1109,Vd1111))
% 27.15/27.21 & Vd1113 != Vd1115
% 27.15/27.21 & Vd1109 != Vd1111
% 27.15/27.21 & Vd1115 = Vd1116
% 27.15/27.21 & rpoint(Vd1116)
% 27.15/27.21 & Vd1113 = Vd1114
% 27.15/27.21 & rpoint(Vd1114)
% 27.15/27.21 & Vd1111 = Vd1112
% 27.15/27.21 & rpoint(Vd1112)
% 27.15/27.21 & Vd1109 = Vd1110
% 27.15/27.21 & rpoint(Vd1110) )
% 27.15/27.21 => rR(vskolem1120(Vd1109,Vd1110,Vd1111,Vd1112,Vd1113,Vd1114,Vd1115,Vd1116),Vd1109,Vd1111) ) ).
% 27.15/27.21
% 27.15/27.21 fof('ass(cond(goal(238), 0), 2)',axiom,
% 27.15/27.21 ! [Vd1109,Vd1110,Vd1111,Vd1112,Vd1113,Vd1114,Vd1115,Vd1116] :
% 27.15/27.21 ( ( rless(vf(Vd1113,Vd1115),vf(Vd1109,Vd1111))
% 27.15/27.21 & Vd1113 != Vd1115
% 27.15/27.21 & Vd1109 != Vd1111
% 27.15/27.21 & Vd1115 = Vd1116
% 27.15/27.21 & rpoint(Vd1116)
% 27.15/27.21 & Vd1113 = Vd1114
% 27.15/27.21 & rpoint(Vd1114)
% 27.15/27.21 & Vd1111 = Vd1112
% 27.15/27.21 & rpoint(Vd1112)
% 27.15/27.21 & Vd1109 = Vd1110
% 27.15/27.21 & rpoint(Vd1110) )
% 27.15/27.21 => rpoint(vskolem1120(Vd1109,Vd1110,Vd1111,Vd1112,Vd1113,Vd1114,Vd1115,Vd1116)) ) ).
% 27.15/27.21
% 27.15/27.21 fof('qu(cond(axiom(194), 0), imp(cond(axiom(194), 0)))',axiom,
% 27.15/27.21 ! [Vd908,Vd909,Vd910,Vd911,Vd912,Vd919,Vd920] :
% 27.15/27.21 ( ( ~ rR(Vd908,Vd910,Vd912)
% 27.15/27.21 & ~ rR(Vd908,Vd909,Vd911)
% 27.15/27.21 & Vd912 != Vd908
% 27.15/27.21 & Vd911 != Vd908
% 27.15/27.21 & Vd910 != Vd908
% 27.15/27.21 & Vd909 != Vd908
% 27.15/27.21 & ron(Vd912,Vd920)
% 27.15/27.21 & ron(Vd910,Vd920)
% 27.15/27.21 & ron(Vd911,Vd919)
% 27.15/27.21 & ron(Vd909,Vd919)
% 27.15/27.21 & ron(Vd908,Vd919)
% 27.15/27.21 & ? [Vd923] :
% 27.15/27.21 ( Vd920 = Vd923
% 27.15/27.21 & rline(Vd923) )
% 27.15/27.21 & ? [Vd922] :
% 27.15/27.21 ( Vd919 = Vd922
% 27.15/27.21 & rline(Vd922) )
% 27.15/27.21 & ? [Vd918] :
% 27.15/27.21 ( Vd912 = Vd918
% 27.15/27.21 & rpoint(Vd918) )
% 27.15/27.21 & ? [Vd917] :
% 27.15/27.21 ( Vd911 = Vd917
% 27.15/27.21 & rpoint(Vd917) )
% 27.15/27.21 & ? [Vd916] :
% 27.15/27.21 ( Vd910 = Vd916
% 27.15/27.21 & rpoint(Vd916) )
% 27.15/27.21 & ? [Vd915] :
% 27.15/27.21 ( Vd909 = Vd915
% 27.15/27.21 & rpoint(Vd915) )
% 27.15/27.21 & ? [Vd914] :
% 27.15/27.21 ( Vd908 = Vd914
% 27.15/27.21 & rpoint(Vd914) ) )
% 27.15/27.21 => vangle(Vd909,Vd908,Vd910) = vangle(Vd911,Vd908,Vd912) ) ).
% 27.15/27.21
% 27.15/27.21 fof('ass(cond(goal(219), 0), 0)',axiom,
% 27.15/27.21 ! [Vd1069,Vd1070] :
% 27.15/27.21 ( ( Vd1069 != Vd1070
% 27.15/27.21 & ? [Vd1073] :
% 27.15/27.21 ( Vd1070 = Vd1073
% 27.15/27.21 & rpoint(Vd1073) )
% 27.15/27.21 & ? [Vd1072] :
% 27.15/27.21 ( Vd1069 = Vd1072
% 27.15/27.21 & rpoint(Vd1072) ) )
% 27.15/27.21 => ! [Vd1074,Vd1075] :
% 27.15/27.21 ( ( Vd1074 = Vd1075
% 27.15/27.21 & Vd1074 != Vd1070
% 27.15/27.21 & Vd1074 != Vd1069
% 27.15/27.21 & rpoint(Vd1075) )
% 27.15/27.21 => vf(Vd1069,Vd1070) = vf(Vd1074,vskolem1078(Vd1074,Vd1075,Vd1069,Vd1070)) ) ) ).
% 27.15/27.21
% 27.15/27.21 fof('ass(cond(goal(219), 0), 1)',axiom,
% 27.15/27.21 ! [Vd1069,Vd1070] :
% 27.15/27.21 ( ( Vd1069 != Vd1070
% 27.15/27.21 & ? [Vd1073] :
% 27.15/27.21 ( Vd1070 = Vd1073
% 27.15/27.21 & rpoint(Vd1073) )
% 27.15/27.21 & ? [Vd1072] :
% 27.15/27.21 ( Vd1069 = Vd1072
% 27.15/27.21 & rpoint(Vd1072) ) )
% 27.15/27.21 => ! [Vd1074,Vd1075] :
% 27.15/27.21 ( ( Vd1074 = Vd1075
% 27.15/27.21 & Vd1074 != Vd1070
% 27.15/27.21 & Vd1074 != Vd1069
% 27.15/27.21 & rpoint(Vd1075) )
% 27.15/27.21 => rpoint(vskolem1078(Vd1074,Vd1075,Vd1069,Vd1070)) ) ) ).
% 27.15/27.21
% 27.15/27.21 fof('qu(cond(axiom(176), 0), imp(cond(axiom(176), 0)))',axiom,
% 27.15/27.21 ! [Vd799,Vd800,Vd801] :
% 27.15/27.21 ( ( ? [Vd805] :
% 27.15/27.21 ( Vd801 = Vd805
% 27.15/27.21 & rpoint(Vd805) )
% 27.15/27.21 & ? [Vd804] :
% 27.15/27.21 ( Vd800 = Vd804
% 27.15/27.21 & rpoint(Vd804) )
% 27.15/27.21 & ? [Vd803] :
% 27.15/27.21 ( Vd799 = Vd803
% 27.15/27.21 & rpoint(Vd803) ) )
% 27.15/27.21 => ( vg(Vd799,Vd800,Vd801) = vg(Vd799,Vd801,Vd800)
% 27.15/27.21 & vg(Vd799,Vd800,Vd801) = vg(Vd801,Vd799,Vd800) ) ) ).
% 27.15/27.21
% 27.15/27.21 fof('ass(cond(goal(206), 0), 0)',axiom,
% 27.15/27.21 ! [Vd1047,Vd1048,Vd1049,Vd1050] :
% 27.15/27.21 ( ( Vd1049 = Vd1050
% 27.15/27.21 & Vd1047 != Vd1049
% 27.15/27.21 & rpoint(Vd1050)
% 27.15/27.21 & Vd1047 = Vd1048
% 27.15/27.21 & rpoint(Vd1048) )
% 27.15/27.21 => vf(Vd1049,vskolem1052(Vd1047,Vd1048,Vd1049,Vd1050)) = vf(vskolem1052(Vd1047,Vd1048,Vd1049,Vd1050),Vd1047) ) ).
% 27.15/27.21
% 27.15/27.21 fof('ass(cond(goal(206), 0), 1)',axiom,
% 27.15/27.21 ! [Vd1047,Vd1048,Vd1049,Vd1050] :
% 27.15/27.21 ( ( Vd1049 = Vd1050
% 27.15/27.21 & Vd1047 != Vd1049
% 27.15/27.21 & rpoint(Vd1050)
% 27.15/27.21 & Vd1047 = Vd1048
% 27.15/27.21 & rpoint(Vd1048) )
% 27.15/27.21 => vf(Vd1047,Vd1049) = vf(Vd1049,vskolem1052(Vd1047,Vd1048,Vd1049,Vd1050)) ) ).
% 27.15/27.21
% 27.15/27.21 fof('ass(cond(goal(206), 0), 2)',axiom,
% 27.15/27.21 ! [Vd1047,Vd1048,Vd1049,Vd1050] :
% 27.15/27.21 ( ( Vd1049 = Vd1050
% 27.15/27.21 & Vd1047 != Vd1049
% 27.15/27.21 & rpoint(Vd1050)
% 27.15/27.21 & Vd1047 = Vd1048
% 27.15/27.21 & rpoint(Vd1048) )
% 27.15/27.21 => rpoint(vskolem1052(Vd1047,Vd1048,Vd1049,Vd1050)) ) ).
% 27.15/27.21
% 27.15/27.21 fof('qu(cond(axiom(174), 0), imp(cond(axiom(174), 0)))',axiom,
% 27.15/27.21 ! [Vd792,Vd793,Vd794,Vd795,Vd796,Vd797] :
% 27.15/27.21 ( ( Vd796 = Vd797
% 27.15/27.21 & rpoint(Vd797)
% 27.15/27.21 & Vd794 = Vd795
% 27.15/27.21 & rpoint(Vd795)
% 27.15/27.21 & Vd792 = Vd793
% 27.15/27.21 & rpoint(Vd793) )
% 27.15/27.21 => rgeq(vg(Vd792,Vd794,Vd796),v0) ) ).
% 27.15/27.21
% 27.15/27.21 fof('qu(cond(axiom(204), 0), imp(cond(axiom(204), 0)))',axiom,
% 27.15/27.21 ! [Vd992,Vd993,Vd994,Vd999,Vd1000,Vd1001,Vd1006,Vd1007,Vd1008,Vd1009,Vd1010,Vd1011,Vd1012,Vd1013,Vd1014,Vd1015,Vd1027,Vd1028] :
% 27.15/27.21 ( ( Vd1027 = Vd1028
% 27.15/27.21 & ! [Vd1031,Vd1032,Vd1033] :
% 27.15/27.21 ( ( rS(Vd1033,Vd1001,Vd1027)
% 27.15/27.21 & ~ rR(Vd999,Vd1032,Vd1000)
% 27.15/27.21 & ron(Vd1032,Vd1027)
% 27.15/27.21 & vf(Vd992,Vd994) = vf(Vd1031,Vd1033)
% 27.15/27.21 & vf(Vd993,Vd994) = vf(Vd1032,Vd1033)
% 27.15/27.21 & vf(Vd992,Vd993) = vf(Vd1031,Vd1032)
% 27.15/27.21 & vangle(Vd1031,Vd1033,Vd1032) = vangle(Vd992,Vd994,Vd993)
% 27.15/27.21 & vangle(Vd1032,Vd1031,Vd1033) = vangle(Vd993,Vd992,Vd994)
% 27.15/27.21 & vangle(Vd1033,Vd1032,Vd1031) = vangle(Vd994,Vd993,Vd992)
% 27.15/27.21 & Vd1031 = Vd999
% 27.15/27.21 & rpoint(Vd1033)
% 27.15/27.21 & rpoint(Vd1032)
% 27.15/27.21 & rpoint(Vd1031) )
% 27.15/27.21 => ( vangle(Vd1010,Vd1011,Vd1012) = vangle(Vd1013,Vd1014,Vd1015)
% 27.15/27.21 & vf(Vd1006,Vd1007) = vf(Vd1008,Vd1009) ) )
% 27.15/27.21 & ~ ron(Vd1001,Vd1027)
% 27.15/27.21 & ron(Vd1000,Vd1027)
% 27.15/27.21 & ron(Vd999,Vd1027)
% 27.15/27.21 & rline(Vd1028)
% 27.15/27.21 & ? [Vd1026] :
% 27.15/27.21 ( Vd1015 = Vd1026
% 27.15/27.21 & rpoint(Vd1026) )
% 27.15/27.21 & ? [Vd1025] :
% 27.15/27.21 ( Vd1014 = Vd1025
% 27.15/27.21 & rpoint(Vd1025) )
% 27.15/27.21 & ? [Vd1024] :
% 27.15/27.21 ( Vd1013 = Vd1024
% 27.15/27.21 & rpoint(Vd1024) )
% 27.15/27.21 & ? [Vd1023] :
% 27.15/27.21 ( Vd1012 = Vd1023
% 27.15/27.21 & rpoint(Vd1023) )
% 27.15/27.21 & ? [Vd1022] :
% 27.15/27.21 ( Vd1011 = Vd1022
% 27.15/27.21 & rpoint(Vd1022) )
% 27.15/27.21 & ? [Vd1021] :
% 27.15/27.21 ( Vd1010 = Vd1021
% 27.15/27.21 & rpoint(Vd1021) )
% 27.15/27.21 & ? [Vd1020] :
% 27.15/27.21 ( Vd1009 = Vd1020
% 27.15/27.21 & rpoint(Vd1020) )
% 27.15/27.21 & ? [Vd1019] :
% 27.15/27.21 ( Vd1008 = Vd1019
% 27.15/27.21 & rpoint(Vd1019) )
% 27.15/27.21 & ? [Vd1018] :
% 27.15/27.21 ( Vd1007 = Vd1018
% 27.15/27.21 & rpoint(Vd1018) )
% 27.15/27.21 & ? [Vd1017] :
% 27.15/27.21 ( Vd1006 = Vd1017
% 27.15/27.21 & rpoint(Vd1017) )
% 27.15/27.21 & ? [Vd1005] :
% 27.15/27.21 ( Vd1001 = Vd1005
% 27.15/27.21 & rpoint(Vd1005) )
% 27.15/27.21 & ? [Vd1004] :
% 27.15/27.21 ( Vd1000 = Vd1004
% 27.15/27.21 & rpoint(Vd1004) )
% 27.15/27.21 & ? [Vd1003] :
% 27.15/27.21 ( Vd999 = Vd1003
% 27.15/27.21 & rpoint(Vd1003) )
% 27.15/27.21 & Vd993 != Vd994
% 27.15/27.21 & Vd992 != Vd994
% 27.15/27.21 & Vd992 != Vd993
% 27.15/27.21 & ? [Vd998] :
% 27.15/27.21 ( Vd994 = Vd998
% 27.15/27.21 & rpoint(Vd998) )
% 27.15/27.21 & ? [Vd997] :
% 27.15/27.21 ( Vd993 = Vd997
% 27.15/27.21 & rpoint(Vd997) )
% 27.15/27.21 & ? [Vd996] :
% 27.15/27.21 ( Vd992 = Vd996
% 27.15/27.21 & rpoint(Vd996) ) )
% 27.15/27.21 => ( vangle(Vd1010,Vd1011,Vd1012) = vangle(Vd1013,Vd1014,Vd1015)
% 27.15/27.21 & vf(Vd1006,Vd1007) = vf(Vd1008,Vd1009) ) ) ).
% 27.15/27.21
% 27.15/27.21 fof('qu(cond(axiom(192), 0), imp(cond(axiom(192), 0)))',axiom,
% 27.15/27.21 ! [Vd894,Vd895,Vd896,Vd897,Vd903,Vd904] :
% 27.15/27.21 ( ( ~ ron(Vd897,Vd903)
% 27.15/27.21 & rR(Vd896,Vd894,Vd895)
% 27.15/27.21 & Vd903 = Vd904
% 27.15/27.21 & rline(Vd904)
% 27.15/27.21 & ? [Vd902] :
% 27.15/27.21 ( Vd897 = Vd902
% 27.15/27.21 & rpoint(Vd902) )
% 27.15/27.21 & ? [Vd901] :
% 27.15/27.21 ( Vd896 = Vd901
% 27.15/27.21 & rpoint(Vd901) )
% 27.15/27.21 & ? [Vd900] :
% 27.15/27.21 ( Vd895 = Vd900
% 27.15/27.21 & rpoint(Vd900) )
% 27.15/27.21 & ? [Vd899] :
% 27.15/27.21 ( Vd894 = Vd899
% 27.15/27.21 & rpoint(Vd899) ) )
% 27.15/27.21 => ( vangle(Vd894,Vd896,Vd897) = vangle(Vd897,Vd896,Vd895)
% 27.15/27.21 <=> vangle(Vd894,Vd896,Vd897) = vperp ) ) ).
% 27.15/27.21
% 27.15/27.21 fof('qu(cond(axiom(182), 0), imp(cond(axiom(182), 0)))',axiom,
% 27.15/27.21 ! [Vd837,Vd838,Vd842,Vd843,Vd844] :
% 27.15/27.21 ( ( vf(Vd842,Vd837) = vf(Vd842,Vd838)
% 27.15/27.21 & ron(Vd838,Vd844)
% 27.15/27.21 & ron(Vd837,Vd843)
% 27.15/27.21 & rcenter(Vd842,Vd844)
% 27.15/27.21 & rcenter(Vd842,Vd843)
% 27.15/27.21 & ? [Vd841] :
% 27.15/27.21 ( Vd838 = Vd841
% 27.15/27.21 & rpoint(Vd841) )
% 27.15/27.21 & ? [Vd840] :
% 27.15/27.21 ( Vd837 = Vd840
% 27.15/27.21 & rpoint(Vd840) ) )
% 27.15/27.21 => Vd843 = Vd844 ) ).
% 27.15/27.21
% 27.15/27.21 fof('qu(cond(axiom(172), 0), imp(cond(axiom(172), 0)))',axiom,
% 27.15/27.21 ! [Vd786,Vd787] :
% 27.15/27.21 ( ( ? [Vd790] :
% 27.15/27.21 ( Vd787 = Vd790
% 27.15/27.21 & rpoint(Vd790) )
% 27.15/27.21 & ? [Vd789] :
% 27.15/27.21 ( Vd786 = Vd789
% 27.15/27.21 & rpoint(Vd789) ) )
% 27.15/27.21 => vg(Vd786,Vd786,Vd787) = v0 ) ).
% 27.15/27.21
% 27.15/27.21 fof('qu(cond(axiom(164), 0), imp(cond(axiom(164), 0)))',axiom,
% 27.15/27.21 ! [Vd755,Vd756] :
% 27.15/27.21 ( ( ? [Vd759] :
% 27.15/27.21 ( Vd756 = Vd759
% 27.15/27.21 & rpoint(Vd759) )
% 27.15/27.21 & ? [Vd758] :
% 27.15/27.21 ( Vd755 = Vd758
% 27.15/27.21 & rpoint(Vd758) ) )
% 27.15/27.21 => rleq(v0,vf(Vd755,Vd756)) ) ).
% 27.15/27.21
% 27.15/27.21 fof('qu(cond(axiom(170), 0), imp(cond(axiom(170), 0)))',axiom,
% 27.15/27.21 ! [Vd777,Vd778,Vd779] :
% 27.15/27.21 ( ( ? [Vd783] :
% 27.15/27.21 ( Vd779 = Vd783
% 27.15/27.21 & rpoint(Vd783) )
% 27.15/27.21 & ? [Vd782] :
% 27.15/27.21 ( Vd778 = Vd782
% 27.15/27.21 & rpoint(Vd782) )
% 27.15/27.21 & ? [Vd781] :
% 27.15/27.21 ( Vd777 = Vd781
% 27.15/27.21 & rpoint(Vd781) ) )
% 27.15/27.21 => ( rleq(vangle(Vd777,Vd778,Vd779),vplus(vperp,vperp))
% 27.15/27.21 & rleq(v0,vangle(Vd777,Vd778,Vd779)) ) ) ).
% 27.15/27.21
% 27.15/27.21 fof('qu(cond(axiom(202), 0), imp(cond(axiom(202), 0)))',axiom,
% 27.15/27.21 ! [Vd979,Vd980,Vd981,Vd982,Vd988,Vd989] :
% 27.15/27.21 ( ( ~ ron(Vd982,Vd988)
% 27.15/27.21 & Vd988 = Vd989
% 27.15/27.21 & rline(Vd989)
% 27.15/27.21 & Vd981 != Vd982
% 27.15/27.21 & Vd980 != Vd982
% 27.15/27.21 & Vd980 != Vd981
% 27.15/27.21 & Vd979 != Vd982
% 27.15/27.21 & Vd979 != Vd981
% 27.15/27.21 & Vd979 != Vd980
% 27.15/27.21 & ? [Vd987] :
% 27.15/27.21 ( Vd982 = Vd987
% 27.15/27.21 & rpoint(Vd987) )
% 27.15/27.21 & ? [Vd986] :
% 27.15/27.21 ( Vd981 = Vd986
% 27.15/27.21 & rpoint(Vd986) )
% 27.15/27.21 & ? [Vd985] :
% 27.15/27.21 ( Vd980 = Vd985
% 27.15/27.21 & rpoint(Vd985) )
% 27.15/27.21 & ? [Vd984] :
% 27.15/27.21 ( Vd979 = Vd984
% 27.15/27.21 & rpoint(Vd984) ) )
% 27.15/27.21 => ( rR(Vd981,Vd979,Vd980)
% 27.15/27.21 <=> vplus(vg(Vd979,Vd981,Vd982),vg(Vd982,Vd981,Vd980)) = vg(Vd979,Vd982,Vd980) ) ) ).
% 27.15/27.21
% 27.15/27.21 fof('qu(cond(axiom(168), 0), imp(cond(axiom(168), 0)))',axiom,
% 27.15/27.21 ! [Vd767,Vd768,Vd769] :
% 27.15/27.21 ( ( Vd767 != Vd769
% 27.15/27.21 & Vd767 != Vd768
% 27.15/27.21 & ? [Vd773] :
% 27.15/27.21 ( Vd769 = Vd773
% 27.15/27.21 & rpoint(Vd773) )
% 27.15/27.21 & ? [Vd772] :
% 27.15/27.21 ( Vd768 = Vd772
% 27.15/27.21 & rpoint(Vd772) )
% 27.15/27.21 & ? [Vd771] :
% 27.15/27.21 ( Vd767 = Vd771
% 27.15/27.21 & rpoint(Vd771) ) )
% 27.15/27.21 => vangle(Vd767,Vd768,Vd769) = vangle(Vd769,Vd768,Vd767) ) ).
% 27.15/27.21
% 27.15/27.21 fof('qu(cond(axiom(200), 0), imp(cond(axiom(200), 0)))',axiom,
% 27.15/27.21 ! [Vd967,Vd968,Vd969,Vd974,Vd975] :
% 27.15/27.21 ( ( ron(Vd968,Vd974)
% 27.15/27.21 & ron(Vd967,Vd974)
% 27.15/27.21 & Vd967 != Vd968
% 27.15/27.21 & Vd974 = Vd975
% 27.15/27.21 & rline(Vd975)
% 27.15/27.21 & ? [Vd973] :
% 27.15/27.21 ( Vd969 = Vd973
% 27.15/27.21 & rpoint(Vd973) )
% 27.15/27.21 & ? [Vd972] :
% 27.15/27.21 ( Vd968 = Vd972
% 27.15/27.21 & rpoint(Vd972) )
% 27.15/27.21 & ? [Vd971] :
% 27.15/27.21 ( Vd967 = Vd971
% 27.15/27.21 & rpoint(Vd971) ) )
% 27.15/27.21 => ( vg(Vd967,Vd968,Vd969) = v0
% 27.15/27.21 <=> ron(Vd969,Vd974) ) ) ).
% 27.15/27.21
% 27.15/27.21 fof('qu(cond(axiom(198), 0), imp(cond(axiom(198), 0)))',axiom,
% 27.15/27.21 ! [Vd958,Vd959,Vd960] :
% 27.15/27.21 ( ( ? [Vd964] :
% 27.15/27.21 ( Vd960 = Vd964
% 27.15/27.21 & rpoint(Vd964) )
% 27.15/27.21 & ? [Vd963] :
% 27.15/27.21 ( Vd959 = Vd963
% 27.15/27.21 & rpoint(Vd963) )
% 27.15/27.21 & ? [Vd962] :
% 27.15/27.21 ( Vd958 = Vd962
% 27.15/27.21 & rpoint(Vd962) ) )
% 27.15/27.21 => ? [Vd966] :
% 27.15/27.21 ( vg(Vd958,Vd959,Vd960) = Vd966
% 27.15/27.21 & rreal(Vd966) ) ) ).
% 27.15/27.21
% 27.15/27.21 fof('qu(cond(axiom(196), 0), imp(cond(axiom(196), 0)))',axiom,
% 27.15/27.21 ! [Vd933,Vd934,Vd935,Vd936,Vd937,Vd944,Vd945,Vd946] :
% 27.15/27.21 ( ( rless(vplus(vangle(Vd933,Vd934,Vd935),vangle(Vd934,Vd935,Vd936)),vplus(vperp,vperp))
% 27.15/27.21 & rS(Vd933,Vd936,Vd945)
% 27.15/27.21 & Vd934 != Vd935
% 27.15/27.21 & ron(Vd936,Vd946)
% 27.15/27.21 & ron(Vd935,Vd946)
% 27.15/27.21 & ron(Vd935,Vd945)
% 27.15/27.21 & ron(Vd934,Vd945)
% 27.15/27.21 & ron(Vd934,Vd944)
% 27.15/27.21 & ron(Vd933,Vd944)
% 27.15/27.21 & ? [Vd950] :
% 27.15/27.21 ( Vd946 = Vd950
% 27.15/27.21 & rline(Vd950) )
% 27.15/27.21 & ? [Vd949] :
% 27.15/27.21 ( Vd945 = Vd949
% 27.15/27.21 & rline(Vd949) )
% 27.15/27.21 & ? [Vd948] :
% 27.15/27.21 ( Vd944 = Vd948
% 27.15/27.21 & rline(Vd948) )
% 27.15/27.21 & ? [Vd943] :
% 27.15/27.21 ( Vd937 = Vd943
% 27.15/27.21 & rpoint(Vd943) )
% 27.15/27.21 & ? [Vd942] :
% 27.15/27.21 ( Vd936 = Vd942
% 27.15/27.21 & rpoint(Vd942) )
% 27.15/27.21 & ? [Vd941] :
% 27.15/27.21 ( Vd935 = Vd941
% 27.15/27.21 & rpoint(Vd941) )
% 27.15/27.21 & ? [Vd940] :
% 27.15/27.21 ( Vd934 = Vd940
% 27.15/27.21 & rpoint(Vd940) )
% 27.15/27.21 & ? [Vd939] :
% 27.15/27.21 ( Vd933 = Vd939
% 27.15/27.21 & rpoint(Vd939) ) )
% 27.15/27.21 => ( ( ( ron(Vd937,Vd945)
% 27.15/27.21 & ron(Vd937,Vd944) )
% 27.15/27.21 => rS(Vd937,Vd933,Vd945) )
% 27.15/27.21 & rintersect(Vd944,Vd945) ) ) ).
