TSTP Solution File: SWV878-1 by CSE---1.6
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%------------------------------------------------------------------------------
% File : CSE---1.6
% Problem : SWV878-1 : 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 : n008.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 : Thu Aug 31 21:35:37 EDT 2023
% Result : Unsatisfiable 14.42s 14.42s
% Output : CNFRefutation 14.42s
% Verified :
% SZS Type : -
% Comments :
%------------------------------------------------------------------------------
%----WARNING: Could not form TPTP format derivation
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% 0.00/0.14 % Problem : SWV878-1 : TPTP v8.1.2. Released v4.1.0.
% 0.00/0.15 % Command : java -jar /export/starexec/sandbox2/solver/bin/mcs_scs.jar %s %d
% 0.21/0.37 % Computer : n008.cluster.edu
% 0.21/0.37 % Model : x86_64 x86_64
% 0.21/0.37 % CPU : Intel(R) Xeon(R) CPU E5-2620 v4 @ 2.10GHz
% 0.21/0.37 % Memory : 8042.1875MB
% 0.21/0.37 % OS : Linux 3.10.0-693.el7.x86_64
% 0.21/0.37 % CPULimit : 300
% 0.21/0.37 % WCLimit : 300
% 0.21/0.37 % DateTime : Tue Aug 29 07:29:02 EDT 2023
% 0.21/0.37 % CPUTime :
% 0.24/0.57 start to proof:theBenchmark
% 14.25/14.36 %-------------------------------------------
% 14.25/14.36 % File :CSE---1.6
% 14.25/14.36 % Problem :theBenchmark
% 14.25/14.36 % Transform :cnf
% 14.25/14.36 % Format :tptp:raw
% 14.25/14.36 % Command :java -jar mcs_scs.jar %d %s
% 14.25/14.36
% 14.25/14.36 % Result :Theorem 13.560000s
% 14.25/14.36 % Output :CNFRefutation 13.560000s
% 14.25/14.36 %-------------------------------------------
% 14.25/14.37 %------------------------------------------------------------------------------
% 14.25/14.37 % File : SWV878-1 : TPTP v8.1.2. Released v4.1.0.
% 14.25/14.37 % Domain : Software Verification
% 14.25/14.37 % Problem : Hoare logic with procedures 371_1
% 14.25/14.37 % Version : Especial.
% 14.25/14.37 % English : Completeness is taken relative to completeness of the underlying
% 14.25/14.37 % logic. Two versions of completeness proof: nested single recursion
% 14.25/14.37 % and simultaneous recursion in call rule.
% 14.25/14.37
% 14.25/14.37 % Refs : [Nip10] Nipkow (2010), Email to Geoff Sutcliffe
% 14.25/14.37 % : [BN10] Boehme & Nipkow (2010), Sledgehammer: Judgement Day
% 14.25/14.37 % Source : [Nip10]
% 14.25/14.37 % Names : Hoare-371_1 [Nip10]
% 14.25/14.37
% 14.25/14.37 % Status : Unsatisfiable
% 14.25/14.37 % Rating : 0.43 v8.1.0, 0.42 v7.4.0, 0.35 v7.3.0, 0.33 v7.1.0, 0.25 v7.0.0, 0.47 v6.3.0, 0.45 v6.2.0, 0.60 v6.1.0, 0.71 v6.0.0, 0.80 v5.5.0, 0.95 v5.4.0, 0.90 v5.3.0, 0.94 v5.2.0, 1.00 v5.0.0, 0.93 v4.1.0
% 14.25/14.37 % Syntax : Number of clauses : 847 ( 185 unt; 111 nHn; 473 RR)
% 14.25/14.37 % Number of literals : 2025 ( 470 equ;1093 neg)
% 14.25/14.37 % Maximal clause size : 7 ( 2 avg)
% 14.25/14.37 % Maximal term depth : 9 ( 2 avg)
% 14.25/14.37 % Number of predicates : 37 ( 36 usr; 0 prp; 1-6 aty)
% 14.25/14.37 % Number of functors : 50 ( 50 usr; 11 con; 0-5 aty)
% 14.25/14.37 % Number of variables : 2635 ( 258 sgn)
% 14.25/14.37 % SPC : CNF_UNS_RFO_SEQ_NHN
% 14.25/14.37
% 14.25/14.37 % Comments :
% 14.25/14.37 %------------------------------------------------------------------------------
% 14.25/14.37 cnf(cls_diff__less__Suc_0,axiom,
% 14.25/14.37 c_HOL_Oord__class_Oless(c_HOL_Ominus__class_Ominus(V_m,V_n,tc_nat),c_Suc(V_m),tc_nat) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_Un__absorb_0,axiom,
% 14.25/14.37 hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_A),V_A) = V_A ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_sup__idem_0,axiom,
% 14.25/14.37 ( ~ class_Lattices_Oupper__semilattice(T_a)
% 14.25/14.37 | hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_x),V_x) = V_x ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_order__less__trans_0,axiom,
% 14.25/14.37 ( ~ class_Orderings_Opreorder(T_a)
% 14.25/14.37 | c_HOL_Oord__class_Oless(V_x,V_z,T_a)
% 14.25/14.37 | ~ c_HOL_Oord__class_Oless(V_y,V_z,T_a)
% 14.25/14.37 | ~ c_HOL_Oord__class_Oless(V_x,V_y,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_psubset__trans_0,axiom,
% 14.25/14.37 ( c_HOL_Oord__class_Oless(V_A,V_C,tc_fun(T_a,tc_bool))
% 14.25/14.37 | ~ c_HOL_Oord__class_Oless(V_B,V_C,tc_fun(T_a,tc_bool))
% 14.25/14.37 | ~ c_HOL_Oord__class_Oless(V_A,V_B,tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_psubsetD_0,axiom,
% 14.25/14.37 ( c_in(V_c,V_B,T_a)
% 14.25/14.37 | ~ c_in(V_c,V_A,T_a)
% 14.25/14.37 | ~ c_HOL_Oord__class_Oless(V_A,V_B,tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_xt1_I10_J_0,axiom,
% 14.25/14.37 ( ~ class_Orderings_Oorder(T_a)
% 14.25/14.37 | c_HOL_Oord__class_Oless(V_z,V_x,T_a)
% 14.25/14.37 | ~ c_HOL_Oord__class_Oless(V_z,V_y,T_a)
% 14.25/14.37 | ~ c_HOL_Oord__class_Oless(V_y,V_x,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_neg__0__equal__iff__equal_0,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 14.25/14.37 | c_HOL_Ozero__class_Ozero(T_a) != c_HOL_Ouminus__class_Ouminus(V_a,T_a)
% 14.25/14.37 | c_HOL_Ozero__class_Ozero(T_a) = V_a ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_gr__implies__not0_0,axiom,
% 14.25/14.37 ~ c_HOL_Oord__class_Oless(V_m,c_HOL_Ozero__class_Ozero(tc_nat),tc_nat) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_not__less0_0,axiom,
% 14.25/14.37 ~ c_HOL_Oord__class_Oless(V_n,c_HOL_Ozero__class_Ozero(tc_nat),tc_nat) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_fold1__strict__below__iff_2,axiom,
% 14.25/14.37 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.37 | c_HOL_Oord__class_Oless(hAPP(c_Finite__Set_Ofold1(c_Orderings_Oord__class_Omin(T_a),T_a),V_A),V_x,T_a)
% 14.25/14.37 | ~ c_HOL_Oord__class_Oless(V_xa,V_x,T_a)
% 14.25/14.37 | ~ c_in(V_xa,V_A,T_a)
% 14.25/14.37 | V_A = c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool))
% 14.25/14.37 | ~ c_Finite__Set_Ofinite(V_A,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_strict__below__fold1__iff_0,axiom,
% 14.25/14.37 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.38 | c_HOL_Oord__class_Oless(V_x,V_xa,T_a)
% 14.25/14.38 | ~ c_in(V_xa,V_A,T_a)
% 14.25/14.38 | ~ c_HOL_Oord__class_Oless(V_x,hAPP(c_Finite__Set_Ofold1(c_Orderings_Oord__class_Omin(T_a),T_a),V_A),T_a)
% 14.25/14.38 | V_A = c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool))
% 14.25/14.38 | ~ c_Finite__Set_Ofinite(V_A,T_a) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_inf__min_0,axiom,
% 14.25/14.38 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.38 | ~ class_Lattices_Olower__semilattice(T_a)
% 14.25/14.38 | c_Lattices_Olower__semilattice__class_Oinf(T_a) = c_Orderings_Oord__class_Omin(T_a) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_max__diff__distrib__left_0,axiom,
% 14.25/14.38 ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 14.25/14.38 | c_HOL_Ominus__class_Ominus(hAPP(hAPP(c_Orderings_Oord__class_Omax(T_a),V_x),V_y),V_z,T_a) = hAPP(hAPP(c_Orderings_Oord__class_Omax(T_a),c_HOL_Ominus__class_Ominus(V_x,V_z,T_a)),c_HOL_Ominus__class_Ominus(V_y,V_z,T_a)) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_min__max_Oinf__assoc_0,axiom,
% 14.25/14.38 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.38 | hAPP(hAPP(c_Orderings_Oord__class_Omin(T_a),hAPP(hAPP(c_Orderings_Oord__class_Omin(T_a),V_x),V_y)),V_z) = hAPP(hAPP(c_Orderings_Oord__class_Omin(T_a),V_x),hAPP(hAPP(c_Orderings_Oord__class_Omin(T_a),V_y),V_z)) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_min__max_Oinf__left__commute_0,axiom,
% 14.25/14.38 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.38 | hAPP(hAPP(c_Orderings_Oord__class_Omin(T_a),V_x),hAPP(hAPP(c_Orderings_Oord__class_Omin(T_a),V_y),V_z)) = hAPP(hAPP(c_Orderings_Oord__class_Omin(T_a),V_y),hAPP(hAPP(c_Orderings_Oord__class_Omin(T_a),V_x),V_z)) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_diff__le__mono2_0,axiom,
% 14.25/14.38 ( c_lessequals(c_HOL_Ominus__class_Ominus(V_l,V_n,tc_nat),c_HOL_Ominus__class_Ominus(V_l,V_m,tc_nat),tc_nat)
% 14.25/14.38 | ~ c_lessequals(V_m,V_n,tc_nat) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_diff__le__mono_0,axiom,
% 14.25/14.38 ( c_lessequals(c_HOL_Ominus__class_Ominus(V_m,V_l,tc_nat),c_HOL_Ominus__class_Ominus(V_n,V_l,tc_nat),tc_nat)
% 14.25/14.38 | ~ c_lessequals(V_m,V_n,tc_nat) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_le__diff__iff_1,axiom,
% 14.25/14.38 ( c_lessequals(c_HOL_Ominus__class_Ominus(V_m,V_k,tc_nat),c_HOL_Ominus__class_Ominus(V_n,V_k,tc_nat),tc_nat)
% 14.25/14.38 | ~ c_lessequals(V_m,V_n,tc_nat)
% 14.25/14.38 | ~ c_lessequals(V_k,V_n,tc_nat)
% 14.25/14.38 | ~ c_lessequals(V_k,V_m,tc_nat) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_le__diff__iff_0,axiom,
% 14.25/14.38 ( c_lessequals(V_m,V_n,tc_nat)
% 14.25/14.38 | ~ c_lessequals(c_HOL_Ominus__class_Ominus(V_m,V_k,tc_nat),c_HOL_Ominus__class_Ominus(V_n,V_k,tc_nat),tc_nat)
% 14.25/14.38 | ~ c_lessequals(V_k,V_n,tc_nat)
% 14.25/14.38 | ~ c_lessequals(V_k,V_m,tc_nat) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_eq__diff__iff_0,axiom,
% 14.25/14.38 ( c_HOL_Ominus__class_Ominus(V_m,V_k,tc_nat) != c_HOL_Ominus__class_Ominus(V_n,V_k,tc_nat)
% 14.25/14.38 | ~ c_lessequals(V_k,V_n,tc_nat)
% 14.25/14.38 | ~ c_lessequals(V_k,V_m,tc_nat)
% 14.25/14.38 | V_m = V_n ) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_min__max_Oinf__sup__absorb_0,axiom,
% 14.25/14.38 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.38 | hAPP(hAPP(c_Orderings_Oord__class_Omin(T_a),V_x),hAPP(hAPP(c_Orderings_Oord__class_Omax(T_a),V_x),V_y)) = V_x ) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_diff__0__eq__0_0,axiom,
% 14.25/14.38 c_HOL_Ominus__class_Ominus(c_HOL_Ozero__class_Ozero(tc_nat),V_n,tc_nat) = c_HOL_Ozero__class_Ozero(tc_nat) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_Un__left__commute_0,axiom,
% 14.25/14.38 hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_A),hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_B),V_C)) = hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_B),hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_A),V_C)) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_Un__assoc_0,axiom,
% 14.25/14.38 hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_A),V_B)),V_C) = hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_A),hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_B),V_C)) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_sup__assoc_0,axiom,
% 14.25/14.38 ( ~ class_Lattices_Oupper__semilattice(T_a)
% 14.25/14.38 | hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_x),V_y)),V_z) = hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_x),hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_y),V_z)) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_sup__left__commute_0,axiom,
% 14.25/14.38 ( ~ class_Lattices_Oupper__semilattice(T_a)
% 14.25/14.38 | hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_x),hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_y),V_z)) = hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_y),hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_x),V_z)) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_inf__sup__aci_I7_J_0,axiom,
% 14.25/14.38 ( ~ class_Lattices_Olattice(T_a)
% 14.25/14.38 | hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_x),hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_y),V_z)) = hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_y),hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_x),V_z)) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_inf__sup__aci_I6_J_0,axiom,
% 14.25/14.38 ( ~ class_Lattices_Olattice(T_a)
% 14.25/14.38 | hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_x),V_y)),V_z) = hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_x),hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_y),V_z)) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_Max__def__raw_0,axiom,
% 14.25/14.38 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.38 | c_Finite__Set_Olinorder__class_OMax(T_a) = c_Finite__Set_Ofold1(c_Orderings_Oord__class_Omax(T_a),T_a) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_min__max_Oless__supI1_0,axiom,
% 14.25/14.38 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.38 | c_HOL_Oord__class_Oless(V_x,hAPP(hAPP(c_Orderings_Oord__class_Omax(T_a),V_a),V_b),T_a)
% 14.25/14.38 | ~ c_HOL_Oord__class_Oless(V_x,V_a,T_a) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_min__max_Oless__supI2_0,axiom,
% 14.25/14.38 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.38 | c_HOL_Oord__class_Oless(V_x,hAPP(hAPP(c_Orderings_Oord__class_Omax(T_a),V_a),V_b),T_a)
% 14.25/14.38 | ~ c_HOL_Oord__class_Oless(V_x,V_b,T_a) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_less__max__iff__disj_1,axiom,
% 14.25/14.38 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.38 | c_HOL_Oord__class_Oless(V_z,hAPP(hAPP(c_Orderings_Oord__class_Omax(T_a),V_x),V_y),T_a)
% 14.25/14.38 | ~ c_HOL_Oord__class_Oless(V_z,V_x,T_a) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_less__max__iff__disj_2,axiom,
% 14.25/14.38 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.38 | c_HOL_Oord__class_Oless(V_z,hAPP(hAPP(c_Orderings_Oord__class_Omax(T_a),V_x),V_y),T_a)
% 14.25/14.38 | ~ c_HOL_Oord__class_Oless(V_z,V_y,T_a) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_max__less__iff__conj_0,axiom,
% 14.25/14.38 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.38 | c_HOL_Oord__class_Oless(V_x,V_z,T_a)
% 14.25/14.38 | ~ c_HOL_Oord__class_Oless(hAPP(hAPP(c_Orderings_Oord__class_Omax(T_a),V_x),V_y),V_z,T_a) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_max__less__iff__conj_1,axiom,
% 14.25/14.38 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.38 | c_HOL_Oord__class_Oless(V_y,V_z,T_a)
% 14.25/14.38 | ~ c_HOL_Oord__class_Oless(hAPP(hAPP(c_Orderings_Oord__class_Omax(T_a),V_x),V_y),V_z,T_a) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_min__max_Oinf__commute_0,axiom,
% 14.25/14.38 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.38 | hAPP(hAPP(c_Orderings_Oord__class_Omin(T_a),V_x),V_y) = hAPP(hAPP(c_Orderings_Oord__class_Omin(T_a),V_y),V_x) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_diff__le__self_0,axiom,
% 14.25/14.38 c_lessequals(c_HOL_Ominus__class_Ominus(V_m,V_n,tc_nat),V_m,tc_nat) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_Un__Int__crazy_0,axiom,
% 14.25/14.38 hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_A),V_B)),hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_B),V_C))),hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_C),V_A)) = hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_A),V_B)),hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_B),V_C))),hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_C),V_A)) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_Compl__partition2_0,axiom,
% 14.25/14.38 hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),c_HOL_Ouminus__class_Ouminus(V_A,tc_fun(T_a,tc_bool))),V_A) = c_Orderings_Otop__class_Otop(tc_fun(T_a,tc_bool)) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_Compl__partition_0,axiom,
% 14.25/14.38 hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_A),c_HOL_Ouminus__class_Ouminus(V_A,tc_fun(T_a,tc_bool))) = c_Orderings_Otop__class_Otop(tc_fun(T_a,tc_bool)) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_inf__sup__distrib2_0,axiom,
% 14.25/14.38 ( ~ class_Lattices_Odistrib__lattice(T_a)
% 14.25/14.38 | hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_y),V_z)),V_x) = hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_y),V_x)),hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_z),V_x)) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_inf__sup__distrib1_0,axiom,
% 14.25/14.38 ( ~ class_Lattices_Odistrib__lattice(T_a)
% 14.25/14.38 | hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_x),hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_y),V_z)) = hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_x),V_y)),hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_x),V_z)) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_Int__Un__distrib_0,axiom,
% 14.25/14.38 hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_A),hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_B),V_C)) = hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_A),V_B)),hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_A),V_C)) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_Int__Un__distrib2_0,axiom,
% 14.25/14.38 hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_B),V_C)),V_A) = hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_B),V_A)),hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_C),V_A)) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_sup__eq__if_0,axiom,
% 14.25/14.38 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.38 | ~ class_OrderedGroup_Olordered__ab__group__add(T_a)
% 14.25/14.38 | hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_a),c_HOL_Ouminus__class_Ouminus(V_a,T_a)) = c_HOL_Ouminus__class_Ouminus(V_a,T_a)
% 14.25/14.38 | ~ c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_min__max_Oinf__left__idem_0,axiom,
% 14.25/14.38 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.38 | hAPP(hAPP(c_Orderings_Oord__class_Omin(T_a),V_x),hAPP(hAPP(c_Orderings_Oord__class_Omin(T_a),V_x),V_y)) = hAPP(hAPP(c_Orderings_Oord__class_Omin(T_a),V_x),V_y) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_min__less__iff__conj_2,axiom,
% 14.25/14.38 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.38 | c_HOL_Oord__class_Oless(V_z,hAPP(hAPP(c_Orderings_Oord__class_Omin(T_a),V_x),V_y),T_a)
% 14.25/14.38 | ~ c_HOL_Oord__class_Oless(V_z,V_y,T_a)
% 14.25/14.38 | ~ c_HOL_Oord__class_Oless(V_z,V_x,T_a) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_neg__less__0__iff__less_1,axiom,
% 14.25/14.38 ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 14.25/14.38 | c_HOL_Oord__class_Oless(c_HOL_Ouminus__class_Ouminus(V_a,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.25/14.38 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_neg__less__0__iff__less_0,axiom,
% 14.25/14.38 ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 14.25/14.38 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 14.25/14.38 | ~ c_HOL_Oord__class_Oless(c_HOL_Ouminus__class_Ouminus(V_a,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_ComplD_0,axiom,
% 14.25/14.38 ( ~ c_in(V_c,V_A,T_a)
% 14.25/14.38 | ~ c_in(V_c,c_HOL_Ouminus__class_Ouminus(V_A,tc_fun(T_a,tc_bool)),T_a) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_ComplI_0,axiom,
% 14.25/14.38 ( c_in(V_c,c_HOL_Ouminus__class_Ouminus(V_A,tc_fun(T_a,tc_bool)),T_a)
% 14.25/14.38 | c_in(V_c,V_A,T_a) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_max__less__iff__conj_2,axiom,
% 14.25/14.38 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.38 | c_HOL_Oord__class_Oless(hAPP(hAPP(c_Orderings_Oord__class_Omax(T_a),V_x),V_y),V_z,T_a)
% 14.25/14.38 | ~ c_HOL_Oord__class_Oless(V_y,V_z,T_a)
% 14.25/14.38 | ~ c_HOL_Oord__class_Oless(V_x,V_z,T_a) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_min__diff__distrib__left_0,axiom,
% 14.25/14.38 ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 14.25/14.38 | c_HOL_Ominus__class_Ominus(hAPP(hAPP(c_Orderings_Oord__class_Omin(T_a),V_x),V_y),V_z,T_a) = hAPP(hAPP(c_Orderings_Oord__class_Omin(T_a),c_HOL_Ominus__class_Ominus(V_x,V_z,T_a)),c_HOL_Ominus__class_Ominus(V_y,V_z,T_a)) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_min__max_Oinf__sup__distrib2_0,axiom,
% 14.25/14.38 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.38 | hAPP(hAPP(c_Orderings_Oord__class_Omin(T_a),hAPP(hAPP(c_Orderings_Oord__class_Omax(T_a),V_y),V_z)),V_x) = hAPP(hAPP(c_Orderings_Oord__class_Omax(T_a),hAPP(hAPP(c_Orderings_Oord__class_Omin(T_a),V_y),V_x)),hAPP(hAPP(c_Orderings_Oord__class_Omin(T_a),V_z),V_x)) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_min__max_Oinf__sup__distrib1_0,axiom,
% 14.25/14.38 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.38 | hAPP(hAPP(c_Orderings_Oord__class_Omin(T_a),V_x),hAPP(hAPP(c_Orderings_Oord__class_Omax(T_a),V_y),V_z)) = hAPP(hAPP(c_Orderings_Oord__class_Omax(T_a),hAPP(hAPP(c_Orderings_Oord__class_Omin(T_a),V_x),V_y)),hAPP(hAPP(c_Orderings_Oord__class_Omin(T_a),V_x),V_z)) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_sup__top__right_0,axiom,
% 14.25/14.38 ( ~ class_Lattices_Obounded__lattice(T_a)
% 14.25/14.38 | hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_x),c_Orderings_Otop__class_Otop(T_a)) = c_Orderings_Otop__class_Otop(T_a) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_sup__top__left_0,axiom,
% 14.25/14.38 ( ~ class_Lattices_Obounded__lattice(T_a)
% 14.25/14.38 | hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),c_Orderings_Otop__class_Otop(T_a)),V_x) = c_Orderings_Otop__class_Otop(T_a) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_Un__UNIV__left_0,axiom,
% 14.25/14.38 hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),c_Orderings_Otop__class_Otop(tc_fun(T_a,tc_bool))),V_B) = c_Orderings_Otop__class_Otop(tc_fun(T_a,tc_bool)) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_Un__UNIV__right_0,axiom,
% 14.25/14.38 hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_A),c_Orderings_Otop__class_Otop(tc_fun(T_a,tc_bool))) = c_Orderings_Otop__class_Otop(tc_fun(T_a,tc_bool)) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_Compl__Diff__eq_0,axiom,
% 14.25/14.38 c_HOL_Ouminus__class_Ouminus(c_HOL_Ominus__class_Ominus(V_A,V_B,tc_fun(T_a,tc_bool)),tc_fun(T_a,tc_bool)) = hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),c_HOL_Ouminus__class_Ouminus(V_A,tc_fun(T_a,tc_bool))),V_B) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_linorder__class_OMin__def__raw_0,axiom,
% 14.25/14.38 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.38 | c_Finite__Set_Olinorder__class_OMin(T_a) = c_Finite__Set_Ofold1(c_Orderings_Oord__class_Omin(T_a),T_a) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_diff__less__mono2_0,axiom,
% 14.25/14.38 ( c_HOL_Oord__class_Oless(c_HOL_Ominus__class_Ominus(V_l,V_n,tc_nat),c_HOL_Ominus__class_Ominus(V_l,V_m,tc_nat),tc_nat)
% 14.25/14.38 | ~ c_HOL_Oord__class_Oless(V_m,V_l,tc_nat)
% 14.25/14.38 | ~ c_HOL_Oord__class_Oless(V_m,V_n,tc_nat) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_diff__self__eq__0_0,axiom,
% 14.25/14.38 c_HOL_Ominus__class_Ominus(V_m,V_m,tc_nat) = c_HOL_Ozero__class_Ozero(tc_nat) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_minus__nat_Odiff__0_0,axiom,
% 14.25/14.38 c_HOL_Ominus__class_Ominus(V_m,c_HOL_Ozero__class_Ozero(tc_nat),tc_nat) = V_m ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_fun__upd__twist_0,axiom,
% 14.25/14.38 ( c_Fun_Ofun__upd(c_Fun_Ofun__upd(V_m,V_a,V_b,T_a,T_b),V_c,V_d,T_a,T_b) = c_Fun_Ofun__upd(c_Fun_Ofun__upd(V_m,V_c,V_d,T_a,T_b),V_a,V_b,T_a,T_b)
% 14.25/14.38 | V_a = V_c ) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_less__max__iff__disj_0,axiom,
% 14.25/14.38 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.38 | c_HOL_Oord__class_Oless(V_z,V_y,T_a)
% 14.25/14.38 | c_HOL_Oord__class_Oless(V_z,V_x,T_a)
% 14.25/14.38 | ~ c_HOL_Oord__class_Oless(V_z,hAPP(hAPP(c_Orderings_Oord__class_Omax(T_a),V_x),V_y),T_a) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_sup1E_0,axiom,
% 14.25/14.38 ( hBOOL(hAPP(V_B,V_x))
% 14.25/14.38 | hBOOL(hAPP(V_A,V_x))
% 14.25/14.38 | ~ hBOOL(hAPP(hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_A),V_B),V_x)) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_sup1CI_0,axiom,
% 14.25/14.38 ( hBOOL(hAPP(hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_A),V_B),V_x))
% 14.25/14.38 | ~ hBOOL(hAPP(V_B,V_x)) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_sup1CI_1,axiom,
% 14.25/14.38 ( hBOOL(hAPP(hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_A),V_B),V_x))
% 14.25/14.38 | ~ hBOOL(hAPP(V_A,V_x)) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_UnE_0,axiom,
% 14.25/14.38 ( c_in(V_c,V_B,T_a)
% 14.25/14.38 | c_in(V_c,V_A,T_a)
% 14.25/14.38 | ~ c_in(V_c,hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_A),V_B),T_a) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_sup__max_0,axiom,
% 14.25/14.38 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.38 | ~ class_Lattices_Oupper__semilattice(T_a)
% 14.25/14.39 | c_Lattices_Oupper__semilattice__class_Osup(T_a) = c_Orderings_Oord__class_Omax(T_a) ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_min__less__iff__disj_0,axiom,
% 14.25/14.39 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.39 | c_HOL_Oord__class_Oless(V_y,V_z,T_a)
% 14.25/14.39 | c_HOL_Oord__class_Oless(V_x,V_z,T_a)
% 14.25/14.39 | ~ c_HOL_Oord__class_Oless(hAPP(hAPP(c_Orderings_Oord__class_Omin(T_a),V_x),V_y),V_z,T_a) ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_diff__Suc__Suc_0,axiom,
% 14.25/14.39 c_HOL_Ominus__class_Ominus(c_Suc(V_m),c_Suc(V_n),tc_nat) = c_HOL_Ominus__class_Ominus(V_m,V_n,tc_nat) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_neg__less__iff__less_1,axiom,
% 14.25/14.39 ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 14.25/14.39 | c_HOL_Oord__class_Oless(c_HOL_Ouminus__class_Ouminus(V_b,T_a),c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a)
% 14.25/14.39 | ~ c_HOL_Oord__class_Oless(V_a,V_b,T_a) ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_neg__less__iff__less_0,axiom,
% 14.25/14.39 ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 14.25/14.39 | c_HOL_Oord__class_Oless(V_a,V_b,T_a)
% 14.25/14.39 | ~ c_HOL_Oord__class_Oless(c_HOL_Ouminus__class_Ouminus(V_b,T_a),c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a) ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_less__SucE_0,axiom,
% 14.25/14.39 ( V_m = V_n
% 14.25/14.39 | c_HOL_Oord__class_Oless(V_m,V_n,tc_nat)
% 14.25/14.39 | ~ c_HOL_Oord__class_Oless(V_m,c_Suc(V_n),tc_nat) ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_less__antisym_0,axiom,
% 14.25/14.39 ( V_m = V_n
% 14.25/14.39 | ~ c_HOL_Oord__class_Oless(V_n,c_Suc(V_m),tc_nat)
% 14.25/14.39 | c_HOL_Oord__class_Oless(V_n,V_m,tc_nat) ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_not__less__less__Suc__eq_0,axiom,
% 14.25/14.39 ( V_n = V_m
% 14.25/14.39 | ~ c_HOL_Oord__class_Oless(V_n,c_Suc(V_m),tc_nat)
% 14.25/14.39 | c_HOL_Oord__class_Oless(V_n,V_m,tc_nat) ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_sup__0__imp__0_0,axiom,
% 14.25/14.39 ( ~ class_OrderedGroup_Olordered__ab__group__add(T_a)
% 14.25/14.39 | hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_a),c_HOL_Ouminus__class_Ouminus(V_a,T_a)) != c_HOL_Ozero__class_Ozero(T_a)
% 14.25/14.39 | V_a = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_neg__equal__0__iff__equal_0,axiom,
% 14.25/14.39 ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 14.25/14.39 | c_HOL_Ouminus__class_Ouminus(V_a,T_a) != c_HOL_Ozero__class_Ozero(T_a)
% 14.25/14.39 | V_a = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_less__imp__diff__less_0,axiom,
% 14.25/14.39 ( c_HOL_Oord__class_Oless(c_HOL_Ominus__class_Ominus(V_j,V_n,tc_nat),V_k,tc_nat)
% 14.25/14.39 | ~ c_HOL_Oord__class_Oless(V_j,V_k,tc_nat) ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_fun__upd__upd_0,axiom,
% 14.25/14.39 c_Fun_Ofun__upd(c_Fun_Ofun__upd(V_f,V_x,V_y,T_a,T_b),V_x,V_z,T_a,T_b) = c_Fun_Ofun__upd(V_f,V_x,V_z,T_a,T_b) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_psubset__eq_1,axiom,
% 14.25/14.39 ~ c_HOL_Oord__class_Oless(V_x,V_x,tc_fun(T_a,tc_bool)) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_nat__less__le_1,axiom,
% 14.25/14.39 ~ c_HOL_Oord__class_Oless(V_x,V_x,tc_nat) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_less__not__refl_0,axiom,
% 14.25/14.39 ~ c_HOL_Oord__class_Oless(V_n,V_n,tc_nat) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_order__less__le_1,axiom,
% 14.25/14.39 ( ~ class_Orderings_Oorder(T_a)
% 14.25/14.39 | ~ c_HOL_Oord__class_Oless(V_x,V_x,T_a) ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_linorder__neq__iff_1,axiom,
% 14.25/14.39 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.39 | ~ c_HOL_Oord__class_Oless(V_x,V_x,T_a) ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_order__less__irrefl_0,axiom,
% 14.25/14.39 ( ~ class_Orderings_Opreorder(T_a)
% 14.25/14.39 | ~ c_HOL_Oord__class_Oless(V_x,V_x,T_a) ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_sup__inf__absorb_0,axiom,
% 14.25/14.39 ( ~ class_Lattices_Olattice(T_a)
% 14.25/14.39 | hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_x),hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_x),V_y)) = V_x ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_min__max_Oinf__idem_0,axiom,
% 14.25/14.39 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.39 | hAPP(hAPP(c_Orderings_Oord__class_Omin(T_a),V_x),V_x) = V_x ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_compl__eq__compl__iff_0,axiom,
% 14.25/14.39 ( ~ class_Lattices_Oboolean__algebra(T_a)
% 14.25/14.39 | c_HOL_Ouminus__class_Ouminus(V_x,T_a) != c_HOL_Ouminus__class_Ouminus(V_y,T_a)
% 14.25/14.39 | V_x = V_y ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_neg__equal__iff__equal_0,axiom,