% 27.15/27.21
% 27.15/27.21 %------------------------------------------------------------------------------
% 27.15/27.21 %-------------------------------------------
% 27.15/27.21 % Proof found
% 27.15/27.21 % SZS status Theorem for theBenchmark
% 27.15/27.21 % SZS output start Proof
% 27.15/27.21 %ClaNum:590(EqnAxiom:264)
% 27.15/27.21 %VarNum:6765(SingletonVarNum:2281)
% 27.15/27.21 %MaxLitNum:42
% 27.15/27.21 %MaxfuncDepth:2
% 27.15/27.21 %SharedTerms:112
% 27.15/27.21 %goalClause: 330
% 27.15/27.21 %singleGoalClaCount:1
% 27.15/27.21 [265]E(a1,a2)
% 27.15/27.21 [266]E(a3,a68)
% 27.15/27.21 [267]E(a65,a69)
% 27.15/27.21 [268]E(a70,a4)
% 27.15/27.21 [269]E(a66,a15)
% 27.15/27.21 [270]E(a26,a65)
% 27.15/27.21 [271]E(a37,a2)
% 27.15/27.21 [272]E(a61,a48)
% 27.15/27.21 [273]E(a62,a57)
% 27.15/27.21 [274]E(a63,a58)
% 27.15/27.21 [275]E(a1,a59)
% 27.15/27.21 [276]E(a5,a69)
% 27.15/27.21 [277]P1(a71)
% 27.15/27.21 [278]P1(a4)
% 27.15/27.21 [279]P1(a15)
% 27.15/27.21 [280]P1(a26)
% 27.15/27.21 [281]P1(a37)
% 27.15/27.21 [282]P1(a48)
% 27.15/27.21 [283]P1(a57)
% 27.15/27.21 [284]P1(a58)
% 27.15/27.21 [285]P1(a59)
% 27.15/27.21 [286]P1(a5)
% 27.15/27.21 [287]P2(a72)
% 27.15/27.21 [288]P2(a67)
% 27.15/27.21 [289]P2(a73)
% 27.15/27.21 [290]P13(a68)
% 27.15/27.21 [292]P12(a2,a72)
% 27.15/27.21 [294]P12(a2,a67)
% 27.15/27.21 [295]P12(a2,a73)
% 27.15/27.21 [297]P12(a70,a72)
% 27.15/27.21 [298]P12(a70,a73)
% 27.15/27.21 [300]P12(a66,a72)
% 27.15/27.21 [301]P12(a65,a67)
% 27.15/27.21 [304]P12(a1,a67)
% 27.15/27.21 [305]P12(a69,a67)
% 27.15/27.21 [313]P3(a66,a2,a70)
% 27.15/27.21 [314]P4(a70,a66,a67)
% 27.15/27.21 [315]P4(a66,a70,a67)
% 27.15/27.21 [321]~E(a66,a70)
% 27.15/27.21 [322]~E(a63,a62)
% 27.15/27.21 [323]~E(a62,a61)
% 27.15/27.21 [324]~E(a63,a61)
% 27.15/27.21 [325]~P12(a66,a67)
% 27.15/27.21 [327]~P3(a2,a70,a66)
% 27.15/27.21 [328]~P3(a70,a2,a66)
% 27.15/27.21 [329]~P3(a65,a1,a2)
% 27.15/27.21 [306]E(f74(a63,a62),f74(a2,a65))
% 27.15/27.21 [307]E(f74(a63,a61),f74(a2,a66))
% 27.15/27.21 [308]E(f74(a1,a70),f74(a2,a66))
% 27.15/27.21 [309]E(f74(a1,a70),f74(a63,a61))
% 27.15/27.21 [310]E(f74(a1,a69),f74(a2,a65))
% 27.15/27.21 [311]E(f74(a1,a69),f74(a63,a62))
% 27.15/27.21 [312]E(f74(a62,a61),f74(a69,a70))
% 27.15/27.21 [316]E(f64(a62,a63,a61),f64(a65,a2,a66))
% 27.15/27.21 [317]E(f64(a61,a62,a63),f64(a70,a69,a1))
% 27.15/27.21 [318]E(f64(a1,a70,a69),f64(a63,a61,a62))
% 27.15/27.21 [319]E(f64(a65,a2,a66),f64(a69,a1,a70))
% 27.15/27.21 [320]E(f64(a62,a63,a61),f64(a69,a1,a70))
% 27.15/27.21 [330]~E(f75(f74(a2,a66),f74(a66,a70)),f74(a2,a70))
% 27.15/27.21 [342]~P6(x3421,x3422)+P7(x3421,x3422)
% 27.15/27.21 [343]~P6(x3431,x3432)+E(f49(x3431,x3432),x3431)
% 27.15/27.21 [344]~P6(x3441,x3442)+E(f52(x3441,x3442),x3442)
% 27.15/27.21 [357]~P6(x3571,x3572)+P1(f49(x3571,x3572))
% 27.15/27.21 [358]~P6(x3581,x3582)+P5(f52(x3581,x3582))
% 27.15/27.21 [341]~P13(x3412)+~P9(x3411,x3411)+~E(x3411,x3412)
% 27.15/27.21 [331]~P1(x3312)+~E(x3311,x3312)+~E(f38(x3311),x3311)
% 27.15/27.21 [332]~P5(x3322)+~E(x3321,x3322)+P1(f16(x3321))
% 27.15/27.21 [333]~P5(x3332)+~E(x3331,x3332)+P1(f24(x3331))
% 27.15/27.21 [334]~P5(x3342)+~E(x3341,x3342)+P1(f27(x3341))
% 27.15/27.21 [335]~P2(x3352)+~E(x3351,x3352)+P1(f39(x3351))
% 27.15/27.21 [336]~P1(x3362)+~E(x3361,x3362)+P1(f38(x3361))
% 27.15/27.21 [337]~P13(x3372)+~E(x3371,x3372)+E(f75(x3371,a3),x3371)
% 27.15/27.21 [338]~P5(x3382)+~E(x3381,x3382)+P12(f27(x3381),x3381)
% 27.15/27.21 [339]~P2(x3392)+~E(x3391,x3392)+P12(f39(x3391),x3391)
% 27.15/27.21 [340]~P5(x3402)+~E(x3401,x3402)+P7(f24(x3401),x3401)
% 27.15/27.21 [346]~P5(x3462)+~E(x3461,x3462)+~P12(f16(x3461),x3461)
% 27.15/27.21 [347]~P5(x3472)+~E(x3471,x3472)+~P7(f16(x3471),x3471)
% 27.15/27.21 [387]~P14(x3874)+~E(x3871,x3872)+~E(f78(x3873,x3871,x3872),x3874)
% 27.15/27.21 [388]~P14(x3884)+~E(x3881,x3882)+~E(f78(x3881,x3883,x3882),x3884)
% 27.15/27.21 [389]~P14(x3894)+~E(x3891,x3892)+~E(f78(x3891,x3892,x3893),x3894)
% 27.15/27.21 [417]~P14(x4174)+E(f47(x4171,x4172,x4173),x4173)+~E(f78(x4171,x4172,x4173),x4174)
% 27.15/27.21 [418]~P14(x4184)+E(f50(x4181,x4182,x4183),x4182)+~E(f78(x4181,x4182,x4183),x4184)
% 27.15/27.21 [419]~P14(x4194)+E(f51(x4191,x4192,x4193),x4191)+~E(f78(x4191,x4192,x4193),x4194)
% 27.15/27.21 [464]~P14(x4644)+~E(f78(x4641,x4642,x4643),x4644)+P1(f47(x4641,x4642,x4643))
% 27.15/27.21 [465]~P14(x4654)+~E(f78(x4651,x4652,x4653),x4654)+P1(f50(x4651,x4652,x4653))
% 27.15/27.21 [466]~P14(x4664)+~E(f78(x4661,x4662,x4663),x4664)+P1(f51(x4661,x4662,x4663))
% 27.15/27.21 [368]~P2(x3681)+~P12(a2,x3681)+~P12(a66,x3681)+~P12(a65,x3681)
% 27.15/27.21 [361]~P5(x3614)+~P6(x3612,x3613)+~P6(x3611,x3613)+E(x3611,x3612)+~E(x3613,x3614)
% 27.15/27.21 [348]~P1(x3484)+~P1(x3482)+~E(x3481,x3482)+~E(x3483,x3484)+~E(f44(x3483,x3481),x3481)
% 27.15/27.21 [349]~P1(x3494)+~P1(x3492)+~E(x3491,x3492)+~E(x3493,x3494)+~E(f44(x3493,x3491),x3493)
% 27.15/27.21 [351]~P1(x3513)+~P1(x3514)+~E(x3512,x3513)+~E(x3511,x3514)+E(f74(x3511,x3512),f74(x3512,x3511))
% 27.15/27.21 [352]~P13(x3523)+~P13(x3524)+~E(x3522,x3523)+~E(x3521,x3524)+E(f75(x3521,x3522),f75(x3522,x3521))
% 27.15/27.21 [353]~P1(x3534)+~P1(x3533)+~E(x3532,x3533)+~E(x3531,x3534)+E(f60(x3531,x3532),f74(x3531,x3532))
% 27.15/27.21 [354]~P1(x3544)+~P1(x3543)+~E(x3542,x3543)+~E(x3541,x3544)+P1(f44(x3541,x3542))
% 27.15/27.21 [355]~P1(x3554)+~P1(x3553)+~E(x3552,x3553)+~E(x3551,x3554)+P13(f60(x3551,x3552))
% 27.15/27.21 [362]~P1(x3623)+~P1(x3624)+~E(x3621,x3623)+~E(x3622,x3624)+P10(a3,f74(x3621,x3622))
% 27.15/27.21 [372]~P1(x3723)+~P1(x3724)+~E(x3721,x3723)+~E(x3722,x3724)+E(f76(x3721,x3721,x3722),a3)
% 27.15/27.21 [381]~E(x3811,x3812)+~P13(x3814)+~P13(x3812)+~E(x3813,x3814)+E(f10(x3811,x3812,x3813),f75(x3811,x3813))
% 27.15/27.21 [406]~E(x4061,x4062)+~P13(x4064)+~P13(x4062)+~E(x4063,x4064)+P13(f10(x4061,x4062,x4063))
% 27.15/27.21 [367]~P1(x3674)+~P5(x3672)+~P12(x3673,x3671)+~P7(x3673,x3671)+~E(x3671,x3672)+~E(x3673,x3674)
% 27.15/27.21 [384]P4(x3841,x3841,x3842)+~P1(x3844)+~P2(x3843)+P12(x3841,x3842)+~E(x3842,x3843)+~E(x3841,x3844)
% 27.15/27.21 [345]~E(x3451,x3452)+~P1(x3454)+~P1(x3453)+~E(x3452,x3453)+~E(x3451,x3454)+E(f74(x3451,x3452),a3)
% 27.15/27.21 [350]~P1(x3504)+~P1(x3503)+E(x3501,x3502)+~E(x3502,x3503)+~E(x3501,x3504)+~E(f74(x3501,x3502),a3)
% 27.15/27.21 [359]~P1(x3594)+~P1(x3593)+E(x3591,x3592)+~E(x3592,x3593)+~E(x3591,x3594)+P2(f17(x3591,x3592))
% 27.15/27.21 [360]~P1(x3604)+~P1(x3603)+E(x3601,x3602)+~E(x3602,x3603)+~E(x3601,x3604)+P5(f6(x3601,x3602))
% 27.15/27.21 [363]~P1(x3633)+~P1(x3634)+E(x3631,x3632)+~E(x3632,x3633)+~E(x3631,x3634)+P12(x3631,f6(x3632,x3631))
% 27.15/27.21 [364]~P1(x3643)+~P1(x3644)+E(x3641,x3642)+~E(x3642,x3643)+~E(x3641,x3644)+P12(x3641,f17(x3642,x3641))
% 27.15/27.21 [365]~P1(x3654)+~P1(x3653)+E(x3651,x3652)+~E(x3652,x3653)+~E(x3651,x3654)+P12(x3651,f17(x3651,x3652))
% 27.15/27.21 [366]~P1(x3664)+~P1(x3663)+E(x3661,x3662)+~E(x3662,x3663)+~E(x3661,x3664)+P6(x3661,f6(x3661,x3662))
% 27.15/27.21 [370]~P5(x3704)+~P5(x3703)+~P11(x3701,x3702)+~E(x3702,x3703)+~E(x3701,x3704)+P1(f7(x3701,x3702))
% 27.15/27.21 [371]~P5(x3714)+~P5(x3713)+~P11(x3711,x3712)+~E(x3712,x3713)+~E(x3711,x3714)+P1(f8(x3711,x3712))
% 27.15/27.21 [376]~P5(x3764)+~P5(x3763)+~P11(x3761,x3762)+~E(x3762,x3763)+~E(x3761,x3764)+P12(f7(x3761,x3762),x3762)
% 27.15/27.21 [377]~P5(x3774)+~P5(x3773)+~P11(x3771,x3772)+~E(x3772,x3773)+~E(x3771,x3774)+P12(f7(x3771,x3772),x3771)
% 27.15/27.21 [378]~P5(x3784)+~P5(x3783)+~P11(x3781,x3782)+~E(x3782,x3783)+~E(x3781,x3784)+P12(f8(x3781,x3782),x3782)
% 27.15/27.21 [379]~P5(x3794)+~P5(x3793)+~P11(x3791,x3792)+~E(x3792,x3793)+~E(x3791,x3794)+P12(f8(x3791,x3792),x3791)
% 27.15/27.21 [380]~P5(x3804)+~P5(x3802)+~P11(x3803,x3801)+~E(x3801,x3802)+~E(x3803,x3804)+~E(f8(x3803,x3801),f7(x3803,x3801))
% 27.15/27.21 [401]~P1(x4013)+~P2(x4014)+P12(x4011,x4012)+~E(x4011,x4013)+~E(x4012,x4014)+~E(f29(x4012,x4014,x4011),x4011)
% 27.15/27.21 [404]~P1(x4042)+~P5(x4044)+~P12(x4041,x4043)+~E(x4041,x4042)+~E(x4043,x4044)+~E(f28(x4043,x4044,x4041),x4041)
% 27.15/27.21 [405]~P1(x4052)+~P2(x4054)+~P12(x4051,x4053)+~E(x4051,x4052)+~E(x4053,x4054)+~E(f40(x4053,x4054,x4051),x4051)
% 27.15/27.21 [415]~E(x4152,x4153)+~P1(x4154)+~P2(x4153)+P12(x4151,x4152)+~E(x4151,x4154)+P1(f30(x4152,x4153,x4151))
% 27.15/27.21 [416]~E(x4162,x4163)+~P1(x4164)+~P2(x4163)+P12(x4161,x4162)+~E(x4161,x4164)+P1(f29(x4162,x4163,x4161))
% 27.15/27.21 [424]~E(x4241,x4242)+~P5(x4244)+~P5(x4242)+~P11(x4241,x4243)+~E(x4243,x4244)+P1(f18(x4241,x4242,x4243))
% 27.15/27.21 [425]~E(x4251,x4252)+~P2(x4254)+~P5(x4252)+~P11(x4253,x4251)+~E(x4253,x4254)+P1(f19(x4251,x4252,x4253))
% 27.15/27.21 [426]~E(x4261,x4262)+~P2(x4264)+~P5(x4262)+~P11(x4263,x4261)+~E(x4263,x4264)+P1(f21(x4261,x4262,x4263))
% 27.15/27.21 [427]~E(x4271,x4272)+~P2(x4274)+~P5(x4272)+~P11(x4273,x4271)+~E(x4273,x4274)+P1(f22(x4271,x4272,x4273))
% 27.15/27.21 [428]~E(x4281,x4282)+~P2(x4284)+~P2(x4282)+~P11(x4281,x4283)+~E(x4283,x4284)+P1(f23(x4281,x4282,x4283))
% 27.15/27.21 [429]~E(x4291,x4292)+~P1(x4294)+~P5(x4292)+~P12(x4293,x4291)+~E(x4293,x4294)+P1(f28(x4291,x4292,x4293))
% 27.15/27.21 [430]~E(x4301,x4302)+~P1(x4304)+~P2(x4302)+~P12(x4303,x4301)+~E(x4303,x4304)+P1(f40(x4301,x4302,x4303))
% 27.15/27.21 [434]~E(x4341,x4342)+~P5(x4344)+~P5(x4342)+~P11(x4341,x4343)+~E(x4343,x4344)+P12(f18(x4341,x4342,x4343),x4343)
% 27.15/27.21 [435]~E(x4351,x4352)+~P5(x4354)+~P5(x4352)+~P11(x4351,x4353)+~E(x4353,x4354)+P12(f18(x4351,x4352,x4353),x4351)
% 27.15/27.21 [436]~E(x4361,x4362)+~P2(x4364)+~P5(x4362)+~P11(x4363,x4361)+~E(x4363,x4364)+P12(f19(x4361,x4362,x4363),x4363)
% 27.15/27.21 [437]~E(x4371,x4372)+~P2(x4374)+~P5(x4372)+~P11(x4373,x4371)+~E(x4373,x4374)+P12(f19(x4371,x4372,x4373),x4371)
% 27.15/27.21 [438]~E(x4381,x4382)+~P2(x4384)+~P5(x4382)+~P11(x4383,x4381)+~E(x4383,x4384)+P12(f21(x4381,x4382,x4383),x4383)
% 27.15/27.21 [439]~E(x4391,x4392)+~P2(x4394)+~P5(x4392)+~P11(x4393,x4391)+~E(x4393,x4394)+P12(f21(x4391,x4392,x4393),x4391)
% 27.15/27.21 [440]~E(x4401,x4402)+~P2(x4404)+~P5(x4402)+~P11(x4403,x4401)+~E(x4403,x4404)+P12(f22(x4401,x4402,x4403),x4403)
% 27.15/27.21 [441]~E(x4411,x4412)+~P2(x4414)+~P5(x4412)+~P11(x4413,x4411)+~E(x4413,x4414)+P12(f22(x4411,x4412,x4413),x4411)
% 27.15/27.21 [442]~E(x4421,x4422)+~P2(x4424)+~P2(x4422)+~P11(x4421,x4423)+~E(x4423,x4424)+P12(f23(x4421,x4422,x4423),x4423)
% 27.15/27.21 [443]~E(x4431,x4432)+~P2(x4434)+~P2(x4432)+~P11(x4431,x4433)+~E(x4433,x4434)+P12(f23(x4431,x4432,x4433),x4431)
% 27.15/27.21 [444]~E(x4441,x4442)+~P1(x4444)+~P5(x4442)+~P12(x4443,x4441)+~E(x4443,x4444)+P12(f28(x4441,x4442,x4443),x4441)
% 27.15/27.21 [445]~E(x4451,x4452)+~P1(x4454)+~P2(x4452)+~P12(x4453,x4451)+~E(x4453,x4454)+P12(f40(x4451,x4452,x4453),x4451)
% 27.15/27.21 [457]~E(x4572,x4573)+~P1(x4574)+~P2(x4573)+P12(x4571,x4572)+~E(x4571,x4574)+P4(f29(x4572,x4573,x4571),x4571,x4572)
% 27.15/27.21 [467]~P2(x4672)+~P5(x4674)+~P11(x4671,x4673)+~E(x4671,x4672)+~E(x4673,x4674)+~E(f21(x4673,x4674,x4671),f19(x4673,x4674,x4671))
% 27.15/27.21 [480]~P1(x4803)+~P2(x4804)+P12(x4801,x4802)+~E(x4801,x4803)+~E(x4802,x4804)+~P4(f30(x4802,x4804,x4801),x4801,x4802)
% 27.15/27.21 [501]~E(x5012,x5013)+~E(x5011,x5014)+~P1(x5013)+~P1(x5014)+E(x5011,x5012)+P1(f79(x5012,x5013,x5011,x5014))
% 27.15/27.21 [504]~E(x5042,x5043)+~E(x5041,x5044)+~P1(x5043)+~P1(x5044)+E(x5041,x5042)+E(f74(x5041,f79(x5042,x5043,x5041,x5044)),f74(x5042,x5041))
% 27.15/27.21 [520]~E(x5202,x5203)+~E(x5201,x5204)+~P1(x5203)+~P1(x5204)+E(x5201,x5202)+E(f74(x5201,f79(x5202,x5203,x5201,x5204)),f74(f79(x5202,x5203,x5201,x5204),x5202))
% 27.15/27.21 [356]P9(x3562,x3561)+P9(x3561,x3562)+~P13(x3563)+~P13(x3564)+E(x3561,x3562)+~E(x3562,x3563)+~E(x3561,x3564)
% 27.15/27.21 [369]~P13(x3694)+~P13(x3693)+~P9(x3692,x3691)+~P9(x3691,x3692)+E(x3691,x3692)+~E(x3692,x3693)+~E(x3691,x3694)
% 27.15/27.21 [395]~P1(x3956)+~P1(x3954)+~P1(x3952)+~E(x3951,x3952)+~E(x3953,x3954)+~E(x3955,x3956)+~E(f45(x3955,x3953,x3951),x3951)
% 27.15/27.21 [396]~P1(x3966)+~P1(x3964)+~P1(x3962)+~E(x3961,x3962)+~E(x3963,x3964)+~E(x3965,x3966)+~E(f45(x3965,x3963,x3961),x3963)
% 27.15/27.21 [397]~P1(x3976)+~P1(x3974)+~P1(x3972)+~E(x3971,x3972)+~E(x3973,x3974)+~E(x3975,x3976)+~E(f45(x3975,x3973,x3971),x3975)
% 27.15/27.21 [408]~P1(x4086)+~P1(x4085)+~P1(x4084)+~E(x4083,x4084)+~E(x4082,x4085)+~E(x4081,x4086)+E(f76(x4081,x4082,x4083),f76(x4083,x4081,x4082))
% 27.15/27.21 [409]~P1(x4096)+~P1(x4095)+~P1(x4094)+~E(x4093,x4094)+~E(x4092,x4095)+~E(x4091,x4096)+E(f76(x4091,x4092,x4093),f76(x4091,x4093,x4092))
% 27.15/27.21 [410]~P1(x4106)+~P1(x4105)+~P1(x4104)+~E(x4103,x4104)+~E(x4102,x4105)+~E(x4101,x4106)+E(f53(x4101,x4102,x4103),f76(x4101,x4102,x4103))
% 27.15/27.21 [412]~P1(x4126)+~P1(x4125)+~P1(x4124)+~E(x4123,x4124)+~E(x4122,x4125)+~E(x4121,x4126)+P1(f45(x4121,x4122,x4123))
% 27.15/27.21 [413]~P1(x4136)+~P1(x4135)+~P1(x4134)+~E(x4133,x4134)+~E(x4132,x4135)+~E(x4131,x4136)+P13(f53(x4131,x4132,x4133))
% 27.15/27.21 [420]~P1(x4206)+~P1(x4205)+~P1(x4204)+~E(x4203,x4204)+~E(x4202,x4205)+~E(x4201,x4206)+P10(a3,f64(x4201,x4202,x4203))
% 27.15/27.21 [421]~P1(x4214)+~P1(x4215)+~P1(x4216)+~E(x4211,x4214)+~E(x4212,x4215)+~E(x4213,x4216)+P8(f76(x4211,x4212,x4213),a3)
% 27.15/27.21 [447]~P1(x4476)+~P1(x4475)+~P1(x4474)+~E(x4473,x4474)+~E(x4472,x4475)+~E(x4471,x4476)+P10(f64(x4471,x4472,x4473),f75(a77,a77))
% 27.15/27.21 [399]~E(x3995,x3993)+~P1(x3996)+~P1(x3992)+~P1(x3994)+~P3(x3991,x3995,x3993)+~E(x3991,x3992)+~E(x3993,x3994)+~E(x3995,x3996)
% 27.15/27.21 [400]~E(x4005,x4003)+~P1(x4006)+~P1(x4004)+~P1(x4002)+~P3(x4003,x4005,x4001)+~E(x4001,x4002)+~E(x4003,x4004)+~E(x4005,x4006)
% 27.15/27.21 [411]~P1(x4116)+~P1(x4114)+~P2(x4112)+~P12(x4115,x4111)+~P4(x4115,x4113,x4111)+~E(x4111,x4112)+~E(x4113,x4114)+~E(x4115,x4116)
% 27.15/27.21 [448]~P1(x4484)+~P1(x4486)+~P1(x4485)+~P3(x4481,x4483,x4482)+P3(x4481,x4482,x4483)+~E(x4483,x4484)+~E(x4482,x4485)+~E(x4481,x4486)
% 27.15/27.21 [449]~P1(x4496)+~P1(x4495)+~P2(x4494)+~P4(x4492,x4491,x4493)+P4(x4491,x4492,x4493)+~E(x4493,x4494)+~E(x4491,x4495)+~E(x4492,x4496)
% 27.15/27.21 [463]~P1(x4636)+~P1(x4634)+~P1(x4632)+~P3(x4633,x4635,x4631)+~P3(x4635,x4633,x4631)+~E(x4631,x4632)+~E(x4633,x4634)+~E(x4635,x4636)
% 27.15/27.21 [373]~P13(x3736)+~P13(x3733)+~P13(x3735)+E(x3731,x3732)+~E(x3732,x3733)+~E(x3734,x3735)+~E(x3731,x3736)+~E(f75(x3731,x3734),f75(x3732,x3734))
% 27.15/27.21 [394]~P1(x3945)+~P1(x3944)+~P12(x3942,x3946)+~P6(x3941,x3946)+~E(x3943,x3944)+~E(x3942,x3945)+~P12(x3943,x3946)+E(f74(x3941,x3942),f74(x3941,x3943))
% 27.15/27.21 [398]~P13(x3986)+~P13(x3985)+~P13(x3984)+~P9(x3981,x3983)+~E(x3982,x3984)+~E(x3983,x3985)+~E(x3981,x3986)+P9(f75(x3981,x3982),f75(x3983,x3982))
% 27.15/27.21 [402]~P1(x4025)+~P1(x4024)+~P12(x4023,x4022)+~P6(x4026,x4022)+P12(x4021,x4022)+~E(x4023,x4024)+~E(x4021,x4025)+~E(f74(x4026,x4021),f74(x4026,x4023))
% 27.15/27.21 [431]~P1(x4315)+~P1(x4314)+~P6(x4311,x4316)+~P7(x4312,x4316)+~E(x4313,x4314)+~E(x4312,x4315)+~P12(x4313,x4316)+P9(f74(x4311,x4312),f74(x4311,x4313))
% 27.15/27.21 [450]~P1(x4505)+~P1(x4504)+~P12(x4503,x4502)+P7(x4501,x4502)+~E(x4503,x4504)+~E(x4501,x4505)+~P6(x4506,x4502)+~P9(f74(x4506,x4501),f74(x4506,x4503))
% 27.15/27.21 [458]~P1(x4585)+~P1(x4586)+~P1(x4584)+~P3(x4582,x4581,x4583)+~E(x4583,x4584)+~E(x4581,x4585)+~E(x4582,x4586)+E(f75(f74(x4581,x4582),f74(x4582,x4583)),f74(x4581,x4583))
% 27.15/27.21 [385]~P13(x3853)+~P13(x3856)+~P13(x3854)+~P9(x3851,x3855)+~P9(x3855,x3852)+P9(x3851,x3852)+~E(x3851,x3853)+~E(x3852,x3854)+~E(x3855,x3856)
% 27.15/27.21 [386]~P1(x3866)+~P2(x3864)+~P5(x3863)+~P12(x3865,x3861)+~P7(x3865,x3862)+P11(x3861,x3862)+~E(x3862,x3863)+~E(x3861,x3864)+~E(x3865,x3866)
% 27.15/27.21 [403]~P1(x4034)+~P1(x4036)+~P12(x4033,x4031)+~P12(x4035,x4032)+~P7(x4033,x4032)+~P7(x4035,x4031)+P11(x4031,x4032)+~E(x4033,x4034)+~E(x4035,x4036)
% 27.15/27.21 [414]~P1(x4146)+~P1(x4144)+~P1(x4145)+E(x4141,x4142)+E(x4141,x4143)+~E(x4142,x4144)+~E(x4143,x4145)+~E(x4141,x4146)+E(f64(x4141,x4142,x4143),f64(x4143,x4142,x4141))
% 27.15/27.21 [496]~P1(x4964)+~P1(x4962)+~P5(x4966)+~P12(x4961,x4965)+~P12(x4963,x4965)+~E(x4961,x4962)+~E(x4963,x4964)+~E(x4965,x4966)+~E(f25(x4965,x4966,x4963,x4961),x4961)
% 27.15/27.21 [497]~P1(x4974)+~P1(x4972)+~P5(x4976)+~P12(x4971,x4975)+~P12(x4973,x4975)+~E(x4971,x4972)+~E(x4973,x4974)+~E(x4975,x4976)+~E(f25(x4975,x4976,x4973,x4971),x4973)
% 27.15/27.21 [506]~E(x5061,x5062)+~P1(x5066)+~P1(x5065)+~P5(x5062)+~P12(x5064,x5061)+~P12(x5063,x5061)+~E(x5064,x5065)+~E(x5063,x5066)+P1(f25(x5061,x5062,x5063,x5064))
% 27.15/27.21 [510]~E(x5101,x5102)+~P1(x5106)+~P1(x5105)+~P5(x5102)+~P12(x5104,x5101)+~P12(x5103,x5101)+~E(x5104,x5105)+~E(x5103,x5106)+P12(f25(x5101,x5102,x5103,x5104),x5101)
% 27.15/27.21 [523]~P1(x5232)+~P1(x5234)+~P2(x5236)+~P12(x5231,x5235)+~P12(x5233,x5235)+~E(x5231,x5232)+~E(x5233,x5234)+~E(x5235,x5236)+~E(f43(x5235,x5236,x5233,x5234,x5231),x5231)
% 27.15/27.21 [524]~P1(x5242)+~P1(x5244)+~P2(x5246)+~P12(x5241,x5245)+~P12(x5243,x5245)+~E(x5241,x5242)+~E(x5243,x5244)+~E(x5245,x5246)+~E(f43(x5245,x5246,x5243,x5244,x5241),x5243)
% 27.15/27.21 [525]~P1(x5254)+~P1(x5255)+~P2(x5256)+~P4(x5253,x5251,x5252)+P12(x5251,x5252)+~E(x5253,x5254)+~E(x5251,x5255)+~E(x5252,x5256)+~E(f31(x5252,x5256,x5251,x5255,x5253),x5253)
% 27.15/27.21 [526]~P1(x5264)+~P1(x5265)+~P2(x5266)+~P4(x5263,x5261,x5262)+P12(x5261,x5262)+~E(x5263,x5264)+~E(x5261,x5265)+~E(x5262,x5266)+~E(f31(x5262,x5266,x5261,x5265,x5263),x5261)
% 27.15/27.21 [529]~E(x5293,x5294)+~E(x5291,x5292)+~P1(x5296)+~P1(x5294)+~P2(x5292)+~P12(x5295,x5291)+~P12(x5293,x5291)+~E(x5295,x5296)+P1(f43(x5291,x5292,x5293,x5294,x5295))
% 27.15/27.21 [530]~E(x5303,x5304)+~E(x5301,x5302)+~P1(x5306)+~P1(x5304)+~P2(x5302)+~P12(x5305,x5301)+~P12(x5303,x5301)+~E(x5305,x5306)+P12(f43(x5301,x5302,x5303,x5304,x5305),x5301)
% 27.15/27.21 [531]~E(x5311,x5314)+~E(x5312,x5313)+~P1(x5316)+~P1(x5314)+~P2(x5313)+~P4(x5315,x5311,x5312)+P12(x5311,x5312)+~E(x5315,x5316)+P1(f31(x5312,x5313,x5311,x5314,x5315))
% 27.15/27.21 [534]~E(x5341,x5344)+~E(x5342,x5343)+~P1(x5346)+~P1(x5344)+~P2(x5343)+~P4(x5345,x5341,x5342)+P12(x5341,x5342)+~E(x5345,x5346)+P4(f31(x5342,x5343,x5341,x5344,x5345),x5341,x5342)
% 27.15/27.21 [491]~P1(x4918)+~P1(x4916)+~P1(x4914)+~P1(x4912)+~E(x4911,x4912)+~E(x4913,x4914)+~E(x4915,x4916)+~E(x4917,x4918)+~E(f46(x4917,x4915,x4913,x4911),x4911)
% 27.15/27.21 [492]~P1(x4928)+~P1(x4926)+~P1(x4924)+~P1(x4922)+~E(x4921,x4922)+~E(x4923,x4924)+~E(x4925,x4926)+~E(x4927,x4928)+~E(f46(x4927,x4925,x4923,x4921),x4923)
% 27.15/27.21 [493]~P1(x4938)+~P1(x4936)+~P1(x4934)+~P1(x4932)+~E(x4931,x4932)+~E(x4933,x4934)+~E(x4935,x4936)+~E(x4937,x4938)+~E(f46(x4937,x4935,x4933,x4931),x4935)
% 27.15/27.21 [494]~P1(x4948)+~P1(x4946)+~P1(x4944)+~P1(x4942)+~E(x4941,x4942)+~E(x4943,x4944)+~E(x4945,x4946)+~E(x4947,x4948)+~E(f46(x4947,x4945,x4943,x4941),x4947)
% 27.15/27.21 [503]~P1(x5038)+~P1(x5037)+~P1(x5036)+~P1(x5035)+~E(x5034,x5035)+~E(x5033,x5036)+~E(x5032,x5037)+~E(x5031,x5038)+P1(f46(x5031,x5032,x5033,x5034))
% 27.15/27.21 [502]E(x5023,x5021)+~E(x5022,x5024)+~P1(x5024)+~P1(x5026)+~P1(x5025)+E(x5021,x5022)+E(x5023,x5022)+~E(x5021,x5025)+~E(x5023,x5026)+P1(f80(x5022,x5024,x5023,x5021))
% 27.15/27.21 [507]~E(x5073,x5074)+~P1(x5076)+~P1(x5075)+~P2(x5074)+~P12(x5072,x5073)+~P12(x5071,x5073)+E(x5071,x5072)+~E(x5072,x5075)+~E(x5071,x5076)+P1(f33(x5073,x5074,x5071,x5072))
% 27.15/27.21 [508]~E(x5083,x5084)+~P1(x5086)+~P1(x5085)+~P2(x5084)+~P12(x5082,x5083)+~P12(x5081,x5083)+E(x5081,x5082)+~E(x5082,x5085)+~E(x5081,x5086)+P1(f42(x5083,x5084,x5081,x5082))
% 27.15/27.21 [514]~E(x5143,x5144)+~P1(x5145)+~P1(x5146)+~P2(x5144)+~P12(x5142,x5143)+~P12(x5141,x5143)+E(x5141,x5142)+~E(x5142,x5145)+~E(x5141,x5146)+P3(x5141,x5142,f33(x5143,x5144,x5142,x5141))
% 27.15/27.21 [515]~E(x5153,x5154)+~P1(x5156)+~P1(x5155)+~P2(x5154)+~P12(x5152,x5153)+~P12(x5151,x5153)+E(x5151,x5152)+~E(x5152,x5155)+~E(x5151,x5156)+P3(f42(x5153,x5154,x5151,x5152),x5151,x5152)
% 27.15/27.21 [505]E(x5053,x5051)+~E(x5052,x5054)+~P1(x5054)+~P1(x5056)+~P1(x5055)+E(x5051,x5052)+E(x5053,x5052)+~E(x5051,x5055)+~E(x5053,x5056)+E(f74(x5052,f80(x5052,x5054,x5053,x5051)),f74(x5053,x5051))
% 27.15/27.21 [433]~P1(x4336)+~P1(x4334)+~P12(x4333,x4331)+~P12(x4335,x4332)+~P6(x4337,x4332)+~P6(x4337,x4331)+E(x4331,x4332)+~E(x4333,x4334)+~E(x4335,x4336)+~E(f74(x4337,x4335),f74(x4337,x4333))
% 27.15/27.21 [470]~P1(x4704)+~P1(x4708)+~P1(x4702)+~P2(x4706)+~P12(x4707,x4705)+~P3(x4707,x4703,x4701)+~P4(x4703,x4701,x4705)+~E(x4701,x4702)+~E(x4703,x4704)+~E(x4705,x4706)+~E(x4707,x4708)
% 27.15/27.21 [475]~P1(x4754)+~P1(x4756)+~P1(x4758)+~P1(x4755)+~P3(x4751,x4752,x4757)+~P3(x4757,x4751,x4753)+P3(x4751,x4752,x4753)+~E(x4752,x4754)+~E(x4753,x4755)+~E(x4751,x4756)+~E(x4757,x4758)
% 27.15/27.21 [476]~P1(x4767)+~P1(x4766)+~P1(x4764)+~P1(x4768)+~P3(x4765,x4762,x4763)+~P3(x4761,x4762,x4765)+P3(x4761,x4762,x4763)+~E(x4763,x4764)+~E(x4765,x4766)+~E(x4762,x4767)+~E(x4761,x4768)
% 27.15/27.21 [477]~P1(x4778)+~P1(x4774)+~P1(x4776)+~P2(x4775)+~P4(x4777,x4771,x4773)+~P4(x4777,x4772,x4773)+P4(x4771,x4772,x4773)+~E(x4771,x4774)+~E(x4773,x4775)+~E(x4772,x4776)+~E(x4777,x4778)
% 27.15/27.21 [478]~P1(x4788)+~P1(x4784)+~P1(x4787)+~P2(x4785)+~P3(x4782,x4781,x4786)+~P4(x4781,x4786,x4783)+P4(x4781,x4782,x4783)+~E(x4782,x4784)+~E(x4783,x4785)+~E(x4786,x4787)+~E(x4781,x4788)
% 27.15/27.21 [481]~P1(x4816)+~P1(x4818)+~P1(x4812)+~P1(x4814)+~P3(x4817,x4811,x4813)+~P3(x4817,x4815,x4811)+~P3(x4817,x4815,x4813)+~E(x4811,x4812)+~E(x4813,x4814)+~E(x4815,x4816)+~E(x4817,x4818)
% 27.15/27.21 [432]~P1(x4325)+~P1(x4326)+~P2(x4327)+~P2(x4328)+~P12(x4323,x4322)+~P12(x4324,x4322)+P11(x4321,x4322)+P4(x4323,x4324,x4321)+~E(x4323,x4325)+~E(x4324,x4326)+~E(x4322,x4327)+~E(x4321,x4328)
% 27.15/27.21 [451]~P1(x4515)+~P1(x4513)+~P1(x4517)+~P2(x4518)+~P12(x4514,x4512)+~P12(x4516,x4512)+~P3(x4511,x4514,x4516)+P12(x4511,x4512)+~E(x4511,x4513)+~E(x4514,x4515)+~E(x4516,x4517)+~E(x4512,x4518)
% 27.15/27.21 [452]~P1(x4525)+~P1(x4527)+~P1(x4523)+~P2(x4528)+~P12(x4524,x4522)+~P12(x4526,x4522)+~P3(x4526,x4524,x4521)+P12(x4521,x4522)+~E(x4521,x4523)+~E(x4524,x4525)+~E(x4526,x4527)+~E(x4522,x4528)
% 27.15/27.21 [453]~P1(x4538)+~P1(x4534)+~P1(x4535)+~P5(x4536)+~P12(x4533,x4532)+~P12(x4537,x4532)+~P3(x4531,x4537,x4533)+P7(x4531,x4532)+~E(x4533,x4534)+~E(x4531,x4535)+~E(x4532,x4536)+~E(x4537,x4538)
% 27.15/27.21 [454]~P1(x4548)+~P1(x4544)+~P1(x4545)+~P5(x4546)+~P12(x4543,x4542)+~P7(x4547,x4542)+~P3(x4541,x4547,x4543)+P7(x4541,x4542)+~E(x4543,x4544)+~E(x4541,x4545)+~E(x4542,x4546)+~E(x4547,x4548)
% 27.15/27.21 [468]~P1(x4686)+~P1(x4688)+~P1(x4684)+~P2(x4687)+~P12(x4685,x4682)+~P3(x4681,x4685,x4683)+P12(x4681,x4682)+P4(x4681,x4683,x4682)+~E(x4683,x4684)+~E(x4685,x4686)+~E(x4682,x4687)+~E(x4681,x4688)
% 27.15/27.21 [484]~P1(x4848)+~P1(x4846)+~P5(x4847)+~P5(x4845)+~P12(x4842,x4843)+~P12(x4841,x4843)+~E(x4844,x4845)+~E(x4842,x4846)+~E(x4843,x4847)+~E(x4841,x4848)+P4(x4841,x4842,f12(x4841,x4842,x4843))+P11(f11(x4841,x4842,x4843),x4843)
% 27.15/27.21 [485]~P1(x4858)+~P1(x4856)+~P5(x4857)+~P5(x4855)+~P12(x4852,x4853)+~P7(x4851,x4853)+~E(x4854,x4855)+~E(x4852,x4856)+~E(x4853,x4857)+~E(x4851,x4858)+P4(x4851,x4852,f12(x4851,x4852,x4853))+P11(f11(x4851,x4852,x4853),x4853)
% 27.15/27.21 [486]~P1(x4868)+~P1(x4866)+~P5(x4867)+~P5(x4865)+~P12(x4861,x4863)+~P7(x4862,x4863)+~E(x4864,x4865)+~E(x4862,x4866)+~E(x4863,x4867)+~E(x4861,x4868)+P4(x4861,x4862,f12(x4861,x4862,x4863))+P11(f11(x4861,x4862,x4863),x4863)
% 27.15/27.21 [487]~P1(x4878)+~P1(x4876)+~P5(x4877)+~P5(x4875)+~P7(x4872,x4873)+~P7(x4871,x4873)+~E(x4874,x4875)+~E(x4872,x4876)+~E(x4873,x4877)+~E(x4871,x4878)+P4(x4871,x4872,f12(x4871,x4872,x4873))+P11(f11(x4871,x4872,x4873),x4873)
% 27.15/27.21 [499]~P1(x4996)+~P1(x4994)+~P1(x4992)+~P2(x4998)+~P12(x4991,x4997)+~P12(x4993,x4997)+~P12(x4995,x4997)+~E(x4991,x4992)+~E(x4993,x4994)+~E(x4995,x4996)+~E(x4997,x4998)+~E(f41(x4997,x4998,x4995,x4993),x4993)
% 27.15/27.21 [500]~P1(x5006)+~P1(x5004)+~P1(x5002)+~P2(x5008)+~P12(x5001,x5007)+~P12(x5003,x5007)+~P12(x5005,x5007)+~E(x5001,x5002)+~E(x5003,x5004)+~E(x5005,x5006)+~E(x5007,x5008)+~E(f41(x5007,x5008,x5005,x5003),x5005)
% 27.15/27.21 [511]~E(x5111,x5112)+~P1(x5118)+~P1(x5117)+~P1(x5116)+~P2(x5112)+~P12(x5115,x5111)+~P12(x5114,x5111)+~P12(x5113,x5111)+~E(x5115,x5116)+~E(x5114,x5117)+~E(x5113,x5118)+P1(f41(x5111,x5112,x5113,x5114))
% 27.15/27.21 [513]~E(x5131,x5132)+~P1(x5138)+~P1(x5137)+~P1(x5136)+~P2(x5132)+~P12(x5135,x5131)+~P12(x5134,x5131)+~P12(x5133,x5131)+~E(x5135,x5136)+~E(x5134,x5137)+~E(x5133,x5138)+P12(f41(x5131,x5132,x5133,x5134),x5131)
% 27.15/27.22 [527]~P1(x5276)+~P1(x5274)+~P1(x5272)+~P2(x5278)+~P12(x5273,x5277)+~P12(x5275,x5277)+~P3(x5273,x5275,x5271)+~E(x5271,x5272)+~E(x5273,x5274)+~E(x5275,x5276)+~E(x5277,x5278)+~E(f34(x5277,x5278,x5275,x5273,x5271),x5271)
% 27.15/27.22 [528]~P1(x5286)+~P1(x5284)+~P1(x5282)+~P2(x5288)+~P12(x5283,x5287)+~P12(x5285,x5287)+~P3(x5281,x5285,x5283)+~E(x5281,x5282)+~E(x5283,x5284)+~E(x5285,x5286)+~E(x5287,x5288)+~E(f35(x5287,x5288,x5285,x5283,x5281),x5281)
% 27.15/27.22 [532]~E(x5321,x5322)+~P1(x5328)+~P1(x5327)+~P1(x5326)+~P2(x5322)+~P12(x5324,x5321)+~P12(x5323,x5321)+~P3(x5324,x5323,x5325)+~E(x5325,x5326)+~E(x5324,x5327)+~E(x5323,x5328)+P1(f34(x5321,x5322,x5323,x5324,x5325))
% 27.15/27.22 [533]~E(x5331,x5332)+~P1(x5338)+~P1(x5337)+~P1(x5336)+~P2(x5332)+~P12(x5334,x5331)+~P12(x5333,x5331)+~P3(x5335,x5333,x5334)+~E(x5335,x5336)+~E(x5334,x5337)+~E(x5333,x5338)+P1(f35(x5331,x5332,x5333,x5334,x5335))
% 27.15/27.22 [535]~E(x5353,x5354)+~P1(x5357)+~P1(x5358)+~P1(x5356)+~P2(x5354)+~P12(x5352,x5353)+~P12(x5351,x5353)+~P3(x5351,x5352,x5355)+~E(x5355,x5356)+~E(x5352,x5357)+~E(x5351,x5358)+P3(x5351,x5352,f34(x5353,x5354,x5352,x5351,x5355))
% 27.15/27.22 [536]~E(x5361,x5362)+~P1(x5368)+~P1(x5367)+~P1(x5366)+~P2(x5362)+~P12(x5364,x5361)+~P12(x5363,x5361)+~P3(x5365,x5363,x5364)+~E(x5365,x5366)+~E(x5364,x5367)+~E(x5363,x5368)+P3(f35(x5361,x5362,x5363,x5364,x5365),x5363,x5364)
% 27.15/27.22 [541]~P1(x5414)+~P1(x5416)+~P1(x5417)+~P2(x5418)+~P4(x5413,x5411,x5412)+~P4(x5415,x5411,x5412)+P12(x5411,x5412)+~E(x5413,x5414)+~E(x5415,x5416)+~E(x5411,x5417)+~E(x5412,x5418)+~E(f32(x5412,x5418,x5411,x5417,x5415,x5416,x5413),x5413)
% 27.15/27.22 [542]~P1(x5424)+~P1(x5426)+~P1(x5427)+~P2(x5428)+~P4(x5423,x5421,x5422)+~P4(x5425,x5421,x5422)+P12(x5421,x5422)+~E(x5423,x5424)+~E(x5425,x5426)+~E(x5421,x5427)+~E(x5422,x5428)+~E(f32(x5422,x5428,x5421,x5427,x5425,x5426,x5423),x5425)
% 27.15/27.22 [543]~P1(x5434)+~P1(x5436)+~P1(x5437)+~P2(x5438)+~P4(x5433,x5431,x5432)+~P4(x5435,x5431,x5432)+P12(x5431,x5432)+~E(x5433,x5434)+~E(x5435,x5436)+~E(x5431,x5437)+~E(x5432,x5438)+~E(f32(x5432,x5438,x5431,x5437,x5435,x5436,x5433),x5431)
% 27.15/27.22 [559]~E(x5595,x5596)+~E(x5591,x5594)+~E(x5592,x5593)+~P1(x5598)+~P1(x5596)+~P1(x5594)+~P2(x5593)+~P4(x5597,x5591,x5592)+~P4(x5595,x5591,x5592)+P12(x5591,x5592)+~E(x5597,x5598)+P1(f32(x5592,x5593,x5591,x5594,x5595,x5596,x5597))
% 27.15/27.22 [560]~E(x5605,x5606)+~E(x5601,x5604)+~E(x5602,x5603)+~P1(x5608)+~P1(x5606)+~P1(x5604)+~P2(x5603)+~P4(x5607,x5601,x5602)+~P4(x5605,x5601,x5602)+P12(x5601,x5602)+~E(x5607,x5608)+P4(f32(x5602,x5603,x5601,x5604,x5605,x5606,x5607),x5601,x5602)
% 27.15/27.22 [562]~E(x5622,x5626)+~E(x5621,x5625)+~E(x5624,x5628)+~E(x5623,x5627)+~P1(x5625)+~P1(x5626)+~P1(x5627)+~P1(x5628)+E(x5621,x5622)+E(x5623,x5624)+~P9(f74(x5623,x5624),f74(x5621,x5622))+P1(f81(x5621,x5625,x5622,x5626,x5623,x5627,x5624,x5628))
% 27.15/27.22 [564]~E(x5642,x5646)+~E(x5641,x5645)+~E(x5644,x5648)+~E(x5643,x5647)+~P1(x5645)+~P1(x5646)+~P1(x5647)+~P1(x5648)+E(x5641,x5642)+E(x5643,x5644)+P3(f81(x5641,x5645,x5642,x5646,x5643,x5647,x5644,x5648),x5641,x5642)+~P9(f74(x5643,x5644),f74(x5641,x5642))
% 27.15/27.22 [563]~E(x5632,x5636)+~E(x5631,x5635)+~E(x5634,x5638)+~E(x5633,x5637)+~P1(x5635)+~P1(x5636)+~P1(x5637)+~P1(x5638)+E(x5631,x5632)+E(x5633,x5634)+~P9(f74(x5633,x5634),f74(x5631,x5632))+E(f74(x5631,f81(x5631,x5635,x5632,x5636,x5633,x5637,x5634,x5638)),f74(x5633,x5634))
% 27.15/27.22 [446]~P1(x4465)+~P1(x4464)+~P1(x4468)+~P2(x4467)+~P12(x4462,x4466)+~P12(x4461,x4466)+~P12(x4463,x4466)+E(x4461,x4462)+~E(x4462,x4464)+~E(x4461,x4465)+~E(x4466,x4467)+~E(x4463,x4468)+E(f76(x4461,x4462,x4463),a3)
% 27.15/27.22 [455]~P1(x4558)+~P1(x4557)+~P1(x4556)+~P2(x4555)+~P12(x4552,x4554)+~P12(x4551,x4554)+E(x4551,x4552)+P12(x4553,x4554)+~E(x4554,x4555)+~E(x4553,x4556)+~E(x4552,x4557)+~E(x4551,x4558)+~E(f76(x4551,x4552,x4553),a3)
% 27.15/27.22 [544]~E(x5441,x5447)+~E(x5445,x5446)+~E(x5443,x5444)+~P1(x5448)+~P1(x5447)+~P2(x5446)+~P5(x5444)+~P12(x5442,x5445)+~P12(x5441,x5445)+~P7(x5441,x5443)+E(x5441,x5442)+~E(x5442,x5448)+P1(f20(x5443,x5444,x5445,x5446,x5441,x5447,x5442))
% 27.15/27.22 [545]~E(x5451,x5457)+~E(x5455,x5456)+~E(x5453,x5454)+~P1(x5458)+~P1(x5457)+~P2(x5456)+~P5(x5454)+~P12(x5452,x5455)+~P12(x5451,x5455)+~P7(x5451,x5453)+E(x5451,x5452)+~E(x5452,x5458)+P12(f20(x5453,x5454,x5455,x5456,x5451,x5457,x5452),x5455)
% 27.15/27.22 [546]~E(x5461,x5467)+~E(x5465,x5466)+~E(x5463,x5464)+~P1(x5468)+~P1(x5467)+~P2(x5466)+~P5(x5464)+~P12(x5462,x5465)+~P12(x5461,x5465)+~P7(x5461,x5463)+E(x5461,x5462)+~E(x5462,x5468)+P12(f20(x5463,x5464,x5465,x5466,x5461,x5467,x5462),x5463)
% 27.15/27.22 [552]~E(x5525,x5526)+~E(x5523,x5524)+~E(x5521,x5527)+~P1(x5528)+~P1(x5527)+~P2(x5526)+~P5(x5524)+~P12(x5522,x5525)+~P12(x5521,x5525)+~P7(x5521,x5523)+E(x5521,x5522)+~E(x5522,x5528)+P3(x5521,f20(x5523,x5524,x5525,x5526,x5521,x5527,x5522),x5522)
% 27.15/27.22 [550]~E(x5502,x5505)+~P2(x5505)+~P5(x5509)+~P5(x5508)+~P12(x5507,x5502)+~P12(x5506,x5502)+~P6(x5507,x5504)+~P6(x5506,x5503)+~P11(x5503,x5504)+P12(x5501,x5502)+~E(x5504,x5508)+~E(x5503,x5509)+P1(f13(x5503,x5504,x5502,x5505,x5506,x5507,x5501))
% 27.15/27.22 [551]~E(x5512,x5515)+~P2(x5515)+~P5(x5519)+~P5(x5518)+~P12(x5517,x5512)+~P12(x5516,x5512)+~P6(x5517,x5514)+~P6(x5516,x5513)+~P11(x5513,x5514)+P12(x5511,x5512)+~E(x5514,x5518)+~E(x5513,x5519)+P1(f14(x5513,x5514,x5512,x5515,x5516,x5517,x5511))
% 27.15/27.22 [553]~E(x5532,x5535)+~P2(x5535)+~P5(x5539)+~P5(x5538)+~P12(x5537,x5532)+~P12(x5536,x5532)+~P6(x5537,x5534)+~P6(x5536,x5533)+~P11(x5533,x5534)+P12(x5531,x5532)+~E(x5534,x5538)+~E(x5533,x5539)+P12(f13(x5533,x5534,x5532,x5535,x5536,x5537,x5531),x5534)
% 27.15/27.22 [554]~E(x5542,x5545)+~P2(x5545)+~P5(x5549)+~P5(x5548)+~P12(x5547,x5542)+~P12(x5546,x5542)+~P6(x5547,x5544)+~P6(x5546,x5543)+~P11(x5543,x5544)+P12(x5541,x5542)+~E(x5544,x5548)+~E(x5543,x5549)+P12(f13(x5543,x5544,x5542,x5545,x5546,x5547,x5541),x5543)
% 27.15/27.22 [555]~E(x5552,x5555)+~P2(x5555)+~P5(x5559)+~P5(x5558)+~P12(x5557,x5552)+~P12(x5556,x5552)+~P6(x5557,x5554)+~P6(x5556,x5553)+~P11(x5553,x5554)+P12(x5551,x5552)+~E(x5554,x5558)+~E(x5553,x5559)+P12(f14(x5553,x5554,x5552,x5555,x5556,x5557,x5551),x5554)
% 27.15/27.22 [556]~E(x5562,x5565)+~P2(x5565)+~P5(x5569)+~P5(x5568)+~P12(x5567,x5562)+~P12(x5566,x5562)+~P6(x5567,x5564)+~P6(x5566,x5563)+~P11(x5563,x5564)+P12(x5561,x5562)+~E(x5564,x5568)+~E(x5563,x5569)+P12(f14(x5563,x5564,x5562,x5565,x5566,x5567,x5561),x5563)
% 27.15/27.22 [558]~E(x5582,x5585)+~P2(x5585)+~P5(x5589)+~P5(x5588)+~P12(x5587,x5582)+~P12(x5586,x5582)+~P6(x5587,x5584)+~P6(x5586,x5583)+~P11(x5583,x5584)+P12(x5581,x5582)+~E(x5584,x5588)+~E(x5583,x5589)+P4(f14(x5583,x5584,x5582,x5585,x5586,x5587,x5581),x5581,x5582)
% 27.15/27.22 [561]~P2(x5613)+~P5(x5617)+~P5(x5615)+~P6(x5618,x5614)+~P6(x5619,x5616)+~P11(x5616,x5614)+P12(x5611,x5612)+~E(x5612,x5613)+~E(x5614,x5615)+~E(x5616,x5617)+~P12(x5618,x5612)+~P12(x5619,x5612)+~P4(f13(x5616,x5614,x5612,x5613,x5619,x5618,x5611),x5611,x5612)