% 14.25/14.39 ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 14.25/14.39 | c_HOL_Ouminus__class_Ouminus(V_a,T_a) != c_HOL_Ouminus__class_Ouminus(V_b,T_a)
% 14.25/14.39 | V_a = V_b ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_Compl__eq__Compl__iff_0,axiom,
% 14.25/14.39 ( c_HOL_Ouminus__class_Ouminus(V_A,tc_fun(T_a,tc_bool)) != c_HOL_Ouminus__class_Ouminus(V_B,tc_fun(T_a,tc_bool))
% 14.25/14.39 | V_A = V_B ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_linorder__neqE__ordered__idom_0,axiom,
% 14.25/14.39 ( ~ class_Ring__and__Field_Oordered__idom(T_a)
% 14.25/14.39 | c_HOL_Oord__class_Oless(V_y,V_x,T_a)
% 14.25/14.39 | c_HOL_Oord__class_Oless(V_x,V_y,T_a)
% 14.25/14.39 | V_x = V_y ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_not__less__iff__gr__or__eq_0,axiom,
% 14.25/14.39 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.39 | V_x = V_y
% 14.25/14.39 | c_HOL_Oord__class_Oless(V_y,V_x,T_a)
% 14.25/14.39 | c_HOL_Oord__class_Oless(V_x,V_y,T_a) ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_nat__neq__iff_0,axiom,
% 14.25/14.39 ( c_HOL_Oord__class_Oless(V_n,V_m,tc_nat)
% 14.25/14.39 | c_HOL_Oord__class_Oless(V_m,V_n,tc_nat)
% 14.25/14.39 | V_m = V_n ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_nat__less__cases_0,axiom,
% 14.25/14.39 ( hBOOL(hAPP(hAPP(V_P,V_n),V_m))
% 14.25/14.39 | c_HOL_Oord__class_Oless(V_n,V_m,tc_nat)
% 14.25/14.39 | V_m = V_n
% 14.25/14.39 | c_HOL_Oord__class_Oless(V_m,V_n,tc_nat) ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_diffs0__imp__equal_0,axiom,
% 14.25/14.39 ( c_HOL_Ominus__class_Ominus(V_n,V_m,tc_nat) != c_HOL_Ozero__class_Ozero(tc_nat)
% 14.25/14.39 | c_HOL_Ominus__class_Ominus(V_m,V_n,tc_nat) != c_HOL_Ozero__class_Ozero(tc_nat)
% 14.25/14.39 | V_m = V_n ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_linorder__neqE__nat_0,axiom,
% 14.25/14.39 ( c_HOL_Oord__class_Oless(V_y,V_x,tc_nat)
% 14.25/14.39 | c_HOL_Oord__class_Oless(V_x,V_y,tc_nat)
% 14.25/14.39 | V_x = V_y ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_linorder__neqE_0,axiom,
% 14.25/14.39 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.39 | c_HOL_Oord__class_Oless(V_y,V_x,T_a)
% 14.25/14.39 | c_HOL_Oord__class_Oless(V_x,V_y,T_a)
% 14.25/14.39 | V_x = V_y ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_linorder__less__linear_0,axiom,
% 14.25/14.39 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.39 | c_HOL_Oord__class_Oless(V_y,V_x,T_a)
% 14.25/14.39 | V_x = V_y
% 14.25/14.39 | c_HOL_Oord__class_Oless(V_x,V_y,T_a) ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_linorder__antisym__conv3_0,axiom,
% 14.25/14.39 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.39 | V_x = V_y
% 14.25/14.39 | c_HOL_Oord__class_Oless(V_x,V_y,T_a)
% 14.25/14.39 | c_HOL_Oord__class_Oless(V_y,V_x,T_a) ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_min__max_Osup__idem_0,axiom,
% 14.25/14.39 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.39 | hAPP(hAPP(c_Orderings_Oord__class_Omax(T_a),V_x),V_x) = V_x ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_inf__sup__absorb_0,axiom,
% 14.25/14.39 ( ~ class_Lattices_Olattice(T_a)
% 14.25/14.39 | hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_x),hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_x),V_y)) = V_x ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_less__infI2_0,axiom,
% 14.25/14.39 ( ~ class_Lattices_Olower__semilattice(T_a)
% 14.25/14.39 | c_HOL_Oord__class_Oless(hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_a),V_b),V_x,T_a)
% 14.25/14.39 | ~ c_HOL_Oord__class_Oless(V_b,V_x,T_a) ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_less__infI1_0,axiom,
% 14.25/14.39 ( ~ class_Lattices_Olower__semilattice(T_a)
% 14.25/14.39 | c_HOL_Oord__class_Oless(hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_a),V_b),V_x,T_a)
% 14.25/14.39 | ~ c_HOL_Oord__class_Oless(V_a,V_x,T_a) ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_termination__basic__simps_I5_J_0,axiom,
% 14.25/14.39 ( c_lessequals(V_x,V_y,tc_nat)
% 14.25/14.39 | ~ c_HOL_Oord__class_Oless(V_x,V_y,tc_nat) ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_nat__less__le_0,axiom,
% 14.25/14.39 ( c_lessequals(V_m,V_n,tc_nat)
% 14.25/14.39 | ~ c_HOL_Oord__class_Oless(V_m,V_n,tc_nat) ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_lessI_0,axiom,
% 14.25/14.39 c_HOL_Oord__class_Oless(V_n,c_Suc(V_n),tc_nat) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_less__Suc__eq_2,axiom,
% 14.25/14.39 c_HOL_Oord__class_Oless(V_x,c_Suc(V_x),tc_nat) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_less__trans__Suc_0,axiom,
% 14.25/14.39 ( c_HOL_Oord__class_Oless(c_Suc(V_i),V_k,tc_nat)
% 14.25/14.39 | ~ c_HOL_Oord__class_Oless(V_j,V_k,tc_nat)
% 14.25/14.39 | ~ c_HOL_Oord__class_Oless(V_i,V_j,tc_nat) ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_fun__upd__idem_0,axiom,
% 14.25/14.39 c_Fun_Ofun__upd(V_f,V_x,hAPP(V_f,V_x),T_b,T_a) = V_f ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_fun__upd__same_0,axiom,
% 14.25/14.39 hAPP(c_Fun_Ofun__upd(V_f,V_x,V_y,T_b,T_a),V_x) = V_y ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_fun__upd__triv_0,axiom,
% 14.25/14.39 c_Fun_Ofun__upd(V_f,V_x,hAPP(V_f,V_x),T_a,T_b) = V_f ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_fun__upd__apply_0,axiom,
% 14.25/14.39 hAPP(c_Fun_Ofun__upd(V_f,V_x,V_y,T_a,T_aa),V_x) = V_y ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_fun__upd__idem__iff_1,axiom,
% 14.25/14.39 c_Fun_Ofun__upd(V_f,V_x,hAPP(V_f,V_x),T_aa,T_a) = V_f ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_neg__0__equal__iff__equal_1,axiom,
% 14.25/14.39 ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 14.25/14.39 | c_HOL_Ozero__class_Ozero(T_a) = c_HOL_Ouminus__class_Ouminus(c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_gr0I_0,axiom,
% 14.25/14.39 ( c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_nat),V_n,tc_nat)
% 14.25/14.39 | V_n = c_HOL_Ozero__class_Ozero(tc_nat) ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_neq0__conv_1,axiom,
% 14.25/14.39 ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_nat),c_HOL_Ozero__class_Ozero(tc_nat),tc_nat) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_neg__equal__zero_1,axiom,
% 14.25/14.39 ( ~ class_OrderedGroup_Oordered__ab__group__add(T_a)
% 14.25/14.39 | c_HOL_Ouminus__class_Ouminus(c_HOL_Ozero__class_Ozero(T_a),T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_minus__zero_0,axiom,
% 14.25/14.39 ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 14.25/14.39 | c_HOL_Ouminus__class_Ouminus(c_HOL_Ozero__class_Ozero(T_a),T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_sup__inf__distrib2_0,axiom,
% 14.25/14.39 ( ~ class_Lattices_Odistrib__lattice(T_a)
% 14.25/14.39 | hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_y),V_z)),V_x) = hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_y),V_x)),hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_z),V_x)) ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_sup__inf__distrib1_0,axiom,
% 14.25/14.39 ( ~ class_Lattices_Odistrib__lattice(T_a)
% 14.25/14.39 | hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_x),hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_y),V_z)) = hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_x),V_y)),hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_x),V_z)) ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_Un__Int__distrib_0,axiom,
% 14.25/14.39 hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_A),hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_B),V_C)) = hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_A),V_B)),hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_A),V_C)) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_Un__Int__distrib2_0,axiom,
% 14.25/14.39 hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_B),V_C)),V_A) = hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_B),V_A)),hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_C),V_A)) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_less__diff__iff_0,axiom,
% 14.25/14.39 ( c_HOL_Oord__class_Oless(V_m,V_n,tc_nat)
% 14.25/14.39 | ~ c_HOL_Oord__class_Oless(c_HOL_Ominus__class_Ominus(V_m,V_k,tc_nat),c_HOL_Ominus__class_Ominus(V_n,V_k,tc_nat),tc_nat)
% 14.25/14.39 | ~ c_lessequals(V_k,V_n,tc_nat)
% 14.25/14.39 | ~ c_lessequals(V_k,V_m,tc_nat) ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_less__diff__iff_1,axiom,
% 14.25/14.39 ( c_HOL_Oord__class_Oless(c_HOL_Ominus__class_Ominus(V_m,V_k,tc_nat),c_HOL_Ominus__class_Ominus(V_n,V_k,tc_nat),tc_nat)
% 14.25/14.39 | ~ c_HOL_Oord__class_Oless(V_m,V_n,tc_nat)
% 14.25/14.39 | ~ c_lessequals(V_k,V_n,tc_nat)
% 14.25/14.39 | ~ c_lessequals(V_k,V_m,tc_nat) ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_sup__eq__if_1,axiom,
% 14.25/14.39 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.39 | ~ class_OrderedGroup_Olordered__ab__group__add(T_a)
% 14.25/14.39 | hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_a),c_HOL_Ouminus__class_Ouminus(V_a,T_a)) = V_a
% 14.25/14.39 | c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_UnCI_0,axiom,
% 14.25/14.39 ( c_in(V_c,hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_A),V_B),T_a)
% 14.25/14.39 | ~ c_in(V_c,V_B,T_a) ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_UnCI_1,axiom,
% 14.25/14.39 ( c_in(V_c,hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_A),V_B),T_a)
% 14.25/14.39 | ~ c_in(V_c,V_A,T_a) ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_nat__diff__split_0,axiom,
% 14.25/14.39 ( hBOOL(hAPP(V_P,c_HOL_Ozero__class_Ozero(tc_nat)))
% 14.25/14.39 | ~ c_HOL_Oord__class_Oless(V_a,V_b,tc_nat)
% 14.25/14.39 | ~ hBOOL(hAPP(V_P,c_HOL_Ominus__class_Ominus(V_a,V_b,tc_nat))) ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_zero__less__diff_0,axiom,
% 14.25/14.39 ( c_HOL_Oord__class_Oless(V_m,V_n,tc_nat)
% 14.25/14.39 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_nat),c_HOL_Ominus__class_Ominus(V_n,V_m,tc_nat),tc_nat) ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_zero__less__diff_1,axiom,
% 14.25/14.39 ( c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_nat),c_HOL_Ominus__class_Ominus(V_n,V_m,tc_nat),tc_nat)
% 14.25/14.39 | ~ c_HOL_Oord__class_Oless(V_m,V_n,tc_nat) ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_Suc__lessD_0,axiom,
% 14.25/14.39 ( c_HOL_Oord__class_Oless(V_m,V_n,tc_nat)
% 14.25/14.39 | ~ c_HOL_Oord__class_Oless(c_Suc(V_m),V_n,tc_nat) ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_less__SucI_0,axiom,
% 14.25/14.39 ( c_HOL_Oord__class_Oless(V_m,c_Suc(V_n),tc_nat)
% 14.25/14.39 | ~ c_HOL_Oord__class_Oless(V_m,V_n,tc_nat) ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_Suc__pred_0,axiom,
% 14.25/14.39 ( c_Suc(c_HOL_Ominus__class_Ominus(V_n,c_Suc(c_HOL_Ozero__class_Ozero(tc_nat)),tc_nat)) = V_n
% 14.25/14.39 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_nat),V_n,tc_nat) ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_diff__less_0,axiom,
% 14.25/14.39 ( c_HOL_Oord__class_Oless(c_HOL_Ominus__class_Ominus(V_m,V_n,tc_nat),V_m,tc_nat)
% 14.25/14.39 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_nat),V_m,tc_nat)
% 14.25/14.39 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_nat),V_n,tc_nat) ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_fun__upd__apply_1,axiom,
% 14.25/14.39 ( hAPP(c_Fun_Ofun__upd(V_f,V_x,V_y,T_b,T_a),V_z) = hAPP(V_f,V_z)
% 14.25/14.39 | V_z = V_x ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_fun__upd__other_0,axiom,
% 14.25/14.39 ( hAPP(c_Fun_Ofun__upd(V_f,V_x,V_y,T_a,T_b),V_z) = hAPP(V_f,V_z)
% 14.25/14.39 | V_z = V_x ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_min__max_Odistrib__sup__le_0,axiom,
% 14.25/14.39 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.39 | c_lessequals(hAPP(hAPP(c_Orderings_Oord__class_Omax(T_a),V_x),hAPP(hAPP(c_Orderings_Oord__class_Omin(T_a),V_y),V_z)),hAPP(hAPP(c_Orderings_Oord__class_Omin(T_a),hAPP(hAPP(c_Orderings_Oord__class_Omax(T_a),V_x),V_y)),hAPP(hAPP(c_Orderings_Oord__class_Omax(T_a),V_x),V_z)),T_a) ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_compl__sup__top_0,axiom,
% 14.25/14.39 ( ~ class_Lattices_Oboolean__algebra(T_a)
% 14.25/14.39 | hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),c_HOL_Ouminus__class_Ouminus(V_x,T_a)),V_x) = c_Orderings_Otop__class_Otop(T_a) ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_sup__compl__top_0,axiom,
% 14.25/14.39 ( ~ class_Lattices_Oboolean__algebra(T_a)
% 14.25/14.39 | hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_x),c_HOL_Ouminus__class_Ouminus(V_x,T_a)) = c_Orderings_Otop__class_Otop(T_a) ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_min__max_Oless__infI1_0,axiom,
% 14.25/14.39 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.39 | c_HOL_Oord__class_Oless(hAPP(hAPP(c_Orderings_Oord__class_Omin(T_a),V_a),V_b),V_x,T_a)
% 14.25/14.39 | ~ c_HOL_Oord__class_Oless(V_a,V_x,T_a) ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_min__max_Oless__infI2_0,axiom,
% 14.25/14.39 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.39 | c_HOL_Oord__class_Oless(hAPP(hAPP(c_Orderings_Oord__class_Omin(T_a),V_a),V_b),V_x,T_a)
% 14.25/14.39 | ~ c_HOL_Oord__class_Oless(V_b,V_x,T_a) ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_min__less__iff__conj_0,axiom,
% 14.25/14.39 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.39 | c_HOL_Oord__class_Oless(V_z,V_x,T_a)
% 14.25/14.39 | ~ c_HOL_Oord__class_Oless(V_z,hAPP(hAPP(c_Orderings_Oord__class_Omin(T_a),V_x),V_y),T_a) ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_min__less__iff__conj_1,axiom,
% 14.25/14.39 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.39 | c_HOL_Oord__class_Oless(V_z,V_y,T_a)
% 14.25/14.39 | ~ c_HOL_Oord__class_Oless(V_z,hAPP(hAPP(c_Orderings_Oord__class_Omin(T_a),V_x),V_y),T_a) ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_min__less__iff__disj_1,axiom,
% 14.25/14.39 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.39 | c_HOL_Oord__class_Oless(hAPP(hAPP(c_Orderings_Oord__class_Omin(T_a),V_x),V_y),V_z,T_a)
% 14.25/14.39 | ~ c_HOL_Oord__class_Oless(V_x,V_z,T_a) ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_min__less__iff__disj_2,axiom,
% 14.25/14.39 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.39 | c_HOL_Oord__class_Oless(hAPP(hAPP(c_Orderings_Oord__class_Omin(T_a),V_x),V_y),V_z,T_a)
% 14.25/14.39 | ~ c_HOL_Oord__class_Oless(V_y,V_z,T_a) ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_Nat_Odiff__diff__eq_0,axiom,
% 14.25/14.39 ( c_HOL_Ominus__class_Ominus(c_HOL_Ominus__class_Ominus(V_m,V_k,tc_nat),c_HOL_Ominus__class_Ominus(V_n,V_k,tc_nat),tc_nat) = c_HOL_Ominus__class_Ominus(V_m,V_n,tc_nat)
% 14.25/14.39 | ~ c_lessequals(V_k,V_n,tc_nat)
% 14.25/14.39 | ~ c_lessequals(V_k,V_m,tc_nat) ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_diff__commute_0,axiom,
% 14.25/14.39 c_HOL_Ominus__class_Ominus(c_HOL_Ominus__class_Ominus(V_i,V_j,tc_nat),V_k,tc_nat) = c_HOL_Ominus__class_Ominus(c_HOL_Ominus__class_Ominus(V_i,V_k,tc_nat),V_j,tc_nat) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_diff__less__mono_0,axiom,
% 14.25/14.39 ( c_HOL_Oord__class_Oless(c_HOL_Ominus__class_Ominus(V_a,V_c,tc_nat),c_HOL_Ominus__class_Ominus(V_b,V_c,tc_nat),tc_nat)
% 14.25/14.39 | ~ c_lessequals(V_c,V_a,tc_nat)
% 14.25/14.39 | ~ c_HOL_Oord__class_Oless(V_a,V_b,tc_nat) ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_vimage__Compl_0,axiom,
% 14.25/14.39 c_Set_Ovimage(V_f,c_HOL_Ouminus__class_Ouminus(V_A,tc_fun(T_b,tc_bool)),T_a,T_b) = c_HOL_Ouminus__class_Ouminus(c_Set_Ovimage(V_f,V_A,T_a,T_b),tc_fun(T_a,tc_bool)) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_Suc__lessI_0,axiom,
% 14.25/14.39 ( c_HOL_Oord__class_Oless(c_Suc(V_m),V_n,tc_nat)
% 14.25/14.39 | c_Suc(V_m) = V_n
% 14.25/14.39 | ~ c_HOL_Oord__class_Oless(V_m,V_n,tc_nat) ) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_Un__Diff__cancel2_0,axiom,
% 14.25/14.39 hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),c_HOL_Ominus__class_Ominus(V_B,V_A,tc_fun(T_a,tc_bool))),V_A) = hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_B),V_A) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_Un__Diff__cancel_0,axiom,
% 14.25/14.39 hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_A),c_HOL_Ominus__class_Ominus(V_B,V_A,tc_fun(T_a,tc_bool))) = hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_A),V_B) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_Suc__diff__diff_0,axiom,
% 14.25/14.39 c_HOL_Ominus__class_Ominus(c_HOL_Ominus__class_Ominus(c_Suc(V_m),V_n,tc_nat),c_Suc(V_k),tc_nat) = c_HOL_Ominus__class_Ominus(c_HOL_Ominus__class_Ominus(V_m,V_n,tc_nat),V_k,tc_nat) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_Un__Diff_0,axiom,
% 14.25/14.39 c_HOL_Ominus__class_Ominus(hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_A),V_B),V_C,tc_fun(T_a,tc_bool)) = hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),c_HOL_Ominus__class_Ominus(V_A,V_C,tc_fun(T_a,tc_bool))),c_HOL_Ominus__class_Ominus(V_B,V_C,tc_fun(T_a,tc_bool))) ).
% 14.25/14.39
% 14.25/14.39 cnf(cls_inf__eq__neg__sup_0,axiom,
% 14.25/14.40 ( ~ class_OrderedGroup_Olordered__ab__group__add(T_a)
% 14.25/14.40 | hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_a),V_b) = c_HOL_Ouminus__class_Ouminus(hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),c_HOL_Ouminus__class_Ouminus(V_a,T_a)),c_HOL_Ouminus__class_Ouminus(V_b,T_a)),T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_Un__commute_0,axiom,
% 14.25/14.40 hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_A),V_B) = hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_B),V_A) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_sup__commute_0,axiom,
% 14.25/14.40 ( ~ class_Lattices_Oupper__semilattice(T_a)
% 14.25/14.40 | hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_x),V_y) = hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_y),V_x) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_inf__sup__aci_I5_J_0,axiom,
% 14.25/14.40 ( ~ class_Lattices_Olattice(T_a)
% 14.25/14.40 | hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_x),V_y) = hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_y),V_x) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_Compl__Int_0,axiom,
% 14.25/14.40 c_HOL_Ouminus__class_Ouminus(hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_A),V_B),tc_fun(T_a,tc_bool)) = hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),c_HOL_Ouminus__class_Ouminus(V_A,tc_fun(T_a,tc_bool))),c_HOL_Ouminus__class_Ouminus(V_B,tc_fun(T_a,tc_bool))) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_compl__inf_0,axiom,
% 14.25/14.40 ( ~ class_Lattices_Oboolean__algebra(T_a)
% 14.25/14.40 | c_HOL_Ouminus__class_Ouminus(hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_x),V_y),T_a) = hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),c_HOL_Ouminus__class_Ouminus(V_x,T_a)),c_HOL_Ouminus__class_Ouminus(V_y,T_a)) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_neg__inf__eq__sup_0,axiom,
% 14.25/14.40 ( ~ class_OrderedGroup_Olordered__ab__group__add(T_a)
% 14.25/14.40 | c_HOL_Ouminus__class_Ouminus(hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_a),V_b),T_a) = hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),c_HOL_Ouminus__class_Ouminus(V_a,T_a)),c_HOL_Ouminus__class_Ouminus(V_b,T_a)) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_min__max_Osup__commute_0,axiom,
% 14.25/14.40 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.40 | hAPP(hAPP(c_Orderings_Oord__class_Omax(T_a),V_x),V_y) = hAPP(hAPP(c_Orderings_Oord__class_Omax(T_a),V_y),V_x) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_Un__left__absorb_0,axiom,
% 14.25/14.40 hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_A),hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_A),V_B)) = hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_A),V_B) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_sup__left__idem_0,axiom,
% 14.25/14.40 ( ~ class_Lattices_Oupper__semilattice(T_a)
% 14.25/14.40 | hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_x),hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_x),V_y)) = hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_x),V_y) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_inf__sup__aci_I8_J_0,axiom,
% 14.25/14.40 ( ~ class_Lattices_Olattice(T_a)
% 14.25/14.40 | hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_x),hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_x),V_y)) = hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_x),V_y) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_min__max_Odistrib__inf__le_0,axiom,
% 14.25/14.40 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.40 | c_lessequals(hAPP(hAPP(c_Orderings_Oord__class_Omax(T_a),hAPP(hAPP(c_Orderings_Oord__class_Omin(T_a),V_x),V_y)),hAPP(hAPP(c_Orderings_Oord__class_Omin(T_a),V_x),V_z)),hAPP(hAPP(c_Orderings_Oord__class_Omin(T_a),V_x),hAPP(hAPP(c_Orderings_Oord__class_Omax(T_a),V_y),V_z)),T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_Compl__Un_0,axiom,
% 14.25/14.40 c_HOL_Ouminus__class_Ouminus(hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_A),V_B),tc_fun(T_a,tc_bool)) = hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),c_HOL_Ouminus__class_Ouminus(V_A,tc_fun(T_a,tc_bool))),c_HOL_Ouminus__class_Ouminus(V_B,tc_fun(T_a,tc_bool))) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_compl__sup_0,axiom,
% 14.25/14.40 ( ~ class_Lattices_Oboolean__algebra(T_a)
% 14.25/14.40 | c_HOL_Ouminus__class_Ouminus(hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_x),V_y),T_a) = hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),c_HOL_Ouminus__class_Ouminus(V_x,T_a)),c_HOL_Ouminus__class_Ouminus(V_y,T_a)) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_neg__sup__eq__inf_0,axiom,
% 14.25/14.40 ( ~ class_OrderedGroup_Olordered__ab__group__add(T_a)
% 14.25/14.40 | c_HOL_Ouminus__class_Ouminus(hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_a),V_b),T_a) = hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),c_HOL_Ouminus__class_Ouminus(V_a,T_a)),c_HOL_Ouminus__class_Ouminus(V_b,T_a)) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_min__max_Osup__inf__absorb_0,axiom,
% 14.25/14.40 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.40 | hAPP(hAPP(c_Orderings_Oord__class_Omax(T_a),V_x),hAPP(hAPP(c_Orderings_Oord__class_Omin(T_a),V_x),V_y)) = V_x ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_diff__diff__cancel_0,axiom,
% 14.25/14.40 ( c_HOL_Ominus__class_Ominus(V_n,c_HOL_Ominus__class_Ominus(V_n,V_i,tc_nat),tc_nat) = V_i
% 14.25/14.40 | ~ c_lessequals(V_i,V_n,tc_nat) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_vimage__Un_0,axiom,
% 14.25/14.40 c_Set_Ovimage(V_f,hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_b,tc_bool)),V_A),V_B),T_a,T_b) = hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),c_Set_Ovimage(V_f,V_A,T_a,T_b)),c_Set_Ovimage(V_f,V_B,T_a,T_b)) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_not__less__less__Suc__eq_1,axiom,
% 14.25/14.40 ( c_HOL_Oord__class_Oless(V_x,V_x,tc_nat)
% 14.25/14.40 | c_HOL_Oord__class_Oless(V_x,c_Suc(V_x),tc_nat) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_not__less__eq_1,axiom,
% 14.25/14.40 ( ~ c_HOL_Oord__class_Oless(V_m,V_n,tc_nat)
% 14.25/14.40 | ~ c_HOL_Oord__class_Oless(V_n,c_Suc(V_m),tc_nat) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_not__less__eq_0,axiom,
% 14.25/14.40 ( c_HOL_Oord__class_Oless(V_n,c_Suc(V_m),tc_nat)
% 14.25/14.40 | c_HOL_Oord__class_Oless(V_m,V_n,tc_nat) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_min__max_Osup__assoc_0,axiom,
% 14.25/14.40 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.40 | hAPP(hAPP(c_Orderings_Oord__class_Omax(T_a),hAPP(hAPP(c_Orderings_Oord__class_Omax(T_a),V_x),V_y)),V_z) = hAPP(hAPP(c_Orderings_Oord__class_Omax(T_a),V_x),hAPP(hAPP(c_Orderings_Oord__class_Omax(T_a),V_y),V_z)) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_min__max_Osup__left__commute_0,axiom,
% 14.25/14.40 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.40 | hAPP(hAPP(c_Orderings_Oord__class_Omax(T_a),V_x),hAPP(hAPP(c_Orderings_Oord__class_Omax(T_a),V_y),V_z)) = hAPP(hAPP(c_Orderings_Oord__class_Omax(T_a),V_y),hAPP(hAPP(c_Orderings_Oord__class_Omax(T_a),V_x),V_z)) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_fun__upd__idem__iff_0,axiom,
% 14.25/14.40 ( c_Fun_Ofun__upd(V_f,V_x,V_y,T_a,T_b) != V_f
% 14.25/14.40 | hAPP(V_f,V_x) = V_y ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_inj__on__Un_1,axiom,
% 14.25/14.40 ( c_Fun_Oinj__on(V_f,V_B,T_a,T_b)
% 14.25/14.40 | ~ c_Fun_Oinj__on(V_f,hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_A),V_B),T_a,T_b) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_inj__on__Un_0,axiom,
% 14.25/14.40 ( c_Fun_Oinj__on(V_f,V_A,T_a,T_b)
% 14.25/14.40 | ~ c_Fun_Oinj__on(V_f,hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_A),V_B),T_a,T_b) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_neg__equal__zero_0,axiom,
% 14.25/14.40 ( ~ class_OrderedGroup_Oordered__ab__group__add(T_a)
% 14.25/14.40 | c_HOL_Ouminus__class_Ouminus(V_a,T_a) != V_a
% 14.25/14.40 | V_a = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_min__max_Osup__left__idem_0,axiom,
% 14.25/14.40 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.40 | hAPP(hAPP(c_Orderings_Oord__class_Omax(T_a),V_x),hAPP(hAPP(c_Orderings_Oord__class_Omax(T_a),V_x),V_y)) = hAPP(hAPP(c_Orderings_Oord__class_Omax(T_a),V_x),V_y) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_double__complement_0,axiom,
% 14.25/14.40 c_HOL_Ouminus__class_Ouminus(c_HOL_Ouminus__class_Ouminus(V_A,tc_fun(T_a,tc_bool)),tc_fun(T_a,tc_bool)) = V_A ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_minus__minus_0,axiom,
% 14.25/14.40 ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 14.25/14.40 | c_HOL_Ouminus__class_Ouminus(c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a) = V_a ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_double__compl_0,axiom,
% 14.25/14.40 ( ~ class_Lattices_Oboolean__algebra(T_a)
% 14.25/14.40 | c_HOL_Ouminus__class_Ouminus(c_HOL_Ouminus__class_Ouminus(V_x,T_a),T_a) = V_x ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_equation__minus__iff_0,axiom,
% 14.25/14.40 ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 14.25/14.40 | V_b = c_HOL_Ouminus__class_Ouminus(c_HOL_Ouminus__class_Ouminus(V_b,T_a),T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_equation__minus__iff_1,axiom,
% 14.25/14.40 ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 14.25/14.40 | V_a = c_HOL_Ouminus__class_Ouminus(c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_minus__equation__iff_1,axiom,
% 14.25/14.40 ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 14.25/14.40 | c_HOL_Ouminus__class_Ouminus(c_HOL_Ouminus__class_Ouminus(V_b,T_a),T_a) = V_b ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_less__supI1_0,axiom,
% 14.25/14.40 ( ~ class_Lattices_Oupper__semilattice(T_a)
% 14.25/14.40 | c_HOL_Oord__class_Oless(V_x,hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_a),V_b),T_a)
% 14.25/14.40 | ~ c_HOL_Oord__class_Oless(V_x,V_a,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_less__supI2_0,axiom,
% 14.25/14.40 ( ~ class_Lattices_Oupper__semilattice(T_a)
% 14.25/14.40 | c_HOL_Oord__class_Oless(V_x,hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_a),V_b),T_a)
% 14.25/14.40 | ~ c_HOL_Oord__class_Oless(V_x,V_b,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_minus__diff__eq_0,axiom,
% 14.25/14.40 ( ~ class_OrderedGroup_Oab__group__add(T_a)
% 14.25/14.40 | c_HOL_Ouminus__class_Ouminus(c_HOL_Ominus__class_Ominus(V_a,V_b,T_a),T_a) = c_HOL_Ominus__class_Ominus(V_b,V_a,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_less__Suc__eq__0__disj_3,axiom,
% 14.25/14.40 ( c_HOL_Oord__class_Oless(c_Suc(V_x),c_Suc(V_n),tc_nat)
% 14.25/14.40 | ~ c_HOL_Oord__class_Oless(V_x,V_n,tc_nat) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_Suc__less__eq_0,axiom,
% 14.25/14.40 ( c_HOL_Oord__class_Oless(V_m,V_n,tc_nat)
% 14.25/14.40 | ~ c_HOL_Oord__class_Oless(c_Suc(V_m),c_Suc(V_n),tc_nat) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_Suc__mono_0,axiom,
% 14.25/14.40 ( c_HOL_Oord__class_Oless(c_Suc(V_m),c_Suc(V_n),tc_nat)
% 14.25/14.40 | ~ c_HOL_Oord__class_Oless(V_m,V_n,tc_nat) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_less__minus__iff_0,axiom,
% 14.25/14.40 ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 14.25/14.40 | c_HOL_Oord__class_Oless(V_b,c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a)
% 14.25/14.40 | ~ c_HOL_Oord__class_Oless(V_a,c_HOL_Ouminus__class_Ouminus(V_b,T_a),T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_less__minus__iff_1,axiom,
% 14.25/14.40 ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 14.25/14.40 | c_HOL_Oord__class_Oless(V_a,c_HOL_Ouminus__class_Ouminus(V_b,T_a),T_a)
% 14.25/14.40 | ~ c_HOL_Oord__class_Oless(V_b,c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_minus__less__iff_0,axiom,