% 27.15/27.22 [407]~P1(x4075)+~P1(x4078)+~P2(x4076)+~P2(x4077)+~P12(x4074,x4072)+~P12(x4074,x4071)+~P12(x4073,x4072)+~P12(x4073,x4071)+E(x4071,x4072)+E(x4073,x4074)+~E(x4074,x4075)+~E(x4072,x4076)+~E(x4071,x4077)+~E(x4073,x4078)
% 27.15/27.22 [422]P7(x4221,x4222)+~P1(x4225)+~P1(x4228)+~P5(x4227)+~P5(x4226)+~P12(x4224,x4223)+~P12(x4221,x4223)+~P7(x4224,x4222)+P12(x4221,x4222)+P11(x4223,x4222)+~E(x4224,x4225)+~E(x4222,x4226)+~E(x4223,x4227)+~E(x4221,x4228)
% 27.15/27.22 [423]P7(x4231,x4232)+~P1(x4235)+~P1(x4238)+~P5(x4237)+~P5(x4236)+~P12(x4234,x4233)+~P7(x4234,x4232)+~P7(x4231,x4233)+P12(x4231,x4232)+P11(x4233,x4232)+~E(x4234,x4235)+~E(x4232,x4236)+~E(x4233,x4237)+~E(x4231,x4238)
% 27.15/27.22 [472]P4(x4723,x4721,x4722)+P4(x4724,x4721,x4722)+P4(x4724,x4723,x4722)+~P1(x4728)+~P1(x4727)+~P1(x4725)+~P2(x4726)+P12(x4721,x4722)+P12(x4723,x4722)+P12(x4724,x4722)+~E(x4721,x4725)+~E(x4722,x4726)+~E(x4723,x4727)+~E(x4724,x4728)
% 27.15/27.22 [456]~P1(x4565)+~P1(x4566)+~P1(x4568)+~P2(x4567)+~P12(x4562,x4564)+~P12(x4561,x4564)+E(x4561,x4562)+E(x4563,x4562)+P12(x4563,x4564)+~E(x4562,x4565)+~E(x4561,x4566)+~E(x4564,x4567)+~E(x4563,x4568)+~E(f64(x4561,x4562,x4563),a3)
% 27.15/27.22 [474]~P1(x4748)+~P1(x4747)+~P1(x4746)+~P2(x4745)+~P12(x4743,x4744)+~P12(x4741,x4744)+~P3(x4741,x4743,x4742)+E(x4741,x4742)+E(x4741,x4743)+~E(x4744,x4745)+~E(x4742,x4746)+~E(x4743,x4747)+~E(x4741,x4748)+~E(f64(x4743,x4741,x4742),a3)
% 27.15/27.22 [547]P7(x5471,x5472)+~E(x5476,x5477)+~E(x5474,x5475)+~E(x5472,x5473)+~P1(x5478)+~P1(x5477)+~P2(x5475)+~P5(x5473)+~P12(x5471,x5474)+~P12(x5476,x5474)+~P7(x5476,x5472)+P12(x5471,x5472)+~E(x5471,x5478)+P1(f9(x5472,x5473,x5474,x5475,x5476,x5477,x5471))
% 27.15/27.22 [548]P7(x5481,x5482)+~E(x5486,x5487)+~E(x5484,x5485)+~E(x5482,x5483)+~P1(x5488)+~P1(x5487)+~P2(x5485)+~P5(x5483)+~P12(x5481,x5484)+~P12(x5486,x5484)+~P7(x5486,x5482)+P12(x5481,x5482)+~E(x5481,x5488)+P12(f9(x5482,x5483,x5484,x5485,x5486,x5487,x5481),x5484)
% 27.15/27.22 [549]P7(x5491,x5492)+~E(x5496,x5497)+~E(x5494,x5495)+~E(x5492,x5493)+~P1(x5498)+~P1(x5497)+~P2(x5495)+~P5(x5493)+~P12(x5491,x5494)+~P12(x5496,x5494)+~P7(x5496,x5492)+P12(x5491,x5492)+~E(x5491,x5498)+P12(f9(x5492,x5493,x5494,x5495,x5496,x5497,x5491),x5492)
% 27.15/27.22 [557]P7(x5571,x5572)+~E(x5576,x5577)+~E(x5574,x5575)+~E(x5572,x5573)+~P1(x5578)+~P1(x5577)+~P2(x5575)+~P5(x5573)+~P12(x5571,x5574)+~P12(x5576,x5574)+~P7(x5576,x5572)+P12(x5571,x5572)+~E(x5571,x5578)+P3(f9(x5572,x5573,x5574,x5575,x5576,x5577,x5571),x5576,x5571)
% 27.15/27.22 [461]~P1(x46110)+~P1(x4617)+~P1(x4615)+~P2(x4614)+~P5(x4618)+~P12(x4619,x4612)+~P7(x4616,x4612)+~P3(x4611,x4619,x4616)+P7(x4611,x4612)+~E(x4613,x4614)+~E(x4611,x4615)+~E(x4616,x4617)+~E(x4612,x4618)+~E(x4619,x46110)
% 27.15/27.22 [462]~P1(x46210)+~P1(x4627)+~P1(x4625)+~P2(x4624)+~P5(x4628)+~P7(x4626,x4622)+~P7(x4629,x4622)+~P3(x4621,x4629,x4626)+P7(x4621,x4622)+~E(x4623,x4624)+~E(x4621,x4625)+~E(x4626,x4627)+~E(x4622,x4628)+~E(x4629,x46210)
% 27.15/27.22 [483]~P1(x48310)+~P1(x4837)+~P1(x4839)+~P1(x4838)+~P2(x4836)+~P3(x4832,x4831,x4834)+P12(x4833,x4835)+~E(x4835,x4836)+~E(x4834,x4837)+~E(x4833,x4838)+~E(x4832,x4839)+~E(x4831,x48310)+E(f64(x4831,x4832,x4833),f64(x4833,x4832,x4834))+~E(f64(x4831,x4832,x4833),a77)
% 27.15/27.22 [488]~P1(x48810)+~P1(x4887)+~P1(x4889)+~P1(x4888)+~P2(x4885)+~P3(x4882,x4881,x4886)+P12(x4883,x4884)+~E(x4884,x4885)+~E(x4886,x4887)+~E(x4883,x4888)+~E(x4882,x4889)+~E(x4881,x48810)+~E(f64(x4881,x4882,x4883),f64(x4883,x4882,x4886))+E(f64(x4881,x4882,x4883),a77)
% 27.15/27.22 [469]P3(x4691,x4693,x4692)+~P1(x4698)+~P1(x4697)+~P1(x4696)+~P2(x4695)+~P12(x4692,x4694)+~P12(x4693,x4694)+~P12(x4691,x4694)+E(x4691,x4692)+E(x4691,x4693)+~E(x4694,x4695)+~E(x4692,x4696)+~E(x4693,x4697)+~E(x4691,x4698)+E(f64(x4693,x4691,x4692),a3)
% 27.15/27.22 [537]~P1(x5378)+~P1(x5376)+~P1(x5374)+~P1(x5372)+~P2(x53710)+~P12(x5373,x5379)+~P12(x5375,x5379)+~P12(x5377,x5379)+~P3(x5371,x5377,x5375)+~P3(x5373,x5377,x5375)+~E(x5371,x5372)+~E(x5373,x5374)+~E(x5375,x5376)+~E(x5377,x5378)+~E(x5379,x53710)+~E(f36(x5379,x53710,x5377,x5375,x5373,x5371),x5371)
% 27.15/27.22 [538]~P1(x5388)+~P1(x5386)+~P1(x5384)+~P1(x5382)+~P2(x53810)+~P12(x5383,x5389)+~P12(x5385,x5389)+~P12(x5387,x5389)+~P3(x5381,x5387,x5385)+~P3(x5383,x5387,x5385)+~E(x5381,x5382)+~E(x5383,x5384)+~E(x5385,x5386)+~E(x5387,x5388)+~E(x5389,x53810)+~E(f36(x5389,x53810,x5387,x5385,x5383,x5381),x5383)
% 27.15/27.22 [539]~E(x5391,x5392)+~P1(x53910)+~P1(x5399)+~P1(x5398)+~P1(x5397)+~P2(x5392)+~P12(x5395,x5391)+~P12(x5394,x5391)+~P12(x5393,x5391)+~P3(x5396,x5393,x5394)+~P3(x5395,x5393,x5394)+~E(x5396,x5397)+~E(x5395,x5398)+~E(x5394,x5399)+~E(x5393,x53910)+P1(f36(x5391,x5392,x5393,x5394,x5395,x5396))
% 27.15/27.22 [540]~E(x5401,x5402)+~P1(x54010)+~P1(x5409)+~P1(x5408)+~P1(x5407)+~P2(x5402)+~P12(x5405,x5401)+~P12(x5404,x5401)+~P12(x5403,x5401)+~P3(x5406,x5403,x5404)+~P3(x5405,x5403,x5404)+~E(x5406,x5407)+~E(x5405,x5408)+~E(x5404,x5409)+~E(x5403,x54010)+P3(f36(x5401,x5402,x5403,x5404,x5405,x5406),x5403,x5404)
% 27.15/27.22 [479]E(x4793,x4791)+P3(x4792,x4791,x4793)+P3(x4791,x4792,x4793)+P3(x4793,x4792,x4791)+~P12(x4793,x4797)+~P12(x4791,x4797)+~P12(x4792,x4797)+~P2(x4798)+~P1(x4794)+~P1(x4795)+~P1(x4796)+E(x4791,x4792)+E(x4793,x4792)+~E(x4792,x4794)+~E(x4791,x4795)+~E(x4793,x4796)+~E(x4797,x4798)
% 27.15/27.22 [471]~P1(x4719)+~P7(x4713,x4717)+~P12(x4711,x4717)+~P12(x4711,x4714)+~P12(x4712,x4717)+~P12(x4712,x4714)+~P12(x4713,x4714)+~P5(x4718)+~P2(x4715)+~P1(x47110)+~P1(x4716)+E(x4711,x4712)+P3(x4713,x4711,x4712)+~E(x4714,x4715)+~E(x4713,x4716)+~E(x4717,x4718)+~E(x4712,x4719)+~E(x4711,x47110)
% 27.15/27.22 [495]E(x4953,x4951)+~P3(x4954,x4953,x4951)+E(x4954,x4951)+E(x4954,x4953)+~P2(x4956)+~P1(x4957)+~P1(x49510)+~P1(x4958)+~P1(x4959)+E(x4951,x4952)+E(x4953,x4952)+E(x4954,x4952)+P12(x4952,x4955)+~E(x4955,x4956)+~E(x4952,x4957)+~E(x4951,x4958)+~E(x4953,x4959)+~E(x4954,x49510)+E(f75(f76(x4953,x4954,x4952),f76(x4952,x4954,x4951)),f76(x4953,x4952,x4951))
% 27.15/27.22 [509]E(x5093,x5091)+~P2(x5096)+E(x5094,x5091)+E(x5094,x5093)+~P1(x5098)+P3(x5093,x5094,x5092)+~P1(x5099)+~P1(x5097)+~P1(x50910)+E(x5091,x5092)+E(x5093,x5092)+E(x5094,x5092)+P12(x5091,x5095)+~E(x5095,x5096)+~E(x5092,x5097)+~E(x5091,x5098)+~E(x5093,x5099)+~E(x5094,x50910)+~E(f75(f76(x5094,x5093,x5091),f76(x5091,x5093,x5092)),f76(x5094,x5091,x5092))
% 27.15/27.22 [519]~P1(x5199)+~P1(x5197)+~P1(x5198)+~P1(x51912)+~P1(x51910)+~P1(x51911)+~E(x5195,x5197)+~E(x5194,x5198)+~E(x5196,x5199)+~E(x5192,x51910)+~E(x5191,x51911)+~E(x5193,x51912)+~E(f74(x5192,x5193),f74(x5195,x5196))+~E(f74(x5191,x5192),f74(x5194,x5195))+~E(f74(x5193,x5191),f74(x5196,x5194))+~E(f64(x5192,x5193,x5191),f64(x5195,x5196,x5194))+~E(f64(x5191,x5192,x5193),f64(x5194,x5195,x5196))+~E(f64(x5193,x5191,x5192),f64(x5196,x5194,x5195))+E(f76(x5191,x5192,x5193),f76(x5194,x5195,x5196))
% 27.15/27.22 [473]~P12(x4735,x4733)+E(x4735,x4731)+P3(x4735,x4731,x4732)+P4(x4731,x4732,x4733)+~P12(x4735,x4734)+~P12(x4731,x4734)+~P12(x4732,x4734)+~P2(x4738)+~P2(x4739)+~P1(x4737)+~P1(x47310)+~P1(x4736)+E(x4731,x4732)+E(x4733,x4734)+E(x4735,x4732)+~E(x4732,x4736)+~E(x4731,x4737)+~E(x4734,x4738)+~E(x4733,x4739)+~E(x4735,x47310)
% 27.15/27.22 [482]~P5(x4828)+~P4(x4821,x4822,x4829)+~P11(x4824,x4823)+~P6(x48212,x4823)+~P6(x48211,x4824)+~P12(x4821,x4823)+~P12(x4821,x4824)+~P12(x4822,x4823)+~P12(x4822,x4824)+~P5(x4827)+~P2(x48210)+~P1(x4825)+~P1(x4826)+E(x4821,x4822)+E(x4823,x4824)+~E(x4822,x4825)+~E(x4821,x4826)+~E(x4824,x4827)+~E(x4823,x4828)+~E(x4829,x48210)+~P12(x48211,x4829)+~P12(x48212,x4829)
% 27.15/27.22 [517]~P12(x5175,x5174)+~P12(x5171,x5173)+P12(x5176,x5173)+P4(x5175,x5176,x5173)+~P12(x5172,x5173)+~P12(x5172,x5174)+~P2(x5177)+~P2(x51710)+~P1(x51711)+~P1(x51712)+~P1(x5179)+~P1(x5178)+E(x5171,x5172)+E(x5173,x5174)+E(x5175,x5172)+P12(x5176,x5174)+~E(x5174,x5177)+~E(x5172,x5178)+~E(x5171,x5179)+~E(x5173,x51710)+~E(x5176,x51711)+~E(x5175,x51712)+~E(f75(f64(x5171,x5172,x5176),f64(x5176,x5172,x5175)),f64(x5171,x5172,x5175))
% 27.15/27.22 [518]~P12(x5185,x5184)+~P12(x5181,x5183)+P12(x5186,x5183)+P4(x5185,x5186,x5183)+~P12(x5181,x5184)+~P12(x5182,x5183)+~P2(x51810)+~P2(x5187)+~P1(x51811)+~P1(x5188)+~P1(x51812)+~P1(x5189)+E(x5181,x5182)+E(x5183,x5184)+E(x5185,x5181)+P12(x5186,x5184)+~E(x5184,x5187)+~E(x5182,x5188)+~E(x5181,x5189)+~E(x5183,x51810)+~E(x5186,x51811)+~E(x5185,x51812)+~E(f75(f64(x5185,x5181,x5186),f64(x5186,x5181,x5182)),f64(x5185,x5181,x5182))
% 27.15/27.22 [498]~P2(x4986)+~P4(x49813,x49811,x4989)+~P4(x49813,x4987,x4981)+~P4(x49811,x4987,x4985)+~P12(x49813,x4985)+~P12(x49811,x4989)+~P12(x4987,x4989)+~P12(x4983,x4989)+~P12(x4983,x4985)+~P12(x4983,x4981)+~P2(x49810)+~P2(x4982)+~P1(x4988)+~P1(x49812)+~P1(x49814)+~P1(x4984)+~E(x4981,x4982)+~E(x4983,x4984)+~E(x4985,x4986)+~E(x4987,x4988)+~E(x4989,x49810)+~E(x49811,x49812)+~E(x49813,x49814)
% 27.15/27.22 [516]~P1(x5167)+~P4(x5165,x5166,x5163)+~P4(x5161,x5166,x5164)+~P12(x5165,x5164)+~P12(x5161,x5163)+~P12(x5162,x5163)+~P12(x5162,x5164)+~P2(x5168)+~P2(x51610)+~P1(x51611)+~P1(x51612)+~P1(x5169)+P12(x5166,x5163)+P12(x5166,x5164)+E(x5161,x5162)+E(x5163,x5164)+E(x5165,x5162)+~E(x5162,x5167)+~E(x5164,x5168)+~E(x5161,x5169)+~E(x5163,x51610)+~E(x5166,x51611)+~E(x5165,x51612)+E(f75(f64(x5161,x5162,x5166),f64(x5166,x5162,x5165)),f64(x5161,x5162,x5165))
% 27.15/27.22 [490]~P1(x49014)+~P4(x4905,x4903,x4908)+~P12(x4901,x4908)+~P12(x4902,x4904)+~P12(x4902,x4908)+~P12(x4902,x4906)+~P12(x4903,x4906)+~P12(x4905,x4904)+~P2(x4907)+~P2(x49011)+~P2(x4909)+~P1(x49012)+~P1(x49010)+~P1(x49013)+P4(x4901,x4903,x4904)+E(x4901,x4902)+P4(x4901,x4905,x4906)+P12(x4903,x4904)+~E(x4906,x4907)+~E(x4908,x4909)+~E(x4905,x49010)+~E(x4904,x49011)+~E(x4903,x49012)+~E(x4902,x49013)+~E(x4901,x49014)
% 27.15/27.22 [512]~P2(x5126)+~P4(x5121,x5122,x51213)+~P4(x5121,x51211,x5123)+~P4(x51211,x5122,x5129)+~P4(x5127,x5121,x51213)+~P12(x5121,x5129)+~P12(x51211,x51213)+~P12(x5127,x5123)+~P12(x5124,x51213)+~P12(x5124,x5129)+~P12(x5124,x5123)+~P2(x51214)+~P2(x51210)+~P1(x51212)+~P1(x51215)+~P1(x5128)+~P1(x5125)+P4(x5121,x5122,x5123)+~E(x5124,x5125)+~E(x5123,x5126)+~E(x5127,x5128)+~E(x5129,x51210)+~E(x51211,x51212)+~E(x51213,x51214)+~E(x5121,x51215)
% 27.15/27.22 [489]~P12(x4891,x4896)+~P12(x4895,x4898)+~P12(x4894,x4898)+P3(x4891,x4893,x4892)+P3(x4891,x4895,x4894)+~P12(x4893,x4896)+~P12(x4892,x4896)+~P2(x4899)+~P2(x4897)+~P1(x48912)+~P1(x48910)+~P1(x48913)+~P1(x48914)+~P1(x48911)+E(x4891,x4892)+E(x4891,x4893)+E(x4891,x4894)+E(x4891,x4895)+~E(x4896,x4897)+~E(x4898,x4899)+~E(x4892,x48910)+~E(x4893,x48911)+~E(x4894,x48912)+~E(x4895,x48913)+~E(x4891,x48914)+E(f64(x4893,x4891,x4895),f64(x4892,x4891,x4894))
% 27.15/27.22 [521]~P12(x5219,x5217)+~P2(x52115)+~P2(x52116)+~P1(x5216)+~P1(x52110)+~P1(x52111)+~P1(x52112)+~P1(x52114)+~P2(x5218)+~P12(x5212,x5217)+~P12(x5212,x5214)+~P12(x5211,x5214)+~P12(x5211,x5213)+~P12(x52113,x5213)+~P4(x52113,x5219,x5214)+E(x5211,x5212)+P11(x5213,x5214)+~E(x5215,x5216)+~E(x5217,x5218)+~E(x5219,x52110)+~E(x5212,x52111)+~E(x5211,x52112)+~E(x52113,x52114)+~E(x5214,x52115)+~E(x5213,x52116)+~P9(f75(f64(x52113,x5211,x5212),f64(x5211,x5212,x5219)),f75(a77,a77))
% 27.15/27.22 [522]~P12(x5222,x5226)+~P12(x5228,x5226)+~P2(x5227)+~P2(x52215)+~P2(x52214)+~P1(x52216)+~P1(x5229)+~P1(x52210)+~P1(x52211)+~P1(x52212)+~P12(x5222,x5225)+~P12(x5221,x52213)+~P12(x5221,x5225)+~P12(x5224,x52213)+~P12(x5223,x52213)+~P12(x5223,x5225)+~P4(x5224,x5228,x5225)+E(x5221,x5222)+P4(x5223,x5224,x5225)+~E(x5226,x5227)+~E(x5228,x5229)+~E(x5222,x52210)+~E(x5221,x52211)+~E(x5224,x52212)+~E(x52213,x52214)+~E(x5225,x52215)+~E(x5223,x52216)+~P9(f75(f64(x5224,x5221,x5222),f64(x5221,x5222,x5228)),f75(a77,a77))
% 27.15/27.22 [565]E(x5651,x5652)+E(x5653,x5652)+E(x5653,x5651)+E(f74(x5654,x5655),f74(x5656,x5657))+E(f54(x5653,x5651,x5652,x5658,x5659,x56510,x5654,x5655,x5656,x5657,x56511,x56512,x56513,x56514,x56515,x56516,x56517,x56518),x5658)+P12(x56510,x56517)+~E(x56517,x56518)+~E(x56516,x56519)+~E(x56515,x56520)+~E(x56514,x56521)+~E(x56513,x56522)+~E(x56512,x56523)+~E(x56511,x56524)+~E(x56510,x56525)+~E(x5659,x56526)+~E(x5658,x56527)+~E(x5652,x56528)+~E(x5651,x56529)+~E(x5653,x56530)+~E(x5657,x56531)+~E(x5656,x56532)+~E(x5655,x56533)+~E(x5654,x56534)+~P1(x56530)+~P1(x56529)+~P1(x56528)+~P1(x56527)+~P1(x56526)+~P1(x56525)+~P1(x56534)+~P1(x56533)+~P1(x56532)+~P1(x56531)+~P1(x56524)+~P1(x56523)+~P1(x56522)+~P1(x56521)+~P1(x56520)+~P1(x56519)+~P2(x56518)+~P12(x5659,x56517)+~P12(x5658,x56517)
% 27.15/27.22 [566]E(x5661,x5662)+E(x5663,x5662)+E(x5663,x5661)+E(f64(x5664,x5665,x5666),f64(x5667,x5668,x5669))+E(f54(x5663,x5661,x5662,x56610,x56611,x56612,x56613,x56614,x56615,x56616,x5664,x5665,x5666,x5667,x5668,x5669,x56617,x56618),x56610)+P12(x56612,x56617)+~E(x56617,x56618)+~E(x56616,x56619)+~E(x56615,x56620)+~E(x56614,x56621)+~E(x56613,x56622)+~E(x56612,x56623)+~E(x56611,x56624)+~E(x56610,x56625)+~E(x5662,x56626)+~E(x5661,x56627)+~E(x5663,x56628)+~E(x5669,x56629)+~E(x5668,x56630)+~E(x5667,x56631)+~E(x5666,x56632)+~E(x5665,x56633)+~E(x5664,x56634)+~P1(x56628)+~P1(x56627)+~P1(x56626)+~P1(x56625)+~P1(x56624)+~P1(x56623)+~P1(x56622)+~P1(x56621)+~P1(x56620)+~P1(x56619)+~P1(x56634)+~P1(x56633)+~P1(x56632)+~P1(x56631)+~P1(x56630)+~P1(x56629)+~P2(x56618)+~P12(x56611,x56617)+~P12(x56610,x56617)
% 27.15/27.22 [567]E(x5671,x5672)+E(x5673,x5672)+E(x5673,x5671)+E(f74(x5674,x5675),f74(x5676,x5677))+P12(x5678,x5679)+P1(f54(x5673,x5671,x5672,x56710,x56711,x5678,x5674,x5675,x5676,x5677,x56712,x56713,x56714,x56715,x56716,x56717,x5679,x56718))+~E(x5679,x56718)+~E(x56717,x56719)+~E(x56716,x56720)+~E(x56715,x56721)+~E(x56714,x56722)+~E(x56713,x56723)+~E(x56712,x56724)+~E(x5678,x56725)+~E(x56711,x56726)+~E(x56710,x56727)+~E(x5672,x56728)+~E(x5671,x56729)+~E(x5673,x56730)+~E(x5677,x56731)+~E(x5676,x56732)+~E(x5675,x56733)+~E(x5674,x56734)+~P1(x56730)+~P1(x56729)+~P1(x56728)+~P1(x56727)+~P1(x56726)+~P1(x56725)+~P1(x56734)+~P1(x56733)+~P1(x56732)+~P1(x56731)+~P1(x56724)+~P1(x56723)+~P1(x56722)+~P1(x56721)+~P1(x56720)+~P1(x56719)+~P2(x56718)+~P12(x56711,x5679)+~P12(x56710,x5679)
% 27.15/27.22 [568]E(x5681,x5682)+E(x5683,x5682)+E(x5683,x5681)+E(f74(x5684,x5685),f74(x5686,x5687))+P12(x5688,x5689)+P1(f55(x5683,x5681,x5682,x56810,x56811,x5688,x5684,x5685,x5686,x5687,x56812,x56813,x56814,x56815,x56816,x56817,x5689,x56818))+~E(x5689,x56818)+~E(x56817,x56819)+~E(x56816,x56820)+~E(x56815,x56821)+~E(x56814,x56822)+~E(x56813,x56823)+~E(x56812,x56824)+~E(x5688,x56825)+~E(x56811,x56826)+~E(x56810,x56827)+~E(x5682,x56828)+~E(x5681,x56829)+~E(x5683,x56830)+~E(x5687,x56831)+~E(x5686,x56832)+~E(x5685,x56833)+~E(x5684,x56834)+~P1(x56830)+~P1(x56829)+~P1(x56828)+~P1(x56827)+~P1(x56826)+~P1(x56825)+~P1(x56834)+~P1(x56833)+~P1(x56832)+~P1(x56831)+~P1(x56824)+~P1(x56823)+~P1(x56822)+~P1(x56821)+~P1(x56820)+~P1(x56819)+~P2(x56818)+~P12(x56811,x5689)+~P12(x56810,x5689)
% 27.15/27.22 [569]E(x5691,x5692)+E(x5693,x5692)+E(x5693,x5691)+E(f74(x5694,x5695),f74(x5696,x5697))+P12(x5698,x5699)+P1(f56(x5693,x5691,x5692,x56910,x56911,x5698,x5694,x5695,x5696,x5697,x56912,x56913,x56914,x56915,x56916,x56917,x5699,x56918))+~E(x5699,x56918)+~E(x56917,x56919)+~E(x56916,x56920)+~E(x56915,x56921)+~E(x56914,x56922)+~E(x56913,x56923)+~E(x56912,x56924)+~E(x5698,x56925)+~E(x56911,x56926)+~E(x56910,x56927)+~E(x5692,x56928)+~E(x5691,x56929)+~E(x5693,x56930)+~E(x5697,x56931)+~E(x5696,x56932)+~E(x5695,x56933)+~E(x5694,x56934)+~P1(x56930)+~P1(x56929)+~P1(x56928)+~P1(x56927)+~P1(x56926)+~P1(x56925)+~P1(x56934)+~P1(x56933)+~P1(x56932)+~P1(x56931)+~P1(x56924)+~P1(x56923)+~P1(x56922)+~P1(x56921)+~P1(x56920)+~P1(x56919)+~P2(x56918)+~P12(x56911,x5699)+~P12(x56910,x5699)