% 14.25/14.40 ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 14.25/14.40 | c_HOL_Oord__class_Oless(c_HOL_Ouminus__class_Ouminus(V_b,T_a),V_a,T_a)
% 14.25/14.40 | ~ c_HOL_Oord__class_Oless(c_HOL_Ouminus__class_Ouminus(V_a,T_a),V_b,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_minus__less__iff_1,axiom,
% 14.25/14.40 ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 14.25/14.40 | c_HOL_Oord__class_Oless(c_HOL_Ouminus__class_Ouminus(V_a,T_a),V_b,T_a)
% 14.25/14.40 | ~ c_HOL_Oord__class_Oless(c_HOL_Ouminus__class_Ouminus(V_b,T_a),V_a,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_linorder__antisym__conv2_0,axiom,
% 14.25/14.40 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.40 | V_x = V_y
% 14.25/14.40 | c_HOL_Oord__class_Oless(V_x,V_y,T_a)
% 14.25/14.40 | ~ c_lessequals(V_x,V_y,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_linorder__antisym__conv1_0,axiom,
% 14.25/14.40 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.40 | V_x = V_y
% 14.25/14.40 | ~ c_lessequals(V_x,V_y,T_a)
% 14.25/14.40 | c_HOL_Oord__class_Oless(V_x,V_y,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_order__neq__le__trans_0,axiom,
% 14.25/14.40 ( ~ class_Orderings_Oorder(T_a)
% 14.25/14.40 | c_HOL_Oord__class_Oless(V_a,V_b,T_a)
% 14.25/14.40 | ~ c_lessequals(V_a,V_b,T_a)
% 14.25/14.40 | V_a = V_b ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_order__le__neq__trans_0,axiom,
% 14.25/14.40 ( ~ class_Orderings_Oorder(T_a)
% 14.25/14.40 | c_HOL_Oord__class_Oless(V_a,V_b,T_a)
% 14.25/14.40 | V_a = V_b
% 14.25/14.40 | ~ c_lessequals(V_a,V_b,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_order__less__le_2,axiom,
% 14.25/14.40 ( ~ class_Orderings_Oorder(T_a)
% 14.25/14.40 | c_HOL_Oord__class_Oless(V_x,V_y,T_a)
% 14.25/14.40 | V_x = V_y
% 14.25/14.40 | ~ c_lessequals(V_x,V_y,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_order__le__less_0,axiom,
% 14.25/14.40 ( ~ class_Orderings_Oorder(T_a)
% 14.25/14.40 | V_x = V_y
% 14.25/14.40 | c_HOL_Oord__class_Oless(V_x,V_y,T_a)
% 14.25/14.40 | ~ c_lessequals(V_x,V_y,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_xt1_I12_J_0,axiom,
% 14.25/14.40 ( ~ class_Orderings_Oorder(T_a)
% 14.25/14.40 | c_HOL_Oord__class_Oless(V_b,V_a,T_a)
% 14.25/14.40 | ~ c_lessequals(V_b,V_a,T_a)
% 14.25/14.40 | V_a = V_b ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_xt1_I11_J_0,axiom,
% 14.25/14.40 ( ~ class_Orderings_Oorder(T_a)
% 14.25/14.40 | c_HOL_Oord__class_Oless(V_b,V_a,T_a)
% 14.25/14.40 | V_a = V_b
% 14.25/14.40 | ~ c_lessequals(V_b,V_a,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_order__less__le__trans_0,axiom,
% 14.25/14.40 ( ~ class_Orderings_Opreorder(T_a)
% 14.25/14.40 | c_HOL_Oord__class_Oless(V_x,V_z,T_a)
% 14.25/14.40 | ~ c_lessequals(V_y,V_z,T_a)
% 14.25/14.40 | ~ c_HOL_Oord__class_Oless(V_x,V_y,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_order__le__less__trans_0,axiom,
% 14.25/14.40 ( ~ class_Orderings_Opreorder(T_a)
% 14.25/14.40 | c_HOL_Oord__class_Oless(V_x,V_z,T_a)
% 14.25/14.40 | ~ c_HOL_Oord__class_Oless(V_y,V_z,T_a)
% 14.25/14.40 | ~ c_lessequals(V_x,V_y,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_xt1_I8_J_0,axiom,
% 14.25/14.40 ( ~ class_Orderings_Oorder(T_a)
% 14.25/14.40 | c_HOL_Oord__class_Oless(V_z,V_x,T_a)
% 14.25/14.40 | ~ c_HOL_Oord__class_Oless(V_z,V_y,T_a)
% 14.25/14.40 | ~ c_lessequals(V_y,V_x,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_xt1_I7_J_0,axiom,
% 14.25/14.40 ( ~ class_Orderings_Oorder(T_a)
% 14.25/14.40 | c_HOL_Oord__class_Oless(V_z,V_x,T_a)
% 14.25/14.40 | ~ c_lessequals(V_z,V_y,T_a)
% 14.25/14.40 | ~ c_HOL_Oord__class_Oless(V_y,V_x,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_le__supE_0,axiom,
% 14.25/14.40 ( ~ class_Lattices_Oupper__semilattice(T_a)
% 14.25/14.40 | c_lessequals(V_a,V_x,T_a)
% 14.25/14.40 | ~ c_lessequals(hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_a),V_b),V_x,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_le__supE_1,axiom,
% 14.25/14.40 ( ~ class_Lattices_Oupper__semilattice(T_a)
% 14.25/14.40 | c_lessequals(V_b,V_x,T_a)
% 14.25/14.40 | ~ c_lessequals(hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_a),V_b),V_x,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_le__supI1_0,axiom,
% 14.25/14.40 ( ~ class_Lattices_Oupper__semilattice(T_a)
% 14.25/14.40 | c_lessequals(V_x,hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_a),V_b),T_a)
% 14.25/14.40 | ~ c_lessequals(V_x,V_a,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_le__supI2_0,axiom,
% 14.25/14.40 ( ~ class_Lattices_Oupper__semilattice(T_a)
% 14.25/14.40 | c_lessequals(V_x,hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_a),V_b),T_a)
% 14.25/14.40 | ~ c_lessequals(V_x,V_b,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_le__sup__iff_0,axiom,
% 14.25/14.40 ( ~ class_Lattices_Oupper__semilattice(T_a)
% 14.25/14.40 | c_lessequals(V_x,V_z,T_a)
% 14.25/14.40 | ~ c_lessequals(hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_x),V_y),V_z,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_le__sup__iff_1,axiom,
% 14.25/14.40 ( ~ class_Lattices_Oupper__semilattice(T_a)
% 14.25/14.40 | c_lessequals(V_y,V_z,T_a)
% 14.25/14.40 | ~ c_lessequals(hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_x),V_y),V_z,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_le__iff__sup_0,axiom,
% 14.25/14.40 ( ~ class_Lattices_Oupper__semilattice(T_a)
% 14.25/14.40 | hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_x),V_y) = V_y
% 14.25/14.40 | ~ c_lessequals(V_x,V_y,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_le__iff__sup_1,axiom,
% 14.25/14.40 ( ~ class_Lattices_Oupper__semilattice(T_a)
% 14.25/14.40 | hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_x),V_y) != V_y
% 14.25/14.40 | c_lessequals(V_x,V_y,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_sup__absorb1_0,axiom,
% 14.25/14.40 ( ~ class_Lattices_Oupper__semilattice(T_a)
% 14.25/14.40 | hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_x),V_y) = V_x
% 14.25/14.40 | ~ c_lessequals(V_y,V_x,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_order__less__imp__le_0,axiom,
% 14.25/14.40 ( ~ class_Orderings_Opreorder(T_a)
% 14.25/14.40 | c_lessequals(V_x,V_y,T_a)
% 14.25/14.40 | ~ c_HOL_Oord__class_Oless(V_x,V_y,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_order__le__less_1,axiom,
% 14.25/14.40 ( ~ class_Orderings_Oorder(T_a)
% 14.25/14.40 | c_lessequals(V_x,V_y,T_a)
% 14.25/14.40 | ~ c_HOL_Oord__class_Oless(V_x,V_y,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_less__le__not__le_2,axiom,
% 14.25/14.40 ( ~ class_Orderings_Opreorder(T_a)
% 14.25/14.40 | c_HOL_Oord__class_Oless(V_x,V_y,T_a)
% 14.25/14.40 | c_lessequals(V_y,V_x,T_a)
% 14.25/14.40 | ~ c_lessequals(V_x,V_y,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_min__max_Ole__supE_0,axiom,
% 14.25/14.40 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.40 | c_lessequals(V_a,V_x,T_a)
% 14.25/14.40 | ~ c_lessequals(hAPP(hAPP(c_Orderings_Oord__class_Omax(T_a),V_a),V_b),V_x,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_min__max_Ole__supE_1,axiom,
% 14.25/14.40 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.40 | c_lessequals(V_b,V_x,T_a)
% 14.25/14.40 | ~ c_lessequals(hAPP(hAPP(c_Orderings_Oord__class_Omax(T_a),V_a),V_b),V_x,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_min__max_Ole__supI1_0,axiom,
% 14.25/14.40 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.40 | c_lessequals(V_x,hAPP(hAPP(c_Orderings_Oord__class_Omax(T_a),V_a),V_b),T_a)
% 14.25/14.40 | ~ c_lessequals(V_x,V_a,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_min__max_Ole__supI2_0,axiom,
% 14.25/14.40 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.40 | c_lessequals(V_x,hAPP(hAPP(c_Orderings_Oord__class_Omax(T_a),V_a),V_b),T_a)
% 14.25/14.40 | ~ c_lessequals(V_x,V_b,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_le__max__iff__disj_1,axiom,
% 14.25/14.40 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.40 | c_lessequals(V_z,hAPP(hAPP(c_Orderings_Oord__class_Omax(T_a),V_x),V_y),T_a)
% 14.25/14.40 | ~ c_lessequals(V_z,V_x,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_le__max__iff__disj_2,axiom,
% 14.25/14.40 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.40 | c_lessequals(V_z,hAPP(hAPP(c_Orderings_Oord__class_Omax(T_a),V_x),V_y),T_a)
% 14.25/14.40 | ~ c_lessequals(V_z,V_y,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_min__max_Ole__sup__iff_0,axiom,
% 14.25/14.40 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.40 | c_lessequals(V_x,V_z,T_a)
% 14.25/14.40 | ~ c_lessequals(hAPP(hAPP(c_Orderings_Oord__class_Omax(T_a),V_x),V_y),V_z,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_min__max_Ole__sup__iff_1,axiom,
% 14.25/14.40 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.40 | c_lessequals(V_y,V_z,T_a)
% 14.25/14.40 | ~ c_lessequals(hAPP(hAPP(c_Orderings_Oord__class_Omax(T_a),V_x),V_y),V_z,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_min__le__iff__disj_0,axiom,
% 14.25/14.40 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.40 | c_lessequals(V_y,V_z,T_a)
% 14.25/14.40 | c_lessequals(V_x,V_z,T_a)
% 14.25/14.40 | ~ c_lessequals(hAPP(hAPP(c_Orderings_Oord__class_Omin(T_a),V_x),V_y),V_z,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_min__max_Ole__infE_0,axiom,
% 14.25/14.40 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.40 | c_lessequals(V_x,V_a,T_a)
% 14.25/14.40 | ~ c_lessequals(V_x,hAPP(hAPP(c_Orderings_Oord__class_Omin(T_a),V_a),V_b),T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_min__max_Ole__infE_1,axiom,
% 14.25/14.40 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.40 | c_lessequals(V_x,V_b,T_a)
% 14.25/14.40 | ~ c_lessequals(V_x,hAPP(hAPP(c_Orderings_Oord__class_Omin(T_a),V_a),V_b),T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_min__max_Ole__infI1_0,axiom,
% 14.25/14.40 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.40 | c_lessequals(hAPP(hAPP(c_Orderings_Oord__class_Omin(T_a),V_a),V_b),V_x,T_a)
% 14.25/14.40 | ~ c_lessequals(V_a,V_x,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_min__max_Ole__infI2_0,axiom,
% 14.25/14.40 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.40 | c_lessequals(hAPP(hAPP(c_Orderings_Oord__class_Omin(T_a),V_a),V_b),V_x,T_a)
% 14.25/14.40 | ~ c_lessequals(V_b,V_x,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_min__le__iff__disj_1,axiom,
% 14.25/14.40 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.40 | c_lessequals(hAPP(hAPP(c_Orderings_Oord__class_Omin(T_a),V_x),V_y),V_z,T_a)
% 14.25/14.40 | ~ c_lessequals(V_x,V_z,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_min__le__iff__disj_2,axiom,
% 14.25/14.40 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.40 | c_lessequals(hAPP(hAPP(c_Orderings_Oord__class_Omin(T_a),V_x),V_y),V_z,T_a)
% 14.25/14.40 | ~ c_lessequals(V_y,V_z,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_sup__eq__neg__inf_0,axiom,
% 14.25/14.40 ( ~ class_OrderedGroup_Olordered__ab__group__add(T_a)
% 14.25/14.40 | hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_a),V_b) = c_HOL_Ouminus__class_Ouminus(hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),c_HOL_Ouminus__class_Ouminus(V_a,T_a)),c_HOL_Ouminus__class_Ouminus(V_b,T_a)),T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_less__eqI_0,axiom,
% 14.25/14.40 ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 14.25/14.40 | c_HOL_Ominus__class_Ominus(V_x,V_y,T_a) != c_HOL_Ominus__class_Ominus(V_x_H,V_y_H,T_a)
% 14.25/14.40 | c_HOL_Oord__class_Oless(V_x_H,V_y_H,T_a)
% 14.25/14.40 | ~ c_HOL_Oord__class_Oless(V_x,V_y,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_less__eqI_1,axiom,
% 14.25/14.40 ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 14.25/14.40 | c_HOL_Ominus__class_Ominus(V_x,V_y,T_a) != c_HOL_Ominus__class_Ominus(V_x_H,V_y_H,T_a)
% 14.25/14.40 | c_HOL_Oord__class_Oless(V_x,V_y,T_a)
% 14.25/14.40 | ~ c_HOL_Oord__class_Oless(V_x_H,V_y_H,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_neg__0__less__iff__less_1,axiom,
% 14.25/14.40 ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 14.25/14.40 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a)
% 14.25/14.40 | ~ c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_neg__0__less__iff__less_0,axiom,
% 14.25/14.40 ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 14.25/14.40 | c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.25/14.40 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_diff__Suc__less_0,axiom,
% 14.25/14.40 ( c_HOL_Oord__class_Oless(c_HOL_Ominus__class_Ominus(V_n,c_Suc(V_i),tc_nat),V_n,tc_nat)
% 14.25/14.40 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_nat),V_n,tc_nat) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_min__max_Osup__inf__distrib2_0,axiom,
% 14.25/14.40 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.40 | hAPP(hAPP(c_Orderings_Oord__class_Omax(T_a),hAPP(hAPP(c_Orderings_Oord__class_Omin(T_a),V_y),V_z)),V_x) = hAPP(hAPP(c_Orderings_Oord__class_Omin(T_a),hAPP(hAPP(c_Orderings_Oord__class_Omax(T_a),V_y),V_x)),hAPP(hAPP(c_Orderings_Oord__class_Omax(T_a),V_z),V_x)) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_min__max_Osup__inf__distrib1_0,axiom,
% 14.25/14.40 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.40 | hAPP(hAPP(c_Orderings_Oord__class_Omax(T_a),V_x),hAPP(hAPP(c_Orderings_Oord__class_Omin(T_a),V_y),V_z)) = hAPP(hAPP(c_Orderings_Oord__class_Omin(T_a),hAPP(hAPP(c_Orderings_Oord__class_Omax(T_a),V_x),V_y)),hAPP(hAPP(c_Orderings_Oord__class_Omax(T_a),V_x),V_z)) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_nat__less__le_2,axiom,
% 14.25/14.40 ( c_HOL_Oord__class_Oless(V_m,V_n,tc_nat)
% 14.25/14.40 | V_m = V_n
% 14.25/14.40 | ~ c_lessequals(V_m,V_n,tc_nat) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_le__eq__less__or__eq_0,axiom,
% 14.25/14.40 ( V_m = V_n
% 14.25/14.40 | c_HOL_Oord__class_Oless(V_m,V_n,tc_nat)
% 14.25/14.40 | ~ c_lessequals(V_m,V_n,tc_nat) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_le__neq__implies__less_0,axiom,
% 14.25/14.40 ( c_HOL_Oord__class_Oless(V_m,V_n,tc_nat)
% 14.25/14.40 | V_m = V_n
% 14.25/14.40 | ~ c_lessequals(V_m,V_n,tc_nat) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_less__minus__self__iff_0,axiom,
% 14.25/14.40 ( ~ class_Ring__and__Field_Oordered__idom(T_a)
% 14.25/14.40 | c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.25/14.40 | ~ c_HOL_Oord__class_Oless(V_a,c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_less__minus__self__iff_1,axiom,
% 14.25/14.40 ( ~ class_Ring__and__Field_Oordered__idom(T_a)
% 14.25/14.40 | c_HOL_Oord__class_Oless(V_a,c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a)
% 14.25/14.40 | ~ c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_xt1_I9_J_0,axiom,
% 14.25/14.40 ( ~ class_Orderings_Oorder(T_a)
% 14.25/14.40 | ~ c_HOL_Oord__class_Oless(V_a,V_b,T_a)
% 14.25/14.40 | ~ c_HOL_Oord__class_Oless(V_b,V_a,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_not__less__iff__gr__or__eq_1,axiom,
% 14.25/14.40 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.40 | ~ c_HOL_Oord__class_Oless(V_x,V_y,T_a)
% 14.25/14.40 | ~ c_HOL_Oord__class_Oless(V_y,V_x,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_order__less__asym_0,axiom,
% 14.25/14.40 ( ~ class_Orderings_Opreorder(T_a)
% 14.25/14.40 | ~ c_HOL_Oord__class_Oless(V_y,V_x,T_a)
% 14.25/14.40 | ~ c_HOL_Oord__class_Oless(V_x,V_y,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_order__less__asym_H_0,axiom,
% 14.25/14.40 ( ~ class_Orderings_Opreorder(T_a)
% 14.25/14.40 | ~ c_HOL_Oord__class_Oless(V_b,V_a,T_a)
% 14.25/14.40 | ~ c_HOL_Oord__class_Oless(V_a,V_b,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_compl__unique_0,axiom,
% 14.25/14.40 ( ~ class_Lattices_Oboolean__algebra(T_a)
% 14.25/14.40 | hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_x),V_y) != c_Orderings_Otop__class_Otop(T_a)
% 14.25/14.40 | hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_x),V_y) != c_Orderings_Obot__class_Obot(T_a)
% 14.25/14.40 | c_HOL_Ouminus__class_Ouminus(V_x,T_a) = V_y ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_card__psubset_0,axiom,
% 14.25/14.40 ( c_HOL_Oord__class_Oless(V_A,V_B,tc_fun(T_a,tc_bool))
% 14.25/14.40 | ~ c_HOL_Oord__class_Oless(c_Finite__Set_Ocard(V_A,T_a),c_Finite__Set_Ocard(V_B,T_a),tc_nat)
% 14.25/14.40 | ~ c_lessequals(V_A,V_B,tc_fun(T_a,tc_bool))
% 14.25/14.40 | ~ c_Finite__Set_Ofinite(V_B,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_setsum__diff__nat_0,axiom,
% 14.25/14.40 ( c_Finite__Set_Osetsum(V_f,c_HOL_Ominus__class_Ominus(V_A,V_B,tc_fun(T_a,tc_bool)),T_a,tc_nat) = c_HOL_Ominus__class_Ominus(c_Finite__Set_Osetsum(V_f,V_A,T_a,tc_nat),c_Finite__Set_Osetsum(V_f,V_B,T_a,tc_nat),tc_nat)
% 14.25/14.40 | ~ c_lessequals(V_B,V_A,tc_fun(T_a,tc_bool))
% 14.25/14.40 | ~ c_Finite__Set_Ofinite(V_B,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_Min__Un_0,axiom,
% 14.25/14.40 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.40 | hAPP(c_Finite__Set_Olinorder__class_OMin(T_a),hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_A),V_B)) = hAPP(hAPP(c_Orderings_Oord__class_Omin(T_a),hAPP(c_Finite__Set_Olinorder__class_OMin(T_a),V_A)),hAPP(c_Finite__Set_Olinorder__class_OMin(T_a),V_B))
% 14.25/14.40 | V_B = c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool))
% 14.25/14.40 | ~ c_Finite__Set_Ofinite(V_B,T_a)
% 14.25/14.40 | V_A = c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool))
% 14.25/14.40 | ~ c_Finite__Set_Ofinite(V_A,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_Max__Un_0,axiom,
% 14.25/14.40 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.40 | hAPP(c_Finite__Set_Olinorder__class_OMax(T_a),hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_A),V_B)) = hAPP(hAPP(c_Orderings_Oord__class_Omax(T_a),hAPP(c_Finite__Set_Olinorder__class_OMax(T_a),V_A)),hAPP(c_Finite__Set_Olinorder__class_OMax(T_a),V_B))
% 14.25/14.40 | V_B = c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool))
% 14.25/14.40 | ~ c_Finite__Set_Ofinite(V_B,T_a)
% 14.25/14.40 | V_A = c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool))
% 14.25/14.40 | ~ c_Finite__Set_Ofinite(V_A,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_neg__0__le__iff__le_1,axiom,
% 14.25/14.40 ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 14.25/14.40 | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a)
% 14.25/14.40 | ~ c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_neg__0__le__iff__le_0,axiom,
% 14.25/14.40 ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 14.25/14.40 | c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.25/14.40 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_neg__less__eq__nonneg_1,axiom,
% 14.25/14.40 ( ~ class_OrderedGroup_Oordered__ab__group__add(T_a)
% 14.25/14.40 | c_lessequals(c_HOL_Ouminus__class_Ouminus(V_a,T_a),V_a,T_a)
% 14.25/14.40 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_neg__less__eq__nonneg_0,axiom,
% 14.25/14.40 ( ~ class_OrderedGroup_Oordered__ab__group__add(T_a)
% 14.25/14.40 | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 14.25/14.40 | ~ c_lessequals(c_HOL_Ouminus__class_Ouminus(V_a,T_a),V_a,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_less__eq__neg__nonpos_1,axiom,
% 14.25/14.40 ( ~ class_OrderedGroup_Oordered__ab__group__add(T_a)
% 14.25/14.40 | c_lessequals(V_a,c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a)
% 14.25/14.40 | ~ c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_less__eq__neg__nonpos_0,axiom,
% 14.25/14.40 ( ~ class_OrderedGroup_Oordered__ab__group__add(T_a)
% 14.25/14.40 | c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.25/14.40 | ~ c_lessequals(V_a,c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_minus__le__self__iff_1,axiom,
% 14.25/14.40 ( ~ class_OrderedGroup_Olordered__ab__group__add(T_a)
% 14.25/14.40 | c_lessequals(c_HOL_Ouminus__class_Ouminus(V_a,T_a),V_a,T_a)
% 14.25/14.40 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_minus__le__self__iff_0,axiom,
% 14.25/14.40 ( ~ class_OrderedGroup_Olordered__ab__group__add(T_a)
% 14.25/14.40 | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 14.25/14.40 | ~ c_lessequals(c_HOL_Ouminus__class_Ouminus(V_a,T_a),V_a,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_le__minus__self__iff_1,axiom,
% 14.25/14.40 ( ~ class_OrderedGroup_Olordered__ab__group__add(T_a)
% 14.25/14.40 | c_lessequals(V_a,c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a)
% 14.25/14.40 | ~ c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_le__minus__self__iff_0,axiom,
% 14.25/14.40 ( ~ class_OrderedGroup_Olordered__ab__group__add(T_a)
% 14.25/14.40 | c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.25/14.40 | ~ c_lessequals(V_a,c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_neg__le__0__iff__le_1,axiom,
% 14.25/14.40 ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 14.25/14.40 | c_lessequals(c_HOL_Ouminus__class_Ouminus(V_a,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.25/14.40 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_neg__le__0__iff__le_0,axiom,
% 14.25/14.40 ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 14.25/14.40 | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 14.25/14.40 | ~ c_lessequals(c_HOL_Ouminus__class_Ouminus(V_a,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_group__add__class_Odiff__0_0,axiom,
% 14.25/14.40 ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 14.25/14.40 | c_HOL_Ominus__class_Ominus(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) = c_HOL_Ouminus__class_Ouminus(V_a,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_less__iff__diff__less__0_1,axiom,
% 14.25/14.40 ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 14.25/14.40 | c_HOL_Oord__class_Oless(V_a,V_b,T_a)
% 14.25/14.40 | ~ c_HOL_Oord__class_Oless(c_HOL_Ominus__class_Ominus(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_less__iff__diff__less__0_0,axiom,
% 14.25/14.40 ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 14.25/14.40 | c_HOL_Oord__class_Oless(c_HOL_Ominus__class_Ominus(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.25/14.40 | ~ c_HOL_Oord__class_Oless(V_a,V_b,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_setsum__def_1,axiom,
% 14.25/14.40 ( ~ class_OrderedGroup_Ocomm__monoid__add(T_a)
% 14.25/14.40 | c_Finite__Set_Osetsum(V_f,V_A,T_b,T_a) = c_HOL_Ozero__class_Ozero(T_a)
% 14.25/14.40 | c_Finite__Set_Ofinite(V_A,T_b) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_setsum__infinite_0,axiom,
% 14.25/14.40 ( ~ class_OrderedGroup_Ocomm__monoid__add(T_b)
% 14.25/14.40 | c_Finite__Set_Osetsum(V_f,V_A,T_a,T_b) = c_HOL_Ozero__class_Ozero(T_b)
% 14.25/14.40 | c_Finite__Set_Ofinite(V_A,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_fold1__below__iff_2,axiom,
% 14.25/14.40 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.40 | c_lessequals(hAPP(c_Finite__Set_Ofold1(c_Orderings_Oord__class_Omin(T_a),T_a),V_A),V_x,T_a)
% 14.25/14.40 | ~ c_lessequals(V_xa,V_x,T_a)
% 14.25/14.40 | ~ c_in(V_xa,V_A,T_a)
% 14.25/14.40 | V_A = c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool))
% 14.25/14.40 | ~ c_Finite__Set_Ofinite(V_A,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_setsum__empty_0,axiom,
% 14.25/14.40 ( ~ class_OrderedGroup_Ocomm__monoid__add(T_a)
% 14.25/14.40 | c_Finite__Set_Osetsum(V_f,c_Orderings_Obot__class_Obot(tc_fun(T_b,tc_bool)),T_b,T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_fold__graph_OinsertI_0,axiom,
% 14.25/14.40 ( c_Finite__Set_Ofold__graph(V_f,V_z,c_Set_Oinsert(V_x,V_A,T_a),hAPP(hAPP(V_f,V_x),V_y),T_a,T_b)
% 14.25/14.40 | ~ c_Finite__Set_Ofold__graph(V_f,V_z,V_A,V_y,T_a,T_b)
% 14.25/14.40 | c_in(V_x,V_A,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_psubset__insert__iff_0,axiom,
% 14.25/14.40 ( c_HOL_Oord__class_Oless(V_A,V_B,tc_fun(T_a,tc_bool))
% 14.25/14.40 | ~ c_in(V_x,V_B,T_a)
% 14.25/14.40 | ~ c_HOL_Oord__class_Oless(V_A,c_Set_Oinsert(V_x,V_B,T_a),tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_psubset__insert__iff_6,axiom,
% 14.25/14.40 ( c_HOL_Oord__class_Oless(V_A,c_Set_Oinsert(V_x,V_B,T_a),tc_fun(T_a,tc_bool))
% 14.25/14.40 | ~ c_in(V_x,V_B,T_a)
% 14.25/14.40 | ~ c_HOL_Oord__class_Oless(V_A,V_B,tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_inf__0__imp__0_0,axiom,
% 14.25/14.40 ( ~ class_OrderedGroup_Olordered__ab__group__add(T_a)
% 14.25/14.40 | hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_a),c_HOL_Ouminus__class_Ouminus(V_a,T_a)) != c_HOL_Ozero__class_Ozero(T_a)
% 14.25/14.40 | V_a = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_distrib__inf__le_0,axiom,
% 14.25/14.40 ( ~ class_Lattices_Olattice(T_a)
% 14.25/14.40 | c_lessequals(hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_x),V_y)),hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_x),V_z)),hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_x),hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_y),V_z)),T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_distrib__sup__le_0,axiom,
% 14.25/14.40 ( ~ class_Lattices_Olattice(T_a)
% 14.25/14.40 | c_lessequals(hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_x),hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_y),V_z)),hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_x),V_y)),hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_x),V_z)),T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_fold1__antimono_0,axiom,
% 14.25/14.40 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.40 | c_lessequals(hAPP(c_Finite__Set_Ofold1(c_Orderings_Oord__class_Omin(T_a),T_a),V_B),hAPP(c_Finite__Set_Ofold1(c_Orderings_Oord__class_Omin(T_a),T_a),V_A),T_a)
% 14.25/14.40 | ~ c_Finite__Set_Ofinite(V_B,T_a)
% 14.25/14.40 | ~ c_lessequals(V_A,V_B,tc_fun(T_a,tc_bool))
% 14.25/14.40 | V_A = c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_fun__upd__image_1,axiom,
% 14.25/14.40 ( c_Set_Oimage(c_Fun_Ofun__upd(V_f,V_x,V_y,T_b,T_a),V_A,T_b,T_a) = c_Set_Oimage(V_f,V_A,T_b,T_a)
% 14.25/14.40 | c_in(V_x,V_A,T_b) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_diff__eq_0,axiom,
% 14.25/14.40 ( ~ class_Lattices_Oboolean__algebra(T_a)
% 14.25/14.40 | c_HOL_Ominus__class_Ominus(V_x,V_y,T_a) = hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_x),c_HOL_Ouminus__class_Ouminus(V_y,T_a)) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_gr0__conv__Suc_1,axiom,
% 14.25/14.40 c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_nat),c_Suc(V_x),tc_nat) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_zero__less__Suc_0,axiom,
% 14.25/14.40 c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_nat),c_Suc(V_n),tc_nat) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_less__Suc0_0,axiom,
% 14.25/14.40 ( V_n = c_HOL_Ozero__class_Ozero(tc_nat)
% 14.25/14.40 | ~ c_HOL_Oord__class_Oless(V_n,c_Suc(c_HOL_Ozero__class_Ozero(tc_nat)),tc_nat) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_less__Suc0_1,axiom,
% 14.25/14.40 c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_nat),c_Suc(c_HOL_Ozero__class_Ozero(tc_nat)),tc_nat) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_insert__is__Un_0,axiom,
% 14.25/14.40 c_Set_Oinsert(V_a,V_A,T_a) = hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),c_Set_Oinsert(V_a,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a)),V_A) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_fold1__singleton_0,axiom,
% 14.25/14.40 hAPP(c_Finite__Set_Ofold1(V_f,T_a),c_Set_Oinsert(V_a,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a)) = V_a ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_inf__compl__bot_0,axiom,
% 14.25/14.40 ( ~ class_Lattices_Oboolean__algebra(T_a)
% 14.25/14.40 | hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_x),c_HOL_Ouminus__class_Ouminus(V_x,T_a)) = c_Orderings_Obot__class_Obot(T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_compl__inf__bot_0,axiom,
% 14.25/14.40 ( ~ class_Lattices_Oboolean__algebra(T_a)
% 14.25/14.40 | hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),c_HOL_Ouminus__class_Ouminus(V_x,T_a)),V_x) = c_Orderings_Obot__class_Obot(T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_subset__Compl__self__eq_1,axiom,
% 14.25/14.40 c_lessequals(c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),c_HOL_Ouminus__class_Ouminus(c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),tc_fun(T_a,tc_bool)),tc_fun(T_a,tc_bool)) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_subset__Compl__self__eq_0,axiom,
% 14.25/14.40 ( V_A = c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool))
% 14.25/14.40 | ~ c_lessequals(V_A,c_HOL_Ouminus__class_Ouminus(V_A,tc_fun(T_a,tc_bool)),tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_setsum__diff1__nat_0,axiom,
% 14.25/14.40 ( c_Finite__Set_Osetsum(V_f,c_HOL_Ominus__class_Ominus(V_A,c_Set_Oinsert(V_a,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a),tc_fun(T_a,tc_bool)),T_a,tc_nat) = c_HOL_Ominus__class_Ominus(c_Finite__Set_Osetsum(V_f,V_A,T_a,tc_nat),hAPP(V_f,V_a),tc_nat)
% 14.25/14.40 | ~ c_in(V_a,V_A,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_the__inv__into__f__f_0,axiom,