% 27.15/27.22 [570]E(x5701,x5702)+E(x5703,x5702)+E(x5703,x5701)+E(f74(x5704,x5705),f74(x5706,x5707))+P12(x5708,x5709)+P12(f55(x5703,x5701,x5702,x57010,x57011,x5708,x5704,x5705,x5706,x5707,x57012,x57013,x57014,x57015,x57016,x57017,x5709,x57018),x5709)+~E(x5709,x57018)+~E(x57017,x57019)+~E(x57016,x57020)+~E(x57015,x57021)+~E(x57014,x57022)+~E(x57013,x57023)+~E(x57012,x57024)+~E(x5708,x57025)+~E(x57011,x57026)+~E(x57010,x57027)+~E(x5702,x57028)+~E(x5701,x57029)+~E(x5703,x57030)+~E(x5707,x57031)+~E(x5706,x57032)+~E(x5705,x57033)+~E(x5704,x57034)+~P1(x57030)+~P1(x57029)+~P1(x57028)+~P1(x57027)+~P1(x57026)+~P1(x57025)+~P1(x57034)+~P1(x57033)+~P1(x57032)+~P1(x57031)+~P1(x57024)+~P1(x57023)+~P1(x57022)+~P1(x57021)+~P1(x57020)+~P1(x57019)+~P2(x57018)+~P12(x57011,x5709)+~P12(x57010,x5709)
% 27.15/27.22 [571]E(x5711,x5712)+E(x5713,x5712)+E(x5713,x5711)+E(f74(x5714,x5715),f74(x5716,x5717))+P12(x5718,x5719)+P4(f56(x5713,x5711,x5712,x57110,x57111,x5718,x5714,x5715,x5716,x5717,x57112,x57113,x57114,x57115,x57116,x57117,x5719,x57118),x5718,x5719)+~E(x5719,x57118)+~E(x57117,x57119)+~E(x57116,x57120)+~E(x57115,x57121)+~E(x57114,x57122)+~E(x57113,x57123)+~E(x57112,x57124)+~E(x5718,x57125)+~E(x57111,x57126)+~E(x57110,x57127)+~E(x5712,x57128)+~E(x5711,x57129)+~E(x5713,x57130)+~E(x5717,x57131)+~E(x5716,x57132)+~E(x5715,x57133)+~E(x5714,x57134)+~P1(x57130)+~P1(x57129)+~P1(x57128)+~P1(x57127)+~P1(x57126)+~P1(x57125)+~P1(x57134)+~P1(x57133)+~P1(x57132)+~P1(x57131)+~P1(x57124)+~P1(x57123)+~P1(x57122)+~P1(x57121)+~P1(x57120)+~P1(x57119)+~P2(x57118)+~P12(x57111,x5719)+~P12(x57110,x5719)
% 27.15/27.22 [572]E(x5721,x5722)+E(x5723,x5722)+E(x5723,x5721)+E(f64(x5724,x5725,x5726),f64(x5727,x5728,x5729))+P12(x57210,x57211)+P1(f54(x5723,x5721,x5722,x57212,x57213,x57210,x57214,x57215,x57216,x57217,x5724,x5725,x5726,x5727,x5728,x5729,x57211,x57218))+~E(x57211,x57218)+~E(x57217,x57219)+~E(x57216,x57220)+~E(x57215,x57221)+~E(x57214,x57222)+~E(x57210,x57223)+~E(x57213,x57224)+~E(x57212,x57225)+~E(x5722,x57226)+~E(x5721,x57227)+~E(x5723,x57228)+~E(x5729,x57229)+~E(x5728,x57230)+~E(x5727,x57231)+~E(x5726,x57232)+~E(x5725,x57233)+~E(x5724,x57234)+~P1(x57228)+~P1(x57227)+~P1(x57226)+~P1(x57225)+~P1(x57224)+~P1(x57223)+~P1(x57222)+~P1(x57221)+~P1(x57220)+~P1(x57219)+~P1(x57234)+~P1(x57233)+~P1(x57232)+~P1(x57231)+~P1(x57230)+~P1(x57229)+~P2(x57218)+~P12(x57213,x57211)+~P12(x57212,x57211)
% 27.15/27.22 [573]E(x5731,x5732)+E(x5733,x5732)+E(x5733,x5731)+E(f64(x5734,x5735,x5736),f64(x5737,x5738,x5739))+P12(x57310,x57311)+P1(f55(x5733,x5731,x5732,x57312,x57313,x57310,x57314,x57315,x57316,x57317,x5734,x5735,x5736,x5737,x5738,x5739,x57311,x57318))+~E(x57311,x57318)+~E(x57317,x57319)+~E(x57316,x57320)+~E(x57315,x57321)+~E(x57314,x57322)+~E(x57310,x57323)+~E(x57313,x57324)+~E(x57312,x57325)+~E(x5732,x57326)+~E(x5731,x57327)+~E(x5733,x57328)+~E(x5739,x57329)+~E(x5738,x57330)+~E(x5737,x57331)+~E(x5736,x57332)+~E(x5735,x57333)+~E(x5734,x57334)+~P1(x57328)+~P1(x57327)+~P1(x57326)+~P1(x57325)+~P1(x57324)+~P1(x57323)+~P1(x57322)+~P1(x57321)+~P1(x57320)+~P1(x57319)+~P1(x57334)+~P1(x57333)+~P1(x57332)+~P1(x57331)+~P1(x57330)+~P1(x57329)+~P2(x57318)+~P12(x57313,x57311)+~P12(x57312,x57311)
% 27.15/27.22 [574]E(x5741,x5742)+E(x5743,x5742)+E(x5743,x5741)+E(f64(x5744,x5745,x5746),f64(x5747,x5748,x5749))+P12(x57410,x57411)+P1(f56(x5743,x5741,x5742,x57412,x57413,x57410,x57414,x57415,x57416,x57417,x5744,x5745,x5746,x5747,x5748,x5749,x57411,x57418))+~E(x57411,x57418)+~E(x57417,x57419)+~E(x57416,x57420)+~E(x57415,x57421)+~E(x57414,x57422)+~E(x57410,x57423)+~E(x57413,x57424)+~E(x57412,x57425)+~E(x5742,x57426)+~E(x5741,x57427)+~E(x5743,x57428)+~E(x5749,x57429)+~E(x5748,x57430)+~E(x5747,x57431)+~E(x5746,x57432)+~E(x5745,x57433)+~E(x5744,x57434)+~P1(x57428)+~P1(x57427)+~P1(x57426)+~P1(x57425)+~P1(x57424)+~P1(x57423)+~P1(x57422)+~P1(x57421)+~P1(x57420)+~P1(x57419)+~P1(x57434)+~P1(x57433)+~P1(x57432)+~P1(x57431)+~P1(x57430)+~P1(x57429)+~P2(x57418)+~P12(x57413,x57411)+~P12(x57412,x57411)
% 27.15/27.22 [575]E(x5751,x5752)+E(x5753,x5752)+E(x5753,x5751)+E(f64(x5754,x5755,x5756),f64(x5757,x5758,x5759))+P12(x57510,x57511)+P12(f55(x5753,x5751,x5752,x57512,x57513,x57510,x57514,x57515,x57516,x57517,x5754,x5755,x5756,x5757,x5758,x5759,x57511,x57518),x57511)+~E(x57511,x57518)+~E(x57517,x57519)+~E(x57516,x57520)+~E(x57515,x57521)+~E(x57514,x57522)+~E(x57510,x57523)+~E(x57513,x57524)+~E(x57512,x57525)+~E(x5752,x57526)+~E(x5751,x57527)+~E(x5753,x57528)+~E(x5759,x57529)+~E(x5758,x57530)+~E(x5757,x57531)+~E(x5756,x57532)+~E(x5755,x57533)+~E(x5754,x57534)+~P1(x57528)+~P1(x57527)+~P1(x57526)+~P1(x57525)+~P1(x57524)+~P1(x57523)+~P1(x57522)+~P1(x57521)+~P1(x57520)+~P1(x57519)+~P1(x57534)+~P1(x57533)+~P1(x57532)+~P1(x57531)+~P1(x57530)+~P1(x57529)+~P2(x57518)+~P12(x57513,x57511)+~P12(x57512,x57511)
% 27.15/27.22 [576]E(x5761,x5762)+E(x5763,x5762)+E(x5763,x5761)+E(f64(x5764,x5765,x5766),f64(x5767,x5768,x5769))+P12(x57610,x57611)+P4(f56(x5763,x5761,x5762,x57612,x57613,x57610,x57614,x57615,x57616,x57617,x5764,x5765,x5766,x5767,x5768,x5769,x57611,x57618),x57610,x57611)+~E(x57611,x57618)+~E(x57617,x57619)+~E(x57616,x57620)+~E(x57615,x57621)+~E(x57614,x57622)+~E(x57610,x57623)+~E(x57613,x57624)+~E(x57612,x57625)+~E(x5762,x57626)+~E(x5761,x57627)+~E(x5763,x57628)+~E(x5769,x57629)+~E(x5768,x57630)+~E(x5767,x57631)+~E(x5766,x57632)+~E(x5765,x57633)+~E(x5764,x57634)+~P1(x57628)+~P1(x57627)+~P1(x57626)+~P1(x57625)+~P1(x57624)+~P1(x57623)+~P1(x57622)+~P1(x57621)+~P1(x57620)+~P1(x57619)+~P1(x57634)+~P1(x57633)+~P1(x57632)+~P1(x57631)+~P1(x57630)+~P1(x57629)+~P2(x57618)+~P12(x57613,x57611)+~P12(x57612,x57611)
% 27.15/27.22 [577]E(x5771,x5772)+E(x5773,x5772)+E(x5773,x5771)+E(f74(x5774,x5775),f74(x5776,x5777))+P12(x5778,x5779)+~E(x5779,x57710)+~E(x57711,x57712)+~E(x57713,x57714)+~E(x57715,x57716)+~E(x57717,x57718)+~E(x57719,x57720)+~E(x57721,x57722)+~E(x5778,x57723)+~E(x57724,x57725)+~E(x5772,x57726)+~E(x5771,x57727)+~E(x5773,x57728)+~E(x57729,x57730)+~E(x5777,x57731)+~E(x5776,x57732)+~E(x5775,x57733)+~E(x5774,x57734)+~P1(x57728)+~P1(x57727)+~P1(x57726)+~P1(x57730)+~P1(x57725)+~P1(x57723)+~P1(x57734)+~P1(x57733)+~P1(x57732)+~P1(x57731)+~P1(x57722)+~P1(x57720)+~P1(x57718)+~P1(x57716)+~P1(x57714)+~P1(x57712)+~P2(x57710)+~P12(x57724,x5779)+~P12(x57729,x5779)+~P3(x57729,f55(x5773,x5771,x5772,x57729,x57724,x5778,x5774,x5775,x5776,x5777,x57721,x57719,x57717,x57715,x57713,x57711,x5779,x57710),x57724)
% 27.15/27.22 [578]E(x5781,x5782)+E(x5783,x5782)+E(x5783,x5781)+E(f64(x5784,x5785,x5786),f64(x5787,x5788,x5789))+P12(x57810,x57811)+~E(x57811,x57812)+~E(x57813,x57814)+~E(x57815,x57816)+~E(x57817,x57818)+~E(x57819,x57820)+~E(x57810,x57821)+~E(x57822,x57823)+~E(x5782,x57824)+~E(x5781,x57825)+~E(x5783,x57826)+~E(x57827,x57828)+~E(x5789,x57829)+~E(x5788,x57830)+~E(x5787,x57831)+~E(x5786,x57832)+~E(x5785,x57833)+~E(x5784,x57834)+~P1(x57826)+~P1(x57825)+~P1(x57824)+~P1(x57828)+~P1(x57823)+~P1(x57821)+~P1(x57820)+~P1(x57818)+~P1(x57816)+~P1(x57814)+~P1(x57834)+~P1(x57833)+~P1(x57832)+~P1(x57831)+~P1(x57830)+~P1(x57829)+~P2(x57812)+~P12(x57822,x57811)+~P12(x57827,x57811)+~P3(x57827,f55(x5783,x5781,x5782,x57827,x57822,x57810,x57819,x57817,x57815,x57813,x5784,x5785,x5786,x5787,x5788,x5789,x57811,x57812),x57822)
% 27.15/27.22 [579]E(x5791,x5792)+E(x5793,x5792)+E(x5793,x5791)+E(f74(x5794,x5795),f74(x5796,x5797))+E(f74(f54(x5793,x5792,x5791,x5798,x5799,x57910,x5794,x5795,x5796,x5797,x57911,x57912,x57913,x57914,x57915,x57916,x57917,x57918),f56(x5793,x5792,x5791,x5798,x5799,x57910,x5794,x5795,x5796,x5797,x57911,x57912,x57913,x57914,x57915,x57916,x57917,x57918)),f74(x5793,x5791))+P12(x57910,x57917)+~E(x57917,x57918)+~E(x57916,x57919)+~E(x57915,x57920)+~E(x57914,x57921)+~E(x57913,x57922)+~E(x57912,x57923)+~E(x57911,x57924)+~E(x57910,x57925)+~E(x5799,x57926)+~E(x5798,x57927)+~E(x5792,x57928)+~E(x5791,x57929)+~E(x5793,x57930)+~E(x5797,x57931)+~E(x5796,x57932)+~E(x5795,x57933)+~E(x5794,x57934)+~P1(x57930)+~P1(x57928)+~P1(x57929)+~P1(x57927)+~P1(x57926)+~P1(x57925)+~P1(x57934)+~P1(x57933)+~P1(x57932)+~P1(x57931)+~P1(x57924)+~P1(x57923)+~P1(x57922)+~P1(x57921)+~P1(x57920)+~P1(x57919)+~P2(x57918)+~P12(x5799,x57917)+~P12(x5798,x57917)
% 27.15/27.22 [580]E(x5801,x5802)+E(x5803,x5802)+E(x5803,x5801)+E(f74(x5804,x5805),f74(x5806,x5807))+E(f74(f54(x5803,x5801,x5802,x5808,x5809,x58010,x5804,x5805,x5806,x5807,x58011,x58012,x58013,x58014,x58015,x58016,x58017,x58018),f55(x5803,x5801,x5802,x5808,x5809,x58010,x5804,x5805,x5806,x5807,x58011,x58012,x58013,x58014,x58015,x58016,x58017,x58018)),f74(x5803,x5801))+P12(x58010,x58017)+~E(x58017,x58018)+~E(x58016,x58019)+~E(x58015,x58020)+~E(x58014,x58021)+~E(x58013,x58022)+~E(x58012,x58023)+~E(x58011,x58024)+~E(x58010,x58025)+~E(x5809,x58026)+~E(x5808,x58027)+~E(x5802,x58028)+~E(x5801,x58029)+~E(x5803,x58030)+~E(x5807,x58031)+~E(x5806,x58032)+~E(x5805,x58033)+~E(x5804,x58034)+~P1(x58030)+~P1(x58029)+~P1(x58028)+~P1(x58027)+~P1(x58026)+~P1(x58025)+~P1(x58034)+~P1(x58033)+~P1(x58032)+~P1(x58031)+~P1(x58024)+~P1(x58023)+~P1(x58022)+~P1(x58021)+~P1(x58020)+~P1(x58019)+~P2(x58018)+~P12(x5809,x58017)+~P12(x5808,x58017)
% 27.15/27.22 [581]E(x5811,x5812)+E(x5813,x5812)+E(x5813,x5811)+E(f74(x5814,x5815),f74(x5816,x5817))+E(f74(f55(x5812,x5813,x5811,x5818,x5819,x58110,x5814,x5815,x5816,x5817,x58111,x58112,x58113,x58114,x58115,x58116,x58117,x58118),f56(x5812,x5813,x5811,x5818,x5819,x58110,x5814,x5815,x5816,x5817,x58111,x58112,x58113,x58114,x58115,x58116,x58117,x58118)),f74(x5813,x5811))+P12(x58110,x58117)+~E(x58117,x58118)+~E(x58116,x58119)+~E(x58115,x58120)+~E(x58114,x58121)+~E(x58113,x58122)+~E(x58112,x58123)+~E(x58111,x58124)+~E(x58110,x58125)+~E(x5819,x58126)+~E(x5818,x58127)+~E(x5812,x58128)+~E(x5811,x58129)+~E(x5813,x58130)+~E(x5817,x58131)+~E(x5816,x58132)+~E(x5815,x58133)+~E(x5814,x58134)+~P1(x58128)+~P1(x58130)+~P1(x58129)+~P1(x58127)+~P1(x58126)+~P1(x58125)+~P1(x58134)+~P1(x58133)+~P1(x58132)+~P1(x58131)+~P1(x58124)+~P1(x58123)+~P1(x58122)+~P1(x58121)+~P1(x58120)+~P1(x58119)+~P2(x58118)+~P12(x5819,x58117)+~P12(x5818,x58117)
% 27.15/27.22 [582]E(x5821,x5822)+E(x5823,x5822)+E(x5823,x5821)+E(f64(x5824,x5825,x5826),f64(x5827,x5828,x5829))+E(f74(f54(x5823,x5822,x5821,x58210,x58211,x58212,x58213,x58214,x58215,x58216,x5824,x5825,x5826,x5827,x5828,x5829,x58217,x58218),f56(x5823,x5822,x5821,x58210,x58211,x58212,x58213,x58214,x58215,x58216,x5824,x5825,x5826,x5827,x5828,x5829,x58217,x58218)),f74(x5823,x5821))+P12(x58212,x58217)+~E(x58217,x58218)+~E(x58216,x58219)+~E(x58215,x58220)+~E(x58214,x58221)+~E(x58213,x58222)+~E(x58212,x58223)+~E(x58211,x58224)+~E(x58210,x58225)+~E(x5822,x58226)+~E(x5821,x58227)+~E(x5823,x58228)+~E(x5829,x58229)+~E(x5828,x58230)+~E(x5827,x58231)+~E(x5826,x58232)+~E(x5825,x58233)+~E(x5824,x58234)+~P1(x58228)+~P1(x58226)+~P1(x58227)+~P1(x58225)+~P1(x58224)+~P1(x58223)+~P1(x58222)+~P1(x58221)+~P1(x58220)+~P1(x58219)+~P1(x58234)+~P1(x58233)+~P1(x58232)+~P1(x58231)+~P1(x58230)+~P1(x58229)+~P2(x58218)+~P12(x58211,x58217)+~P12(x58210,x58217)
% 27.15/27.22 [583]E(x5831,x5832)+E(x5833,x5832)+E(x5833,x5831)+E(f64(x5834,x5835,x5836),f64(x5837,x5838,x5839))+E(f74(f54(x5833,x5831,x5832,x58310,x58311,x58312,x58313,x58314,x58315,x58316,x5834,x5835,x5836,x5837,x5838,x5839,x58317,x58318),f55(x5833,x5831,x5832,x58310,x58311,x58312,x58313,x58314,x58315,x58316,x5834,x5835,x5836,x5837,x5838,x5839,x58317,x58318)),f74(x5833,x5831))+P12(x58312,x58317)+~E(x58317,x58318)+~E(x58316,x58319)+~E(x58315,x58320)+~E(x58314,x58321)+~E(x58313,x58322)+~E(x58312,x58323)+~E(x58311,x58324)+~E(x58310,x58325)+~E(x5832,x58326)+~E(x5831,x58327)+~E(x5833,x58328)+~E(x5839,x58329)+~E(x5838,x58330)+~E(x5837,x58331)+~E(x5836,x58332)+~E(x5835,x58333)+~E(x5834,x58334)+~P1(x58328)+~P1(x58327)+~P1(x58326)+~P1(x58325)+~P1(x58324)+~P1(x58323)+~P1(x58322)+~P1(x58321)+~P1(x58320)+~P1(x58319)+~P1(x58334)+~P1(x58333)+~P1(x58332)+~P1(x58331)+~P1(x58330)+~P1(x58329)+~P2(x58318)+~P12(x58311,x58317)+~P12(x58310,x58317)
% 27.15/27.22 [584]E(x5841,x5842)+E(x5843,x5842)+E(x5843,x5841)+E(f64(x5844,x5845,x5846),f64(x5847,x5848,x5849))+E(f74(f55(x5842,x5843,x5841,x58410,x58411,x58412,x58413,x58414,x58415,x58416,x5844,x5845,x5846,x5847,x5848,x5849,x58417,x58418),f56(x5842,x5843,x5841,x58410,x58411,x58412,x58413,x58414,x58415,x58416,x5844,x5845,x5846,x5847,x5848,x5849,x58417,x58418)),f74(x5843,x5841))+P12(x58412,x58417)+~E(x58417,x58418)+~E(x58416,x58419)+~E(x58415,x58420)+~E(x58414,x58421)+~E(x58413,x58422)+~E(x58412,x58423)+~E(x58411,x58424)+~E(x58410,x58425)+~E(x5842,x58426)+~E(x5841,x58427)+~E(x5843,x58428)+~E(x5849,x58429)+~E(x5848,x58430)+~E(x5847,x58431)+~E(x5846,x58432)+~E(x5845,x58433)+~E(x5844,x58434)+~P1(x58426)+~P1(x58428)+~P1(x58427)+~P1(x58425)+~P1(x58424)+~P1(x58423)+~P1(x58422)+~P1(x58421)+~P1(x58420)+~P1(x58419)+~P1(x58434)+~P1(x58433)+~P1(x58432)+~P1(x58431)+~P1(x58430)+~P1(x58429)+~P2(x58418)+~P12(x58411,x58417)+~P12(x58410,x58417)
% 27.15/27.22 [585]E(x5851,x5852)+E(x5853,x5852)+E(x5853,x5851)+E(f74(x5854,x5855),f74(x5856,x5857))+E(f64(f54(x5853,x5851,x5852,x5858,x5859,x58510,x5854,x5855,x5856,x5857,x58511,x58512,x58513,x58514,x58515,x58516,x58517,x58518),f56(x5853,x5851,x5852,x5858,x5859,x58510,x5854,x5855,x5856,x5857,x58511,x58512,x58513,x58514,x58515,x58516,x58517,x58518),f55(x5853,x5851,x5852,x5858,x5859,x58510,x5854,x5855,x5856,x5857,x58511,x58512,x58513,x58514,x58515,x58516,x58517,x58518)),f64(x5853,x5852,x5851))+P12(x58510,x58517)+~E(x58517,x58518)+~E(x58516,x58519)+~E(x58515,x58520)+~E(x58514,x58521)+~E(x58513,x58522)+~E(x58512,x58523)+~E(x58511,x58524)+~E(x58510,x58525)+~E(x5859,x58526)+~E(x5858,x58527)+~E(x5852,x58528)+~E(x5851,x58529)+~E(x5853,x58530)+~E(x5857,x58531)+~E(x5856,x58532)+~E(x5855,x58533)+~E(x5854,x58534)+~P1(x58530)+~P1(x58529)+~P1(x58528)+~P1(x58527)+~P1(x58526)+~P1(x58525)+~P1(x58534)+~P1(x58533)+~P1(x58532)+~P1(x58531)+~P1(x58524)+~P1(x58523)+~P1(x58522)+~P1(x58521)+~P1(x58520)+~P1(x58519)+~P2(x58518)+~P12(x5859,x58517)+~P12(x5858,x58517)
% 27.15/27.22 [586]E(x5861,x5862)+E(x5863,x5862)+E(x5863,x5861)+E(f74(x5864,x5865),f74(x5866,x5867))+E(f64(f55(x5863,x5861,x5862,x5868,x5869,x58610,x5864,x5865,x5866,x5867,x58611,x58612,x58613,x58614,x58615,x58616,x58617,x58618),f54(x5863,x5861,x5862,x5868,x5869,x58610,x5864,x5865,x5866,x5867,x58611,x58612,x58613,x58614,x58615,x58616,x58617,x58618),f56(x5863,x5861,x5862,x5868,x5869,x58610,x5864,x5865,x5866,x5867,x58611,x58612,x58613,x58614,x58615,x58616,x58617,x58618)),f64(x5861,x5863,x5862))+P12(x58610,x58617)+~E(x58617,x58618)+~E(x58616,x58619)+~E(x58615,x58620)+~E(x58614,x58621)+~E(x58613,x58622)+~E(x58612,x58623)+~E(x58611,x58624)+~E(x58610,x58625)+~E(x5869,x58626)+~E(x5868,x58627)+~E(x5862,x58628)+~E(x5861,x58629)+~E(x5863,x58630)+~E(x5867,x58631)+~E(x5866,x58632)+~E(x5865,x58633)+~E(x5864,x58634)+~P1(x58630)+~P1(x58629)+~P1(x58628)+~P1(x58627)+~P1(x58626)+~P1(x58625)+~P1(x58634)+~P1(x58633)+~P1(x58632)+~P1(x58631)+~P1(x58624)+~P1(x58623)+~P1(x58622)+~P1(x58621)+~P1(x58620)+~P1(x58619)+~P2(x58618)+~P12(x5869,x58617)+~P12(x5868,x58617)
% 27.15/27.22 [587]E(x5871,x5872)+E(x5873,x5872)+E(x5873,x5871)+E(f74(x5874,x5875),f74(x5876,x5877))+E(f64(f56(x5873,x5871,x5872,x5878,x5879,x58710,x5874,x5875,x5876,x5877,x58711,x58712,x58713,x58714,x58715,x58716,x58717,x58718),f55(x5873,x5871,x5872,x5878,x5879,x58710,x5874,x5875,x5876,x5877,x58711,x58712,x58713,x58714,x58715,x58716,x58717,x58718),f54(x5873,x5871,x5872,x5878,x5879,x58710,x5874,x5875,x5876,x5877,x58711,x58712,x58713,x58714,x58715,x58716,x58717,x58718)),f64(x5872,x5871,x5873))+P12(x58710,x58717)+~E(x58717,x58718)+~E(x58716,x58719)+~E(x58715,x58720)+~E(x58714,x58721)+~E(x58713,x58722)+~E(x58712,x58723)+~E(x58711,x58724)+~E(x58710,x58725)+~E(x5879,x58726)+~E(x5878,x58727)+~E(x5872,x58728)+~E(x5871,x58729)+~E(x5873,x58730)+~E(x5877,x58731)+~E(x5876,x58732)+~E(x5875,x58733)+~E(x5874,x58734)+~P1(x58730)+~P1(x58729)+~P1(x58728)+~P1(x58727)+~P1(x58726)+~P1(x58725)+~P1(x58734)+~P1(x58733)+~P1(x58732)+~P1(x58731)+~P1(x58724)+~P1(x58723)+~P1(x58722)+~P1(x58721)+~P1(x58720)+~P1(x58719)+~P2(x58718)+~P12(x5879,x58717)+~P12(x5878,x58717)
% 27.15/27.22 [588]E(x5881,x5882)+E(x5883,x5882)+E(x5883,x5881)+E(f64(x5884,x5885,x5886),f64(x5887,x5888,x5889))+E(f64(f54(x5883,x5881,x5882,x58810,x58811,x58812,x58813,x58814,x58815,x58816,x5884,x5885,x5886,x5887,x5888,x5889,x58817,x58818),f56(x5883,x5881,x5882,x58810,x58811,x58812,x58813,x58814,x58815,x58816,x5884,x5885,x5886,x5887,x5888,x5889,x58817,x58818),f55(x5883,x5881,x5882,x58810,x58811,x58812,x58813,x58814,x58815,x58816,x5884,x5885,x5886,x5887,x5888,x5889,x58817,x58818)),f64(x5883,x5882,x5881))+P12(x58812,x58817)+~E(x58817,x58818)+~E(x58816,x58819)+~E(x58815,x58820)+~E(x58814,x58821)+~E(x58813,x58822)+~E(x58812,x58823)+~E(x58811,x58824)+~E(x58810,x58825)+~E(x5882,x58826)+~E(x5881,x58827)+~E(x5883,x58828)+~E(x5889,x58829)+~E(x5888,x58830)+~E(x5887,x58831)+~E(x5886,x58832)+~E(x5885,x58833)+~E(x5884,x58834)+~P1(x58828)+~P1(x58827)+~P1(x58826)+~P1(x58825)+~P1(x58824)+~P1(x58823)+~P1(x58822)+~P1(x58821)+~P1(x58820)+~P1(x58819)+~P1(x58834)+~P1(x58833)+~P1(x58832)+~P1(x58831)+~P1(x58830)+~P1(x58829)+~P2(x58818)+~P12(x58811,x58817)+~P12(x58810,x58817)
% 27.15/27.22 [589]E(x5891,x5892)+E(x5893,x5892)+E(x5893,x5891)+E(f64(x5894,x5895,x5896),f64(x5897,x5898,x5899))+E(f64(f55(x5893,x5891,x5892,x58910,x58911,x58912,x58913,x58914,x58915,x58916,x5894,x5895,x5896,x5897,x5898,x5899,x58917,x58918),f54(x5893,x5891,x5892,x58910,x58911,x58912,x58913,x58914,x58915,x58916,x5894,x5895,x5896,x5897,x5898,x5899,x58917,x58918),f56(x5893,x5891,x5892,x58910,x58911,x58912,x58913,x58914,x58915,x58916,x5894,x5895,x5896,x5897,x5898,x5899,x58917,x58918)),f64(x5891,x5893,x5892))+P12(x58912,x58917)+~E(x58917,x58918)+~E(x58916,x58919)+~E(x58915,x58920)+~E(x58914,x58921)+~E(x58913,x58922)+~E(x58912,x58923)+~E(x58911,x58924)+~E(x58910,x58925)+~E(x5892,x58926)+~E(x5891,x58927)+~E(x5893,x58928)+~E(x5899,x58929)+~E(x5898,x58930)+~E(x5897,x58931)+~E(x5896,x58932)+~E(x5895,x58933)+~E(x5894,x58934)+~P1(x58928)+~P1(x58927)+~P1(x58926)+~P1(x58925)+~P1(x58924)+~P1(x58923)+~P1(x58922)+~P1(x58921)+~P1(x58920)+~P1(x58919)+~P1(x58934)+~P1(x58933)+~P1(x58932)+~P1(x58931)+~P1(x58930)+~P1(x58929)+~P2(x58918)+~P12(x58911,x58917)+~P12(x58910,x58917)
% 27.15/27.22 [590]E(x5901,x5902)+E(x5903,x5902)+E(x5903,x5901)+E(f64(x5904,x5905,x5906),f64(x5907,x5908,x5909))+E(f64(f56(x5903,x5901,x5902,x59010,x59011,x59012,x59013,x59014,x59015,x59016,x5904,x5905,x5906,x5907,x5908,x5909,x59017,x59018),f55(x5903,x5901,x5902,x59010,x59011,x59012,x59013,x59014,x59015,x59016,x5904,x5905,x5906,x5907,x5908,x5909,x59017,x59018),f54(x5903,x5901,x5902,x59010,x59011,x59012,x59013,x59014,x59015,x59016,x5904,x5905,x5906,x5907,x5908,x5909,x59017,x59018)),f64(x5902,x5901,x5903))+P12(x59012,x59017)+~E(x59017,x59018)+~E(x59016,x59019)+~E(x59015,x59020)+~E(x59014,x59021)+~E(x59013,x59022)+~E(x59012,x59023)+~E(x59011,x59024)+~E(x59010,x59025)+~E(x5902,x59026)+~E(x5901,x59027)+~E(x5903,x59028)+~E(x5909,x59029)+~E(x5908,x59030)+~E(x5907,x59031)+~E(x5906,x59032)+~E(x5905,x59033)+~E(x5904,x59034)+~P1(x59028)+~P1(x59027)+~P1(x59026)+~P1(x59025)+~P1(x59024)+~P1(x59023)+~P1(x59022)+~P1(x59021)+~P1(x59020)+~P1(x59019)+~P1(x59034)+~P1(x59033)+~P1(x59032)+~P1(x59031)+~P1(x59030)+~P1(x59029)+~P2(x59018)+~P12(x59011,x59017)+~P12(x59010,x59017)
% 27.15/27.22 %EqnAxiom
% 27.15/27.22 [1]E(x11,x11)
% 27.15/27.22 [2]E(x22,x21)+~E(x21,x22)
% 27.15/27.22 [3]E(x31,x33)+~E(x31,x32)+~E(x32,x33)
% 27.15/27.22 [4]~E(x41,x42)+E(f74(x41,x43),f74(x42,x43))
% 27.15/27.22 [5]~E(x51,x52)+E(f74(x53,x51),f74(x53,x52))
% 27.15/27.22 [6]~E(x61,x62)+E(f64(x61,x63,x64),f64(x62,x63,x64))
% 27.15/27.22 [7]~E(x71,x72)+E(f64(x73,x71,x74),f64(x73,x72,x74))
% 27.15/27.22 [8]~E(x81,x82)+E(f64(x83,x84,x81),f64(x83,x84,x82))
% 27.15/27.22 [9]~E(x91,x92)+E(f55(x91,x93,x94,x95,x96,x97,x98,x99,x910,x911,x912,x913,x914,x915,x916,x917,x918,x919),f55(x92,x93,x94,x95,x96,x97,x98,x99,x910,x911,x912,x913,x914,x915,x916,x917,x918,x919))
% 27.15/27.22 [10]~E(x101,x102)+E(f55(x103,x101,x104,x105,x106,x107,x108,x109,x1010,x1011,x1012,x1013,x1014,x1015,x1016,x1017,x1018,x1019),f55(x103,x102,x104,x105,x106,x107,x108,x109,x1010,x1011,x1012,x1013,x1014,x1015,x1016,x1017,x1018,x1019))
% 27.15/27.22 [11]~E(x111,x112)+E(f55(x113,x114,x111,x115,x116,x117,x118,x119,x1110,x1111,x1112,x1113,x1114,x1115,x1116,x1117,x1118,x1119),f55(x113,x114,x112,x115,x116,x117,x118,x119,x1110,x1111,x1112,x1113,x1114,x1115,x1116,x1117,x1118,x1119))
% 27.15/27.22 [12]~E(x121,x122)+E(f55(x123,x124,x125,x121,x126,x127,x128,x129,x1210,x1211,x1212,x1213,x1214,x1215,x1216,x1217,x1218,x1219),f55(x123,x124,x125,x122,x126,x127,x128,x129,x1210,x1211,x1212,x1213,x1214,x1215,x1216,x1217,x1218,x1219))
% 27.15/27.22 [13]~E(x131,x132)+E(f55(x133,x134,x135,x136,x131,x137,x138,x139,x1310,x1311,x1312,x1313,x1314,x1315,x1316,x1317,x1318,x1319),f55(x133,x134,x135,x136,x132,x137,x138,x139,x1310,x1311,x1312,x1313,x1314,x1315,x1316,x1317,x1318,x1319))
% 27.15/27.22 [14]~E(x141,x142)+E(f55(x143,x144,x145,x146,x147,x141,x148,x149,x1410,x1411,x1412,x1413,x1414,x1415,x1416,x1417,x1418,x1419),f55(x143,x144,x145,x146,x147,x142,x148,x149,x1410,x1411,x1412,x1413,x1414,x1415,x1416,x1417,x1418,x1419))
% 27.15/27.22 [15]~E(x151,x152)+E(f55(x153,x154,x155,x156,x157,x158,x151,x159,x1510,x1511,x1512,x1513,x1514,x1515,x1516,x1517,x1518,x1519),f55(x153,x154,x155,x156,x157,x158,x152,x159,x1510,x1511,x1512,x1513,x1514,x1515,x1516,x1517,x1518,x1519))
% 27.15/27.22 [16]~E(x161,x162)+E(f55(x163,x164,x165,x166,x167,x168,x169,x161,x1610,x1611,x1612,x1613,x1614,x1615,x1616,x1617,x1618,x1619),f55(x163,x164,x165,x166,x167,x168,x169,x162,x1610,x1611,x1612,x1613,x1614,x1615,x1616,x1617,x1618,x1619))
% 27.15/27.22 [17]~E(x171,x172)+E(f55(x173,x174,x175,x176,x177,x178,x179,x1710,x171,x1711,x1712,x1713,x1714,x1715,x1716,x1717,x1718,x1719),f55(x173,x174,x175,x176,x177,x178,x179,x1710,x172,x1711,x1712,x1713,x1714,x1715,x1716,x1717,x1718,x1719))
% 27.15/27.22 [18]~E(x181,x182)+E(f55(x183,x184,x185,x186,x187,x188,x189,x1810,x1811,x181,x1812,x1813,x1814,x1815,x1816,x1817,x1818,x1819),f55(x183,x184,x185,x186,x187,x188,x189,x1810,x1811,x182,x1812,x1813,x1814,x1815,x1816,x1817,x1818,x1819))
% 27.15/27.22 [19]~E(x191,x192)+E(f55(x193,x194,x195,x196,x197,x198,x199,x1910,x1911,x1912,x191,x1913,x1914,x1915,x1916,x1917,x1918,x1919),f55(x193,x194,x195,x196,x197,x198,x199,x1910,x1911,x1912,x192,x1913,x1914,x1915,x1916,x1917,x1918,x1919))
% 27.15/27.22 [20]~E(x201,x202)+E(f55(x203,x204,x205,x206,x207,x208,x209,x2010,x2011,x2012,x2013,x201,x2014,x2015,x2016,x2017,x2018,x2019),f55(x203,x204,x205,x206,x207,x208,x209,x2010,x2011,x2012,x2013,x202,x2014,x2015,x2016,x2017,x2018,x2019))
% 27.15/27.22 [21]~E(x211,x212)+E(f55(x213,x214,x215,x216,x217,x218,x219,x2110,x2111,x2112,x2113,x2114,x211,x2115,x2116,x2117,x2118,x2119),f55(x213,x214,x215,x216,x217,x218,x219,x2110,x2111,x2112,x2113,x2114,x212,x2115,x2116,x2117,x2118,x2119))
% 27.15/27.22 [22]~E(x221,x222)+E(f55(x223,x224,x225,x226,x227,x228,x229,x2210,x2211,x2212,x2213,x2214,x2215,x221,x2216,x2217,x2218,x2219),f55(x223,x224,x225,x226,x227,x228,x229,x2210,x2211,x2212,x2213,x2214,x2215,x222,x2216,x2217,x2218,x2219))
% 27.15/27.22 [23]~E(x231,x232)+E(f55(x233,x234,x235,x236,x237,x238,x239,x2310,x2311,x2312,x2313,x2314,x2315,x2316,x231,x2317,x2318,x2319),f55(x233,x234,x235,x236,x237,x238,x239,x2310,x2311,x2312,x2313,x2314,x2315,x2316,x232,x2317,x2318,x2319))
% 27.15/27.22 [24]~E(x241,x242)+E(f55(x243,x244,x245,x246,x247,x248,x249,x2410,x2411,x2412,x2413,x2414,x2415,x2416,x2417,x241,x2418,x2419),f55(x243,x244,x245,x246,x247,x248,x249,x2410,x2411,x2412,x2413,x2414,x2415,x2416,x2417,x242,x2418,x2419))
% 27.15/27.22 [25]~E(x251,x252)+E(f55(x253,x254,x255,x256,x257,x258,x259,x2510,x2511,x2512,x2513,x2514,x2515,x2516,x2517,x2518,x251,x2519),f55(x253,x254,x255,x256,x257,x258,x259,x2510,x2511,x2512,x2513,x2514,x2515,x2516,x2517,x2518,x252,x2519))
% 27.15/27.22 [26]~E(x261,x262)+E(f55(x263,x264,x265,x266,x267,x268,x269,x2610,x2611,x2612,x2613,x2614,x2615,x2616,x2617,x2618,x2619,x261),f55(x263,x264,x265,x266,x267,x268,x269,x2610,x2611,x2612,x2613,x2614,x2615,x2616,x2617,x2618,x2619,x262))
% 27.15/27.22 [27]~E(x271,x272)+E(f54(x271,x273,x274,x275,x276,x277,x278,x279,x2710,x2711,x2712,x2713,x2714,x2715,x2716,x2717,x2718,x2719),f54(x272,x273,x274,x275,x276,x277,x278,x279,x2710,x2711,x2712,x2713,x2714,x2715,x2716,x2717,x2718,x2719))
% 27.15/27.22 [28]~E(x281,x282)+E(f54(x283,x281,x284,x285,x286,x287,x288,x289,x2810,x2811,x2812,x2813,x2814,x2815,x2816,x2817,x2818,x2819),f54(x283,x282,x284,x285,x286,x287,x288,x289,x2810,x2811,x2812,x2813,x2814,x2815,x2816,x2817,x2818,x2819))
% 27.15/27.22 [29]~E(x291,x292)+E(f54(x293,x294,x291,x295,x296,x297,x298,x299,x2910,x2911,x2912,x2913,x2914,x2915,x2916,x2917,x2918,x2919),f54(x293,x294,x292,x295,x296,x297,x298,x299,x2910,x2911,x2912,x2913,x2914,x2915,x2916,x2917,x2918,x2919))
% 27.15/27.22 [30]~E(x301,x302)+E(f54(x303,x304,x305,x301,x306,x307,x308,x309,x3010,x3011,x3012,x3013,x3014,x3015,x3016,x3017,x3018,x3019),f54(x303,x304,x305,x302,x306,x307,x308,x309,x3010,x3011,x3012,x3013,x3014,x3015,x3016,x3017,x3018,x3019))
% 27.15/27.22 [31]~E(x311,x312)+E(f54(x313,x314,x315,x316,x311,x317,x318,x319,x3110,x3111,x3112,x3113,x3114,x3115,x3116,x3117,x3118,x3119),f54(x313,x314,x315,x316,x312,x317,x318,x319,x3110,x3111,x3112,x3113,x3114,x3115,x3116,x3117,x3118,x3119))
% 27.15/27.22 [32]~E(x321,x322)+E(f54(x323,x324,x325,x326,x327,x321,x328,x329,x3210,x3211,x3212,x3213,x3214,x3215,x3216,x3217,x3218,x3219),f54(x323,x324,x325,x326,x327,x322,x328,x329,x3210,x3211,x3212,x3213,x3214,x3215,x3216,x3217,x3218,x3219))
% 27.15/27.22 [33]~E(x331,x332)+E(f54(x333,x334,x335,x336,x337,x338,x331,x339,x3310,x3311,x3312,x3313,x3314,x3315,x3316,x3317,x3318,x3319),f54(x333,x334,x335,x336,x337,x338,x332,x339,x3310,x3311,x3312,x3313,x3314,x3315,x3316,x3317,x3318,x3319))
% 27.15/27.22 [34]~E(x341,x342)+E(f54(x343,x344,x345,x346,x347,x348,x349,x341,x3410,x3411,x3412,x3413,x3414,x3415,x3416,x3417,x3418,x3419),f54(x343,x344,x345,x346,x347,x348,x349,x342,x3410,x3411,x3412,x3413,x3414,x3415,x3416,x3417,x3418,x3419))
% 27.15/27.22 [35]~E(x351,x352)+E(f54(x353,x354,x355,x356,x357,x358,x359,x3510,x351,x3511,x3512,x3513,x3514,x3515,x3516,x3517,x3518,x3519),f54(x353,x354,x355,x356,x357,x358,x359,x3510,x352,x3511,x3512,x3513,x3514,x3515,x3516,x3517,x3518,x3519))
% 27.15/27.22 [36]~E(x361,x362)+E(f54(x363,x364,x365,x366,x367,x368,x369,x3610,x3611,x361,x3612,x3613,x3614,x3615,x3616,x3617,x3618,x3619),f54(x363,x364,x365,x366,x367,x368,x369,x3610,x3611,x362,x3612,x3613,x3614,x3615,x3616,x3617,x3618,x3619))
% 27.15/27.22 [37]~E(x371,x372)+E(f54(x373,x374,x375,x376,x377,x378,x379,x3710,x3711,x3712,x371,x3713,x3714,x3715,x3716,x3717,x3718,x3719),f54(x373,x374,x375,x376,x377,x378,x379,x3710,x3711,x3712,x372,x3713,x3714,x3715,x3716,x3717,x3718,x3719))
% 27.15/27.22 [38]~E(x381,x382)+E(f54(x383,x384,x385,x386,x387,x388,x389,x3810,x3811,x3812,x3813,x381,x3814,x3815,x3816,x3817,x3818,x3819),f54(x383,x384,x385,x386,x387,x388,x389,x3810,x3811,x3812,x3813,x382,x3814,x3815,x3816,x3817,x3818,x3819))
% 27.15/27.22 [39]~E(x391,x392)+E(f54(x393,x394,x395,x396,x397,x398,x399,x3910,x3911,x3912,x3913,x3914,x391,x3915,x3916,x3917,x3918,x3919),f54(x393,x394,x395,x396,x397,x398,x399,x3910,x3911,x3912,x3913,x3914,x392,x3915,x3916,x3917,x3918,x3919))
% 27.15/27.22 [40]~E(x401,x402)+E(f54(x403,x404,x405,x406,x407,x408,x409,x4010,x4011,x4012,x4013,x4014,x4015,x401,x4016,x4017,x4018,x4019),f54(x403,x404,x405,x406,x407,x408,x409,x4010,x4011,x4012,x4013,x4014,x4015,x402,x4016,x4017,x4018,x4019))
% 27.15/27.22 [41]~E(x411,x412)+E(f54(x413,x414,x415,x416,x417,x418,x419,x4110,x4111,x4112,x4113,x4114,x4115,x4116,x411,x4117,x4118,x4119),f54(x413,x414,x415,x416,x417,x418,x419,x4110,x4111,x4112,x4113,x4114,x4115,x4116,x412,x4117,x4118,x4119))
% 27.15/27.22 [42]~E(x421,x422)+E(f54(x423,x424,x425,x426,x427,x428,x429,x4210,x4211,x4212,x4213,x4214,x4215,x4216,x4217,x421,x4218,x4219),f54(x423,x424,x425,x426,x427,x428,x429,x4210,x4211,x4212,x4213,x4214,x4215,x4216,x4217,x422,x4218,x4219))
% 27.15/27.22 [43]~E(x431,x432)+E(f54(x433,x434,x435,x436,x437,x438,x439,x4310,x4311,x4312,x4313,x4314,x4315,x4316,x4317,x4318,x431,x4319),f54(x433,x434,x435,x436,x437,x438,x439,x4310,x4311,x4312,x4313,x4314,x4315,x4316,x4317,x4318,x432,x4319))
% 27.15/27.22 [44]~E(x441,x442)+E(f54(x443,x444,x445,x446,x447,x448,x449,x4410,x4411,x4412,x4413,x4414,x4415,x4416,x4417,x4418,x4419,x441),f54(x443,x444,x445,x446,x447,x448,x449,x4410,x4411,x4412,x4413,x4414,x4415,x4416,x4417,x4418,x4419,x442))
% 27.15/27.22 [45]~E(x451,x452)+E(f75(x451,x453),f75(x452,x453))
% 27.15/27.22 [46]~E(x461,x462)+E(f75(x463,x461),f75(x463,x462))
% 27.15/27.22 [47]~E(x471,x472)+E(f56(x471,x473,x474,x475,x476,x477,x478,x479,x4710,x4711,x4712,x4713,x4714,x4715,x4716,x4717,x4718,x4719),f56(x472,x473,x474,x475,x476,x477,x478,x479,x4710,x4711,x4712,x4713,x4714,x4715,x4716,x4717,x4718,x4719))
% 27.15/27.22 [48]~E(x481,x482)+E(f56(x483,x481,x484,x485,x486,x487,x488,x489,x4810,x4811,x4812,x4813,x4814,x4815,x4816,x4817,x4818,x4819),f56(x483,x482,x484,x485,x486,x487,x488,x489,x4810,x4811,x4812,x4813,x4814,x4815,x4816,x4817,x4818,x4819))
% 27.15/27.22 [49]~E(x491,x492)+E(f56(x493,x494,x491,x495,x496,x497,x498,x499,x4910,x4911,x4912,x4913,x4914,x4915,x4916,x4917,x4918,x4919),f56(x493,x494,x492,x495,x496,x497,x498,x499,x4910,x4911,x4912,x4913,x4914,x4915,x4916,x4917,x4918,x4919))
% 27.15/27.22 [50]~E(x501,x502)+E(f56(x503,x504,x505,x501,x506,x507,x508,x509,x5010,x5011,x5012,x5013,x5014,x5015,x5016,x5017,x5018,x5019),f56(x503,x504,x505,x502,x506,x507,x508,x509,x5010,x5011,x5012,x5013,x5014,x5015,x5016,x5017,x5018,x5019))
% 27.15/27.22 [51]~E(x511,x512)+E(f56(x513,x514,x515,x516,x511,x517,x518,x519,x5110,x5111,x5112,x5113,x5114,x5115,x5116,x5117,x5118,x5119),f56(x513,x514,x515,x516,x512,x517,x518,x519,x5110,x5111,x5112,x5113,x5114,x5115,x5116,x5117,x5118,x5119))
% 27.15/27.22 [52]~E(x521,x522)+E(f56(x523,x524,x525,x526,x527,x521,x528,x529,x5210,x5211,x5212,x5213,x5214,x5215,x5216,x5217,x5218,x5219),f56(x523,x524,x525,x526,x527,x522,x528,x529,x5210,x5211,x5212,x5213,x5214,x5215,x5216,x5217,x5218,x5219))
% 27.15/27.22 [53]~E(x531,x532)+E(f56(x533,x534,x535,x536,x537,x538,x531,x539,x5310,x5311,x5312,x5313,x5314,x5315,x5316,x5317,x5318,x5319),f56(x533,x534,x535,x536,x537,x538,x532,x539,x5310,x5311,x5312,x5313,x5314,x5315,x5316,x5317,x5318,x5319))
% 27.15/27.22 [54]~E(x541,x542)+E(f56(x543,x544,x545,x546,x547,x548,x549,x541,x5410,x5411,x5412,x5413,x5414,x5415,x5416,x5417,x5418,x5419),f56(x543,x544,x545,x546,x547,x548,x549,x542,x5410,x5411,x5412,x5413,x5414,x5415,x5416,x5417,x5418,x5419))
% 27.15/27.22 [55]~E(x551,x552)+E(f56(x553,x554,x555,x556,x557,x558,x559,x5510,x551,x5511,x5512,x5513,x5514,x5515,x5516,x5517,x5518,x5519),f56(x553,x554,x555,x556,x557,x558,x559,x5510,x552,x5511,x5512,x5513,x5514,x5515,x5516,x5517,x5518,x5519))
% 27.15/27.22 [56]~E(x561,x562)+E(f56(x563,x564,x565,x566,x567,x568,x569,x5610,x5611,x561,x5612,x5613,x5614,x5615,x5616,x5617,x5618,x5619),f56(x563,x564,x565,x566,x567,x568,x569,x5610,x5611,x562,x5612,x5613,x5614,x5615,x5616,x5617,x5618,x5619))
% 27.15/27.22 [57]~E(x571,x572)+E(f56(x573,x574,x575,x576,x577,x578,x579,x5710,x5711,x5712,x571,x5713,x5714,x5715,x5716,x5717,x5718,x5719),f56(x573,x574,x575,x576,x577,x578,x579,x5710,x5711,x5712,x572,x5713,x5714,x5715,x5716,x5717,x5718,x5719))