% 14.25/14.40 ( hAPP(c_Fun_Othe__inv__into(V_A,V_f,T_a,T_b),hAPP(V_f,V_x)) = V_x
% 14.25/14.40 | ~ c_in(V_x,V_A,T_a)
% 14.25/14.40 | ~ c_Fun_Oinj__on(V_f,V_A,T_a,T_b) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_the__inv__into__f__eq_0,axiom,
% 14.25/14.40 ( ~ c_Fun_Oinj__on(V_f,V_A,T_aa,T_a)
% 14.25/14.40 | hAPP(c_Fun_Othe__inv__into(V_A,V_f,T_aa,T_a),hAPP(V_f,V_x)) = V_x
% 14.25/14.40 | ~ c_in(V_x,V_A,T_aa) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_diff__is__0__eq_0,axiom,
% 14.25/14.40 ( c_HOL_Ominus__class_Ominus(V_m,V_n,tc_nat) != c_HOL_Ozero__class_Ozero(tc_nat)
% 14.25/14.40 | c_lessequals(V_m,V_n,tc_nat) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_diff__is__0__eq_1,axiom,
% 14.25/14.40 ( c_HOL_Ominus__class_Ominus(V_m,V_n,tc_nat) = c_HOL_Ozero__class_Ozero(tc_nat)
% 14.25/14.40 | ~ c_lessequals(V_m,V_n,tc_nat) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_Compl__disjoint_0,axiom,
% 14.25/14.40 hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_A),c_HOL_Ouminus__class_Ouminus(V_A,tc_fun(T_a,tc_bool))) = c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_Compl__disjoint2_0,axiom,
% 14.25/14.40 hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),c_HOL_Ouminus__class_Ouminus(V_A,tc_fun(T_a,tc_bool))),V_A) = c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_setsum__0_0,axiom,
% 14.25/14.40 ( ~ class_OrderedGroup_Ocomm__monoid__add(T_a)
% 14.25/14.40 | c_Finite__Set_Osetsum(c_COMBK(c_HOL_Ozero__class_Ozero(T_a),T_a,T_b),V_A,T_b,T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_compl__top__eq_0,axiom,
% 14.25/14.40 ( ~ class_Lattices_Oboolean__algebra(T_a)
% 14.25/14.40 | c_HOL_Ouminus__class_Ouminus(c_Orderings_Otop__class_Otop(T_a),T_a) = c_Orderings_Obot__class_Obot(T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_compl__bot__eq_0,axiom,
% 14.25/14.40 ( ~ class_Lattices_Oboolean__algebra(T_a)
% 14.25/14.40 | c_HOL_Ouminus__class_Ouminus(c_Orderings_Obot__class_Obot(T_a),T_a) = c_Orderings_Otop__class_Otop(T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_le__less__Suc__eq_1,axiom,
% 14.25/14.40 ( ~ c_lessequals(V_x,V_x,tc_nat)
% 14.25/14.40 | c_HOL_Oord__class_Oless(V_x,c_Suc(V_x),tc_nat) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_less__Suc__eq__le_0,axiom,
% 14.25/14.40 ( c_lessequals(V_m,V_n,tc_nat)
% 14.25/14.40 | ~ c_HOL_Oord__class_Oless(V_m,c_Suc(V_n),tc_nat) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_less__Suc__eq__le_1,axiom,
% 14.25/14.40 ( c_HOL_Oord__class_Oless(V_m,c_Suc(V_n),tc_nat)
% 14.25/14.40 | ~ c_lessequals(V_m,V_n,tc_nat) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_Suc__leI_0,axiom,
% 14.25/14.40 ( c_lessequals(c_Suc(V_m),V_n,tc_nat)
% 14.25/14.40 | ~ c_HOL_Oord__class_Oless(V_m,V_n,tc_nat) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_Suc__le__eq_0,axiom,
% 14.25/14.40 ( c_HOL_Oord__class_Oless(V_m,V_n,tc_nat)
% 14.25/14.40 | ~ c_lessequals(c_Suc(V_m),V_n,tc_nat) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_less__eq__Suc__le_0,axiom,
% 14.25/14.40 ( c_lessequals(c_Suc(V_n),V_m,tc_nat)
% 14.25/14.40 | ~ c_HOL_Oord__class_Oless(V_n,V_m,tc_nat) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_less__eq__Suc__le_1,axiom,
% 14.25/14.40 ( c_HOL_Oord__class_Oless(V_n,V_m,tc_nat)
% 14.25/14.40 | ~ c_lessequals(c_Suc(V_n),V_m,tc_nat) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_Suc__diff__le_0,axiom,
% 14.25/14.40 ( c_HOL_Ominus__class_Ominus(c_Suc(V_m),V_n,tc_nat) = c_Suc(c_HOL_Ominus__class_Ominus(V_m,V_n,tc_nat))
% 14.25/14.40 | ~ c_lessequals(V_n,V_m,tc_nat) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_le__less__Suc__eq_0,axiom,
% 14.25/14.40 ( V_n = V_m
% 14.25/14.40 | ~ c_HOL_Oord__class_Oless(V_n,c_Suc(V_m),tc_nat)
% 14.25/14.40 | ~ c_lessequals(V_m,V_n,tc_nat) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_finite__compl_0,axiom,
% 14.25/14.40 ( c_Finite__Set_Ofinite(c_Orderings_Otop__class_Otop(tc_fun(T_a,tc_bool)),T_a)
% 14.25/14.40 | ~ c_Finite__Set_Ofinite(c_HOL_Ouminus__class_Ouminus(V_A,tc_fun(T_a,tc_bool)),T_a)
% 14.25/14.40 | ~ c_Finite__Set_Ofinite(V_A,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_finite__compl_1,axiom,
% 14.25/14.40 ( c_Finite__Set_Ofinite(c_HOL_Ouminus__class_Ouminus(V_A,tc_fun(T_a,tc_bool)),T_a)
% 14.25/14.40 | ~ c_Finite__Set_Ofinite(c_Orderings_Otop__class_Otop(tc_fun(T_a,tc_bool)),T_a)
% 14.25/14.40 | ~ c_Finite__Set_Ofinite(V_A,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_Compl__UNIV__eq_0,axiom,
% 14.25/14.40 c_HOL_Ouminus__class_Ouminus(c_Orderings_Otop__class_Otop(tc_fun(T_a,tc_bool)),tc_fun(T_a,tc_bool)) = c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_Compl__empty__eq_0,axiom,
% 14.25/14.40 c_HOL_Ouminus__class_Ouminus(c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),tc_fun(T_a,tc_bool)) = c_Orderings_Otop__class_Otop(tc_fun(T_a,tc_bool)) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_Un__Int__assoc__eq_0,axiom,
% 14.25/14.40 ( hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_A),V_B)),V_C) != hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_A),hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_B),V_C))
% 14.25/14.40 | c_lessequals(V_C,V_A,tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_Un__Int__assoc__eq_1,axiom,
% 14.25/14.40 ( hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_A),V_B)),V_C) = hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_A),hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_B),V_C))
% 14.25/14.40 | ~ c_lessequals(V_C,V_A,tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_card__eq__SucD_2,axiom,
% 14.25/14.40 ( c_Finite__Set_Ocard(V_A,T_a) != c_Suc(V_k)
% 14.25/14.40 | c_Finite__Set_Ocard(c_ATP__Linkup_Osko__Finite__Set__Xcard__eq__SucD__1__2(V_A,V_k,T_a),T_a) = V_k ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_card__Suc__eq_2,axiom,
% 14.25/14.40 ( c_Finite__Set_Ocard(V_A,T_a) != c_Suc(V_k)
% 14.25/14.40 | c_Finite__Set_Ocard(c_ATP__Linkup_Osko__Finite__Set__Xcard__Suc__eq__1__2(V_A,V_k,T_a),T_a) = V_k ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_Diff__subset__conv_0,axiom,
% 14.25/14.40 ( c_lessequals(V_A,hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_B),V_C),tc_fun(T_a,tc_bool))
% 14.25/14.40 | ~ c_lessequals(c_HOL_Ominus__class_Ominus(V_A,V_B,tc_fun(T_a,tc_bool)),V_C,tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_Diff__subset__conv_1,axiom,
% 14.25/14.40 ( c_lessequals(c_HOL_Ominus__class_Ominus(V_A,V_B,tc_fun(T_a,tc_bool)),V_C,tc_fun(T_a,tc_bool))
% 14.25/14.40 | ~ c_lessequals(V_A,hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_B),V_C),tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_Diff__partition_0,axiom,
% 14.25/14.40 ( hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_A),c_HOL_Ominus__class_Ominus(V_B,V_A,tc_fun(T_a,tc_bool))) = V_B
% 14.25/14.40 | ~ c_lessequals(V_A,V_B,tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_inj__on__the__inv__into_0,axiom,
% 14.25/14.40 ( c_Fun_Oinj__on(c_Fun_Othe__inv__into(V_A,V_f,T_a,T_b),c_Set_Oimage(V_f,V_A,T_a,T_b),T_b,T_a)
% 14.25/14.40 | ~ c_Fun_Oinj__on(V_f,V_A,T_a,T_b) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_inj__on__Un__image__eq__iff_0,axiom,
% 14.25/14.40 ( c_Set_Oimage(V_f,V_A,T_a,T_b) != c_Set_Oimage(V_f,V_B,T_a,T_b)
% 14.25/14.40 | ~ c_Fun_Oinj__on(V_f,hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_A),V_B),T_a,T_b)
% 14.25/14.40 | V_A = V_B ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_the__inv__into__onto_0,axiom,
% 14.25/14.40 ( c_Set_Oimage(c_Fun_Othe__inv__into(V_A,V_f,T_a,T_b),c_Set_Oimage(V_f,V_A,T_a,T_b),T_b,T_a) = V_A
% 14.25/14.40 | ~ c_Fun_Oinj__on(V_f,V_A,T_a,T_b) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_Diff__Compl_0,axiom,
% 14.25/14.40 c_HOL_Ominus__class_Ominus(V_A,c_HOL_Ouminus__class_Ouminus(V_B,tc_fun(T_a,tc_bool)),tc_fun(T_a,tc_bool)) = hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_A),V_B) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_Diff__eq_0,axiom,
% 14.25/14.40 c_HOL_Ominus__class_Ominus(V_A,V_B,tc_fun(T_a,tc_bool)) = hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_A),c_HOL_Ouminus__class_Ouminus(V_B,tc_fun(T_a,tc_bool))) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_Un__Diff__Int_0,axiom,
% 14.25/14.40 hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),c_HOL_Ominus__class_Ominus(V_A,V_B,tc_fun(T_a,tc_bool))),hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_A),V_B)) = V_A ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_Diff__Un_0,axiom,
% 14.25/14.40 c_HOL_Ominus__class_Ominus(V_A,hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_B),V_C),tc_fun(T_a,tc_bool)) = hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),c_HOL_Ominus__class_Ominus(V_A,V_B,tc_fun(T_a,tc_bool))),c_HOL_Ominus__class_Ominus(V_A,V_C,tc_fun(T_a,tc_bool))) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_Diff__Int_0,axiom,
% 14.25/14.40 c_HOL_Ominus__class_Ominus(V_A,hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_B),V_C),tc_fun(T_a,tc_bool)) = hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),c_HOL_Ominus__class_Ominus(V_A,V_B,tc_fun(T_a,tc_bool))),c_HOL_Ominus__class_Ominus(V_A,V_C,tc_fun(T_a,tc_bool))) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_the__inv__f__f_0,axiom,
% 14.25/14.40 ( hAPP(c_Fun_Othe__inv__into(c_Orderings_Otop__class_Otop(tc_fun(T_a,tc_bool)),V_f,T_a,T_b),hAPP(V_f,V_x)) = V_x
% 14.25/14.40 | ~ c_Fun_Oinj__on(V_f,c_Orderings_Otop__class_Otop(tc_fun(T_a,tc_bool)),T_a,T_b) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_Compl__eq__Diff__UNIV_0,axiom,
% 14.25/14.40 c_HOL_Ouminus__class_Ouminus(V_A,tc_fun(T_a,tc_bool)) = c_HOL_Ominus__class_Ominus(c_Orderings_Otop__class_Otop(tc_fun(T_a,tc_bool)),V_A,tc_fun(T_a,tc_bool)) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_min__max_Ole__inf__iff_0,axiom,
% 14.25/14.40 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.40 | c_lessequals(V_x,V_y,T_a)
% 14.25/14.40 | ~ c_lessequals(V_x,hAPP(hAPP(c_Orderings_Oord__class_Omin(T_a),V_y),V_z),T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_min__max_Ole__inf__iff_1,axiom,
% 14.25/14.40 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.40 | c_lessequals(V_x,V_z,T_a)
% 14.25/14.40 | ~ c_lessequals(V_x,hAPP(hAPP(c_Orderings_Oord__class_Omin(T_a),V_y),V_z),T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_le__max__iff__disj_0,axiom,
% 14.25/14.40 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.40 | c_lessequals(V_z,V_y,T_a)
% 14.25/14.40 | c_lessequals(V_z,V_x,T_a)
% 14.25/14.40 | ~ c_lessequals(V_z,hAPP(hAPP(c_Orderings_Oord__class_Omax(T_a),V_x),V_y),T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_le__maxI2_0,axiom,
% 14.25/14.40 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.40 | c_lessequals(V_y,hAPP(hAPP(c_Orderings_Oord__class_Omax(T_a),V_x),V_y),T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_le__maxI1_0,axiom,
% 14.25/14.40 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.40 | c_lessequals(V_x,hAPP(hAPP(c_Orderings_Oord__class_Omax(T_a),V_x),V_y),T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_min__max_Ole__supI_0,axiom,
% 14.25/14.40 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.40 | c_lessequals(hAPP(hAPP(c_Orderings_Oord__class_Omax(T_a),V_a),V_b),V_x,T_a)
% 14.25/14.40 | ~ c_lessequals(V_b,V_x,T_a)
% 14.25/14.40 | ~ c_lessequals(V_a,V_x,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_min__max_Osup__least_0,axiom,
% 14.25/14.40 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.40 | c_lessequals(hAPP(hAPP(c_Orderings_Oord__class_Omax(T_a),V_y),V_z),V_x,T_a)
% 14.25/14.40 | ~ c_lessequals(V_z,V_x,T_a)
% 14.25/14.40 | ~ c_lessequals(V_y,V_x,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_min__max_Ole__sup__iff_2,axiom,
% 14.25/14.40 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.40 | c_lessequals(hAPP(hAPP(c_Orderings_Oord__class_Omax(T_a),V_x),V_y),V_z,T_a)
% 14.25/14.40 | ~ c_lessequals(V_y,V_z,T_a)
% 14.25/14.40 | ~ c_lessequals(V_x,V_z,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_le__imp__neg__le_0,axiom,
% 14.25/14.40 ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 14.25/14.40 | c_lessequals(c_HOL_Ouminus__class_Ouminus(V_b,T_a),c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a)
% 14.25/14.40 | ~ c_lessequals(V_a,V_b,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_neg__le__iff__le_0,axiom,
% 14.25/14.40 ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 14.25/14.40 | c_lessequals(V_a,V_b,T_a)
% 14.25/14.40 | ~ c_lessequals(c_HOL_Ouminus__class_Ouminus(V_b,T_a),c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_min__max_Oinf__le1_0,axiom,
% 14.25/14.40 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.40 | c_lessequals(hAPP(hAPP(c_Orderings_Oord__class_Omin(T_a),V_x),V_y),V_x,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_min__max_Oinf__le2_0,axiom,
% 14.25/14.40 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.40 | c_lessequals(hAPP(hAPP(c_Orderings_Oord__class_Omin(T_a),V_x),V_y),V_y,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_min__max_Ole__infI_0,axiom,
% 14.25/14.40 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.40 | c_lessequals(V_x,hAPP(hAPP(c_Orderings_Oord__class_Omin(T_a),V_a),V_b),T_a)
% 14.25/14.40 | ~ c_lessequals(V_x,V_b,T_a)
% 14.25/14.40 | ~ c_lessequals(V_x,V_a,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_min__max_Ole__inf__iff_2,axiom,
% 14.25/14.40 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.40 | c_lessequals(V_x,hAPP(hAPP(c_Orderings_Oord__class_Omin(T_a),V_y),V_z),T_a)
% 14.25/14.40 | ~ c_lessequals(V_x,V_z,T_a)
% 14.25/14.40 | ~ c_lessequals(V_x,V_y,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_min__max_Oinf__greatest_0,axiom,
% 14.25/14.40 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.40 | c_lessequals(V_x,hAPP(hAPP(c_Orderings_Oord__class_Omin(T_a),V_y),V_z),T_a)
% 14.25/14.40 | ~ c_lessequals(V_x,V_z,T_a)
% 14.25/14.40 | ~ c_lessequals(V_x,V_y,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_min__max_Ole__iff__sup_0,axiom,
% 14.25/14.40 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.40 | hAPP(hAPP(c_Orderings_Oord__class_Omax(T_a),V_x),V_y) = V_y
% 14.25/14.40 | ~ c_lessequals(V_x,V_y,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_min__max_Ole__iff__sup_1,axiom,
% 14.25/14.40 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.40 | hAPP(hAPP(c_Orderings_Oord__class_Omax(T_a),V_x),V_y) != V_y
% 14.25/14.40 | c_lessequals(V_x,V_y,T_a) ) ).
% 14.25/14.40
% 14.25/14.40 cnf(cls_min__max_Osup__absorb1_0,axiom,
% 14.25/14.41 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.41 | hAPP(hAPP(c_Orderings_Oord__class_Omax(T_a),V_x),V_y) = V_x
% 14.25/14.41 | ~ c_lessequals(V_y,V_x,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_min__max_Ole__iff__inf_0,axiom,
% 14.25/14.41 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.41 | hAPP(hAPP(c_Orderings_Oord__class_Omin(T_a),V_x),V_y) = V_x
% 14.25/14.41 | ~ c_lessequals(V_x,V_y,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_min__max_Ole__iff__inf_1,axiom,
% 14.25/14.41 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.41 | hAPP(hAPP(c_Orderings_Oord__class_Omin(T_a),V_x),V_y) != V_x
% 14.25/14.41 | c_lessequals(V_x,V_y,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_min__max_Oinf__absorb2_0,axiom,
% 14.25/14.41 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.41 | hAPP(hAPP(c_Orderings_Oord__class_Omin(T_a),V_x),V_y) = V_y
% 14.25/14.41 | ~ c_lessequals(V_y,V_x,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_not__leE_0,axiom,
% 14.25/14.41 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.41 | c_HOL_Oord__class_Oless(V_x,V_y,T_a)
% 14.25/14.41 | c_lessequals(V_y,V_x,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_linorder__antisym__conv2_1,axiom,
% 14.25/14.41 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.41 | ~ c_lessequals(V_x,V_x,T_a)
% 14.25/14.41 | ~ c_HOL_Oord__class_Oless(V_x,V_x,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_linorder__antisym__conv1_1,axiom,
% 14.25/14.41 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.41 | c_HOL_Oord__class_Oless(V_x,V_x,T_a)
% 14.25/14.41 | c_lessequals(V_x,V_x,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_linorder__not__less_1,axiom,
% 14.25/14.41 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.41 | ~ c_HOL_Oord__class_Oless(V_x,V_y,T_a)
% 14.25/14.41 | ~ c_lessequals(V_y,V_x,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_linorder__not__less_0,axiom,
% 14.25/14.41 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.41 | c_lessequals(V_y,V_x,T_a)
% 14.25/14.41 | c_HOL_Oord__class_Oless(V_x,V_y,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_linorder__not__le_1,axiom,
% 14.25/14.41 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.41 | ~ c_lessequals(V_x,V_y,T_a)
% 14.25/14.41 | ~ c_HOL_Oord__class_Oless(V_y,V_x,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_linorder__not__le_0,axiom,
% 14.25/14.41 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.41 | c_HOL_Oord__class_Oless(V_y,V_x,T_a)
% 14.25/14.41 | c_lessequals(V_x,V_y,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_less__le__not__le_1,axiom,
% 14.25/14.41 ( ~ class_Orderings_Opreorder(T_a)
% 14.25/14.41 | ~ c_lessequals(V_y,V_x,T_a)
% 14.25/14.41 | ~ c_HOL_Oord__class_Oless(V_x,V_y,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_le__supI_0,axiom,
% 14.25/14.41 ( ~ class_Lattices_Oupper__semilattice(T_a)
% 14.25/14.41 | c_lessequals(hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_a),V_b),V_x,T_a)
% 14.25/14.41 | ~ c_lessequals(V_b,V_x,T_a)
% 14.25/14.41 | ~ c_lessequals(V_a,V_x,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_sup__ge1_0,axiom,
% 14.25/14.41 ( ~ class_Lattices_Oupper__semilattice(T_a)
% 14.25/14.41 | c_lessequals(V_x,hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_x),V_y),T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_sup__ge2_0,axiom,
% 14.25/14.41 ( ~ class_Lattices_Oupper__semilattice(T_a)
% 14.25/14.41 | c_lessequals(V_y,hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_x),V_y),T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_sup__least_0,axiom,
% 14.25/14.41 ( ~ class_Lattices_Oupper__semilattice(T_a)
% 14.25/14.41 | c_lessequals(hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_y),V_z),V_x,T_a)
% 14.25/14.41 | ~ c_lessequals(V_z,V_x,T_a)
% 14.25/14.41 | ~ c_lessequals(V_y,V_x,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_le__sup__iff_2,axiom,
% 14.25/14.41 ( ~ class_Lattices_Oupper__semilattice(T_a)
% 14.25/14.41 | c_lessequals(hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_x),V_y),V_z,T_a)
% 14.25/14.41 | ~ c_lessequals(V_y,V_z,T_a)
% 14.25/14.41 | ~ c_lessequals(V_x,V_z,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_inf__sup__ord_I4_J_0,axiom,
% 14.25/14.41 ( ~ class_Lattices_Olattice(T_a)
% 14.25/14.41 | c_lessequals(V_y,hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_x),V_y),T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_inf__sup__ord_I3_J_0,axiom,
% 14.25/14.41 ( ~ class_Lattices_Olattice(T_a)
% 14.25/14.41 | c_lessequals(V_x,hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_x),V_y),T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_le__minus__iff_0,axiom,
% 14.25/14.41 ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 14.25/14.41 | c_lessequals(V_b,c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a)
% 14.25/14.41 | ~ c_lessequals(V_a,c_HOL_Ouminus__class_Ouminus(V_b,T_a),T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_le__minus__iff_1,axiom,
% 14.25/14.41 ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 14.25/14.41 | c_lessequals(V_a,c_HOL_Ouminus__class_Ouminus(V_b,T_a),T_a)
% 14.25/14.41 | ~ c_lessequals(V_b,c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_minus__le__iff_0,axiom,
% 14.25/14.41 ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 14.25/14.41 | c_lessequals(c_HOL_Ouminus__class_Ouminus(V_b,T_a),V_a,T_a)
% 14.25/14.41 | ~ c_lessequals(c_HOL_Ouminus__class_Ouminus(V_a,T_a),V_b,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_minus__le__iff_1,axiom,
% 14.25/14.41 ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 14.25/14.41 | c_lessequals(c_HOL_Ouminus__class_Ouminus(V_a,T_a),V_b,T_a)
% 14.25/14.41 | ~ c_lessequals(c_HOL_Ouminus__class_Ouminus(V_b,T_a),V_a,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_finite__Un_1,axiom,
% 14.25/14.41 ( c_Finite__Set_Ofinite(V_G,T_a)
% 14.25/14.41 | ~ c_Finite__Set_Ofinite(hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_F),V_G),T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_finite__Un_0,axiom,
% 14.25/14.41 ( c_Finite__Set_Ofinite(V_F,T_a)
% 14.25/14.41 | ~ c_Finite__Set_Ofinite(hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_F),V_G),T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_finite__UnI_0,axiom,
% 14.25/14.41 ( c_Finite__Set_Ofinite(hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_F),V_G),T_a)
% 14.25/14.41 | ~ c_Finite__Set_Ofinite(V_G,T_a)
% 14.25/14.41 | ~ c_Finite__Set_Ofinite(V_F,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_finite__Un_2,axiom,
% 14.25/14.41 ( c_Finite__Set_Ofinite(hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_F),V_G),T_a)
% 14.25/14.41 | ~ c_Finite__Set_Ofinite(V_G,T_a)
% 14.25/14.41 | ~ c_Finite__Set_Ofinite(V_F,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_fold__graph__imp__finite_0,axiom,
% 14.25/14.41 ( c_Finite__Set_Ofinite(V_A,T_a)
% 14.25/14.41 | ~ c_Finite__Set_Ofold__graph(V_f,V_z,V_A,V_x,T_a,T_b) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_sup__bot__left_0,axiom,
% 14.25/14.41 ( ~ class_Lattices_Obounded__lattice(T_a)
% 14.25/14.41 | hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),c_Orderings_Obot__class_Obot(T_a)),V_x) = V_x ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_sup__bot__right_0,axiom,
% 14.25/14.41 ( ~ class_Lattices_Obounded__lattice(T_a)
% 14.25/14.41 | hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_x),c_Orderings_Obot__class_Obot(T_a)) = V_x ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_sup__eq__bot__eq1_0,axiom,
% 14.25/14.41 ( ~ class_Lattices_Obounded__lattice(T_a)
% 14.25/14.41 | hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_A),V_B) != c_Orderings_Obot__class_Obot(T_a)
% 14.25/14.41 | V_A = c_Orderings_Obot__class_Obot(T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_sup__eq__bot__eq2_0,axiom,
% 14.25/14.41 ( ~ class_Lattices_Obounded__lattice(T_a)
% 14.25/14.41 | hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(T_a),V_A),V_B) != c_Orderings_Obot__class_Obot(T_a)
% 14.25/14.41 | V_B = c_Orderings_Obot__class_Obot(T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Un__empty_2,axiom,
% 14.25/14.41 hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool))),c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool))) = c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Un__empty__right_0,axiom,
% 14.25/14.41 hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_A),c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool))) = V_A ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Un__empty__left_0,axiom,
% 14.25/14.41 hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool))),V_B) = V_B ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_not__psubset__empty_0,axiom,
% 14.25/14.41 ~ c_HOL_Oord__class_Oless(V_A,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),tc_fun(T_a,tc_bool)) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_empty__fold__graphE_0,axiom,
% 14.25/14.41 ( V_x = V_z
% 14.25/14.41 | ~ c_Finite__Set_Ofold__graph(V_f,V_z,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),V_x,T_a,T_b) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_fold__graph_OemptyI_0,axiom,
% 14.25/14.41 c_Finite__Set_Ofold__graph(V_f,V_z,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),V_z,T_a,T_b) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_fold__graph_H_Ointros_I1_J_0,axiom,
% 14.25/14.41 c_Nitpick_Ofold__graph_H(V_f,V_z,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),V_z,T_a,T_b) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Un__empty_1,axiom,
% 14.25/14.41 ( hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_A),V_B) != c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool))
% 14.25/14.41 | V_B = c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Un__empty_0,axiom,
% 14.25/14.41 ( hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_A),V_B) != c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool))
% 14.25/14.41 | V_A = c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Un__insert__right_0,axiom,
% 14.25/14.41 hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_A),c_Set_Oinsert(V_a,V_B,T_a)) = c_Set_Oinsert(V_a,hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_A),V_B),T_a) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Un__insert__left_0,axiom,
% 14.25/14.41 hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),c_Set_Oinsert(V_a,V_B,T_a)),V_C) = c_Set_Oinsert(V_a,hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_B),V_C),T_a) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_less__fun__def_0,axiom,
% 14.25/14.41 ( ~ class_HOL_Oord(T_b)
% 14.25/14.41 | c_lessequals(V_f,V_g,tc_fun(T_a,T_b))
% 14.25/14.41 | ~ c_HOL_Oord__class_Oless(V_f,V_g,tc_fun(T_a,T_b)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_less__fun__def_2,axiom,
% 14.25/14.41 ( ~ class_HOL_Oord(T_b)
% 14.25/14.41 | c_HOL_Oord__class_Oless(V_f,V_g,tc_fun(T_a,T_b))
% 14.25/14.41 | c_lessequals(V_g,V_f,tc_fun(T_a,T_b))
% 14.25/14.41 | ~ c_lessequals(V_f,V_g,tc_fun(T_a,T_b)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_less__fun__def_1,axiom,
% 14.25/14.41 ( ~ class_HOL_Oord(T_b)
% 14.25/14.41 | ~ c_lessequals(V_g,V_f,tc_fun(T_a,T_b))
% 14.25/14.41 | ~ c_HOL_Oord__class_Oless(V_f,V_g,tc_fun(T_a,T_b)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_subset__iff__psubset__eq_0,axiom,
% 14.25/14.41 ( V_A = V_B
% 14.25/14.41 | c_HOL_Oord__class_Oless(V_A,V_B,tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_lessequals(V_A,V_B,tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_psubset__eq_2,axiom,
% 14.25/14.41 ( c_HOL_Oord__class_Oless(V_A,V_B,tc_fun(T_a,tc_bool))
% 14.25/14.41 | V_A = V_B
% 14.25/14.41 | ~ c_lessequals(V_A,V_B,tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_subset__psubset__trans_0,axiom,
% 14.25/14.41 ( c_HOL_Oord__class_Oless(V_A,V_C,tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_HOL_Oord__class_Oless(V_B,V_C,tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_lessequals(V_A,V_B,tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_psubset__subset__trans_0,axiom,
% 14.25/14.41 ( c_HOL_Oord__class_Oless(V_A,V_C,tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_lessequals(V_B,V_C,tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_HOL_Oord__class_Oless(V_A,V_B,tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Un__subset__iff_1,axiom,
% 14.25/14.41 ( c_lessequals(V_B,V_C,tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_lessequals(hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_A),V_B),V_C,tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Un__subset__iff_0,axiom,
% 14.25/14.41 ( c_lessequals(V_A,V_C,tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_lessequals(hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_A),V_B),V_C,tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Un__mono_0,axiom,
% 14.25/14.41 ( c_lessequals(hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_A),V_B),hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_C),V_D),tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_lessequals(V_B,V_D,tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_lessequals(V_A,V_C,tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_subset__Un__eq_1,axiom,
% 14.25/14.41 ( hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_A),V_B) != V_B
% 14.25/14.41 | c_lessequals(V_A,V_B,tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Un__absorb2_0,axiom,
% 14.25/14.41 ( hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_A),V_B) = V_A
% 14.25/14.41 | ~ c_lessequals(V_B,V_A,tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Un__absorb1_0,axiom,
% 14.25/14.41 ( hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_A),V_B) = V_B
% 14.25/14.41 | ~ c_lessequals(V_A,V_B,tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_psubset__eq_0,axiom,
% 14.25/14.41 ( c_lessequals(V_A,V_B,tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_HOL_Oord__class_Oless(V_A,V_B,tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Compl__subset__Compl__iff_1,axiom,
% 14.25/14.41 ( c_lessequals(c_HOL_Ouminus__class_Ouminus(V_A,tc_fun(T_a,tc_bool)),c_HOL_Ouminus__class_Ouminus(V_B,tc_fun(T_a,tc_bool)),tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_lessequals(V_B,V_A,tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Compl__subset__Compl__iff_0,axiom,
% 14.25/14.41 ( c_lessequals(V_B,V_A,tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_lessequals(c_HOL_Ouminus__class_Ouminus(V_A,tc_fun(T_a,tc_bool)),c_HOL_Ouminus__class_Ouminus(V_B,tc_fun(T_a,tc_bool)),tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Compl__anti__mono_0,axiom,
% 14.25/14.41 ( c_lessequals(c_HOL_Ouminus__class_Ouminus(V_B,tc_fun(T_a,tc_bool)),c_HOL_Ouminus__class_Ouminus(V_A,tc_fun(T_a,tc_bool)),tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_lessequals(V_A,V_B,tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Un__subset__iff_2,axiom,
% 14.25/14.41 ( c_lessequals(hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_A),V_B),V_C,tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_lessequals(V_B,V_C,tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_lessequals(V_A,V_C,tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Un__upper2_0,axiom,
% 14.25/14.41 c_lessequals(V_B,hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_A),V_B),tc_fun(T_a,tc_bool)) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Un__upper1_0,axiom,
% 14.25/14.41 c_lessequals(V_A,hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_A),V_B),tc_fun(T_a,tc_bool)) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Un__least_0,axiom,
% 14.25/14.41 ( c_lessequals(hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_A),V_B),V_C,tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_lessequals(V_B,V_C,tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_lessequals(V_A,V_C,tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_psubset__card__mono_0,axiom,
% 14.25/14.41 ( c_HOL_Oord__class_Oless(c_Finite__Set_Ocard(V_A,T_a),c_Finite__Set_Ocard(V_B,T_a),tc_nat)
% 14.25/14.41 | ~ c_HOL_Oord__class_Oless(V_A,V_B,tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_Finite__Set_Ofinite(V_B,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_image__Un_0,axiom,
% 14.25/14.41 c_Set_Oimage(V_f,hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_b,tc_bool)),V_A),V_B),T_b,T_a) = hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),c_Set_Oimage(V_f,V_A,T_b,T_a)),c_Set_Oimage(V_f,V_B,T_b,T_a)) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_setprod__zero__iff_2,axiom,
% 14.25/14.41 ( ~ class_Ring__and__Field_Ono__zero__divisors(T_b)
% 14.25/14.41 | ~ class_Ring__and__Field_Ocomm__semiring__1(T_b)
% 14.25/14.41 | hAPP(V_f,V_x) != c_HOL_Ozero__class_Ozero(T_b)
% 14.25/14.41 | ~ c_in(V_x,V_A,T_a)
% 14.25/14.41 | ~ c_Finite__Set_Ofinite(V_A,T_a)
% 14.25/14.41 | c_Finite__Set_Osetprod(V_f,V_A,T_a,T_b) = c_HOL_Ozero__class_Ozero(T_b) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_setprod__zero_0,axiom,
% 14.25/14.41 ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_b)
% 14.25/14.41 | hAPP(V_f,V_x) != c_HOL_Ozero__class_Ozero(T_b)
% 14.25/14.41 | ~ c_in(V_x,V_A,T_a)
% 14.25/14.41 | ~ c_Finite__Set_Ofinite(V_A,T_a)
% 14.25/14.41 | c_Finite__Set_Osetprod(V_f,V_A,T_a,T_b) = c_HOL_Ozero__class_Ozero(T_b) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_setsum__eq__0__iff_0,axiom,
% 14.25/14.41 ( c_Finite__Set_Osetsum(V_f,V_F,T_a,tc_nat) != c_HOL_Ozero__class_Ozero(tc_nat)
% 14.25/14.41 | ~ c_Finite__Set_Ofinite(V_F,T_a)
% 14.25/14.41 | hAPP(V_f,V_x) = c_HOL_Ozero__class_Ozero(tc_nat)
% 14.25/14.41 | ~ c_in(V_x,V_F,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_psubset__insert__iff_7,axiom,
% 14.25/14.41 ( c_HOL_Oord__class_Oless(V_A,c_Set_Oinsert(V_x,V_B,T_a),tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_lessequals(V_A,V_B,tc_fun(T_a,tc_bool))
% 14.25/14.41 | c_in(V_x,V_A,T_a)
% 14.25/14.41 | ~ c_HOL_Oord__class_Oless(V_A,V_B,tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_psubset__insert__iff_3,axiom,
% 14.25/14.41 ( c_HOL_Oord__class_Oless(V_A,c_Set_Oinsert(V_x,V_B,T_a),tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_lessequals(V_A,V_B,tc_fun(T_a,tc_bool))
% 14.25/14.41 | c_in(V_x,V_A,T_a)
% 14.25/14.41 | c_in(V_x,V_B,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_psubset__insert__iff_2,axiom,
% 14.25/14.41 ( c_lessequals(V_A,V_B,tc_fun(T_a,tc_bool))
% 14.25/14.41 | c_in(V_x,V_A,T_a)
% 14.25/14.41 | c_in(V_x,V_B,T_a)
% 14.25/14.41 | ~ c_HOL_Oord__class_Oless(V_A,c_Set_Oinsert(V_x,V_B,T_a),tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_disjoint__eq__subset__Compl_1,axiom,
% 14.25/14.41 ( hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_A),V_B) = c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_lessequals(V_A,c_HOL_Ouminus__class_Ouminus(V_B,tc_fun(T_a,tc_bool)),tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_disjoint__eq__subset__Compl_0,axiom,
% 14.25/14.41 ( hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_A),V_B) != c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool))
% 14.25/14.41 | c_lessequals(V_A,c_HOL_Ouminus__class_Ouminus(V_B,tc_fun(T_a,tc_bool)),tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_inj__on__fun__updI_0,axiom,
% 14.25/14.41 ( c_Fun_Oinj__on(c_Fun_Ofun__upd(V_f,V_x,V_y,T_a,T_b),V_A,T_a,T_b)
% 14.25/14.41 | c_in(V_y,c_Set_Oimage(V_f,V_A,T_a,T_b),T_b)
% 14.25/14.41 | ~ c_Fun_Oinj__on(V_f,V_A,T_a,T_b) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_f__the__inv__into__f_0,axiom,
% 14.25/14.41 ( hAPP(V_f,hAPP(c_Fun_Othe__inv__into(V_A,V_f,T_a,T_b),V_y)) = V_y
% 14.25/14.41 | ~ c_in(V_y,c_Set_Oimage(V_f,V_A,T_a,T_b),T_b)
% 14.25/14.41 | ~ c_Fun_Oinj__on(V_f,V_A,T_a,T_b) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_card__gt__0__iff_1,axiom,
% 14.25/14.41 ( c_Finite__Set_Ofinite(V_A,T_a)
% 14.25/14.41 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_nat),c_Finite__Set_Ocard(V_A,T_a),tc_nat) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_card__gt__0__iff_0,axiom,
% 14.25/14.41 ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_nat),c_Finite__Set_Ocard(c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a),tc_nat) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_vimage__insert_0,axiom,
% 14.25/14.41 c_Set_Ovimage(V_f,c_Set_Oinsert(V_a,V_B,T_b),T_a,T_b) = hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),c_Set_Ovimage(V_f,c_Set_Oinsert(V_a,c_Orderings_Obot__class_Obot(tc_fun(T_b,tc_bool)),T_b),T_a,T_b)),c_Set_Ovimage(V_f,V_B,T_a,T_b)) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Min__eqI_0,axiom,
% 14.25/14.41 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.41 | hAPP(c_Finite__Set_Olinorder__class_OMin(T_a),V_A) = V_x
% 14.25/14.41 | ~ c_in(V_x,V_A,T_a)
% 14.25/14.41 | c_in(c_ATP__Linkup_Osko__Finite__Set__Xlinorder__class__XMin__eqI__1__1(V_A,V_x,T_a),V_A,T_a)
% 14.25/14.41 | ~ c_Finite__Set_Ofinite(V_A,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Max__eqI_0,axiom,
% 14.25/14.41 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.41 | hAPP(c_Finite__Set_Olinorder__class_OMax(T_a),V_A) = V_x
% 14.25/14.41 | ~ c_in(V_x,V_A,T_a)
% 14.25/14.41 | c_in(c_ATP__Linkup_Osko__Finite__Set__Xlinorder__class__XMax__eqI__1__1(V_A,V_x,T_a),V_A,T_a)
% 14.25/14.41 | ~ c_Finite__Set_Ofinite(V_A,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_fold1__belowI_0,axiom,
% 14.25/14.41 ( ~ class_Lattices_Olower__semilattice(T_a)
% 14.25/14.41 | c_lessequals(hAPP(c_Finite__Set_Ofold1(c_Lattices_Olower__semilattice__class_Oinf(T_a),T_a),V_A),V_a,T_a)
% 14.25/14.41 | ~ c_in(V_a,V_A,T_a)
% 14.25/14.41 | ~ c_Finite__Set_Ofinite(V_A,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_finite__subset__induct_1,axiom,
% 14.25/14.41 ( hBOOL(hAPP(V_P,V_F))
% 14.25/14.41 | c_in(c_ATP__Linkup_Osko__Finite__Set__Xfinite__subset__induct__1__1(V_A,V_P,T_a),V_A,T_a)
% 14.25/14.41 | ~ hBOOL(hAPP(V_P,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool))))
% 14.25/14.41 | ~ c_lessequals(V_F,V_A,tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_Finite__Set_Ofinite(V_F,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_le__infI_0,axiom,
% 14.25/14.41 ( ~ class_Lattices_Olower__semilattice(T_a)
% 14.25/14.41 | c_lessequals(V_x,hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_a),V_b),T_a)
% 14.25/14.41 | ~ c_lessequals(V_x,V_b,T_a)
% 14.25/14.41 | ~ c_lessequals(V_x,V_a,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_inf__le2_0,axiom,
% 14.25/14.41 ( ~ class_Lattices_Olower__semilattice(T_a)
% 14.25/14.41 | c_lessequals(hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_x),V_y),V_y,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_inf__le1_0,axiom,
% 14.25/14.41 ( ~ class_Lattices_Olower__semilattice(T_a)
% 14.25/14.41 | c_lessequals(hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_x),V_y),V_x,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_top__greatest_0,axiom,
% 14.25/14.41 ( ~ class_Orderings_Otop(T_a)
% 14.25/14.41 | c_lessequals(V_x,c_Orderings_Otop__class_Otop(T_a),T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_le__eqI_0,axiom,
% 14.25/14.41 ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 14.25/14.41 | c_HOL_Ominus__class_Ominus(V_x,V_y,T_a) != c_HOL_Ominus__class_Ominus(V_x_H,V_y_H,T_a)
% 14.25/14.41 | c_lessequals(V_y_H,V_x_H,T_a)
% 14.25/14.41 | ~ c_lessequals(V_y,V_x,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_le__eqI_1,axiom,
% 14.25/14.41 ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 14.25/14.41 | c_HOL_Ominus__class_Ominus(V_x,V_y,T_a) != c_HOL_Ominus__class_Ominus(V_x_H,V_y_H,T_a)
% 14.25/14.41 | c_lessequals(V_y,V_x,T_a)
% 14.25/14.41 | ~ c_lessequals(V_y_H,V_x_H,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_vimage__Int_0,axiom,
% 14.25/14.41 c_Set_Ovimage(V_f,hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_b,tc_bool)),V_A),V_B),T_a,T_b) = hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),c_Set_Ovimage(V_f,V_A,T_a,T_b)),c_Set_Ovimage(V_f,V_B,T_a,T_b)) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_vimage__subsetI_0,axiom,
% 14.25/14.41 ( c_lessequals(c_Set_Ovimage(V_f,V_B,T_a,T_b),V_A,tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_lessequals(V_B,c_Set_Oimage(V_f,V_A,T_a,T_b),tc_fun(T_b,tc_bool))
% 14.25/14.41 | ~ c_Fun_Oinj__on(V_f,c_Orderings_Otop__class_Otop(tc_fun(T_a,tc_bool)),T_a,T_b) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_inf1E_0,axiom,
% 14.25/14.41 ( hBOOL(hAPP(V_A,V_x))
% 14.25/14.41 | ~ hBOOL(hAPP(hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_A),V_B),V_x)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_inf1E_1,axiom,
% 14.25/14.41 ( hBOOL(hAPP(V_B,V_x))
% 14.25/14.41 | ~ hBOOL(hAPP(hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_A),V_B),V_x)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_insert__Diff__if_1,axiom,
% 14.25/14.41 ( c_HOL_Ominus__class_Ominus(c_Set_Oinsert(V_x,V_A,T_a),V_B,tc_fun(T_a,tc_bool)) = c_Set_Oinsert(V_x,c_HOL_Ominus__class_Ominus(V_A,V_B,tc_fun(T_a,tc_bool)),T_a)
% 14.25/14.41 | c_in(V_x,V_B,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_le__SucE_0,axiom,
% 14.25/14.41 ( V_m = c_Suc(V_n)
% 14.25/14.41 | c_lessequals(V_m,V_n,tc_nat)
% 14.25/14.41 | ~ c_lessequals(V_m,c_Suc(V_n),tc_nat) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Diff__disjoint_0,axiom,
% 14.25/14.41 hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_A),c_HOL_Ominus__class_Ominus(V_B,V_A,tc_fun(T_a,tc_bool))) = c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_le__Suc__eq_2,axiom,
% 14.25/14.41 c_lessequals(c_Suc(V_n),c_Suc(V_n),tc_nat) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_vimageD_0,axiom,
% 14.25/14.41 ( c_in(hAPP(V_f,V_a),V_A,T_b)
% 14.25/14.41 | ~ c_in(V_a,c_Set_Ovimage(V_f,V_A,T_a,T_b),T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_vimageE_0,axiom,
% 14.25/14.41 ( c_in(hAPP(V_f,V_a),V_B,T_b)
% 14.25/14.41 | ~ c_in(V_a,c_Set_Ovimage(V_f,V_B,T_a,T_b),T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_vimageI_0,axiom,
% 14.25/14.41 ( c_in(V_a,c_Set_Ovimage(V_f,V_B,T_b,T_a),T_b)
% 14.25/14.41 | ~ c_in(hAPP(V_f,V_a),V_B,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_vimageI2_0,axiom,
% 14.25/14.41 ( c_in(V_a,c_Set_Ovimage(V_f,V_A,T_b,T_a),T_b)
% 14.25/14.41 | ~ c_in(hAPP(V_f,V_a),V_A,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_vimage__eq_1,axiom,
% 14.25/14.41 ( c_in(V_a,c_Set_Ovimage(V_f,V_B,T_a,T_b),T_a)
% 14.25/14.41 | ~ c_in(hAPP(V_f,V_a),V_B,T_b) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Int__insert__left_1,axiom,
% 14.25/14.41 ( hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),c_Set_Oinsert(V_a,V_B,T_a)),V_C) = hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_B),V_C)
% 14.25/14.41 | c_in(V_a,V_C,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Int__insert__right_1,axiom,
% 14.25/14.41 ( hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_A),c_Set_Oinsert(V_a,V_B,T_a)) = hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_A),V_B)
% 14.25/14.41 | c_in(V_a,V_A,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_not__less__eq__eq_0,axiom,
% 14.25/14.41 ( c_lessequals(c_Suc(V_n),V_m,tc_nat)
% 14.25/14.41 | c_lessequals(V_m,V_n,tc_nat) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_not__less__eq__eq_1,axiom,
% 14.25/14.41 ( ~ c_lessequals(V_m,V_n,tc_nat)
% 14.25/14.41 | ~ c_lessequals(c_Suc(V_n),V_m,tc_nat) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_card__Diff2__less_0,axiom,
% 14.25/14.41 ( c_HOL_Oord__class_Oless(c_Finite__Set_Ocard(c_HOL_Ominus__class_Ominus(c_HOL_Ominus__class_Ominus(V_A,c_Set_Oinsert(V_x,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a),tc_fun(T_a,tc_bool)),c_Set_Oinsert(V_y,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a),tc_fun(T_a,tc_bool)),T_a),c_Finite__Set_Ocard(V_A,T_a),tc_nat)
% 14.25/14.41 | ~ c_in(V_y,V_A,T_a)
% 14.25/14.41 | ~ c_in(V_x,V_A,T_a)
% 14.25/14.41 | ~ c_Finite__Set_Ofinite(V_A,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_card__Diff1__less_0,axiom,
% 14.25/14.41 ( c_HOL_Oord__class_Oless(c_Finite__Set_Ocard(c_HOL_Ominus__class_Ominus(V_A,c_Set_Oinsert(V_x,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a),tc_fun(T_a,tc_bool)),T_a),c_Finite__Set_Ocard(V_A,T_a),tc_nat)
% 14.25/14.41 | ~ c_in(V_x,V_A,T_a)
% 14.25/14.41 | ~ c_Finite__Set_Ofinite(V_A,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_setsum__diff1_0,axiom,
% 14.25/14.41 ( ~ class_OrderedGroup_Oab__group__add(T_b)
% 14.25/14.41 | c_Finite__Set_Osetsum(V_f,c_HOL_Ominus__class_Ominus(V_A,c_Set_Oinsert(V_a,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a),tc_fun(T_a,tc_bool)),T_a,T_b) = c_HOL_Ominus__class_Ominus(c_Finite__Set_Osetsum(V_f,V_A,T_a,T_b),hAPP(V_f,V_a),T_b)
% 14.25/14.41 | ~ c_in(V_a,V_A,T_a)
% 14.25/14.41 | ~ c_Finite__Set_Ofinite(V_A,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_setsum__diff1__ring_0,axiom,
% 14.25/14.41 ( ~ class_Ring__and__Field_Oring(T_b)
% 14.25/14.41 | c_Finite__Set_Osetsum(V_f,c_HOL_Ominus__class_Ominus(V_A,c_Set_Oinsert(V_a,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a),tc_fun(T_a,tc_bool)),T_a,T_b) = c_HOL_Ominus__class_Ominus(c_Finite__Set_Osetsum(V_f,V_A,T_a,T_b),hAPP(V_f,V_a),T_b)
% 14.25/14.41 | ~ c_in(V_a,V_A,T_a)
% 14.25/14.41 | ~ c_Finite__Set_Ofinite(V_A,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_setprod__diff1_1,axiom,
% 14.25/14.41 ( ~ class_Ring__and__Field_Ofield(T_b)
% 14.25/14.41 | c_Finite__Set_Osetprod(V_f,c_HOL_Ominus__class_Ominus(V_A,c_Set_Oinsert(V_a,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a),tc_fun(T_a,tc_bool)),T_a,T_b) = c_Finite__Set_Osetprod(V_f,V_A,T_a,T_b)
% 14.25/14.41 | c_in(V_a,V_A,T_a)
% 14.25/14.41 | hAPP(V_f,V_a) = c_HOL_Ozero__class_Ozero(T_b)
% 14.25/14.41 | ~ c_Finite__Set_Ofinite(V_A,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_finite__subset__induct_4,axiom,
% 14.25/14.41 ( hBOOL(hAPP(V_P,V_F))
% 14.25/14.41 | ~ hBOOL(hAPP(V_P,c_Set_Oinsert(c_ATP__Linkup_Osko__Finite__Set__Xfinite__subset__induct__1__1(V_A,V_P,T_a),c_ATP__Linkup_Osko__Finite__Set__Xfinite__subset__induct__1__2(V_A,V_P,T_a),T_a)))
% 14.25/14.41 | ~ hBOOL(hAPP(V_P,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool))))
% 14.25/14.41 | ~ c_lessequals(V_F,V_A,tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_Finite__Set_Ofinite(V_F,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_finite__subset__induct_2,axiom,
% 14.25/14.41 ( hBOOL(hAPP(V_P,V_F))
% 14.25/14.41 | ~ c_in(c_ATP__Linkup_Osko__Finite__Set__Xfinite__subset__induct__1__1(V_A,V_P,T_a),c_ATP__Linkup_Osko__Finite__Set__Xfinite__subset__induct__1__2(V_A,V_P,T_a),T_a)
% 14.25/14.41 | ~ hBOOL(hAPP(V_P,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool))))
% 14.25/14.41 | ~ c_lessequals(V_F,V_A,tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_Finite__Set_Ofinite(V_F,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_inj__on__Un_2,axiom,
% 14.25/14.41 ( hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_b,tc_bool)),c_Set_Oimage(V_f,c_HOL_Ominus__class_Ominus(V_A,V_B,tc_fun(T_a,tc_bool)),T_a,T_b)),c_Set_Oimage(V_f,c_HOL_Ominus__class_Ominus(V_B,V_A,tc_fun(T_a,tc_bool)),T_a,T_b)) = c_Orderings_Obot__class_Obot(tc_fun(T_b,tc_bool))
% 14.25/14.41 | ~ c_Fun_Oinj__on(V_f,hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_A),V_B),T_a,T_b) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_inj__on__Un_3,axiom,
% 14.25/14.41 ( hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_b,tc_bool)),c_Set_Oimage(V_f,c_HOL_Ominus__class_Ominus(V_A,V_B,tc_fun(T_a,tc_bool)),T_a,T_b)),c_Set_Oimage(V_f,c_HOL_Ominus__class_Ominus(V_B,V_A,tc_fun(T_a,tc_bool)),T_a,T_b)) != c_Orderings_Obot__class_Obot(tc_fun(T_b,tc_bool))
% 14.25/14.41 | ~ c_Fun_Oinj__on(V_f,V_B,T_a,T_b)
% 14.25/14.41 | ~ c_Fun_Oinj__on(V_f,V_A,T_a,T_b)
% 14.25/14.41 | c_Fun_Oinj__on(V_f,hAPP(hAPP(c_Lattices_Oupper__semilattice__class_Osup(tc_fun(T_a,tc_bool)),V_A),V_B),T_a,T_b) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_fun__upd__image_0,axiom,
% 14.25/14.41 ( c_Set_Oimage(c_Fun_Ofun__upd(V_f,V_x,V_y,T_b,T_a),V_A,T_b,T_a) = c_Set_Oinsert(V_y,c_Set_Oimage(V_f,c_HOL_Ominus__class_Ominus(V_A,c_Set_Oinsert(V_x,c_Orderings_Obot__class_Obot(tc_fun(T_b,tc_bool)),T_b),tc_fun(T_b,tc_bool)),T_b,T_a),T_a)
% 14.25/14.41 | ~ c_in(V_x,V_A,T_b) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_psubset__insert__iff_5,axiom,
% 14.25/14.41 ( c_HOL_Oord__class_Oless(V_A,c_Set_Oinsert(V_x,V_B,T_a),tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_lessequals(V_A,V_B,tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_HOL_Oord__class_Oless(c_HOL_Ominus__class_Ominus(V_A,c_Set_Oinsert(V_x,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a),tc_fun(T_a,tc_bool)),V_B,tc_fun(T_a,tc_bool))
% 14.25/14.41 | c_in(V_x,V_B,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_setsum__diff1_1,axiom,
% 14.25/14.41 ( ~ class_OrderedGroup_Oab__group__add(T_b)
% 14.25/14.41 | c_Finite__Set_Osetsum(V_f,c_HOL_Ominus__class_Ominus(V_A,c_Set_Oinsert(V_a,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a),tc_fun(T_a,tc_bool)),T_a,T_b) = c_Finite__Set_Osetsum(V_f,V_A,T_a,T_b)
% 14.25/14.41 | c_in(V_a,V_A,T_a)
% 14.25/14.41 | ~ c_Finite__Set_Ofinite(V_A,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_below__fold1__iff_0,axiom,
% 14.25/14.41 ( ~ class_Lattices_Olower__semilattice(T_a)
% 14.25/14.41 | c_lessequals(V_x,V_xa,T_a)
% 14.25/14.41 | ~ c_in(V_xa,V_A,T_a)
% 14.25/14.41 | ~ c_lessequals(V_x,hAPP(c_Finite__Set_Ofold1(c_Lattices_Olower__semilattice__class_Oinf(T_a),T_a),V_A),T_a)
% 14.25/14.41 | V_A = c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_Finite__Set_Ofinite(V_A,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Max__insert_0,axiom,
% 14.25/14.41 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.41 | hAPP(c_Finite__Set_Olinorder__class_OMax(T_a),c_Set_Oinsert(V_x,V_A,T_a)) = hAPP(hAPP(c_Orderings_Oord__class_Omax(T_a),V_x),hAPP(c_Finite__Set_Olinorder__class_OMax(T_a),V_A))
% 14.25/14.41 | V_A = c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_Finite__Set_Ofinite(V_A,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Min__insert_0,axiom,
% 14.25/14.41 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.41 | hAPP(c_Finite__Set_Olinorder__class_OMin(T_a),c_Set_Oinsert(V_x,V_A,T_a)) = hAPP(hAPP(c_Orderings_Oord__class_Omin(T_a),V_x),hAPP(c_Finite__Set_Olinorder__class_OMin(T_a),V_A))
% 14.25/14.41 | V_A = c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_Finite__Set_Ofinite(V_A,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_finite__dom__body_0,axiom,
% 14.25/14.41 c_Finite__Set_Ofinite(c_Map_Odom(c_Com_Obody,tc_Com_Opname,tc_Com_Ocom),tc_Com_Opname) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Max__eqI_1,axiom,
% 14.25/14.41 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.41 | hAPP(c_Finite__Set_Olinorder__class_OMax(T_a),V_A) = V_x
% 14.25/14.41 | ~ c_in(V_x,V_A,T_a)
% 14.25/14.41 | ~ c_lessequals(c_ATP__Linkup_Osko__Finite__Set__Xlinorder__class__XMax__eqI__1__1(V_A,V_x,T_a),V_x,T_a)
% 14.25/14.41 | ~ c_Finite__Set_Ofinite(V_A,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Min__eqI_1,axiom,
% 14.25/14.41 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.41 | hAPP(c_Finite__Set_Olinorder__class_OMin(T_a),V_A) = V_x
% 14.25/14.41 | ~ c_in(V_x,V_A,T_a)
% 14.25/14.41 | ~ c_lessequals(V_x,c_ATP__Linkup_Osko__Finite__Set__Xlinorder__class__XMin__eqI__1__1(V_A,V_x,T_a),T_a)
% 14.25/14.41 | ~ c_Finite__Set_Ofinite(V_A,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_inj__image__Compl__subset_0,axiom,
% 14.25/14.41 ( c_lessequals(c_Set_Oimage(V_f,c_HOL_Ouminus__class_Ouminus(V_A,tc_fun(T_a,tc_bool)),T_a,T_b),c_HOL_Ouminus__class_Ouminus(c_Set_Oimage(V_f,V_A,T_a,T_b),tc_fun(T_b,tc_bool)),tc_fun(T_b,tc_bool))
% 14.25/14.41 | ~ c_Fun_Oinj__on(V_f,c_Orderings_Otop__class_Otop(tc_fun(T_a,tc_bool)),T_a,T_b) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_card__Diff__subset__Int_0,axiom,
% 14.25/14.41 ( c_Finite__Set_Ocard(c_HOL_Ominus__class_Ominus(V_A,V_B,tc_fun(T_a,tc_bool)),T_a) = c_HOL_Ominus__class_Ominus(c_Finite__Set_Ocard(V_A,T_a),c_Finite__Set_Ocard(hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_A),V_B),T_a),tc_nat)
% 14.25/14.41 | ~ c_Finite__Set_Ofinite(hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_A),V_B),T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_card__Diff__subset_0,axiom,
% 14.25/14.41 ( c_Finite__Set_Ocard(c_HOL_Ominus__class_Ominus(V_A,V_B,tc_fun(T_a,tc_bool)),T_a) = c_HOL_Ominus__class_Ominus(c_Finite__Set_Ocard(V_A,T_a),c_Finite__Set_Ocard(V_B,T_a),tc_nat)
% 14.25/14.41 | ~ c_lessequals(V_B,V_A,tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_Finite__Set_Ofinite(V_B,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_finite__UNIV__card__ge__0_0,axiom,
% 14.25/14.41 ( c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_nat),c_Finite__Set_Ocard(c_Orderings_Otop__class_Otop(tc_fun(T_a,tc_bool)),T_a),tc_nat)
% 14.25/14.41 | ~ c_Finite__Set_Ofinite(c_Orderings_Otop__class_Otop(tc_fun(T_a,tc_bool)),T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_range__ex1__eq_2,axiom,
% 14.25/14.41 ( ~ c_Fun_Oinj__on(V_f,c_Orderings_Otop__class_Otop(tc_fun(T_aa,tc_bool)),T_aa,T_a)
% 14.25/14.41 | c_in(hAPP(V_f,V_x),c_Set_Oimage(V_f,c_Orderings_Otop__class_Otop(tc_fun(T_aa,tc_bool)),T_aa,T_a),T_a)
% 14.25/14.41 | hAPP(V_f,V_x) = hAPP(V_f,c_ATP__Linkup_Osko__Fun__Xrange__ex1__eq__1__2(hAPP(V_f,V_x),V_f,V_x,T_a,T_aa)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_inj__transfer_0,axiom,
% 14.25/14.41 ( hBOOL(hAPP(V_P,V_x))
% 14.25/14.41 | c_in(c_ATP__Linkup_Osko__Hilbert__Choice__Xinj__transfer__1__1(V_P,V_f,T_a,T_b),c_Set_Oimage(V_f,c_Orderings_Otop__class_Otop(tc_fun(T_a,tc_bool)),T_a,T_b),T_b)
% 14.25/14.41 | ~ c_Fun_Oinj__on(V_f,c_Orderings_Otop__class_Otop(tc_fun(T_a,tc_bool)),T_a,T_b) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_range__ex1__eq_3,axiom,
% 14.25/14.41 ( c_ATP__Linkup_Osko__Fun__Xrange__ex1__eq__1__2(hAPP(V_f,V_x),V_f,V_x,T_a,T_aa) != V_x
% 14.25/14.41 | ~ c_Fun_Oinj__on(V_f,c_Orderings_Otop__class_Otop(tc_fun(T_aa,tc_bool)),T_aa,T_a)
% 14.25/14.41 | c_in(hAPP(V_f,V_x),c_Set_Oimage(V_f,c_Orderings_Otop__class_Otop(tc_fun(T_aa,tc_bool)),T_aa,T_a),T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_range__ex1__eq_0,axiom,
% 14.25/14.41 ( V_b = hAPP(V_f,c_ATP__Linkup_Osko__Fun__Xrange__ex1__eq__1__1(V_b,V_f,T_b,T_a))
% 14.25/14.41 | ~ c_in(V_b,c_Set_Oimage(V_f,c_Orderings_Otop__class_Otop(tc_fun(T_a,tc_bool)),T_a,T_b),T_b)
% 14.25/14.41 | ~ c_Fun_Oinj__on(V_f,c_Orderings_Otop__class_Otop(tc_fun(T_a,tc_bool)),T_a,T_b) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_range__ex1__eq_1,axiom,
% 14.25/14.41 ( ~ c_in(hAPP(V_f,V_y),c_Set_Oimage(V_f,c_Orderings_Otop__class_Otop(tc_fun(T_aa,tc_bool)),T_aa,T_a),T_a)
% 14.25/14.41 | ~ c_Fun_Oinj__on(V_f,c_Orderings_Otop__class_Otop(tc_fun(T_aa,tc_bool)),T_aa,T_a)
% 14.25/14.41 | V_y = c_ATP__Linkup_Osko__Fun__Xrange__ex1__eq__1__1(hAPP(V_f,V_y),V_f,T_a,T_aa) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_psubset__insert__iff_9,axiom,
% 14.25/14.41 ( c_HOL_Oord__class_Oless(V_A,c_Set_Oinsert(V_x,V_B,T_a),tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_lessequals(V_A,V_B,tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_HOL_Oord__class_Oless(c_HOL_Ominus__class_Ominus(V_A,c_Set_Oinsert(V_x,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a),tc_fun(T_a,tc_bool)),V_B,tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_HOL_Oord__class_Oless(V_A,V_B,tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_the__inv__into__into_0,axiom,
% 14.25/14.41 ( c_in(hAPP(c_Fun_Othe__inv__into(V_A,V_f,T_a,T_b),V_x),V_B,T_a)
% 14.25/14.41 | ~ c_lessequals(V_A,V_B,tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_in(V_x,c_Set_Oimage(V_f,V_A,T_a,T_b),T_b)
% 14.25/14.41 | ~ c_Fun_Oinj__on(V_f,V_A,T_a,T_b) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_card__Suc__eq_3,axiom,
% 14.25/14.41 ( c_Finite__Set_Ocard(V_A,T_a) != c_Suc(c_HOL_Ozero__class_Ozero(tc_nat))
% 14.25/14.41 | c_ATP__Linkup_Osko__Finite__Set__Xcard__Suc__eq__1__2(V_A,c_HOL_Ozero__class_Ozero(tc_nat),T_a) = c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_card__eq__SucD_3,axiom,
% 14.25/14.41 ( c_Finite__Set_Ocard(V_A,T_a) != c_Suc(c_HOL_Ozero__class_Ozero(tc_nat))
% 14.25/14.41 | c_ATP__Linkup_Osko__Finite__Set__Xcard__eq__SucD__1__2(V_A,c_HOL_Ozero__class_Ozero(tc_nat),T_a) = c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_setsum__diff_0,axiom,
% 14.25/14.41 ( ~ class_OrderedGroup_Oab__group__add(T_b)
% 14.25/14.41 | c_Finite__Set_Osetsum(V_f,c_HOL_Ominus__class_Ominus(V_A,V_B,tc_fun(T_a,tc_bool)),T_a,T_b) = c_HOL_Ominus__class_Ominus(c_Finite__Set_Osetsum(V_f,V_A,T_a,T_b),c_Finite__Set_Osetsum(V_f,V_B,T_a,T_b),T_b)
% 14.25/14.41 | ~ c_lessequals(V_B,V_A,tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_Finite__Set_Ofinite(V_A,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_card__gt__0__iff_2,axiom,
% 14.25/14.41 ( c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_nat),c_Finite__Set_Ocard(V_A,T_a),tc_nat)
% 14.25/14.41 | ~ c_Finite__Set_Ofinite(V_A,T_a)
% 14.25/14.41 | V_A = c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_fold__graph_H_Ointros_I2_J_0,axiom,
% 14.25/14.41 ( c_Nitpick_Ofold__graph_H(V_f,V_z,V_A,hAPP(hAPP(V_f,V_x),V_y),T_a,T_b)
% 14.25/14.41 | ~ c_Nitpick_Ofold__graph_H(V_f,V_z,c_HOL_Ominus__class_Ominus(V_A,c_Set_Oinsert(V_x,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a),tc_fun(T_a,tc_bool)),V_y,T_a,T_b)
% 14.25/14.41 | ~ c_in(V_x,V_A,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_psubset__insert__iff_1,axiom,
% 14.25/14.41 ( c_HOL_Oord__class_Oless(c_HOL_Ominus__class_Ominus(V_A,c_Set_Oinsert(V_x,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a),tc_fun(T_a,tc_bool)),V_B,tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_in(V_x,V_A,T_a)
% 14.25/14.41 | c_in(V_x,V_B,T_a)
% 14.25/14.41 | ~ c_HOL_Oord__class_Oless(V_A,c_Set_Oinsert(V_x,V_B,T_a),tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_psubset__insert__iff_4,axiom,
% 14.25/14.41 ( c_HOL_Oord__class_Oless(V_A,c_Set_Oinsert(V_x,V_B,T_a),tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_in(V_x,V_A,T_a)
% 14.25/14.41 | ~ c_HOL_Oord__class_Oless(c_HOL_Ominus__class_Ominus(V_A,c_Set_Oinsert(V_x,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a),tc_fun(T_a,tc_bool)),V_B,tc_fun(T_a,tc_bool))
% 14.25/14.41 | c_in(V_x,V_B,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_psubset__insert__iff_8,axiom,
% 14.25/14.41 ( c_HOL_Oord__class_Oless(V_A,c_Set_Oinsert(V_x,V_B,T_a),tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_in(V_x,V_A,T_a)
% 14.25/14.41 | ~ c_HOL_Oord__class_Oless(c_HOL_Ominus__class_Ominus(V_A,c_Set_Oinsert(V_x,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a),tc_fun(T_a,tc_bool)),V_B,tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_HOL_Oord__class_Oless(V_A,V_B,tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_setsum__diff1__nat_1,axiom,
% 14.25/14.41 ( c_Finite__Set_Osetsum(V_f,c_HOL_Ominus__class_Ominus(V_A,c_Set_Oinsert(V_a,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a),tc_fun(T_a,tc_bool)),T_a,tc_nat) = c_Finite__Set_Osetsum(V_f,V_A,T_a,tc_nat)
% 14.25/14.41 | c_in(V_a,V_A,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Diff1__fold__graph_0,axiom,
% 14.25/14.41 ( c_Finite__Set_Ofold__graph(V_f,V_z,V_A,hAPP(hAPP(V_f,V_x),V_y),T_a,T_b)
% 14.25/14.41 | ~ c_in(V_x,V_A,T_a)