% 27.15/27.22 [58]~E(x581,x582)+E(f56(x583,x584,x585,x586,x587,x588,x589,x5810,x5811,x5812,x5813,x581,x5814,x5815,x5816,x5817,x5818,x5819),f56(x583,x584,x585,x586,x587,x588,x589,x5810,x5811,x5812,x5813,x582,x5814,x5815,x5816,x5817,x5818,x5819))
% 27.15/27.22 [59]~E(x591,x592)+E(f56(x593,x594,x595,x596,x597,x598,x599,x5910,x5911,x5912,x5913,x5914,x591,x5915,x5916,x5917,x5918,x5919),f56(x593,x594,x595,x596,x597,x598,x599,x5910,x5911,x5912,x5913,x5914,x592,x5915,x5916,x5917,x5918,x5919))
% 27.15/27.22 [60]~E(x601,x602)+E(f56(x603,x604,x605,x606,x607,x608,x609,x6010,x6011,x6012,x6013,x6014,x6015,x601,x6016,x6017,x6018,x6019),f56(x603,x604,x605,x606,x607,x608,x609,x6010,x6011,x6012,x6013,x6014,x6015,x602,x6016,x6017,x6018,x6019))
% 27.15/27.22 [61]~E(x611,x612)+E(f56(x613,x614,x615,x616,x617,x618,x619,x6110,x6111,x6112,x6113,x6114,x6115,x6116,x611,x6117,x6118,x6119),f56(x613,x614,x615,x616,x617,x618,x619,x6110,x6111,x6112,x6113,x6114,x6115,x6116,x612,x6117,x6118,x6119))
% 27.15/27.22 [62]~E(x621,x622)+E(f56(x623,x624,x625,x626,x627,x628,x629,x6210,x6211,x6212,x6213,x6214,x6215,x6216,x6217,x621,x6218,x6219),f56(x623,x624,x625,x626,x627,x628,x629,x6210,x6211,x6212,x6213,x6214,x6215,x6216,x6217,x622,x6218,x6219))
% 27.15/27.22 [63]~E(x631,x632)+E(f56(x633,x634,x635,x636,x637,x638,x639,x6310,x6311,x6312,x6313,x6314,x6315,x6316,x6317,x6318,x631,x6319),f56(x633,x634,x635,x636,x637,x638,x639,x6310,x6311,x6312,x6313,x6314,x6315,x6316,x6317,x6318,x632,x6319))
% 27.15/27.22 [64]~E(x641,x642)+E(f56(x643,x644,x645,x646,x647,x648,x649,x6410,x6411,x6412,x6413,x6414,x6415,x6416,x6417,x6418,x6419,x641),f56(x643,x644,x645,x646,x647,x648,x649,x6410,x6411,x6412,x6413,x6414,x6415,x6416,x6417,x6418,x6419,x642))
% 27.15/27.22 [65]~E(x651,x652)+E(f43(x651,x653,x654,x655,x656),f43(x652,x653,x654,x655,x656))
% 27.15/27.22 [66]~E(x661,x662)+E(f43(x663,x661,x664,x665,x666),f43(x663,x662,x664,x665,x666))
% 27.15/27.22 [67]~E(x671,x672)+E(f43(x673,x674,x671,x675,x676),f43(x673,x674,x672,x675,x676))
% 27.15/27.22 [68]~E(x681,x682)+E(f43(x683,x684,x685,x681,x686),f43(x683,x684,x685,x682,x686))
% 27.15/27.22 [69]~E(x691,x692)+E(f43(x693,x694,x695,x696,x691),f43(x693,x694,x695,x696,x692))
% 27.15/27.22 [70]~E(x701,x702)+E(f25(x701,x703,x704,x705),f25(x702,x703,x704,x705))
% 27.15/27.22 [71]~E(x711,x712)+E(f25(x713,x711,x714,x715),f25(x713,x712,x714,x715))
% 27.15/27.22 [72]~E(x721,x722)+E(f25(x723,x724,x721,x725),f25(x723,x724,x722,x725))
% 27.15/27.22 [73]~E(x731,x732)+E(f25(x733,x734,x735,x731),f25(x733,x734,x735,x732))
% 27.15/27.22 [74]~E(x741,x742)+E(f36(x741,x743,x744,x745,x746,x747),f36(x742,x743,x744,x745,x746,x747))
% 27.15/27.22 [75]~E(x751,x752)+E(f36(x753,x751,x754,x755,x756,x757),f36(x753,x752,x754,x755,x756,x757))
% 27.15/27.22 [76]~E(x761,x762)+E(f36(x763,x764,x761,x765,x766,x767),f36(x763,x764,x762,x765,x766,x767))
% 27.15/27.22 [77]~E(x771,x772)+E(f36(x773,x774,x775,x771,x776,x777),f36(x773,x774,x775,x772,x776,x777))
% 27.15/27.22 [78]~E(x781,x782)+E(f36(x783,x784,x785,x786,x781,x787),f36(x783,x784,x785,x786,x782,x787))
% 27.15/27.22 [79]~E(x791,x792)+E(f36(x793,x794,x795,x796,x797,x791),f36(x793,x794,x795,x796,x797,x792))
% 27.15/27.22 [80]~E(x801,x802)+E(f80(x801,x803,x804,x805),f80(x802,x803,x804,x805))
% 27.15/27.22 [81]~E(x811,x812)+E(f80(x813,x811,x814,x815),f80(x813,x812,x814,x815))
% 27.15/27.22 [82]~E(x821,x822)+E(f80(x823,x824,x821,x825),f80(x823,x824,x822,x825))
% 27.15/27.22 [83]~E(x831,x832)+E(f80(x833,x834,x835,x831),f80(x833,x834,x835,x832))
% 27.15/27.22 [84]~E(x841,x842)+E(f32(x841,x843,x844,x845,x846,x847,x848),f32(x842,x843,x844,x845,x846,x847,x848))
% 27.15/27.22 [85]~E(x851,x852)+E(f32(x853,x851,x854,x855,x856,x857,x858),f32(x853,x852,x854,x855,x856,x857,x858))
% 27.15/27.22 [86]~E(x861,x862)+E(f32(x863,x864,x861,x865,x866,x867,x868),f32(x863,x864,x862,x865,x866,x867,x868))
% 27.15/27.22 [87]~E(x871,x872)+E(f32(x873,x874,x875,x871,x876,x877,x878),f32(x873,x874,x875,x872,x876,x877,x878))
% 27.15/27.22 [88]~E(x881,x882)+E(f32(x883,x884,x885,x886,x881,x887,x888),f32(x883,x884,x885,x886,x882,x887,x888))
% 27.15/27.22 [89]~E(x891,x892)+E(f32(x893,x894,x895,x896,x897,x891,x898),f32(x893,x894,x895,x896,x897,x892,x898))
% 27.15/27.22 [90]~E(x901,x902)+E(f32(x903,x904,x905,x906,x907,x908,x901),f32(x903,x904,x905,x906,x907,x908,x902))
% 27.15/27.22 [91]~E(x911,x912)+E(f31(x911,x913,x914,x915,x916),f31(x912,x913,x914,x915,x916))
% 27.15/27.22 [92]~E(x921,x922)+E(f31(x923,x921,x924,x925,x926),f31(x923,x922,x924,x925,x926))
% 27.15/27.22 [93]~E(x931,x932)+E(f31(x933,x934,x931,x935,x936),f31(x933,x934,x932,x935,x936))
% 27.15/27.22 [94]~E(x941,x942)+E(f31(x943,x944,x945,x941,x946),f31(x943,x944,x945,x942,x946))
% 27.15/27.22 [95]~E(x951,x952)+E(f31(x953,x954,x955,x956,x951),f31(x953,x954,x955,x956,x952))
% 27.15/27.22 [96]~E(x961,x962)+E(f46(x961,x963,x964,x965),f46(x962,x963,x964,x965))
% 27.15/27.22 [97]~E(x971,x972)+E(f46(x973,x971,x974,x975),f46(x973,x972,x974,x975))
% 27.15/27.22 [98]~E(x981,x982)+E(f46(x983,x984,x981,x985),f46(x983,x984,x982,x985))
% 27.15/27.22 [99]~E(x991,x992)+E(f46(x993,x994,x995,x991),f46(x993,x994,x995,x992))
% 27.15/27.22 [100]~E(x1001,x1002)+E(f79(x1001,x1003,x1004,x1005),f79(x1002,x1003,x1004,x1005))
% 27.15/27.22 [101]~E(x1011,x1012)+E(f79(x1013,x1011,x1014,x1015),f79(x1013,x1012,x1014,x1015))
% 27.15/27.22 [102]~E(x1021,x1022)+E(f79(x1023,x1024,x1021,x1025),f79(x1023,x1024,x1022,x1025))
% 27.15/27.22 [103]~E(x1031,x1032)+E(f79(x1033,x1034,x1035,x1031),f79(x1033,x1034,x1035,x1032))
% 27.15/27.22 [104]~E(x1041,x1042)+E(f20(x1041,x1043,x1044,x1045,x1046,x1047,x1048),f20(x1042,x1043,x1044,x1045,x1046,x1047,x1048))
% 27.15/27.22 [105]~E(x1051,x1052)+E(f20(x1053,x1051,x1054,x1055,x1056,x1057,x1058),f20(x1053,x1052,x1054,x1055,x1056,x1057,x1058))
% 27.15/27.22 [106]~E(x1061,x1062)+E(f20(x1063,x1064,x1061,x1065,x1066,x1067,x1068),f20(x1063,x1064,x1062,x1065,x1066,x1067,x1068))
% 27.15/27.22 [107]~E(x1071,x1072)+E(f20(x1073,x1074,x1075,x1071,x1076,x1077,x1078),f20(x1073,x1074,x1075,x1072,x1076,x1077,x1078))
% 27.15/27.22 [108]~E(x1081,x1082)+E(f20(x1083,x1084,x1085,x1086,x1081,x1087,x1088),f20(x1083,x1084,x1085,x1086,x1082,x1087,x1088))
% 27.15/27.22 [109]~E(x1091,x1092)+E(f20(x1093,x1094,x1095,x1096,x1097,x1091,x1098),f20(x1093,x1094,x1095,x1096,x1097,x1092,x1098))
% 27.15/27.22 [110]~E(x1101,x1102)+E(f20(x1103,x1104,x1105,x1106,x1107,x1108,x1101),f20(x1103,x1104,x1105,x1106,x1107,x1108,x1102))
% 27.15/27.22 [111]~E(x1111,x1112)+E(f76(x1111,x1113,x1114),f76(x1112,x1113,x1114))
% 27.15/27.22 [112]~E(x1121,x1122)+E(f76(x1123,x1121,x1124),f76(x1123,x1122,x1124))
% 27.15/27.22 [113]~E(x1131,x1132)+E(f76(x1133,x1134,x1131),f76(x1133,x1134,x1132))
% 27.15/27.22 [114]~E(x1141,x1142)+E(f11(x1141,x1143,x1144),f11(x1142,x1143,x1144))
% 27.15/27.22 [115]~E(x1151,x1152)+E(f11(x1153,x1151,x1154),f11(x1153,x1152,x1154))
% 27.15/27.22 [116]~E(x1161,x1162)+E(f11(x1163,x1164,x1161),f11(x1163,x1164,x1162))
% 27.15/27.22 [117]~E(x1171,x1172)+E(f14(x1171,x1173,x1174,x1175,x1176,x1177,x1178),f14(x1172,x1173,x1174,x1175,x1176,x1177,x1178))
% 27.15/27.22 [118]~E(x1181,x1182)+E(f14(x1183,x1181,x1184,x1185,x1186,x1187,x1188),f14(x1183,x1182,x1184,x1185,x1186,x1187,x1188))
% 27.15/27.22 [119]~E(x1191,x1192)+E(f14(x1193,x1194,x1191,x1195,x1196,x1197,x1198),f14(x1193,x1194,x1192,x1195,x1196,x1197,x1198))
% 27.15/27.22 [120]~E(x1201,x1202)+E(f14(x1203,x1204,x1205,x1201,x1206,x1207,x1208),f14(x1203,x1204,x1205,x1202,x1206,x1207,x1208))
% 27.15/27.22 [121]~E(x1211,x1212)+E(f14(x1213,x1214,x1215,x1216,x1211,x1217,x1218),f14(x1213,x1214,x1215,x1216,x1212,x1217,x1218))
% 27.15/27.22 [122]~E(x1221,x1222)+E(f14(x1223,x1224,x1225,x1226,x1227,x1221,x1228),f14(x1223,x1224,x1225,x1226,x1227,x1222,x1228))
% 27.15/27.22 [123]~E(x1231,x1232)+E(f14(x1233,x1234,x1235,x1236,x1237,x1238,x1231),f14(x1233,x1234,x1235,x1236,x1237,x1238,x1232))
% 27.15/27.22 [124]~E(x1241,x1242)+E(f9(x1241,x1243,x1244,x1245,x1246,x1247,x1248),f9(x1242,x1243,x1244,x1245,x1246,x1247,x1248))
% 27.15/27.22 [125]~E(x1251,x1252)+E(f9(x1253,x1251,x1254,x1255,x1256,x1257,x1258),f9(x1253,x1252,x1254,x1255,x1256,x1257,x1258))
% 27.15/27.22 [126]~E(x1261,x1262)+E(f9(x1263,x1264,x1261,x1265,x1266,x1267,x1268),f9(x1263,x1264,x1262,x1265,x1266,x1267,x1268))
% 27.15/27.22 [127]~E(x1271,x1272)+E(f9(x1273,x1274,x1275,x1271,x1276,x1277,x1278),f9(x1273,x1274,x1275,x1272,x1276,x1277,x1278))
% 27.15/27.22 [128]~E(x1281,x1282)+E(f9(x1283,x1284,x1285,x1286,x1281,x1287,x1288),f9(x1283,x1284,x1285,x1286,x1282,x1287,x1288))
% 27.15/27.22 [129]~E(x1291,x1292)+E(f9(x1293,x1294,x1295,x1296,x1297,x1291,x1298),f9(x1293,x1294,x1295,x1296,x1297,x1292,x1298))
% 27.15/27.22 [130]~E(x1301,x1302)+E(f9(x1303,x1304,x1305,x1306,x1307,x1308,x1301),f9(x1303,x1304,x1305,x1306,x1307,x1308,x1302))
% 27.15/27.22 [131]~E(x1311,x1312)+E(f34(x1311,x1313,x1314,x1315,x1316),f34(x1312,x1313,x1314,x1315,x1316))
% 27.15/27.22 [132]~E(x1321,x1322)+E(f34(x1323,x1321,x1324,x1325,x1326),f34(x1323,x1322,x1324,x1325,x1326))
% 27.15/27.22 [133]~E(x1331,x1332)+E(f34(x1333,x1334,x1331,x1335,x1336),f34(x1333,x1334,x1332,x1335,x1336))
% 27.15/27.22 [134]~E(x1341,x1342)+E(f34(x1343,x1344,x1345,x1341,x1346),f34(x1343,x1344,x1345,x1342,x1346))
% 27.15/27.22 [135]~E(x1351,x1352)+E(f34(x1353,x1354,x1355,x1356,x1351),f34(x1353,x1354,x1355,x1356,x1352))
% 27.15/27.22 [136]~E(x1361,x1362)+E(f21(x1361,x1363,x1364),f21(x1362,x1363,x1364))
% 27.15/27.22 [137]~E(x1371,x1372)+E(f21(x1373,x1371,x1374),f21(x1373,x1372,x1374))
% 27.15/27.22 [138]~E(x1381,x1382)+E(f21(x1383,x1384,x1381),f21(x1383,x1384,x1382))
% 27.15/27.22 [139]~E(x1391,x1392)+E(f78(x1391,x1393,x1394),f78(x1392,x1393,x1394))
% 27.15/27.22 [140]~E(x1401,x1402)+E(f78(x1403,x1401,x1404),f78(x1403,x1402,x1404))
% 27.15/27.22 [141]~E(x1411,x1412)+E(f78(x1413,x1414,x1411),f78(x1413,x1414,x1412))
% 27.15/27.22 [142]~E(x1421,x1422)+E(f35(x1421,x1423,x1424,x1425,x1426),f35(x1422,x1423,x1424,x1425,x1426))
% 27.15/27.22 [143]~E(x1431,x1432)+E(f35(x1433,x1431,x1434,x1435,x1436),f35(x1433,x1432,x1434,x1435,x1436))
% 27.15/27.22 [144]~E(x1441,x1442)+E(f35(x1443,x1444,x1441,x1445,x1446),f35(x1443,x1444,x1442,x1445,x1446))
% 27.15/27.22 [145]~E(x1451,x1452)+E(f35(x1453,x1454,x1455,x1451,x1456),f35(x1453,x1454,x1455,x1452,x1456))
% 27.15/27.22 [146]~E(x1461,x1462)+E(f35(x1463,x1464,x1465,x1466,x1461),f35(x1463,x1464,x1465,x1466,x1462))
% 27.15/27.22 [147]~E(x1471,x1472)+E(f81(x1471,x1473,x1474,x1475,x1476,x1477,x1478,x1479),f81(x1472,x1473,x1474,x1475,x1476,x1477,x1478,x1479))
% 27.15/27.22 [148]~E(x1481,x1482)+E(f81(x1483,x1481,x1484,x1485,x1486,x1487,x1488,x1489),f81(x1483,x1482,x1484,x1485,x1486,x1487,x1488,x1489))
% 27.15/27.22 [149]~E(x1491,x1492)+E(f81(x1493,x1494,x1491,x1495,x1496,x1497,x1498,x1499),f81(x1493,x1494,x1492,x1495,x1496,x1497,x1498,x1499))
% 27.15/27.22 [150]~E(x1501,x1502)+E(f81(x1503,x1504,x1505,x1501,x1506,x1507,x1508,x1509),f81(x1503,x1504,x1505,x1502,x1506,x1507,x1508,x1509))
% 27.15/27.22 [151]~E(x1511,x1512)+E(f81(x1513,x1514,x1515,x1516,x1511,x1517,x1518,x1519),f81(x1513,x1514,x1515,x1516,x1512,x1517,x1518,x1519))
% 27.15/27.22 [152]~E(x1521,x1522)+E(f81(x1523,x1524,x1525,x1526,x1527,x1521,x1528,x1529),f81(x1523,x1524,x1525,x1526,x1527,x1522,x1528,x1529))
% 27.15/27.22 [153]~E(x1531,x1532)+E(f81(x1533,x1534,x1535,x1536,x1537,x1538,x1531,x1539),f81(x1533,x1534,x1535,x1536,x1537,x1538,x1532,x1539))
% 27.15/27.22 [154]~E(x1541,x1542)+E(f81(x1543,x1544,x1545,x1546,x1547,x1548,x1549,x1541),f81(x1543,x1544,x1545,x1546,x1547,x1548,x1549,x1542))
% 27.15/27.22 [155]~E(x1551,x1552)+E(f13(x1551,x1553,x1554,x1555,x1556,x1557,x1558),f13(x1552,x1553,x1554,x1555,x1556,x1557,x1558))
% 27.15/27.22 [156]~E(x1561,x1562)+E(f13(x1563,x1561,x1564,x1565,x1566,x1567,x1568),f13(x1563,x1562,x1564,x1565,x1566,x1567,x1568))
% 27.15/27.22 [157]~E(x1571,x1572)+E(f13(x1573,x1574,x1571,x1575,x1576,x1577,x1578),f13(x1573,x1574,x1572,x1575,x1576,x1577,x1578))
% 27.15/27.22 [158]~E(x1581,x1582)+E(f13(x1583,x1584,x1585,x1581,x1586,x1587,x1588),f13(x1583,x1584,x1585,x1582,x1586,x1587,x1588))
% 27.15/27.22 [159]~E(x1591,x1592)+E(f13(x1593,x1594,x1595,x1596,x1591,x1597,x1598),f13(x1593,x1594,x1595,x1596,x1592,x1597,x1598))
% 27.15/27.22 [160]~E(x1601,x1602)+E(f13(x1603,x1604,x1605,x1606,x1607,x1601,x1608),f13(x1603,x1604,x1605,x1606,x1607,x1602,x1608))
% 27.15/27.22 [161]~E(x1611,x1612)+E(f13(x1613,x1614,x1615,x1616,x1617,x1618,x1611),f13(x1613,x1614,x1615,x1616,x1617,x1618,x1612))
% 27.15/27.22 [162]~E(x1621,x1622)+E(f19(x1621,x1623,x1624),f19(x1622,x1623,x1624))
% 27.15/27.22 [163]~E(x1631,x1632)+E(f19(x1633,x1631,x1634),f19(x1633,x1632,x1634))
% 27.15/27.22 [164]~E(x1641,x1642)+E(f19(x1643,x1644,x1641),f19(x1643,x1644,x1642))
% 27.15/27.22 [165]~E(x1651,x1652)+E(f23(x1651,x1653,x1654),f23(x1652,x1653,x1654))
% 27.15/27.22 [166]~E(x1661,x1662)+E(f23(x1663,x1661,x1664),f23(x1663,x1662,x1664))
% 27.15/27.22 [167]~E(x1671,x1672)+E(f23(x1673,x1674,x1671),f23(x1673,x1674,x1672))
% 27.15/27.22 [168]~E(x1681,x1682)+E(f30(x1681,x1683,x1684),f30(x1682,x1683,x1684))
% 27.15/27.22 [169]~E(x1691,x1692)+E(f30(x1693,x1691,x1694),f30(x1693,x1692,x1694))
% 27.15/27.22 [170]~E(x1701,x1702)+E(f30(x1703,x1704,x1701),f30(x1703,x1704,x1702))
% 27.15/27.22 [171]~E(x1711,x1712)+E(f38(x1711),f38(x1712))
% 27.15/27.22 [172]~E(x1721,x1722)+E(f16(x1721),f16(x1722))
% 27.15/27.22 [173]~E(x1731,x1732)+E(f24(x1731),f24(x1732))
% 27.15/27.22 [174]~E(x1741,x1742)+E(f27(x1741),f27(x1742))
% 27.15/27.22 [175]~E(x1751,x1752)+E(f39(x1751),f39(x1752))
% 27.15/27.22 [176]~E(x1761,x1762)+E(f29(x1761,x1763,x1764),f29(x1762,x1763,x1764))
% 27.15/27.22 [177]~E(x1771,x1772)+E(f29(x1773,x1771,x1774),f29(x1773,x1772,x1774))
% 27.15/27.22 [178]~E(x1781,x1782)+E(f29(x1783,x1784,x1781),f29(x1783,x1784,x1782))
% 27.15/27.22 [179]~E(x1791,x1792)+E(f42(x1791,x1793,x1794,x1795),f42(x1792,x1793,x1794,x1795))
% 27.15/27.22 [180]~E(x1801,x1802)+E(f42(x1803,x1801,x1804,x1805),f42(x1803,x1802,x1804,x1805))
% 27.15/27.22 [181]~E(x1811,x1812)+E(f42(x1813,x1814,x1811,x1815),f42(x1813,x1814,x1812,x1815))
% 27.15/27.22 [182]~E(x1821,x1822)+E(f42(x1823,x1824,x1825,x1821),f42(x1823,x1824,x1825,x1822))
% 27.15/27.22 [183]~E(x1831,x1832)+E(f45(x1831,x1833,x1834),f45(x1832,x1833,x1834))
% 27.15/27.22 [184]~E(x1841,x1842)+E(f45(x1843,x1841,x1844),f45(x1843,x1842,x1844))
% 27.15/27.22 [185]~E(x1851,x1852)+E(f45(x1853,x1854,x1851),f45(x1853,x1854,x1852))
% 27.15/27.22 [186]~E(x1861,x1862)+E(f50(x1861,x1863,x1864),f50(x1862,x1863,x1864))
% 27.15/27.22 [187]~E(x1871,x1872)+E(f50(x1873,x1871,x1874),f50(x1873,x1872,x1874))
% 27.15/27.22 [188]~E(x1881,x1882)+E(f50(x1883,x1884,x1881),f50(x1883,x1884,x1882))
% 27.15/27.22 [189]~E(x1891,x1892)+E(f53(x1891,x1893,x1894),f53(x1892,x1893,x1894))
% 27.15/27.22 [190]~E(x1901,x1902)+E(f53(x1903,x1901,x1904),f53(x1903,x1902,x1904))
% 27.15/27.22 [191]~E(x1911,x1912)+E(f53(x1913,x1914,x1911),f53(x1913,x1914,x1912))
% 27.15/27.22 [192]~E(x1921,x1922)+E(f49(x1921,x1923),f49(x1922,x1923))
% 27.15/27.22 [193]~E(x1931,x1932)+E(f49(x1933,x1931),f49(x1933,x1932))
% 27.15/27.22 [194]~E(x1941,x1942)+E(f52(x1941,x1943),f52(x1942,x1943))
% 27.15/27.22 [195]~E(x1951,x1952)+E(f52(x1953,x1951),f52(x1953,x1952))
% 27.15/27.22 [196]~E(x1961,x1962)+E(f51(x1961,x1963,x1964),f51(x1962,x1963,x1964))
% 27.15/27.22 [197]~E(x1971,x1972)+E(f51(x1973,x1971,x1974),f51(x1973,x1972,x1974))
% 27.15/27.22 [198]~E(x1981,x1982)+E(f51(x1983,x1984,x1981),f51(x1983,x1984,x1982))
% 27.15/27.22 [199]~E(x1991,x1992)+E(f12(x1991,x1993,x1994),f12(x1992,x1993,x1994))
% 27.15/27.22 [200]~E(x2001,x2002)+E(f12(x2003,x2001,x2004),f12(x2003,x2002,x2004))
% 27.15/27.22 [201]~E(x2011,x2012)+E(f12(x2013,x2014,x2011),f12(x2013,x2014,x2012))
% 27.15/27.22 [202]~E(x2021,x2022)+E(f47(x2021,x2023,x2024),f47(x2022,x2023,x2024))