% 14.25/14.41 | ~ c_Finite__Set_Ofold__graph(V_f,V_z,c_HOL_Ominus__class_Ominus(V_A,c_Set_Oinsert(V_x,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a),tc_fun(T_a,tc_bool)),V_y,T_a,T_b) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_le__inf__iff_2,axiom,
% 14.25/14.41 ( ~ class_Lattices_Olower__semilattice(T_a)
% 14.25/14.41 | c_lessequals(V_x,hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_y),V_z),T_a)
% 14.25/14.41 | ~ c_lessequals(V_x,V_z,T_a)
% 14.25/14.41 | ~ c_lessequals(V_x,V_y,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_inf__greatest_0,axiom,
% 14.25/14.41 ( ~ class_Lattices_Olower__semilattice(T_a)
% 14.25/14.41 | c_lessequals(V_x,hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_y),V_z),T_a)
% 14.25/14.41 | ~ c_lessequals(V_x,V_z,T_a)
% 14.25/14.41 | ~ c_lessequals(V_x,V_y,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_inf__sup__ord_I2_J_0,axiom,
% 14.25/14.41 ( ~ class_Lattices_Olattice(T_a)
% 14.25/14.41 | c_lessequals(hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_x),V_y),V_y,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_inf__sup__ord_I1_J_0,axiom,
% 14.25/14.41 ( ~ class_Lattices_Olattice(T_a)
% 14.25/14.41 | c_lessequals(hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_x),V_y),V_x,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_le__iff__inf_0,axiom,
% 14.25/14.41 ( ~ class_Lattices_Olower__semilattice(T_a)
% 14.25/14.41 | hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_x),V_y) = V_x
% 14.25/14.41 | ~ c_lessequals(V_x,V_y,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_le__iff__inf_1,axiom,
% 14.25/14.41 ( ~ class_Lattices_Olower__semilattice(T_a)
% 14.25/14.41 | hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_x),V_y) != V_x
% 14.25/14.41 | c_lessequals(V_x,V_y,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_inf__absorb2_0,axiom,
% 14.25/14.41 ( ~ class_Lattices_Olower__semilattice(T_a)
% 14.25/14.41 | hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_x),V_y) = V_y
% 14.25/14.41 | ~ c_lessequals(V_y,V_x,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_le__infE_0,axiom,
% 14.25/14.41 ( ~ class_Lattices_Olower__semilattice(T_a)
% 14.25/14.41 | c_lessequals(V_x,V_a,T_a)
% 14.25/14.41 | ~ c_lessequals(V_x,hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_a),V_b),T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_le__infE_1,axiom,
% 14.25/14.41 ( ~ class_Lattices_Olower__semilattice(T_a)
% 14.25/14.41 | c_lessequals(V_x,V_b,T_a)
% 14.25/14.41 | ~ c_lessequals(V_x,hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_a),V_b),T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_le__infI1_0,axiom,
% 14.25/14.41 ( ~ class_Lattices_Olower__semilattice(T_a)
% 14.25/14.41 | c_lessequals(hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_a),V_b),V_x,T_a)
% 14.25/14.41 | ~ c_lessequals(V_a,V_x,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_le__infI2_0,axiom,
% 14.25/14.41 ( ~ class_Lattices_Olower__semilattice(T_a)
% 14.25/14.41 | c_lessequals(hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_a),V_b),V_x,T_a)
% 14.25/14.41 | ~ c_lessequals(V_b,V_x,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_le__inf__iff_0,axiom,
% 14.25/14.41 ( ~ class_Lattices_Olower__semilattice(T_a)
% 14.25/14.41 | c_lessequals(V_x,V_y,T_a)
% 14.25/14.41 | ~ c_lessequals(V_x,hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_y),V_z),T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_le__inf__iff_1,axiom,
% 14.25/14.41 ( ~ class_Lattices_Olower__semilattice(T_a)
% 14.25/14.41 | c_lessequals(V_x,V_z,T_a)
% 14.25/14.41 | ~ c_lessequals(V_x,hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_y),V_z),T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Max__ge_0,axiom,
% 14.25/14.41 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.41 | c_lessequals(V_x,hAPP(c_Finite__Set_Olinorder__class_OMax(T_a),V_A),T_a)
% 14.25/14.41 | ~ c_in(V_x,V_A,T_a)
% 14.25/14.41 | ~ c_Finite__Set_Ofinite(V_A,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Min__le_0,axiom,
% 14.25/14.41 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.41 | c_lessequals(hAPP(c_Finite__Set_Olinorder__class_OMin(T_a),V_A),V_x,T_a)
% 14.25/14.41 | ~ c_in(V_x,V_A,T_a)
% 14.25/14.41 | ~ c_Finite__Set_Ofinite(V_A,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_finite__UNIV_0,axiom,
% 14.25/14.41 ( ~ class_Finite__Set_Ofinite_Ofinite(T_a)
% 14.25/14.41 | c_Finite__Set_Ofinite(c_Orderings_Otop__class_Otop(tc_fun(T_a,tc_bool)),T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_finite__Diff2_1,axiom,
% 14.25/14.41 ( c_Finite__Set_Ofinite(c_HOL_Ominus__class_Ominus(V_A,V_B,tc_fun(T_a,tc_bool)),T_a)
% 14.25/14.41 | ~ c_Finite__Set_Ofinite(V_A,T_a)
% 14.25/14.41 | ~ c_Finite__Set_Ofinite(V_B,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_finite__Diff2_0,axiom,
% 14.25/14.41 ( c_Finite__Set_Ofinite(V_A,T_a)
% 14.25/14.41 | ~ c_Finite__Set_Ofinite(c_HOL_Ominus__class_Ominus(V_A,V_B,tc_fun(T_a,tc_bool)),T_a)
% 14.25/14.41 | ~ c_Finite__Set_Ofinite(V_B,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_finite__Diff_0,axiom,
% 14.25/14.41 ( c_Finite__Set_Ofinite(c_HOL_Ominus__class_Ominus(V_A,V_B,tc_fun(T_a,tc_bool)),T_a)
% 14.25/14.41 | ~ c_Finite__Set_Ofinite(V_A,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_finite__Int_1,axiom,
% 14.25/14.41 ( c_Finite__Set_Ofinite(hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_F),V_G),T_a)
% 14.25/14.41 | ~ c_Finite__Set_Ofinite(V_G,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_finite__Int_0,axiom,
% 14.25/14.41 ( c_Finite__Set_Ofinite(hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_F),V_G),T_a)
% 14.25/14.41 | ~ c_Finite__Set_Ofinite(V_F,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_inf__bot__left_0,axiom,
% 14.25/14.41 ( ~ class_Lattices_Obounded__lattice(T_a)
% 14.25/14.41 | hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),c_Orderings_Obot__class_Obot(T_a)),V_x) = c_Orderings_Obot__class_Obot(T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_inf__bot__right_0,axiom,
% 14.25/14.41 ( ~ class_Lattices_Obounded__lattice(T_a)
% 14.25/14.41 | hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_x),c_Orderings_Obot__class_Obot(T_a)) = c_Orderings_Obot__class_Obot(T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Min__in_0,axiom,
% 14.25/14.41 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.41 | c_in(hAPP(c_Finite__Set_Olinorder__class_OMin(T_a),V_A),V_A,T_a)
% 14.25/14.41 | V_A = c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_Finite__Set_Ofinite(V_A,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Max__in_0,axiom,
% 14.25/14.41 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.41 | c_in(hAPP(c_Finite__Set_Olinorder__class_OMax(T_a),V_A),V_A,T_a)
% 14.25/14.41 | V_A = c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_Finite__Set_Ofinite(V_A,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_vimage__empty_0,axiom,
% 14.25/14.41 c_Set_Ovimage(V_f,c_Orderings_Obot__class_Obot(tc_fun(T_b,tc_bool)),T_a,T_b) = c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_ex__in__conv_0,axiom,
% 14.25/14.41 ~ c_in(V_x,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_ball__empty_0,axiom,
% 14.25/14.41 ( hBOOL(hAPP(V_P,V_x))
% 14.25/14.41 | ~ c_in(V_x,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_empty__iff_0,axiom,
% 14.25/14.41 ~ c_in(V_c,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_emptyE_0,axiom,
% 14.25/14.41 ~ c_in(V_a,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_UNIV__not__empty_0,axiom,
% 14.25/14.41 c_Orderings_Otop__class_Otop(tc_fun(T_a,tc_bool)) != c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_empty__Diff_0,axiom,
% 14.25/14.41 c_HOL_Ominus__class_Ominus(c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),V_A,tc_fun(T_a,tc_bool)) = c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Diff__cancel_0,axiom,
% 14.25/14.41 c_HOL_Ominus__class_Ominus(V_A,V_A,tc_fun(T_a,tc_bool)) = c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Diff__empty_0,axiom,
% 14.25/14.41 c_HOL_Ominus__class_Ominus(V_A,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),tc_fun(T_a,tc_bool)) = V_A ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Int__empty__right_0,axiom,
% 14.25/14.41 hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_A),c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool))) = c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Int__empty__left_0,axiom,
% 14.25/14.41 hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool))),V_B) = c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_inj__on__empty_0,axiom,
% 14.25/14.41 c_Fun_Oinj__on(V_f,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a,T_b) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_bex__empty_0,axiom,
% 14.25/14.41 ( ~ hBOOL(hAPP(V_P,V_x))
% 14.25/14.41 | ~ c_in(V_x,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_insert__Diff_0,axiom,
% 14.25/14.41 ( c_Set_Oinsert(V_a,c_HOL_Ominus__class_Ominus(V_A,c_Set_Oinsert(V_a,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a),tc_fun(T_a,tc_bool)),T_a) = V_A
% 14.25/14.41 | ~ c_in(V_a,V_A,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_vimage__singleton__eq_0,axiom,
% 14.25/14.41 ( hAPP(V_f,V_a) = V_b
% 14.25/14.41 | ~ c_in(V_a,c_Set_Ovimage(V_f,c_Set_Oinsert(V_b,c_Orderings_Obot__class_Obot(tc_fun(T_b,tc_bool)),T_b),T_a,T_b),T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_vimage__singleton__eq_1,axiom,
% 14.25/14.41 c_in(V_a,c_Set_Ovimage(V_f,c_Set_Oinsert(hAPP(V_f,V_a),c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a),T_aa,T_a),T_aa) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Diff__insert__absorb_0,axiom,
% 14.25/14.41 ( c_HOL_Ominus__class_Ominus(c_Set_Oinsert(V_x,V_A,T_a),c_Set_Oinsert(V_x,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a),tc_fun(T_a,tc_bool)) = V_A
% 14.25/14.41 | c_in(V_x,V_A,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_insert__iff_2,axiom,
% 14.25/14.41 ( c_in(V_a,c_Set_Oinsert(V_b,V_A,T_a),T_a)
% 14.25/14.41 | ~ c_in(V_a,V_A,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_insertCI_0,axiom,
% 14.25/14.41 ( c_in(V_a,c_Set_Oinsert(V_b,V_B,T_a),T_a)
% 14.25/14.41 | ~ c_in(V_a,V_B,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_insertE_0,axiom,
% 14.25/14.41 ( c_in(V_a,V_A,T_a)
% 14.25/14.41 | V_a = V_b
% 14.25/14.41 | ~ c_in(V_a,c_Set_Oinsert(V_b,V_A,T_a),T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_insert__inter__insert_0,axiom,
% 14.25/14.41 hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),c_Set_Oinsert(V_a,V_A,T_a)),c_Set_Oinsert(V_a,V_B,T_a)) = c_Set_Oinsert(V_a,hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_A),V_B),T_a) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_inj__on__insert_0,axiom,
% 14.25/14.41 ( c_Fun_Oinj__on(V_f,V_A,T_a,T_b)
% 14.25/14.41 | ~ c_Fun_Oinj__on(V_f,c_Set_Oinsert(V_a,V_A,T_a),T_a,T_b) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_insert__iff_1,axiom,
% 14.25/14.41 c_in(V_x,c_Set_Oinsert(V_x,V_A,T_a),T_a) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_insertI1_0,axiom,
% 14.25/14.41 c_in(V_a,c_Set_Oinsert(V_a,V_B,T_a),T_a) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_insertCI_1,axiom,
% 14.25/14.41 c_in(V_x,c_Set_Oinsert(V_x,V_B,T_a),T_a) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_insert__ident_0,axiom,
% 14.25/14.41 ( c_Set_Oinsert(V_x,V_A,T_a) != c_Set_Oinsert(V_x,V_B,T_a)
% 14.25/14.41 | c_in(V_x,V_B,T_a)
% 14.25/14.41 | c_in(V_x,V_A,T_a)
% 14.25/14.41 | V_A = V_B ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_insert__absorb_0,axiom,
% 14.25/14.41 ( c_Set_Oinsert(V_a,V_A,T_a) = V_A
% 14.25/14.41 | ~ c_in(V_a,V_A,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_inj__on__insert_2,axiom,
% 14.25/14.41 ( c_Fun_Oinj__on(V_f,c_Set_Oinsert(V_a,V_A,T_a),T_a,T_b)
% 14.25/14.41 | c_in(hAPP(V_f,V_a),c_Set_Oimage(V_f,c_HOL_Ominus__class_Ominus(V_A,c_Set_Oinsert(V_a,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a),tc_fun(T_a,tc_bool)),T_a,T_b),T_b)
% 14.25/14.41 | ~ c_Fun_Oinj__on(V_f,V_A,T_a,T_b) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_inj__on__insert_1,axiom,
% 14.25/14.41 ( ~ c_in(hAPP(V_f,V_a),c_Set_Oimage(V_f,c_HOL_Ominus__class_Ominus(V_A,c_Set_Oinsert(V_a,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a),tc_fun(T_a,tc_bool)),T_a,T_b),T_b)
% 14.25/14.41 | ~ c_Fun_Oinj__on(V_f,c_Set_Oinsert(V_a,V_A,T_a),T_a,T_b) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_double__diff_0,axiom,
% 14.25/14.41 ( c_HOL_Ominus__class_Ominus(V_B,c_HOL_Ominus__class_Ominus(V_C,V_A,tc_fun(T_a,tc_bool)),tc_fun(T_a,tc_bool)) = V_A
% 14.25/14.41 | ~ c_lessequals(V_B,V_C,tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_lessequals(V_A,V_B,tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Int__mono_0,axiom,
% 14.25/14.41 ( c_lessequals(hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_A),V_B),hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_C),V_D),tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_lessequals(V_B,V_D,tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_lessequals(V_A,V_C,tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_subset__inj__on_0,axiom,
% 14.25/14.41 ( c_Fun_Oinj__on(V_f,V_A,T_a,T_b)
% 14.25/14.41 | ~ c_lessequals(V_A,V_B,tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_Fun_Oinj__on(V_f,V_B,T_a,T_b) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_subset__iff_0,axiom,
% 14.25/14.41 ( c_in(V_t,V_B,T_a)
% 14.25/14.41 | ~ c_in(V_t,V_A,T_a)
% 14.25/14.41 | ~ c_lessequals(V_A,V_B,tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_set__rev__mp_0,axiom,
% 14.25/14.41 ( c_in(V_x,V_B,T_a)
% 14.25/14.41 | ~ c_lessequals(V_A,V_B,tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_in(V_x,V_A,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_subsetD_0,axiom,
% 14.25/14.41 ( c_in(V_c,V_B,T_a)
% 14.25/14.41 | ~ c_in(V_c,V_A,T_a)
% 14.25/14.41 | ~ c_lessequals(V_A,V_B,tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_set__mp_0,axiom,
% 14.25/14.41 ( c_in(V_x,V_B,T_a)
% 14.25/14.41 | ~ c_in(V_x,V_A,T_a)
% 14.25/14.41 | ~ c_lessequals(V_A,V_B,tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_subset__UNIV_0,axiom,
% 14.25/14.41 c_lessequals(V_A,c_Orderings_Otop__class_Otop(tc_fun(T_a,tc_bool)),tc_fun(T_a,tc_bool)) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Int__subset__iff_2,axiom,
% 14.25/14.41 ( c_lessequals(V_C,hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_A),V_B),tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_lessequals(V_C,V_B,tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_lessequals(V_C,V_A,tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Int__greatest_0,axiom,
% 14.25/14.41 ( c_lessequals(V_C,hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_A),V_B),tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_lessequals(V_C,V_B,tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_lessequals(V_C,V_A,tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Int__lower2_0,axiom,
% 14.25/14.41 c_lessequals(hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_A),V_B),V_B,tc_fun(T_a,tc_bool)) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Int__lower1_0,axiom,
% 14.25/14.41 c_lessequals(hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_A),V_B),V_A,tc_fun(T_a,tc_bool)) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Diff__mono_0,axiom,
% 14.25/14.41 ( c_lessequals(c_HOL_Ominus__class_Ominus(V_A,V_B,tc_fun(T_a,tc_bool)),c_HOL_Ominus__class_Ominus(V_C,V_D,tc_fun(T_a,tc_bool)),tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_lessequals(V_D,V_B,tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_lessequals(V_A,V_C,tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Int__absorb2_0,axiom,
% 14.25/14.41 ( hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_A),V_B) = V_A
% 14.25/14.41 | ~ c_lessequals(V_A,V_B,tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Int__absorb1_0,axiom,
% 14.25/14.41 ( hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_A),V_B) = V_B
% 14.25/14.41 | ~ c_lessequals(V_B,V_A,tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Diff__subset_0,axiom,
% 14.25/14.41 c_lessequals(c_HOL_Ominus__class_Ominus(V_A,V_B,tc_fun(T_a,tc_bool)),V_A,tc_fun(T_a,tc_bool)) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_vimage__mono_0,axiom,
% 14.25/14.41 ( c_lessequals(c_Set_Ovimage(V_f,V_A,T_b,T_a),c_Set_Ovimage(V_f,V_B,T_b,T_a),tc_fun(T_b,tc_bool))
% 14.25/14.41 | ~ c_lessequals(V_A,V_B,tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Int__subset__iff_1,axiom,
% 14.25/14.41 ( c_lessequals(V_C,V_B,tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_lessequals(V_C,hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_A),V_B),tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Int__subset__iff_0,axiom,
% 14.25/14.41 ( c_lessequals(V_C,V_A,tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_lessequals(V_C,hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_A),V_B),tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_inj__on__image__set__diff_0,axiom,
% 14.25/14.41 ( c_Set_Oimage(V_f,c_HOL_Ominus__class_Ominus(V_A,V_B,tc_fun(T_a,tc_bool)),T_a,T_b) = c_HOL_Ominus__class_Ominus(c_Set_Oimage(V_f,V_A,T_a,T_b),c_Set_Oimage(V_f,V_B,T_a,T_b),tc_fun(T_b,tc_bool))
% 14.25/14.41 | ~ c_lessequals(V_B,V_C,tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_lessequals(V_A,V_C,tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_Fun_Oinj__on(V_f,V_C,T_a,T_b) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_inj__image__subset__iff_1,axiom,
% 14.25/14.41 ( c_lessequals(c_Set_Oimage(V_f,V_A,T_a,T_b),c_Set_Oimage(V_f,V_B,T_a,T_b),tc_fun(T_b,tc_bool))
% 14.25/14.41 | ~ c_lessequals(V_A,V_B,tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_Fun_Oinj__on(V_f,c_Orderings_Otop__class_Otop(tc_fun(T_a,tc_bool)),T_a,T_b) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_inj__image__subset__iff_0,axiom,
% 14.25/14.41 ( c_lessequals(V_A,V_B,tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_lessequals(c_Set_Oimage(V_f,V_A,T_a,T_b),c_Set_Oimage(V_f,V_B,T_a,T_b),tc_fun(T_b,tc_bool))
% 14.25/14.41 | ~ c_Fun_Oinj__on(V_f,c_Orderings_Otop__class_Otop(tc_fun(T_a,tc_bool)),T_a,T_b) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_inj__on__image__Int_0,axiom,
% 14.25/14.41 ( c_Set_Oimage(V_f,hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_A),V_B),T_a,T_b) = hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_b,tc_bool)),c_Set_Oimage(V_f,V_A,T_a,T_b)),c_Set_Oimage(V_f,V_B,T_a,T_b))
% 14.25/14.41 | ~ c_lessequals(V_B,V_C,tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_lessequals(V_A,V_C,tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_Fun_Oinj__on(V_f,V_C,T_a,T_b) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_rev__image__eqI_0,axiom,
% 14.25/14.41 ( ~ c_in(V_x,V_A,T_aa)
% 14.25/14.41 | c_in(hAPP(V_f,V_x),c_Set_Oimage(V_f,V_A,T_aa,T_a),T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_image__iff_2,axiom,
% 14.25/14.41 ( ~ c_in(V_x,V_A,T_b)
% 14.25/14.41 | c_in(hAPP(V_f,V_x),c_Set_Oimage(V_f,V_A,T_b,T_a),T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_image__eqI_0,axiom,
% 14.25/14.41 ( c_in(hAPP(V_f,V_x),c_Set_Oimage(V_f,V_A,T_b,T_a),T_a)
% 14.25/14.41 | ~ c_in(V_x,V_A,T_b) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_imageI_0,axiom,
% 14.25/14.41 ( c_in(hAPP(V_f,V_x),c_Set_Oimage(V_f,V_A,T_a,T_b),T_b)
% 14.25/14.41 | ~ c_in(V_x,V_A,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_assms_I4_J_0,axiom,
% 14.25/14.41 ( v_wt(c_Option_Othe(hAPP(c_Com_Obody,V_pn),tc_Com_Ocom))
% 14.25/14.41 | ~ c_in(V_pn,v_U,tc_Com_Opname) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_card__Suc__Diff1_0,axiom,
% 14.25/14.41 ( c_Suc(c_Finite__Set_Ocard(c_HOL_Ominus__class_Ominus(V_A,c_Set_Oinsert(V_x,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a),tc_fun(T_a,tc_bool)),T_a)) = c_Finite__Set_Ocard(V_A,T_a)
% 14.25/14.41 | ~ c_in(V_x,V_A,T_a)
% 14.25/14.41 | ~ c_Finite__Set_Ofinite(V_A,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_diff__single__insert_0,axiom,
% 14.25/14.41 ( c_lessequals(V_A,c_Set_Oinsert(V_x,V_B,T_a),tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_in(V_x,V_A,T_a)
% 14.25/14.41 | ~ c_lessequals(c_HOL_Ominus__class_Ominus(V_A,c_Set_Oinsert(V_x,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a),tc_fun(T_a,tc_bool)),V_B,tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_subset__insert__iff_3,axiom,
% 14.25/14.41 ( c_lessequals(V_A,c_Set_Oinsert(V_x,V_B,T_a),tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_in(V_x,V_A,T_a)
% 14.25/14.41 | ~ c_lessequals(c_HOL_Ominus__class_Ominus(V_A,c_Set_Oinsert(V_x,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a),tc_fun(T_a,tc_bool)),V_B,tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_subset__insert__iff_0,axiom,
% 14.25/14.41 ( c_lessequals(c_HOL_Ominus__class_Ominus(V_A,c_Set_Oinsert(V_x,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a),tc_fun(T_a,tc_bool)),V_B,tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_in(V_x,V_A,T_a)
% 14.25/14.41 | ~ c_lessequals(V_A,c_Set_Oinsert(V_x,V_B,T_a),tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_image__constant_0,axiom,
% 14.25/14.41 ( c_Set_Oimage(c_COMBK(V_c,T_b,T_a),V_A,T_a,T_b) = c_Set_Oinsert(V_c,c_Orderings_Obot__class_Obot(tc_fun(T_b,tc_bool)),T_b)
% 14.25/14.41 | ~ c_in(V_x,V_A,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_card__insert__if_1,axiom,
% 14.25/14.41 ( c_Finite__Set_Ocard(c_Set_Oinsert(V_x,V_A,T_a),T_a) = c_Suc(c_Finite__Set_Ocard(V_A,T_a))
% 14.25/14.41 | c_in(V_x,V_A,T_a)
% 14.25/14.41 | ~ c_Finite__Set_Ofinite(V_A,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_card__Suc__eq_5,axiom,
% 14.25/14.41 ( c_in(V_x,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a)
% 14.25/14.41 | c_Finite__Set_Ocard(c_Set_Oinsert(V_x,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a),T_a) = c_Suc(c_Finite__Set_Ocard(c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_finite__Diff__insert_1,axiom,
% 14.25/14.41 ( c_Finite__Set_Ofinite(c_HOL_Ominus__class_Ominus(V_A,c_Set_Oinsert(V_a,V_B,T_a),tc_fun(T_a,tc_bool)),T_a)
% 14.25/14.41 | ~ c_Finite__Set_Ofinite(c_HOL_Ominus__class_Ominus(V_A,V_B,tc_fun(T_a,tc_bool)),T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_finite__Diff__insert_0,axiom,
% 14.25/14.41 ( c_Finite__Set_Ofinite(c_HOL_Ominus__class_Ominus(V_A,V_B,tc_fun(T_a,tc_bool)),T_a)
% 14.25/14.41 | ~ c_Finite__Set_Ofinite(c_HOL_Ominus__class_Ominus(V_A,c_Set_Oinsert(V_a,V_B,T_a),tc_fun(T_a,tc_bool)),T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_singleton__iff_1,axiom,
% 14.25/14.41 c_in(V_x,c_Set_Oinsert(V_x,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a),T_a) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Min__singleton_0,axiom,
% 14.25/14.41 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.41 | hAPP(c_Finite__Set_Olinorder__class_OMin(T_a),c_Set_Oinsert(V_a,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a)) = V_a ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Diff__insert2_0,axiom,
% 14.25/14.41 c_HOL_Ominus__class_Ominus(V_A,c_Set_Oinsert(V_a,V_B,T_a),tc_fun(T_a,tc_bool)) = c_HOL_Ominus__class_Ominus(c_HOL_Ominus__class_Ominus(V_A,c_Set_Oinsert(V_a,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a),tc_fun(T_a,tc_bool)),V_B,tc_fun(T_a,tc_bool)) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Diff__insert_0,axiom,
% 14.25/14.41 c_HOL_Ominus__class_Ominus(V_A,c_Set_Oinsert(V_a,V_B,T_a),tc_fun(T_a,tc_bool)) = c_HOL_Ominus__class_Ominus(c_HOL_Ominus__class_Ominus(V_A,V_B,tc_fun(T_a,tc_bool)),c_Set_Oinsert(V_a,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a),tc_fun(T_a,tc_bool)) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_singletonE_0,axiom,
% 14.25/14.41 ( V_b = V_a
% 14.25/14.41 | ~ c_in(V_b,c_Set_Oinsert(V_a,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a),T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Max__singleton_0,axiom,
% 14.25/14.41 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.41 | hAPP(c_Finite__Set_Olinorder__class_OMax(T_a),c_Set_Oinsert(V_a,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a)) = V_a ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_insert__Diff__single_0,axiom,
% 14.25/14.41 c_Set_Oinsert(V_a,c_HOL_Ominus__class_Ominus(V_A,c_Set_Oinsert(V_a,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a),tc_fun(T_a,tc_bool)),T_a) = c_Set_Oinsert(V_a,V_A,T_a) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_comm__monoid__add_Ononempty__iff_2,axiom,
% 14.25/14.41 ( c_Set_Oinsert(V_x,V_xa,T_a) != c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool))
% 14.25/14.41 | c_in(V_x,V_xa,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_finite__imageD_0,axiom,
% 14.25/14.41 ( c_Finite__Set_Ofinite(V_A,T_b)
% 14.25/14.41 | ~ c_Fun_Oinj__on(V_f,V_A,T_b,T_a)
% 14.25/14.41 | ~ c_Finite__Set_Ofinite(c_Set_Oimage(V_f,V_A,T_b,T_a),T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_image__set__diff_0,axiom,
% 14.25/14.41 ( c_Set_Oimage(V_f,c_HOL_Ominus__class_Ominus(V_A,V_B,tc_fun(T_a,tc_bool)),T_a,T_b) = c_HOL_Ominus__class_Ominus(c_Set_Oimage(V_f,V_A,T_a,T_b),c_Set_Oimage(V_f,V_B,T_a,T_b),tc_fun(T_b,tc_bool))
% 14.25/14.41 | ~ c_Fun_Oinj__on(V_f,c_Orderings_Otop__class_Otop(tc_fun(T_a,tc_bool)),T_a,T_b) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_DiffI_0,axiom,
% 14.25/14.41 ( c_in(V_c,c_HOL_Ominus__class_Ominus(V_A,V_B,tc_fun(T_a,tc_bool)),T_a)
% 14.25/14.41 | c_in(V_c,V_B,T_a)
% 14.25/14.41 | ~ c_in(V_c,V_A,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Diff__iff_2,axiom,
% 14.25/14.41 ( c_in(V_c,c_HOL_Ominus__class_Ominus(V_A,V_B,tc_fun(T_a,tc_bool)),T_a)
% 14.25/14.41 | c_in(V_c,V_B,T_a)
% 14.25/14.41 | ~ c_in(V_c,V_A,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_le0_0,axiom,
% 14.25/14.41 c_lessequals(c_HOL_Ozero__class_Ozero(tc_nat),V_n,tc_nat) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_eq__iff__diff__eq__0_1,axiom,
% 14.25/14.41 ( ~ class_OrderedGroup_Oab__group__add(T_a)
% 14.25/14.41 | c_HOL_Ominus__class_Ominus(V_a,V_b,T_a) != c_HOL_Ozero__class_Ozero(T_a)
% 14.25/14.41 | V_a = V_b ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_right__minus__eq_0,axiom,
% 14.25/14.41 ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 14.25/14.41 | c_HOL_Ominus__class_Ominus(V_a,V_b,T_a) != c_HOL_Ozero__class_Ozero(T_a)
% 14.25/14.41 | V_a = V_b ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_class__ringb_Osubr0__iff_0,axiom,
% 14.25/14.41 ( ~ class_Ring__and__Field_Oidom(T_a)
% 14.25/14.41 | ~ class_Int_Onumber__ring(T_a)
% 14.25/14.41 | c_HOL_Ominus__class_Ominus(V_x,V_y,T_a) != c_HOL_Ozero__class_Ozero(T_a)
% 14.25/14.41 | V_x = V_y ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_inf__sup__aci_I1_J_0,axiom,
% 14.25/14.41 ( ~ class_Lattices_Olattice(T_a)
% 14.25/14.41 | hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_x),V_y) = hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_y),V_x) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_inf__commute_0,axiom,
% 14.25/14.41 ( ~ class_Lattices_Olower__semilattice(T_a)
% 14.25/14.41 | hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_x),V_y) = hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_y),V_x) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Int__commute_0,axiom,
% 14.25/14.41 hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_A),V_B) = hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_B),V_A) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_inj__onD_0,axiom,
% 14.25/14.41 ( hAPP(V_f,V_x) != hAPP(V_f,V_y)
% 14.25/14.41 | ~ c_Fun_Oinj__on(V_f,V_A,T_a,T_b)
% 14.25/14.41 | V_x = V_y
% 14.25/14.41 | ~ c_in(V_y,V_A,T_a)
% 14.25/14.41 | ~ c_in(V_x,V_A,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_inj__on__def_0,axiom,
% 14.25/14.41 ( hAPP(V_f,V_x) != hAPP(V_f,V_xa)
% 14.25/14.41 | ~ c_in(V_xa,V_A,T_a)
% 14.25/14.41 | ~ c_in(V_x,V_A,T_a)
% 14.25/14.41 | ~ c_Fun_Oinj__on(V_f,V_A,T_a,T_b)
% 14.25/14.41 | V_x = V_xa ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_inj__on__iff_0,axiom,
% 14.25/14.41 ( hAPP(V_f,V_x) != hAPP(V_f,V_y)
% 14.25/14.41 | ~ c_in(V_y,V_A,T_a)
% 14.25/14.41 | ~ c_in(V_x,V_A,T_a)
% 14.25/14.41 | ~ c_Fun_Oinj__on(V_f,V_A,T_a,T_b)
% 14.25/14.41 | V_x = V_y ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_inj__on__contraD_0,axiom,
% 14.25/14.41 ( hAPP(V_f,V_x) != hAPP(V_f,V_y)
% 14.25/14.41 | ~ c_in(V_y,V_A,T_a)
% 14.25/14.41 | ~ c_in(V_x,V_A,T_a)
% 14.25/14.41 | V_x = V_y
% 14.25/14.41 | ~ c_Fun_Oinj__on(V_f,V_A,T_a,T_b) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_IntE_0,axiom,
% 14.25/14.41 ( c_in(V_c,V_A,T_a)
% 14.25/14.41 | ~ c_in(V_c,hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_A),V_B),T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_IntE_1,axiom,
% 14.25/14.41 ( c_in(V_c,V_B,T_a)
% 14.25/14.41 | ~ c_in(V_c,hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_A),V_B),T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_eq__eqI_0,axiom,
% 14.25/14.41 ( ~ class_OrderedGroup_Oab__group__add(T_a)
% 14.25/14.41 | c_HOL_Ominus__class_Ominus(V_x,V_x,T_a) != c_HOL_Ominus__class_Ominus(V_x_H,V_y_H,T_a)
% 14.25/14.41 | V_x_H = V_y_H ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_eq__eqI_1,axiom,
% 14.25/14.41 ( ~ class_OrderedGroup_Oab__group__add(T_a)
% 14.25/14.41 | c_HOL_Ominus__class_Ominus(V_xa,V_y,T_a) != c_HOL_Ominus__class_Ominus(V_x,V_x,T_a)
% 14.25/14.41 | V_xa = V_y ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_rangeI_0,axiom,
% 14.25/14.41 c_in(hAPP(V_f,V_x),c_Set_Oimage(V_f,c_Orderings_Otop__class_Otop(tc_fun(T_b,tc_bool)),T_b,T_a),T_a) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Diff__idemp_0,axiom,
% 14.25/14.41 c_HOL_Ominus__class_Ominus(c_HOL_Ominus__class_Ominus(V_A,V_B,tc_fun(T_a,tc_bool)),V_B,tc_fun(T_a,tc_bool)) = c_HOL_Ominus__class_Ominus(V_A,V_B,tc_fun(T_a,tc_bool)) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_COMBK__def_0,axiom,
% 14.25/14.41 hAPP(c_COMBK(V_P,T_a,T_b),V_Q) = V_P ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_mem__def_0,axiom,
% 14.25/14.41 ( hBOOL(hAPP(V_S,V_x))
% 14.25/14.41 | ~ c_in(V_x,V_S,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_mem__def_1,axiom,
% 14.25/14.41 ( c_in(V_x,V_S,T_a)
% 14.25/14.41 | ~ hBOOL(hAPP(V_S,V_x)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_finite__vimageI_0,axiom,
% 14.25/14.41 ( c_Finite__Set_Ofinite(c_Set_Ovimage(V_h,V_F,T_b,T_a),T_b)
% 14.25/14.41 | ~ c_Fun_Oinj__on(V_h,c_Orderings_Otop__class_Otop(tc_fun(T_b,tc_bool)),T_b,T_a)
% 14.25/14.41 | ~ c_Finite__Set_Ofinite(V_F,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Diff__triv_0,axiom,
% 14.25/14.41 ( hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_A),V_B) != c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool))
% 14.25/14.41 | c_HOL_Ominus__class_Ominus(V_A,V_B,tc_fun(T_a,tc_bool)) = V_A ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_insert__Diff1_0,axiom,
% 14.25/14.41 ( c_HOL_Ominus__class_Ominus(c_Set_Oinsert(V_x,V_A,T_a),V_B,tc_fun(T_a,tc_bool)) = c_HOL_Ominus__class_Ominus(V_A,V_B,tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_in(V_x,V_B,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_inj__on__diff_0,axiom,
% 14.25/14.41 ( c_Fun_Oinj__on(V_f,c_HOL_Ominus__class_Ominus(V_A,V_B,tc_fun(T_a,tc_bool)),T_a,T_b)
% 14.25/14.41 | ~ c_Fun_Oinj__on(V_f,V_A,T_a,T_b) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_vimage__Diff_0,axiom,
% 14.25/14.41 c_Set_Ovimage(V_f,c_HOL_Ominus__class_Ominus(V_A,V_B,tc_fun(T_b,tc_bool)),T_a,T_b) = c_HOL_Ominus__class_Ominus(c_Set_Ovimage(V_f,V_A,T_a,T_b),c_Set_Ovimage(V_f,V_B,T_a,T_b),tc_fun(T_a,tc_bool)) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_nat_Osimps_I2_J_0,axiom,
% 14.25/14.41 c_HOL_Ozero__class_Ozero(tc_nat) != c_Suc(V_nat_H) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Zero__neq__Suc_0,axiom,
% 14.25/14.41 c_HOL_Ozero__class_Ozero(tc_nat) != c_Suc(V_m) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_inj__vimage__image__eq_0,axiom,
% 14.25/14.41 ( c_Set_Ovimage(V_f,c_Set_Oimage(V_f,V_A,T_a,T_b),T_a,T_b) = V_A
% 14.25/14.41 | ~ c_Fun_Oinj__on(V_f,c_Orderings_Otop__class_Otop(tc_fun(T_a,tc_bool)),T_a,T_b) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_vimage__UNIV_0,axiom,
% 14.25/14.41 c_Set_Ovimage(V_f,c_Orderings_Otop__class_Otop(tc_fun(T_b,tc_bool)),T_a,T_b) = c_Orderings_Otop__class_Otop(tc_fun(T_a,tc_bool)) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_DiffE_0,axiom,
% 14.25/14.41 ( c_in(V_c,V_A,T_a)
% 14.25/14.41 | ~ c_in(V_c,c_HOL_Ominus__class_Ominus(V_A,V_B,tc_fun(T_a,tc_bool)),T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_DiffE_1,axiom,
% 14.25/14.41 ( ~ c_in(V_c,V_B,T_a)
% 14.25/14.41 | ~ c_in(V_c,c_HOL_Ominus__class_Ominus(V_A,V_B,tc_fun(T_a,tc_bool)),T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_image__Int_0,axiom,
% 14.25/14.41 ( c_Set_Oimage(V_f,hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_A),V_B),T_a,T_b) = hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_b,tc_bool)),c_Set_Oimage(V_f,V_A,T_a,T_b)),c_Set_Oimage(V_f,V_B,T_a,T_b))
% 14.25/14.41 | ~ c_Fun_Oinj__on(V_f,c_Orderings_Otop__class_Otop(tc_fun(T_a,tc_bool)),T_a,T_b) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_eq__iff__diff__eq__0_0,axiom,
% 14.25/14.41 ( ~ class_OrderedGroup_Oab__group__add(T_a)
% 14.25/14.41 | c_HOL_Ominus__class_Ominus(V_x,V_x,T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_right__minus__eq_1,axiom,
% 14.25/14.41 ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 14.25/14.41 | c_HOL_Ominus__class_Ominus(V_x,V_x,T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_diff__0__right_0,axiom,
% 14.25/14.41 ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 14.25/14.41 | c_HOL_Ominus__class_Ominus(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) = V_a ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_diff__self_0,axiom,
% 14.25/14.41 ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 14.25/14.41 | c_HOL_Ominus__class_Ominus(V_a,V_a,T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_class__ringb_Osubr0__iff_1,axiom,
% 14.25/14.41 ( ~ class_Ring__and__Field_Oidom(T_a)
% 14.25/14.41 | ~ class_Int_Onumber__ring(T_a)
% 14.25/14.41 | c_HOL_Ominus__class_Ominus(V_x,V_x,T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_UNIV__I_0,axiom,
% 14.25/14.41 c_in(V_x,c_Orderings_Otop__class_Otop(tc_fun(T_a,tc_bool)),T_a) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_inj__image__mem__iff_0,axiom,
% 14.25/14.41 ( c_in(V_a,V_A,T_a)
% 14.25/14.41 | ~ c_in(hAPP(V_f,V_a),c_Set_Oimage(V_f,V_A,T_a,T_b),T_b)
% 14.25/14.41 | ~ c_Fun_Oinj__on(V_f,c_Orderings_Otop__class_Otop(tc_fun(T_a,tc_bool)),T_a,T_b) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_inj__image__mem__iff_1,axiom,
% 14.25/14.41 ( c_in(hAPP(V_f,V_a),c_Set_Oimage(V_f,V_A,T_a,T_b),T_b)
% 14.25/14.41 | ~ c_in(V_a,V_A,T_a)
% 14.25/14.41 | ~ c_Fun_Oinj__on(V_f,c_Orderings_Otop__class_Otop(tc_fun(T_a,tc_bool)),T_a,T_b) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Suc__inject_0,axiom,
% 14.25/14.41 ( c_Suc(V_x) != c_Suc(V_y)
% 14.25/14.41 | V_x = V_y ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_nat_Oinject_0,axiom,
% 14.25/14.41 ( c_Suc(V_nat) != c_Suc(V_nat_H)
% 14.25/14.41 | V_nat = V_nat_H ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_injD_0,axiom,
% 14.25/14.41 ( hAPP(V_f,V_x) != hAPP(V_f,V_y)
% 14.25/14.41 | ~ c_Fun_Oinj__on(V_f,c_Orderings_Otop__class_Otop(tc_fun(T_a,tc_bool)),T_a,T_b)
% 14.25/14.41 | V_x = V_y ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_inf__sup__aci_I2_J_0,axiom,
% 14.25/14.41 ( ~ class_Lattices_Olattice(T_a)
% 14.25/14.41 | hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_x),V_y)),V_z) = hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_x),hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_y),V_z)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_inf__sup__aci_I3_J_0,axiom,
% 14.25/14.41 ( ~ class_Lattices_Olattice(T_a)
% 14.25/14.41 | hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_x),hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_y),V_z)) = hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_y),hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_x),V_z)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_inf__left__commute_0,axiom,
% 14.25/14.41 ( ~ class_Lattices_Olower__semilattice(T_a)
% 14.25/14.41 | hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_x),hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_y),V_z)) = hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_y),hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_x),V_z)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_inf__assoc_0,axiom,
% 14.25/14.41 ( ~ class_Lattices_Olower__semilattice(T_a)
% 14.25/14.41 | hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_x),V_y)),V_z) = hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_x),hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_y),V_z)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Int__assoc_0,axiom,
% 14.25/14.41 hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_A),V_B)),V_C) = hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_A),hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_B),V_C)) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Int__left__commute_0,axiom,
% 14.25/14.41 hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_A),hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_B),V_C)) = hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_B),hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_A),V_C)) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_inj__image__eq__iff_0,axiom,
% 14.25/14.41 ( c_Set_Oimage(V_f,V_A,T_a,T_b) != c_Set_Oimage(V_f,V_B,T_a,T_b)
% 14.25/14.41 | ~ c_Fun_Oinj__on(V_f,c_Orderings_Otop__class_Otop(tc_fun(T_a,tc_bool)),T_a,T_b)
% 14.25/14.41 | V_A = V_B ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_inf__eq__top__eq2_0,axiom,
% 14.25/14.41 ( ~ class_Lattices_Obounded__lattice(T_a)
% 14.25/14.41 | hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_A),V_B) != c_Orderings_Otop__class_Otop(T_a)
% 14.25/14.41 | V_B = c_Orderings_Otop__class_Otop(T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_inf__eq__top__eq1_0,axiom,
% 14.25/14.41 ( ~ class_Lattices_Obounded__lattice(T_a)
% 14.25/14.41 | hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_A),V_B) != c_Orderings_Otop__class_Otop(T_a)
% 14.25/14.41 | V_A = c_Orderings_Otop__class_Otop(T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Diff__Int__distrib_0,axiom,
% 14.25/14.41 hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_C),c_HOL_Ominus__class_Ominus(V_A,V_B,tc_fun(T_a,tc_bool))) = c_HOL_Ominus__class_Ominus(hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_C),V_A),hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_C),V_B),tc_fun(T_a,tc_bool)) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Diff__Int__distrib2_0,axiom,
% 14.25/14.41 hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),c_HOL_Ominus__class_Ominus(V_A,V_B,tc_fun(T_a,tc_bool))),V_C) = c_HOL_Ominus__class_Ominus(hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_A),V_C),hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_B),V_C),tc_fun(T_a,tc_bool)) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_disjoint__iff__not__equal_0,axiom,
% 14.25/14.41 ( ~ c_in(V_x,V_B,T_a)
% 14.25/14.41 | ~ c_in(V_x,V_A,T_a)
% 14.25/14.41 | hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_A),V_B) != c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_inf__top__right_0,axiom,
% 14.25/14.41 ( ~ class_Lattices_Obounded__lattice(T_a)
% 14.25/14.41 | hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_x),c_Orderings_Otop__class_Otop(T_a)) = V_x ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_inf__top__left_0,axiom,
% 14.25/14.41 ( ~ class_Lattices_Obounded__lattice(T_a)
% 14.25/14.41 | hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),c_Orderings_Otop__class_Otop(T_a)),V_x) = V_x ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Int__UNIV__left_0,axiom,
% 14.25/14.41 hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),c_Orderings_Otop__class_Otop(tc_fun(T_a,tc_bool))),V_B) = V_B ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Int__UNIV__right_0,axiom,
% 14.25/14.41 hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_A),c_Orderings_Otop__class_Otop(tc_fun(T_a,tc_bool))) = V_A ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_image__vimage__eq_0,axiom,
% 14.25/14.41 c_Set_Oimage(V_f,c_Set_Ovimage(V_f,V_A,T_b,T_a),T_b,T_a) = hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_A),c_Set_Oimage(V_f,c_Orderings_Otop__class_Otop(tc_fun(T_b,tc_bool)),T_b,T_a)) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Diff__Int2_0,axiom,
% 14.25/14.41 c_HOL_Ominus__class_Ominus(hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_A),V_C),hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_B),V_C),tc_fun(T_a,tc_bool)) = c_HOL_Ominus__class_Ominus(hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_A),V_C),V_B,tc_fun(T_a,tc_bool)) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_le__0__eq_0,axiom,
% 14.25/14.41 ( V_n = c_HOL_Ozero__class_Ozero(tc_nat)
% 14.25/14.41 | ~ c_lessequals(V_n,c_HOL_Ozero__class_Ozero(tc_nat),tc_nat) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_top1I_0,axiom,
% 14.25/14.41 hBOOL(hAPP(c_Orderings_Otop__class_Otop(tc_fun(T_a,tc_bool)),V_x)) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_le__antisym_0,axiom,
% 14.25/14.41 ( V_m = V_n
% 14.25/14.41 | ~ c_lessequals(V_n,V_m,tc_nat)
% 14.25/14.41 | ~ c_lessequals(V_m,V_n,tc_nat) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_le__iff__diff__le__0_1,axiom,
% 14.25/14.41 ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 14.25/14.41 | c_lessequals(V_a,V_b,T_a)
% 14.25/14.41 | ~ c_lessequals(c_HOL_Ominus__class_Ominus(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_le__iff__diff__le__0_0,axiom,
% 14.25/14.41 ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 14.25/14.41 | c_lessequals(c_HOL_Ominus__class_Ominus(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.25/14.41 | ~ c_lessequals(V_a,V_b,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_nat_Osimps_I3_J_0,axiom,
% 14.25/14.41 c_Suc(V_nat_H) != c_HOL_Ozero__class_Ozero(tc_nat) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Suc__neq__Zero_0,axiom,
% 14.25/14.41 c_Suc(V_m) != c_HOL_Ozero__class_Ozero(tc_nat) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_vimage__const_1,axiom,
% 14.25/14.41 ( c_Set_Ovimage(c_COMBK(V_c,T_b,T_a),V_A,T_a,T_b) = c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool))
% 14.25/14.41 | c_in(V_c,V_A,T_b) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Int__insert__left_0,axiom,
% 14.25/14.41 ( hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),c_Set_Oinsert(V_a,V_B,T_a)),V_C) = c_Set_Oinsert(V_a,hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_B),V_C),T_a)
% 14.25/14.41 | ~ c_in(V_a,V_C,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Int__insert__right_0,axiom,
% 14.25/14.41 ( hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_A),c_Set_Oinsert(V_a,V_B,T_a)) = c_Set_Oinsert(V_a,hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_A),V_B),T_a)
% 14.25/14.41 | ~ c_in(V_a,V_A,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Diff__UNIV_0,axiom,
% 14.25/14.41 c_HOL_Ominus__class_Ominus(V_A,c_Orderings_Otop__class_Otop(tc_fun(T_a,tc_bool)),tc_fun(T_a,tc_bool)) = c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Suc__leD_0,axiom,
% 14.25/14.41 ( c_lessequals(V_m,V_n,tc_nat)
% 14.25/14.41 | ~ c_lessequals(c_Suc(V_m),V_n,tc_nat) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_le__SucI_0,axiom,
% 14.25/14.41 ( c_lessequals(V_m,c_Suc(V_n),tc_nat)
% 14.25/14.41 | ~ c_lessequals(V_m,V_n,tc_nat) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Suc__n__not__le__n_0,axiom,
% 14.25/14.41 ~ c_lessequals(c_Suc(V_n),V_n,tc_nat) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_inf__sup__aci_I4_J_0,axiom,
% 14.25/14.41 ( ~ class_Lattices_Olattice(T_a)
% 14.25/14.41 | hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_x),hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_x),V_y)) = hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_x),V_y) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_inf__left__idem_0,axiom,
% 14.25/14.41 ( ~ class_Lattices_Olower__semilattice(T_a)
% 14.25/14.41 | hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_x),hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_x),V_y)) = hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_x),V_y) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Int__left__absorb_0,axiom,
% 14.25/14.41 hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_A),hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_A),V_B)) = hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_A),V_B) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_le__0__eq_1,axiom,
% 14.25/14.41 c_lessequals(c_HOL_Ozero__class_Ozero(tc_nat),c_HOL_Ozero__class_Ozero(tc_nat),tc_nat) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Suc__n__not__n_0,axiom,
% 14.25/14.41 c_Suc(V_n) != V_n ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_n__not__Suc__n_0,axiom,
% 14.25/14.41 V_n != c_Suc(V_n) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_inf__idem_0,axiom,
% 14.25/14.41 ( ~ class_Lattices_Olower__semilattice(T_a)
% 14.25/14.41 | hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(T_a),V_x),V_x) = V_x ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Int__absorb_0,axiom,
% 14.25/14.41 hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_A),V_A) = V_A ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_le__refl_0,axiom,
% 14.25/14.41 c_lessequals(V_n,V_n,tc_nat) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_le__trans_0,axiom,
% 14.25/14.41 ( c_lessequals(V_i,V_k,tc_nat)
% 14.25/14.41 | ~ c_lessequals(V_j,V_k,tc_nat)
% 14.25/14.41 | ~ c_lessequals(V_i,V_j,tc_nat) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_eq__imp__le_0,axiom,
% 14.25/14.41 c_lessequals(V_x,V_x,tc_nat) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_card__Suc__eq_4,axiom,
% 14.25/14.41 ( c_in(V_x,V_xa,T_a)
% 14.25/14.41 | c_Finite__Set_Ocard(c_Set_Oinsert(V_x,V_xa,T_a),T_a) = c_Suc(c_Finite__Set_Ocard(V_xa,T_a))
% 14.25/14.41 | c_Finite__Set_Ocard(V_xa,T_a) = c_HOL_Ozero__class_Ozero(tc_nat) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Int__Diff_0,axiom,
% 14.25/14.41 c_HOL_Ominus__class_Ominus(hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_A),V_B),V_C,tc_fun(T_a,tc_bool)) = hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_A),c_HOL_Ominus__class_Ominus(V_B,V_C,tc_fun(T_a,tc_bool))) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_vimage__code_0,axiom,
% 14.25/14.41 ( hBOOL(hAPP(V_A,hAPP(V_f,V_x)))
% 14.25/14.41 | ~ hBOOL(hAPP(c_Set_Ovimage(V_f,V_A,T_a,T_b),V_x)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_vimage__code_1,axiom,
% 14.25/14.41 ( hBOOL(hAPP(c_Set_Ovimage(V_f,V_A,T_a,T_b),V_x))
% 14.25/14.41 | ~ hBOOL(hAPP(V_A,hAPP(V_f,V_x))) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_IntI_0,axiom,
% 14.25/14.41 ( c_in(V_c,hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_A),V_B),T_a)
% 14.25/14.41 | ~ c_in(V_c,V_B,T_a)
% 14.25/14.41 | ~ c_in(V_c,V_A,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Int__iff_2,axiom,
% 14.25/14.41 ( c_in(V_c,hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_A),V_B),T_a)
% 14.25/14.41 | ~ c_in(V_c,V_B,T_a)
% 14.25/14.41 | ~ c_in(V_c,V_A,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_inf1I_0,axiom,
% 14.25/14.41 ( hBOOL(hAPP(hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),V_A),V_B),V_x))
% 14.25/14.41 | ~ hBOOL(hAPP(V_B,V_x))
% 14.25/14.41 | ~ hBOOL(hAPP(V_A,V_x)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_vimage__const_0,axiom,
% 14.25/14.41 ( c_Set_Ovimage(c_COMBK(V_c,T_b,T_a),V_A,T_a,T_b) = c_Orderings_Otop__class_Otop(tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_in(V_c,V_A,T_b) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Suc__le__mono_0,axiom,
% 14.25/14.41 ( c_lessequals(V_n,V_m,tc_nat)
% 14.25/14.41 | ~ c_lessequals(c_Suc(V_n),c_Suc(V_m),tc_nat) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_Suc__le__mono_1,axiom,
% 14.25/14.41 ( c_lessequals(c_Suc(V_n),c_Suc(V_m),tc_nat)
% 14.25/14.41 | ~ c_lessequals(V_n,V_m,tc_nat) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_nat__le__linear_0,axiom,
% 14.25/14.41 ( c_lessequals(V_n,V_m,tc_nat)
% 14.25/14.41 | c_lessequals(V_m,V_n,tc_nat) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_image__constant__conv_0,axiom,
% 14.25/14.41 c_Set_Oimage(c_COMBK(V_c,T_a,T_b),c_Orderings_Obot__class_Obot(tc_fun(T_b,tc_bool)),T_b,T_a) = c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_card__Diff1__le_0,axiom,
% 14.25/14.41 ( c_lessequals(c_Finite__Set_Ocard(c_HOL_Ominus__class_Ominus(V_A,c_Set_Oinsert(V_x,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a),tc_fun(T_a,tc_bool)),T_a),c_Finite__Set_Ocard(V_A,T_a),tc_nat)
% 14.25/14.41 | ~ c_Finite__Set_Ofinite(V_A,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_card__Diff__singleton__if_1,axiom,
% 14.25/14.41 ( c_Finite__Set_Ocard(c_HOL_Ominus__class_Ominus(V_A,c_Set_Oinsert(V_x,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a),tc_fun(T_a,tc_bool)),T_a) = c_Finite__Set_Ocard(V_A,T_a)
% 14.25/14.41 | c_in(V_x,V_A,T_a)
% 14.25/14.41 | ~ c_Finite__Set_Ofinite(V_A,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_card__insert_0,axiom,
% 14.25/14.41 ( c_Finite__Set_Ocard(c_Set_Oinsert(V_x,V_A,T_a),T_a) = c_Suc(c_Finite__Set_Ocard(c_HOL_Ominus__class_Ominus(V_A,c_Set_Oinsert(V_x,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a),tc_fun(T_a,tc_bool)),T_a))
% 14.25/14.41 | ~ c_Finite__Set_Ofinite(V_A,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_insert__subset_2,axiom,
% 14.25/14.41 ( c_lessequals(c_Set_Oinsert(V_x,V_A,T_a),V_B,tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_lessequals(V_A,V_B,tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_in(V_x,V_B,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_insert__subset_0,axiom,
% 14.25/14.41 ( c_in(V_x,V_B,T_a)
% 14.25/14.41 | ~ c_lessequals(c_Set_Oinsert(V_x,V_A,T_a),V_B,tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_subset__insert__iff_2,axiom,
% 14.25/14.41 ( c_lessequals(V_A,c_Set_Oinsert(V_x,V_B,T_a),tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_lessequals(V_A,V_B,tc_fun(T_a,tc_bool))
% 14.25/14.41 | c_in(V_x,V_A,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_subset__insert__iff_1,axiom,
% 14.25/14.41 ( c_lessequals(V_A,V_B,tc_fun(T_a,tc_bool))
% 14.25/14.41 | c_in(V_x,V_A,T_a)
% 14.25/14.41 | ~ c_lessequals(V_A,c_Set_Oinsert(V_x,V_B,T_a),tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_subset__insert_1,axiom,
% 14.25/14.41 ( c_lessequals(V_A,c_Set_Oinsert(V_x,V_B,T_a),tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_lessequals(V_A,V_B,tc_fun(T_a,tc_bool))
% 14.25/14.41 | c_in(V_x,V_A,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_subset__insert_0,axiom,
% 14.25/14.41 ( c_lessequals(V_A,V_B,tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_lessequals(V_A,c_Set_Oinsert(V_x,V_B,T_a),tc_fun(T_a,tc_bool))
% 14.25/14.41 | c_in(V_x,V_A,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_insert__image_0,axiom,
% 14.25/14.41 ( c_Set_Oinsert(hAPP(V_f,V_x),c_Set_Oimage(V_f,V_A,T_a,T_b),T_b) = c_Set_Oimage(V_f,V_A,T_a,T_b)
% 14.25/14.41 | ~ c_in(V_x,V_A,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_image__Int__subset_0,axiom,
% 14.25/14.41 c_lessequals(c_Set_Oimage(V_f,hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_b,tc_bool)),V_A),V_B),T_b,T_a),hAPP(hAPP(c_Lattices_Olower__semilattice__class_Oinf(tc_fun(T_a,tc_bool)),c_Set_Oimage(V_f,V_A,T_b,T_a)),c_Set_Oimage(V_f,V_B,T_b,T_a)),tc_fun(T_a,tc_bool)) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_image__vimage__subset_0,axiom,
% 14.25/14.41 c_lessequals(c_Set_Oimage(V_f,c_Set_Ovimage(V_f,V_A,T_b,T_a),T_b,T_a),V_A,tc_fun(T_a,tc_bool)) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_subset__image__iff_0,axiom,
% 14.25/14.41 ( c_lessequals(c_ATP__Linkup_Osko__Set__Xsubset__image__iff__1__1(V_A,V_B,V_f,T_b,T_a),V_A,tc_fun(T_b,tc_bool))
% 14.25/14.41 | ~ c_lessequals(V_B,c_Set_Oimage(V_f,V_A,T_b,T_a),tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_image__subset__iff_0,axiom,
% 14.25/14.41 ( c_in(hAPP(V_f,V_x),V_B,T_a)
% 14.25/14.41 | ~ c_in(V_x,V_A,T_b)
% 14.25/14.41 | ~ c_lessequals(c_Set_Oimage(V_f,V_A,T_b,T_a),V_B,tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_image__diff__subset_0,axiom,
% 14.25/14.41 c_lessequals(c_HOL_Ominus__class_Ominus(c_Set_Oimage(V_f,V_A,T_b,T_a),c_Set_Oimage(V_f,V_B,T_b,T_a),tc_fun(T_a,tc_bool)),c_Set_Oimage(V_f,c_HOL_Ominus__class_Ominus(V_A,V_B,tc_fun(T_b,tc_bool)),T_b,T_a),tc_fun(T_a,tc_bool)) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_subset__image__iff_1,axiom,
% 14.25/14.41 ( V_B = c_Set_Oimage(V_f,c_ATP__Linkup_Osko__Set__Xsubset__image__iff__1__1(V_A,V_B,V_f,T_b,T_a),T_b,T_a)
% 14.25/14.41 | ~ c_lessequals(V_B,c_Set_Oimage(V_f,V_A,T_b,T_a),tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_card__inj__on__le_0,axiom,
% 14.25/14.41 ( c_lessequals(c_Finite__Set_Ocard(V_A,T_a),c_Finite__Set_Ocard(V_B,T_b),tc_nat)
% 14.25/14.41 | ~ c_Finite__Set_Ofinite(V_B,T_b)
% 14.25/14.41 | ~ c_lessequals(c_Set_Oimage(V_f,V_A,T_a,T_b),V_B,tc_fun(T_b,tc_bool))
% 14.25/14.41 | ~ c_Fun_Oinj__on(V_f,V_A,T_a,T_b) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_card__eq__0__iff_2,axiom,
% 14.25/14.41 ( c_Finite__Set_Ocard(V_A,T_a) = c_HOL_Ozero__class_Ozero(tc_nat)
% 14.25/14.41 | c_Finite__Set_Ofinite(V_A,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_card__eq__UNIV__imp__eq__UNIV_0,axiom,
% 14.25/14.41 ( c_Finite__Set_Ocard(V_A,T_a) != c_Finite__Set_Ocard(c_Orderings_Otop__class_Otop(tc_fun(T_a,tc_bool)),T_a)
% 14.25/14.41 | ~ c_Finite__Set_Ofinite(c_Orderings_Otop__class_Otop(tc_fun(T_a,tc_bool)),T_a)
% 14.25/14.41 | V_A = c_Orderings_Otop__class_Otop(tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_card__empty_0,axiom,
% 14.25/14.41 c_Finite__Set_Ocard(c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a) = c_HOL_Ozero__class_Ozero(tc_nat) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_card__image_0,axiom,
% 14.25/14.41 ( c_Finite__Set_Ocard(c_Set_Oimage(V_f,V_A,T_a,T_b),T_b) = c_Finite__Set_Ocard(V_A,T_a)
% 14.25/14.41 | ~ c_Fun_Oinj__on(V_f,V_A,T_a,T_b) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_finite__subset__induct_0,axiom,
% 14.25/14.41 ( hBOOL(hAPP(V_P,V_F))
% 14.25/14.41 | c_Finite__Set_Ofinite(c_ATP__Linkup_Osko__Finite__Set__Xfinite__subset__induct__1__2(V_A,V_P,T_a),T_a)
% 14.25/14.41 | ~ hBOOL(hAPP(V_P,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool))))
% 14.25/14.41 | ~ c_lessequals(V_F,V_A,tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_Finite__Set_Ofinite(V_F,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_finite__subset__induct_3,axiom,
% 14.25/14.41 ( hBOOL(hAPP(V_P,V_F))
% 14.25/14.41 | hBOOL(hAPP(V_P,c_ATP__Linkup_Osko__Finite__Set__Xfinite__subset__induct__1__2(V_A,V_P,T_a)))
% 14.25/14.41 | ~ hBOOL(hAPP(V_P,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool))))
% 14.25/14.41 | ~ c_lessequals(V_F,V_A,tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_Finite__Set_Ofinite(V_F,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_subset__insert__iff_4,axiom,
% 14.25/14.41 ( c_lessequals(V_A,c_Set_Oinsert(V_x,V_B,T_a),tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_lessequals(V_A,V_B,tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_lessequals(c_HOL_Ominus__class_Ominus(V_A,c_Set_Oinsert(V_x,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a),tc_fun(T_a,tc_bool)),V_B,tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_image__constant__conv_1,axiom,
% 14.25/14.41 ( c_Set_Oimage(c_COMBK(V_c,T_a,T_b),V_A,T_b,T_a) = c_Set_Oinsert(V_c,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a)
% 14.25/14.41 | V_A = c_Orderings_Obot__class_Obot(tc_fun(T_b,tc_bool)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_finite__subset__image_0,axiom,
% 14.25/14.41 ( c_lessequals(c_ATP__Linkup_Osko__Finite__Set__Xfinite__subset__image__1__1(V_A,V_B,V_f,T_b,T_a),V_A,tc_fun(T_b,tc_bool))
% 14.25/14.41 | ~ c_lessequals(V_B,c_Set_Oimage(V_f,V_A,T_b,T_a),tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_Finite__Set_Ofinite(V_B,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_endo__inj__surj_0,axiom,
% 14.25/14.41 ( c_Set_Oimage(V_f,V_A,T_a,T_a) = V_A
% 14.25/14.41 | ~ c_Fun_Oinj__on(V_f,V_A,T_a,T_a)
% 14.25/14.41 | ~ c_lessequals(c_Set_Oimage(V_f,V_A,T_a,T_a),V_A,tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_Finite__Set_Ofinite(V_A,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_finite__subset__image_1,axiom,
% 14.25/14.41 ( c_Finite__Set_Ofinite(c_ATP__Linkup_Osko__Finite__Set__Xfinite__subset__image__1__1(V_A,V_B,V_f,T_b,T_a),T_b)
% 14.25/14.41 | ~ c_lessequals(V_B,c_Set_Oimage(V_f,V_A,T_b,T_a),tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_Finite__Set_Ofinite(V_B,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_finite__subset__image_2,axiom,
% 14.25/14.41 ( V_B = c_Set_Oimage(V_f,c_ATP__Linkup_Osko__Finite__Set__Xfinite__subset__image__1__1(V_A,V_B,V_f,T_b,T_a),T_b,T_a)
% 14.25/14.41 | ~ c_lessequals(V_B,c_Set_Oimage(V_f,V_A,T_b,T_a),tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_Finite__Set_Ofinite(V_B,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_finite__surj__inj_0,axiom,
% 14.25/14.41 ( c_Fun_Oinj__on(V_f,V_A,T_a,T_a)
% 14.25/14.41 | ~ c_lessequals(V_A,c_Set_Oimage(V_f,V_A,T_a,T_a),tc_fun(T_a,tc_bool))
% 14.25/14.41 | ~ c_Finite__Set_Ofinite(V_A,T_a) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_card__eq__0__iff_0,axiom,
% 14.25/14.41 ( c_Finite__Set_Ocard(V_A,T_a) != c_HOL_Ozero__class_Ozero(tc_nat)
% 14.25/14.41 | ~ c_Finite__Set_Ofinite(V_A,T_a)
% 14.25/14.41 | V_A = c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)) ) ).