% 27.15/27.22 [203]~E(x2031,x2032)+E(f47(x2033,x2031,x2034),f47(x2033,x2032,x2034))
% 27.15/27.22 [204]~E(x2041,x2042)+E(f47(x2043,x2044,x2041),f47(x2043,x2044,x2042))
% 27.15/27.22 [205]~E(x2051,x2052)+E(f44(x2051,x2053),f44(x2052,x2053))
% 27.15/27.22 [206]~E(x2061,x2062)+E(f44(x2063,x2061),f44(x2063,x2062))
% 27.15/27.22 [207]~E(x2071,x2072)+E(f18(x2071,x2073,x2074),f18(x2072,x2073,x2074))
% 27.15/27.22 [208]~E(x2081,x2082)+E(f18(x2083,x2081,x2084),f18(x2083,x2082,x2084))
% 27.15/27.22 [209]~E(x2091,x2092)+E(f18(x2093,x2094,x2091),f18(x2093,x2094,x2092))
% 27.15/27.22 [210]~E(x2101,x2102)+E(f41(x2101,x2103,x2104,x2105),f41(x2102,x2103,x2104,x2105))
% 27.15/27.22 [211]~E(x2111,x2112)+E(f41(x2113,x2111,x2114,x2115),f41(x2113,x2112,x2114,x2115))
% 27.15/27.22 [212]~E(x2121,x2122)+E(f41(x2123,x2124,x2121,x2125),f41(x2123,x2124,x2122,x2125))
% 27.15/27.22 [213]~E(x2131,x2132)+E(f41(x2133,x2134,x2135,x2131),f41(x2133,x2134,x2135,x2132))
% 27.15/27.22 [214]~E(x2141,x2142)+E(f33(x2141,x2143,x2144,x2145),f33(x2142,x2143,x2144,x2145))
% 27.15/27.22 [215]~E(x2151,x2152)+E(f33(x2153,x2151,x2154,x2155),f33(x2153,x2152,x2154,x2155))
% 27.15/27.22 [216]~E(x2161,x2162)+E(f33(x2163,x2164,x2161,x2165),f33(x2163,x2164,x2162,x2165))
% 27.15/27.22 [217]~E(x2171,x2172)+E(f33(x2173,x2174,x2175,x2171),f33(x2173,x2174,x2175,x2172))
% 27.15/27.22 [218]~E(x2181,x2182)+E(f28(x2181,x2183,x2184),f28(x2182,x2183,x2184))
% 27.15/27.22 [219]~E(x2191,x2192)+E(f28(x2193,x2191,x2194),f28(x2193,x2192,x2194))
% 27.15/27.22 [220]~E(x2201,x2202)+E(f28(x2203,x2204,x2201),f28(x2203,x2204,x2202))
% 27.15/27.22 [221]~E(x2211,x2212)+E(f10(x2211,x2213,x2214),f10(x2212,x2213,x2214))
% 27.15/27.22 [222]~E(x2221,x2222)+E(f10(x2223,x2221,x2224),f10(x2223,x2222,x2224))
% 27.15/27.22 [223]~E(x2231,x2232)+E(f10(x2233,x2234,x2231),f10(x2233,x2234,x2232))
% 27.15/27.22 [224]~E(x2241,x2242)+E(f22(x2241,x2243,x2244),f22(x2242,x2243,x2244))
% 27.15/27.22 [225]~E(x2251,x2252)+E(f22(x2253,x2251,x2254),f22(x2253,x2252,x2254))
% 27.15/27.22 [226]~E(x2261,x2262)+E(f22(x2263,x2264,x2261),f22(x2263,x2264,x2262))
% 27.15/27.22 [227]~E(x2271,x2272)+E(f60(x2271,x2273),f60(x2272,x2273))
% 27.15/27.22 [228]~E(x2281,x2282)+E(f60(x2283,x2281),f60(x2283,x2282))
% 27.15/27.22 [229]~E(x2291,x2292)+E(f7(x2291,x2293),f7(x2292,x2293))
% 27.15/27.22 [230]~E(x2301,x2302)+E(f7(x2303,x2301),f7(x2303,x2302))
% 27.15/27.22 [231]~E(x2311,x2312)+E(f8(x2311,x2313),f8(x2312,x2313))
% 27.15/27.22 [232]~E(x2321,x2322)+E(f8(x2323,x2321),f8(x2323,x2322))
% 27.15/27.22 [233]~E(x2331,x2332)+E(f40(x2331,x2333,x2334),f40(x2332,x2333,x2334))
% 27.15/27.22 [234]~E(x2341,x2342)+E(f40(x2343,x2341,x2344),f40(x2343,x2342,x2344))
% 27.15/27.22 [235]~E(x2351,x2352)+E(f40(x2353,x2354,x2351),f40(x2353,x2354,x2352))
% 27.15/27.22 [236]~E(x2361,x2362)+E(f17(x2361,x2363),f17(x2362,x2363))
% 27.15/27.22 [237]~E(x2371,x2372)+E(f17(x2373,x2371),f17(x2373,x2372))
% 27.15/27.22 [238]~E(x2381,x2382)+E(f6(x2381,x2383),f6(x2382,x2383))
% 27.15/27.22 [239]~E(x2391,x2392)+E(f6(x2393,x2391),f6(x2393,x2392))
% 27.15/27.22 [240]~P1(x2401)+P1(x2402)+~E(x2401,x2402)
% 27.15/27.22 [241]P12(x2412,x2413)+~E(x2411,x2412)+~P12(x2411,x2413)
% 27.15/27.22 [242]P12(x2423,x2422)+~E(x2421,x2422)+~P12(x2423,x2421)
% 27.15/27.22 [243]~P2(x2431)+P2(x2432)+~E(x2431,x2432)
% 27.15/27.22 [244]P3(x2442,x2443,x2444)+~E(x2441,x2442)+~P3(x2441,x2443,x2444)
% 27.15/27.22 [245]P3(x2453,x2452,x2454)+~E(x2451,x2452)+~P3(x2453,x2451,x2454)
% 27.15/27.22 [246]P3(x2463,x2464,x2462)+~E(x2461,x2462)+~P3(x2463,x2464,x2461)
% 27.15/27.22 [247]P4(x2472,x2473,x2474)+~E(x2471,x2472)+~P4(x2471,x2473,x2474)
% 27.15/27.22 [248]P4(x2483,x2482,x2484)+~E(x2481,x2482)+~P4(x2483,x2481,x2484)
% 27.15/27.22 [249]P4(x2493,x2494,x2492)+~E(x2491,x2492)+~P4(x2493,x2494,x2491)
% 27.15/27.22 [250]P7(x2502,x2503)+~E(x2501,x2502)+~P7(x2501,x2503)
% 27.15/27.22 [251]P7(x2513,x2512)+~E(x2511,x2512)+~P7(x2513,x2511)
% 27.15/27.22 [252]P11(x2522,x2523)+~E(x2521,x2522)+~P11(x2521,x2523)
% 27.15/27.22 [253]P11(x2533,x2532)+~E(x2531,x2532)+~P11(x2533,x2531)
% 27.15/27.22 [254]~P5(x2541)+P5(x2542)+~E(x2541,x2542)
% 27.15/27.22 [255]P9(x2552,x2553)+~E(x2551,x2552)+~P9(x2551,x2553)
% 27.15/27.22 [256]P9(x2563,x2562)+~E(x2561,x2562)+~P9(x2563,x2561)
% 27.15/27.22 [257]~P14(x2571)+P14(x2572)+~E(x2571,x2572)
% 27.15/27.22 [258]P6(x2582,x2583)+~E(x2581,x2582)+~P6(x2581,x2583)
% 27.15/27.22 [259]P6(x2593,x2592)+~E(x2591,x2592)+~P6(x2593,x2591)
% 27.15/27.22 [260]~P13(x2601)+P13(x2602)+~E(x2601,x2602)
% 27.15/27.22 [261]P8(x2612,x2613)+~E(x2611,x2612)+~P8(x2611,x2613)
% 27.15/27.22 [262]P8(x2623,x2622)+~E(x2621,x2622)+~P8(x2623,x2621)
% 27.15/27.22 [263]P10(x2632,x2633)+~E(x2631,x2632)+~P10(x2631,x2633)
% 27.15/27.22 [264]P10(x2643,x2642)+~E(x2641,x2642)+~P10(x2643,x2641)
% 27.15/27.22
% 27.15/27.22 %-------------------------------------------
% 27.15/27.22 cnf(591,plain,
% 27.15/27.22 (E(a2,a1)),
% 27.15/27.22 inference(scs_inference,[],[265,2])).
% 27.15/27.22 cnf(594,plain,
% 27.15/27.22 (P3(a66,a2,a4)),
% 27.15/27.22 inference(scs_inference,[],[265,268,269,313,314,2,248,247,246])).
% 27.15/27.22 cnf(595,plain,
% 27.15/27.22 (P3(a66,a1,a70)),
% 27.15/27.22 inference(scs_inference,[],[265,268,269,313,314,2,248,247,246,245])).
% 27.15/27.22 cnf(601,plain,
% 27.15/27.22 (~P9(a3,a3)),
% 27.15/27.22 inference(scs_inference,[],[265,266,267,268,269,270,280,290,292,300,313,314,325,2,248,247,246,245,244,242,241,240,3,341])).
% 27.15/27.22 cnf(603,plain,
% 27.15/27.22 (~P12(a65,a72)),
% 27.15/27.22 inference(scs_inference,[],[265,266,267,268,269,270,280,287,290,292,300,313,314,325,2,248,247,246,245,244,242,241,240,3,341,368])).
% 27.15/27.22 cnf(605,plain,
% 27.15/27.22 (~P1(a1)),
% 27.15/27.22 inference(scs_inference,[],[330,265,266,267,268,269,270,278,279,280,287,290,292,300,313,314,325,2,248,247,246,245,244,242,241,240,3,341,368,458])).
% 27.15/27.22 cnf(705,plain,
% 27.15/27.22 (E(f78(x7051,x7052,a1),f78(x7051,x7052,a2))),
% 27.15/27.22 inference(scs_inference,[],[330,265,266,267,268,269,270,278,279,280,287,290,292,300,313,314,325,2,248,247,246,245,244,242,241,240,3,341,368,458,239,238,237,236,235,234,233,232,231,230,229,228,227,226,225,224,223,222,221,220,219,218,217,216,215,214,213,212,211,210,209,208,207,206,205,204,203,202,201,200,199,198,197,196,195,194,193,192,191,190,189,188,187,186,185,184,183,182,181,180,179,178,177,176,175,174,173,172,171,170,169,168,167,166,165,164,163,162,161,160,159,158,157,156,155,154,153,152,151,150,149,148,147,146,145,144,143,142,141])).
% 27.15/27.22 cnf(706,plain,
% 27.15/27.22 (E(f78(x7061,a1,x7062),f78(x7061,a2,x7062))),
% 27.15/27.22 inference(scs_inference,[],[330,265,266,267,268,269,270,278,279,280,287,290,292,300,313,314,325,2,248,247,246,245,244,242,241,240,3,341,368,458,239,238,237,236,235,234,233,232,231,230,229,228,227,226,225,224,223,222,221,220,219,218,217,216,215,214,213,212,211,210,209,208,207,206,205,204,203,202,201,200,199,198,197,196,195,194,193,192,191,190,189,188,187,186,185,184,183,182,181,180,179,178,177,176,175,174,173,172,171,170,169,168,167,166,165,164,163,162,161,160,159,158,157,156,155,154,153,152,151,150,149,148,147,146,145,144,143,142,141,140])).
% 27.15/27.22 cnf(707,plain,
% 27.15/27.22 (E(f78(a1,x7071,x7072),f78(a2,x7071,x7072))),
% 27.15/27.22 inference(scs_inference,[],[330,265,266,267,268,269,270,278,279,280,287,290,292,300,313,314,325,2,248,247,246,245,244,242,241,240,3,341,368,458,239,238,237,236,235,234,233,232,231,230,229,228,227,226,225,224,223,222,221,220,219,218,217,216,215,214,213,212,211,210,209,208,207,206,205,204,203,202,201,200,199,198,197,196,195,194,193,192,191,190,189,188,187,186,185,184,183,182,181,180,179,178,177,176,175,174,173,172,171,170,169,168,167,166,165,164,163,162,161,160,159,158,157,156,155,154,153,152,151,150,149,148,147,146,145,144,143,142,141,140,139])).
% 27.15/27.22 cnf(839,plain,
% 27.15/27.22 (E(f64(x8391,a1,x8392),f64(x8391,a2,x8392))),
% 27.15/27.22 inference(scs_inference,[],[330,265,266,267,268,269,270,278,279,280,287,290,292,300,313,314,325,2,248,247,246,245,244,242,241,240,3,341,368,458,239,238,237,236,235,234,233,232,231,230,229,228,227,226,225,224,223,222,221,220,219,218,217,216,215,214,213,212,211,210,209,208,207,206,205,204,203,202,201,200,199,198,197,196,195,194,193,192,191,190,189,188,187,186,185,184,183,182,181,180,179,178,177,176,175,174,173,172,171,170,169,168,167,166,165,164,163,162,161,160,159,158,157,156,155,154,153,152,151,150,149,148,147,146,145,144,143,142,141,140,139,138,137,136,135,134,133,132,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117,116,115,114,113,112,111,110,109,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,74,73,72,71,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7])).
% 27.15/27.22 cnf(841,plain,
% 27.15/27.22 (E(f74(x8411,a1),f74(x8411,a2))),
% 27.15/27.22 inference(scs_inference,[],[330,265,266,267,268,269,270,278,279,280,287,290,292,300,313,314,325,2,248,247,246,245,244,242,241,240,3,341,368,458,239,238,237,236,235,234,233,232,231,230,229,228,227,226,225,224,223,222,221,220,219,218,217,216,215,214,213,212,211,210,209,208,207,206,205,204,203,202,201,200,199,198,197,196,195,194,193,192,191,190,189,188,187,186,185,184,183,182,181,180,179,178,177,176,175,174,173,172,171,170,169,168,167,166,165,164,163,162,161,160,159,158,157,156,155,154,153,152,151,150,149,148,147,146,145,144,143,142,141,140,139,138,137,136,135,134,133,132,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117,116,115,114,113,112,111,110,109,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,74,73,72,71,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5])).
% 27.15/27.22 cnf(842,plain,
% 27.15/27.22 (E(f74(a1,x8421),f74(a2,x8421))),
% 27.15/27.22 inference(scs_inference,[],[330,265,266,267,268,269,270,278,279,280,287,290,292,300,313,314,325,2,248,247,246,245,244,242,241,240,3,341,368,458,239,238,237,236,235,234,233,232,231,230,229,228,227,226,225,224,223,222,221,220,219,218,217,216,215,214,213,212,211,210,209,208,207,206,205,204,203,202,201,200,199,198,197,196,195,194,193,192,191,190,189,188,187,186,185,184,183,182,181,180,179,178,177,176,175,174,173,172,171,170,169,168,167,166,165,164,163,162,161,160,159,158,157,156,155,154,153,152,151,150,149,148,147,146,145,144,143,142,141,140,139,138,137,136,135,134,133,132,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117,116,115,114,113,112,111,110,109,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,74,73,72,71,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4])).
% 27.15/27.22 cnf(844,plain,
% 27.15/27.22 (E(f75(a3,a3),a3)),
% 27.15/27.22 inference(scs_inference,[],[330,265,266,267,268,269,270,278,279,280,287,290,292,300,313,314,325,2,248,247,246,245,244,242,241,240,3,341,368,458,239,238,237,236,235,234,233,232,231,230,229,228,227,226,225,224,223,222,221,220,219,218,217,216,215,214,213,212,211,210,209,208,207,206,205,204,203,202,201,200,199,198,197,196,195,194,193,192,191,190,189,188,187,186,185,184,183,182,181,180,179,178,177,176,175,174,173,172,171,170,169,168,167,166,165,164,163,162,161,160,159,158,157,156,155,154,153,152,151,150,149,148,147,146,145,144,143,142,141,140,139,138,137,136,135,134,133,132,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117,116,115,114,113,112,111,110,109,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,74,73,72,71,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,260,337])).
% 27.15/27.22 cnf(850,plain,
% 27.15/27.22 (P10(a3,f74(a70,a70))),
% 27.15/27.22 inference(scs_inference,[],[330,265,266,267,268,269,270,278,279,280,287,290,292,300,313,314,325,2,248,247,246,245,244,242,241,240,3,341,368,458,239,238,237,236,235,234,233,232,231,230,229,228,227,226,225,224,223,222,221,220,219,218,217,216,215,214,213,212,211,210,209,208,207,206,205,204,203,202,201,200,199,198,197,196,195,194,193,192,191,190,189,188,187,186,185,184,183,182,181,180,179,178,177,176,175,174,173,172,171,170,169,168,167,166,165,164,163,162,161,160,159,158,157,156,155,154,153,152,151,150,149,148,147,146,145,144,143,142,141,140,139,138,137,136,135,134,133,132,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117,116,115,114,113,112,111,110,109,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,74,73,72,71,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,260,337,336,331,362])).
% 27.15/27.22 cnf(875,plain,
% 27.15/27.22 (~P14(f78(a37,a2,a2))),
% 27.15/27.22 inference(scs_inference,[],[271,705,389])).
% 27.15/27.22 cnf(892,plain,
% 27.15/27.22 (E(f60(a61,a61),f74(a61,a61))),
% 27.15/27.22 inference(scs_inference,[],[271,272,273,282,283,705,706,707,389,388,387,355,354,349,348,353])).
% 27.15/27.22 cnf(900,plain,
% 27.15/27.22 (~E(a71,a1)),
% 27.15/27.22 inference(scs_inference,[],[271,272,273,277,282,283,301,327,266,290,705,706,707,603,605,389,388,387,355,354,349,348,353,331,381,244,242,240])).
% 27.15/27.22 cnf(937,plain,
% 27.15/27.22 (P13(f74(a61,a61))),
% 27.15/27.22 inference(scs_inference,[],[330,271,272,273,274,277,282,283,284,288,294,301,315,321,327,328,329,325,279,266,269,290,278,268,705,706,707,842,601,844,850,603,605,389,388,387,355,354,349,348,353,331,381,244,242,240,3,336,406,2,263,246,245,241,243,501,504,520,447,420,413,412,397,396,395,410,256,247,260])).
% 27.15/27.22 cnf(972,plain,
% 27.15/27.22 (P5(f6(a63,a62))),
% 27.15/27.22 inference(scs_inference,[],[322,274,284,273,283,366,365,364,363,360])).
% 27.15/27.22 cnf(979,plain,
% 27.15/27.22 (E(f78(x9791,x9792,a1),f78(x9791,x9792,a2))),
% 27.15/27.22 inference(rename_variables,[],[705])).
% 27.15/27.22 cnf(982,plain,
% 27.15/27.22 (E(f78(x9821,x9822,a1),f78(x9821,x9822,a2))),
% 27.15/27.22 inference(rename_variables,[],[705])).
% 27.15/27.22 cnf(1001,plain,
% 27.15/27.22 (~P3(a1,a70,a66)),
% 27.15/27.22 inference(scs_inference,[],[265,275,285,322,591,274,284,327,273,283,290,266,841,937,892,875,705,979,982,706,366,365,364,363,360,359,350,389,387,362,372,337,388,264,258,257,406,381,244])).
% 27.15/27.22 cnf(1006,plain,
% 27.15/27.22 (~P1(a2)),
% 27.15/27.22 inference(scs_inference,[],[265,275,285,304,322,591,320,274,284,327,329,273,283,290,266,839,841,937,892,875,705,979,982,706,605,366,365,364,363,360,359,350,389,387,362,372,337,388,264,258,257,406,381,244,3,246,241,240])).
% 27.15/27.22 cnf(1007,plain,
% 27.15/27.22 (E(a59,a1)),
% 27.15/27.22 inference(scs_inference,[],[265,275,285,304,322,591,320,274,284,327,329,273,283,290,266,839,841,937,892,875,705,979,982,706,605,366,365,364,363,360,359,350,389,387,362,372,337,388,264,258,257,406,381,244,3,246,241,240,2])).
% 27.15/27.22 cnf(1009,plain,
% 27.15/27.22 (P7(a63,f6(a63,a62))),
% 27.15/27.22 inference(scs_inference,[],[265,275,285,304,322,591,320,274,284,327,329,273,283,290,266,839,841,937,892,875,595,705,979,982,706,605,366,365,364,363,360,359,350,389,387,362,372,337,388,264,258,257,406,381,244,3,246,241,240,2,245,342])).
% 27.15/27.22 cnf(1015,plain,
% 27.15/27.22 (E(f52(a63,f6(a63,a62)),f6(a63,a62))),
% 27.15/27.22 inference(scs_inference,[],[265,275,285,304,322,591,320,274,284,327,329,273,283,290,266,839,841,937,892,875,595,705,979,982,706,605,366,365,364,363,360,359,350,389,387,362,372,337,388,264,258,257,406,381,244,3,246,241,240,2,245,342,358,357,344])).
% 27.15/27.22 cnf(1071,plain,
% 27.15/27.22 (P1(a69)),
% 27.15/27.22 inference(scs_inference,[],[276,323,286,591,269,273,274,266,290,283,272,282,1015,972,1009,594,900,937,892,334,332,352,366,365,364,350,333,363,360,359,250,406,381,244,3,240])).
% 27.15/27.22 cnf(1138,plain,
% 27.15/27.22 ($false),
% 27.15/27.22 inference(scs_inference,[],[266,319,267,270,281,271,1001,1007,1071,839,1006,603,421,262,244,241,3,240]),
% 27.15/27.22 ['proof']).
% 27.15/27.22 % SZS output end Proof
% 27.15/27.22 % Total time :25.880000s
%------------------------------------------------------------------------------