% 14.25/14.41
% 14.25/14.41 cnf(cls_card__insert__if_0,axiom,
% 14.25/14.41 ( c_Finite__Set_Ocard(c_Set_Oinsert(V_x,V_A,T_a),T_a) = c_Finite__Set_Ocard(V_A,T_a)
% 14.25/14.41 | ~ c_in(V_x,V_A,T_a)
% 14.25/14.41 | ~ c_Finite__Set_Ofinite(V_A,T_a) ) ).
% 14.25/14.41
% 14.42/14.42 cnf(cls_card__insert__le_0,axiom,
% 14.42/14.42 ( c_lessequals(c_Finite__Set_Ocard(V_A,T_a),c_Finite__Set_Ocard(c_Set_Oinsert(V_x,V_A,T_a),T_a),tc_nat)
% 14.42/14.42 | ~ c_Finite__Set_Ofinite(V_A,T_a) ) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_card__seteq_0,axiom,
% 14.42/14.42 ( V_A = V_B
% 14.42/14.42 | ~ c_lessequals(c_Finite__Set_Ocard(V_B,T_a),c_Finite__Set_Ocard(V_A,T_a),tc_nat)
% 14.42/14.42 | ~ c_lessequals(V_A,V_B,tc_fun(T_a,tc_bool))
% 14.42/14.42 | ~ c_Finite__Set_Ofinite(V_B,T_a) ) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_card__mono_0,axiom,
% 14.42/14.42 ( c_lessequals(c_Finite__Set_Ocard(V_A,T_a),c_Finite__Set_Ocard(V_B,T_a),tc_nat)
% 14.42/14.42 | ~ c_lessequals(V_A,V_B,tc_fun(T_a,tc_bool))
% 14.42/14.42 | ~ c_Finite__Set_Ofinite(V_B,T_a) ) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_inj__on__iff__eq__card_0,axiom,
% 14.42/14.42 ( c_Finite__Set_Ocard(c_Set_Oimage(V_f,V_A,T_a,T_b),T_b) = c_Finite__Set_Ocard(V_A,T_a)
% 14.42/14.42 | ~ c_Fun_Oinj__on(V_f,V_A,T_a,T_b)
% 14.42/14.42 | ~ c_Finite__Set_Ofinite(V_A,T_a) ) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_eq__card__imp__inj__on_0,axiom,
% 14.42/14.42 ( c_Finite__Set_Ocard(c_Set_Oimage(V_f,V_A,T_a,T_b),T_b) != c_Finite__Set_Ocard(V_A,T_a)
% 14.42/14.42 | ~ c_Finite__Set_Ofinite(V_A,T_a)
% 14.42/14.42 | c_Fun_Oinj__on(V_f,V_A,T_a,T_b) ) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_card__image__le_0,axiom,
% 14.42/14.42 ( c_lessequals(c_Finite__Set_Ocard(c_Set_Oimage(V_f,V_A,T_a,T_b),T_b),c_Finite__Set_Ocard(V_A,T_a),tc_nat)
% 14.42/14.42 | ~ c_Finite__Set_Ofinite(V_A,T_a) ) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_assms_I2_J_0,axiom,
% 14.42/14.42 ( hBOOL(hAPP(hAPP(v_P,V_G),c_Set_Oinsert(hAPP(v_mgt__call,V_pn),c_Orderings_Obot__class_Obot(tc_fun(t_a,tc_bool)),t_a)))
% 14.42/14.42 | ~ hBOOL(hAPP(hAPP(v_P,c_Set_Oinsert(hAPP(v_mgt__call,V_pn),V_G,t_a)),c_Set_Oinsert(v_mgt(c_Option_Othe(hAPP(c_Com_Obody,V_pn),tc_Com_Ocom)),c_Orderings_Obot__class_Obot(tc_fun(t_a,tc_bool)),t_a))) ) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_Min__antimono_0,axiom,
% 14.42/14.42 ( ~ class_Orderings_Olinorder(T_a)
% 14.42/14.42 | c_lessequals(hAPP(c_Finite__Set_Olinorder__class_OMin(T_a),V_N),hAPP(c_Finite__Set_Olinorder__class_OMin(T_a),V_M),T_a)
% 14.42/14.42 | ~ c_Finite__Set_Ofinite(V_N,T_a)
% 14.42/14.42 | V_M = c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool))
% 14.42/14.42 | ~ c_lessequals(V_M,V_N,tc_fun(T_a,tc_bool)) ) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_Max__mono_0,axiom,
% 14.42/14.42 ( ~ class_Orderings_Olinorder(T_a)
% 14.42/14.42 | c_lessequals(hAPP(c_Finite__Set_Olinorder__class_OMax(T_a),V_M),hAPP(c_Finite__Set_Olinorder__class_OMax(T_a),V_N),T_a)
% 14.42/14.42 | ~ c_Finite__Set_Ofinite(V_N,T_a)
% 14.42/14.42 | V_M = c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool))
% 14.42/14.42 | ~ c_lessequals(V_M,V_N,tc_fun(T_a,tc_bool)) ) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_card__bij__eq_0,axiom,
% 14.42/14.42 ( c_Finite__Set_Ocard(V_A,T_a) = c_Finite__Set_Ocard(V_B,T_b)
% 14.42/14.42 | ~ c_Finite__Set_Ofinite(V_B,T_b)
% 14.42/14.42 | ~ c_Finite__Set_Ofinite(V_A,T_a)
% 14.42/14.42 | ~ c_lessequals(c_Set_Oimage(V_g,V_B,T_b,T_a),V_A,tc_fun(T_a,tc_bool))
% 14.42/14.42 | ~ c_Fun_Oinj__on(V_g,V_B,T_b,T_a)
% 14.42/14.42 | ~ c_lessequals(c_Set_Oimage(V_f,V_A,T_a,T_b),V_B,tc_fun(T_b,tc_bool))
% 14.42/14.42 | ~ c_Fun_Oinj__on(V_f,V_A,T_a,T_b) ) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_assms_I3_J_0,axiom,
% 14.42/14.42 ( hBOOL(hAPP(hAPP(v_P,V_G),c_Set_Oinsert(v_mgt(V_c),c_Orderings_Obot__class_Obot(tc_fun(t_a,tc_bool)),t_a)))
% 14.42/14.42 | c_in(v_sko__local__Xassms__3__1(V_G,v_P,v_U,v_mgt__call),v_U,tc_Com_Opname)
% 14.42/14.42 | ~ v_wt(V_c) ) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_assms_I3_J_1,axiom,
% 14.42/14.42 ( hBOOL(hAPP(hAPP(v_P,V_G),c_Set_Oinsert(v_mgt(V_c),c_Orderings_Obot__class_Obot(tc_fun(t_a,tc_bool)),t_a)))
% 14.42/14.42 | ~ hBOOL(hAPP(hAPP(v_P,V_G),c_Set_Oinsert(hAPP(v_mgt__call,v_sko__local__Xassms__3__1(V_G,v_P,v_U,v_mgt__call)),c_Orderings_Obot__class_Obot(tc_fun(t_a,tc_bool)),t_a)))
% 14.42/14.42 | ~ v_wt(V_c) ) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_linorder__linear_0,axiom,
% 14.42/14.42 ( ~ class_Orderings_Olinorder(T_a)
% 14.42/14.42 | c_lessequals(V_y,V_x,T_a)
% 14.42/14.42 | c_lessequals(V_x,V_y,T_a) ) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_insert__mono_0,axiom,
% 14.42/14.42 ( c_lessequals(c_Set_Oinsert(V_a,V_C,T_a),c_Set_Oinsert(V_a,V_D,T_a),tc_fun(T_a,tc_bool))
% 14.42/14.42 | ~ c_lessequals(V_C,V_D,tc_fun(T_a,tc_bool)) ) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_subset__image__iff_2,axiom,
% 14.42/14.42 ( ~ c_lessequals(V_x,V_A,tc_fun(T_b,tc_bool))
% 14.42/14.42 | c_lessequals(c_Set_Oimage(V_f,V_x,T_b,T_a),c_Set_Oimage(V_f,V_A,T_b,T_a),tc_fun(T_a,tc_bool)) ) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_image__mono_0,axiom,
% 14.42/14.42 ( c_lessequals(c_Set_Oimage(V_f,V_A,T_a,T_b),c_Set_Oimage(V_f,V_B,T_a,T_b),tc_fun(T_b,tc_bool))
% 14.42/14.42 | ~ c_lessequals(V_A,V_B,tc_fun(T_a,tc_bool)) ) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_subset__singletonD_0,axiom,
% 14.42/14.42 ( V_A = c_Set_Oinsert(V_x,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a)
% 14.42/14.42 | V_A = c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool))
% 14.42/14.42 | ~ c_lessequals(V_A,c_Set_Oinsert(V_x,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a),tc_fun(T_a,tc_bool)) ) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_image__is__empty_0,axiom,
% 14.42/14.42 ( c_Set_Oimage(V_f,V_A,T_b,T_a) != c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool))
% 14.42/14.42 | V_A = c_Orderings_Obot__class_Obot(tc_fun(T_b,tc_bool)) ) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_rev__finite__subset_0,axiom,
% 14.42/14.42 ( c_Finite__Set_Ofinite(V_A,T_a)
% 14.42/14.42 | ~ c_lessequals(V_A,V_B,tc_fun(T_a,tc_bool))
% 14.42/14.42 | ~ c_Finite__Set_Ofinite(V_B,T_a) ) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_rev__predicate1D_0,axiom,
% 14.42/14.42 ( hBOOL(hAPP(V_Q,V_x))
% 14.42/14.42 | ~ c_lessequals(V_P,V_Q,tc_fun(T_a,tc_bool))
% 14.42/14.42 | ~ hBOOL(hAPP(V_P,V_x)) ) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_finite__subset_0,axiom,
% 14.42/14.42 ( c_Finite__Set_Ofinite(V_A,T_a)
% 14.42/14.42 | ~ c_Finite__Set_Ofinite(V_B,T_a)
% 14.42/14.42 | ~ c_lessequals(V_A,V_B,tc_fun(T_a,tc_bool)) ) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_order__eq__refl_0,axiom,
% 14.42/14.42 ( ~ class_Orderings_Opreorder(T_a)
% 14.42/14.42 | c_lessequals(V_x,V_x,T_a) ) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_order__eq__iff_0,axiom,
% 14.42/14.42 ( ~ class_Orderings_Oorder(T_a)
% 14.42/14.42 | c_lessequals(V_x,V_x,T_a) ) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_predicate1D_0,axiom,
% 14.42/14.42 ( hBOOL(hAPP(V_Q,V_x))
% 14.42/14.42 | ~ hBOOL(hAPP(V_P,V_x))
% 14.42/14.42 | ~ c_lessequals(V_P,V_Q,tc_fun(T_a,tc_bool)) ) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_subset__trans_0,axiom,
% 14.42/14.42 ( c_lessequals(V_A,V_C,tc_fun(T_a,tc_bool))
% 14.42/14.42 | ~ c_lessequals(V_B,V_C,tc_fun(T_a,tc_bool))
% 14.42/14.42 | ~ c_lessequals(V_A,V_B,tc_fun(T_a,tc_bool)) ) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_subset__refl_0,axiom,
% 14.42/14.42 c_lessequals(V_A,V_A,tc_fun(T_a,tc_bool)) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_equalityE_0,axiom,
% 14.42/14.42 c_lessequals(V_x,V_x,tc_fun(T_a,tc_bool)) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_order__trans_0,axiom,
% 14.42/14.42 ( ~ class_Orderings_Opreorder(T_a)
% 14.42/14.42 | c_lessequals(V_x,V_z,T_a)
% 14.42/14.42 | ~ c_lessequals(V_y,V_z,T_a)
% 14.42/14.42 | ~ c_lessequals(V_x,V_y,T_a) ) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_xt1_I6_J_0,axiom,
% 14.42/14.42 ( ~ class_Orderings_Oorder(T_a)
% 14.42/14.42 | c_lessequals(V_z,V_x,T_a)
% 14.42/14.42 | ~ c_lessequals(V_z,V_y,T_a)
% 14.42/14.42 | ~ c_lessequals(V_y,V_x,T_a) ) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_insert__code_1,axiom,
% 14.42/14.42 hBOOL(hAPP(c_Set_Oinsert(V_x,V_A,T_a),V_x)) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_image__insert_0,axiom,
% 14.42/14.42 c_Set_Oimage(V_f,c_Set_Oinsert(V_a,V_B,T_b),T_b,T_a) = c_Set_Oinsert(hAPP(V_f,V_a),c_Set_Oimage(V_f,V_B,T_b,T_a),T_a) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_empty__not__insert_0,axiom,
% 14.42/14.42 c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)) != c_Set_Oinsert(V_a,V_A,T_a) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_subset__empty_1,axiom,
% 14.42/14.42 c_lessequals(c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),tc_fun(T_a,tc_bool)) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_subset__empty_0,axiom,
% 14.42/14.42 ( V_A = c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool))
% 14.42/14.42 | ~ c_lessequals(V_A,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),tc_fun(T_a,tc_bool)) ) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_doubleton__eq__iff_3,axiom,
% 14.42/14.42 ( c_Set_Oinsert(V_a,c_Set_Oinsert(V_b,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a),T_a) != c_Set_Oinsert(V_c,c_Set_Oinsert(V_d,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a),T_a)
% 14.42/14.42 | V_b = V_c
% 14.42/14.42 | V_b = V_d ) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_doubleton__eq__iff_2,axiom,
% 14.42/14.42 ( c_Set_Oinsert(V_a,c_Set_Oinsert(V_b,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a),T_a) != c_Set_Oinsert(V_c,c_Set_Oinsert(V_d,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a),T_a)
% 14.42/14.42 | V_a = V_d
% 14.42/14.42 | V_b = V_d ) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_doubleton__eq__iff_1,axiom,
% 14.42/14.42 ( c_Set_Oinsert(V_a,c_Set_Oinsert(V_b,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a),T_a) != c_Set_Oinsert(V_c,c_Set_Oinsert(V_d,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a),T_a)
% 14.42/14.42 | V_b = V_c
% 14.42/14.42 | V_a = V_c ) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_doubleton__eq__iff_0,axiom,
% 14.42/14.42 ( c_Set_Oinsert(V_a,c_Set_Oinsert(V_b,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a),T_a) != c_Set_Oinsert(V_c,c_Set_Oinsert(V_d,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a),T_a)
% 14.42/14.42 | V_a = V_d
% 14.42/14.42 | V_a = V_c ) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_finite__imageI_0,axiom,
% 14.42/14.42 ( c_Finite__Set_Ofinite(c_Set_Oimage(V_h,V_F,T_a,T_b),T_b)
% 14.42/14.42 | ~ c_Finite__Set_Ofinite(V_F,T_a) ) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_order__antisym__conv_0,axiom,
% 14.42/14.42 ( ~ class_Orderings_Oorder(T_a)
% 14.42/14.42 | V_x = V_y
% 14.42/14.42 | ~ c_lessequals(V_x,V_y,T_a)
% 14.42/14.42 | ~ c_lessequals(V_y,V_x,T_a) ) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_order__antisym_0,axiom,
% 14.42/14.42 ( ~ class_Orderings_Oorder(T_a)
% 14.42/14.42 | V_x = V_y
% 14.42/14.42 | ~ c_lessequals(V_y,V_x,T_a)
% 14.42/14.42 | ~ c_lessequals(V_x,V_y,T_a) ) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_order__eq__iff_2,axiom,
% 14.42/14.42 ( ~ class_Orderings_Oorder(T_a)
% 14.42/14.42 | V_x = V_y
% 14.42/14.42 | ~ c_lessequals(V_y,V_x,T_a)
% 14.42/14.42 | ~ c_lessequals(V_x,V_y,T_a) ) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_set__eq__subset_2,axiom,
% 14.42/14.42 ( V_A = V_B
% 14.42/14.42 | ~ c_lessequals(V_B,V_A,tc_fun(T_a,tc_bool))
% 14.42/14.42 | ~ c_lessequals(V_A,V_B,tc_fun(T_a,tc_bool)) ) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_equalityI_0,axiom,
% 14.42/14.42 ( V_A = V_B
% 14.42/14.42 | ~ c_lessequals(V_B,V_A,tc_fun(T_a,tc_bool))
% 14.42/14.42 | ~ c_lessequals(V_A,V_B,tc_fun(T_a,tc_bool)) ) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_bot1E_0,axiom,
% 14.42/14.42 ~ hBOOL(hAPP(c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),V_x)) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_finite_OemptyI_0,axiom,
% 14.42/14.42 c_Finite__Set_Ofinite(c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_finite__insert_1,axiom,
% 14.42/14.42 ( c_Finite__Set_Ofinite(c_Set_Oinsert(V_a,V_A,T_a),T_a)
% 14.42/14.42 | ~ c_Finite__Set_Ofinite(V_A,T_a) ) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_finite__insert_0,axiom,
% 14.42/14.42 ( c_Finite__Set_Ofinite(V_A,T_a)
% 14.42/14.42 | ~ c_Finite__Set_Ofinite(c_Set_Oinsert(V_a,V_A,T_a),T_a) ) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_subset__insertI_0,axiom,
% 14.42/14.42 c_lessequals(V_B,c_Set_Oinsert(V_a,V_B,T_a),tc_fun(T_a,tc_bool)) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_insert__code_0,axiom,
% 14.42/14.42 ( hBOOL(hAPP(V_A,V_x))
% 14.42/14.42 | V_y = V_x
% 14.42/14.42 | ~ hBOOL(hAPP(c_Set_Oinsert(V_y,V_A,T_a),V_x)) ) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_insert__absorb2_0,axiom,
% 14.42/14.42 c_Set_Oinsert(V_x,c_Set_Oinsert(V_x,V_A,T_a),T_a) = c_Set_Oinsert(V_x,V_A,T_a) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_insert__not__empty_0,axiom,
% 14.42/14.42 c_Set_Oinsert(V_a,V_A,T_a) != c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_bot__least_0,axiom,
% 14.42/14.42 ( ~ class_Orderings_Obot(T_a)
% 14.42/14.42 | c_lessequals(c_Orderings_Obot__class_Obot(T_a),V_x,T_a) ) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_empty__subsetI_0,axiom,
% 14.42/14.42 c_lessequals(c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),V_A,tc_fun(T_a,tc_bool)) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_empty__is__image_0,axiom,
% 14.42/14.42 ( c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)) != c_Set_Oimage(V_f,V_A,T_b,T_a)
% 14.42/14.42 | V_A = c_Orderings_Obot__class_Obot(tc_fun(T_b,tc_bool)) ) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_subset__insertI2_0,axiom,
% 14.42/14.42 ( c_lessequals(V_A,c_Set_Oinsert(V_b,V_B,T_a),tc_fun(T_a,tc_bool))
% 14.42/14.42 | ~ c_lessequals(V_A,V_B,tc_fun(T_a,tc_bool)) ) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_insert__subset_1,axiom,
% 14.42/14.42 ( c_lessequals(V_A,V_B,tc_fun(T_a,tc_bool))
% 14.42/14.42 | ~ c_lessequals(c_Set_Oinsert(V_x,V_A,T_a),V_B,tc_fun(T_a,tc_bool)) ) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_finite__surj_0,axiom,
% 14.42/14.42 ( c_Finite__Set_Ofinite(V_B,T_b)
% 14.42/14.42 | ~ c_lessequals(V_B,c_Set_Oimage(V_f,V_A,T_a,T_b),tc_fun(T_b,tc_bool))
% 14.42/14.42 | ~ c_Finite__Set_Ofinite(V_A,T_a) ) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_insert__commute_0,axiom,
% 14.42/14.42 c_Set_Oinsert(V_x,c_Set_Oinsert(V_y,V_A,T_a),T_a) = c_Set_Oinsert(V_y,c_Set_Oinsert(V_x,V_A,T_a),T_a) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_doubleton__eq__iff_4,axiom,
% 14.42/14.42 c_Set_Oinsert(V_xa,c_Set_Oinsert(V_x,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a),T_a) = c_Set_Oinsert(V_x,c_Set_Oinsert(V_xa,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a),T_a) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_image__empty_0,axiom,
% 14.42/14.42 c_Set_Oimage(V_f,c_Orderings_Obot__class_Obot(tc_fun(T_b,tc_bool)),T_b,T_a) = c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_singleton__inject_0,axiom,
% 14.42/14.42 ( c_Set_Oinsert(V_a,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a) != c_Set_Oinsert(V_b,c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)),T_a)
% 14.42/14.42 | V_a = V_b ) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_insert__code_2,axiom,
% 14.42/14.42 ( hBOOL(hAPP(c_Set_Oinsert(V_y,V_A,T_a),V_x))
% 14.42/14.42 | ~ hBOOL(hAPP(V_A,V_x)) ) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_assms_I1_J_0,axiom,
% 14.42/14.42 ( hBOOL(hAPP(hAPP(v_P,V_G),V_ts))
% 14.42/14.42 | ~ c_lessequals(V_ts,V_G,tc_fun(t_a,tc_bool)) ) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_empty__is__image_1,axiom,
% 14.42/14.42 c_Orderings_Obot__class_Obot(tc_fun(T_a,tc_bool)) = c_Set_Oimage(V_f,c_Orderings_Obot__class_Obot(tc_fun(T_b,tc_bool)),T_b,T_a) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_finite_0,axiom,
% 14.42/14.42 ( ~ class_Finite__Set_Ofinite_Ofinite(T_a)
% 14.42/14.42 | c_Finite__Set_Ofinite(V_A,T_a) ) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_le__funD_0,axiom,
% 14.42/14.42 ( ~ class_HOL_Oord(T_b)
% 14.42/14.42 | c_lessequals(hAPP(V_f,V_x),hAPP(V_g,V_x),T_b)
% 14.42/14.42 | ~ c_lessequals(V_f,V_g,tc_fun(T_a,T_b)) ) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_conjecture_0,negated_conjecture,
% 14.42/14.42 c_Finite__Set_Ofinite(v_U,tc_Com_Opname) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_conjecture_1,negated_conjecture,
% 14.42/14.42 c_lessequals(v_G,c_Set_Oimage(v_mgt__call,v_U,tc_Com_Opname,t_a),tc_fun(t_a,tc_bool)) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_conjecture_2,negated_conjecture,
% 14.42/14.42 c_Finite__Set_Ocard(v_G,t_a) = c_Finite__Set_Ocard(c_Set_Oimage(v_mgt__call,v_U,tc_Com_Opname,t_a),t_a) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_conjecture_3,negated_conjecture,
% 14.42/14.42 v_wt(v_c) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_conjecture_4,negated_conjecture,
% 14.42/14.42 v_G = c_Set_Oimage(v_mgt__call,v_U,tc_Com_Opname,t_a) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_conjecture_5,negated_conjecture,
% 14.42/14.42 ~ hBOOL(hAPP(hAPP(v_P,v_G),c_Set_Oinsert(v_mgt(v_c),c_Orderings_Obot__class_Obot(tc_fun(t_a,tc_bool)),t_a))) ).
% 14.42/14.42
% 14.42/14.42 cnf(clsarity_fun__Lattices_Oupper__semilattice,axiom,
% 14.42/14.42 ( class_Lattices_Oupper__semilattice(tc_fun(T_2,T_1))
% 14.42/14.42 | ~ class_Lattices_Olattice(T_1) ) ).
% 14.42/14.42
% 14.42/14.42 cnf(clsarity_fun__Lattices_Olower__semilattice,axiom,
% 14.42/14.42 ( class_Lattices_Olower__semilattice(tc_fun(T_2,T_1))
% 14.42/14.42 | ~ class_Lattices_Olattice(T_1) ) ).
% 14.42/14.42
% 14.42/14.42 cnf(clsarity_fun__Lattices_Odistrib__lattice,axiom,
% 14.42/14.42 ( class_Lattices_Odistrib__lattice(tc_fun(T_2,T_1))
% 14.42/14.42 | ~ class_Lattices_Odistrib__lattice(T_1) ) ).
% 14.42/14.42
% 14.42/14.42 cnf(clsarity_fun__Lattices_Obounded__lattice,axiom,
% 14.42/14.42 ( class_Lattices_Obounded__lattice(tc_fun(T_2,T_1))
% 14.42/14.42 | ~ class_Lattices_Obounded__lattice(T_1) ) ).
% 14.42/14.42
% 14.42/14.42 cnf(clsarity_fun__Lattices_Oboolean__algebra,axiom,
% 14.42/14.42 ( class_Lattices_Oboolean__algebra(tc_fun(T_2,T_1))
% 14.42/14.42 | ~ class_Lattices_Oboolean__algebra(T_1) ) ).
% 14.42/14.42
% 14.42/14.42 cnf(clsarity_fun__Finite__Set_Ofinite_Ofinite,axiom,
% 14.42/14.42 ( class_Finite__Set_Ofinite_Ofinite(tc_fun(T_2,T_1))
% 14.42/14.42 | ~ class_Finite__Set_Ofinite_Ofinite(T_1)
% 14.42/14.42 | ~ class_Finite__Set_Ofinite_Ofinite(T_2) ) ).
% 14.42/14.42
% 14.42/14.42 cnf(clsarity_fun__Orderings_Opreorder,axiom,
% 14.42/14.42 ( class_Orderings_Opreorder(tc_fun(T_2,T_1))
% 14.42/14.42 | ~ class_Orderings_Opreorder(T_1) ) ).
% 14.42/14.42
% 14.42/14.42 cnf(clsarity_fun__Lattices_Olattice,axiom,
% 14.42/14.42 ( class_Lattices_Olattice(tc_fun(T_2,T_1))
% 14.42/14.42 | ~ class_Lattices_Olattice(T_1) ) ).
% 14.42/14.42
% 14.42/14.42 cnf(clsarity_fun__Orderings_Oorder,axiom,
% 14.42/14.42 ( class_Orderings_Oorder(tc_fun(T_2,T_1))
% 14.42/14.42 | ~ class_Orderings_Oorder(T_1) ) ).
% 14.42/14.42
% 14.42/14.42 cnf(clsarity_fun__Orderings_Otop,axiom,
% 14.42/14.42 ( class_Orderings_Otop(tc_fun(T_2,T_1))
% 14.42/14.42 | ~ class_Orderings_Otop(T_1) ) ).
% 14.42/14.42
% 14.42/14.42 cnf(clsarity_fun__Orderings_Obot,axiom,
% 14.42/14.42 ( class_Orderings_Obot(tc_fun(T_2,T_1))
% 14.42/14.42 | ~ class_Orderings_Obot(T_1) ) ).
% 14.42/14.42
% 14.42/14.42 cnf(clsarity_fun__HOL_Oord,axiom,
% 14.42/14.42 ( class_HOL_Oord(tc_fun(T_2,T_1))
% 14.42/14.42 | ~ class_HOL_Oord(T_1) ) ).
% 14.42/14.42
% 14.42/14.42 cnf(clsarity_nat__Ring__and__Field_Ono__zero__divisors,axiom,
% 14.42/14.42 class_Ring__and__Field_Ono__zero__divisors(tc_nat) ).
% 14.42/14.42
% 14.42/14.42 cnf(clsarity_nat__Ring__and__Field_Ocomm__semiring__1,axiom,
% 14.42/14.42 class_Ring__and__Field_Ocomm__semiring__1(tc_nat) ).
% 14.42/14.42
% 14.42/14.42 cnf(clsarity_nat__OrderedGroup_Ocomm__monoid__add,axiom,
% 14.42/14.42 class_OrderedGroup_Ocomm__monoid__add(tc_nat) ).
% 14.42/14.42
% 14.42/14.42 cnf(clsarity_nat__Lattices_Oupper__semilattice,axiom,
% 14.42/14.42 class_Lattices_Oupper__semilattice(tc_nat) ).
% 14.42/14.42
% 14.42/14.42 cnf(clsarity_nat__Lattices_Olower__semilattice,axiom,
% 14.42/14.42 class_Lattices_Olower__semilattice(tc_nat) ).
% 14.42/14.42
% 14.42/14.42 cnf(clsarity_nat__Lattices_Odistrib__lattice,axiom,
% 14.42/14.42 class_Lattices_Odistrib__lattice(tc_nat) ).
% 14.42/14.42
% 14.42/14.42 cnf(clsarity_nat__Orderings_Opreorder,axiom,
% 14.42/14.42 class_Orderings_Opreorder(tc_nat) ).
% 14.42/14.42
% 14.42/14.42 cnf(clsarity_nat__Orderings_Olinorder,axiom,
% 14.42/14.42 class_Orderings_Olinorder(tc_nat) ).
% 14.42/14.42
% 14.42/14.42 cnf(clsarity_nat__Lattices_Olattice,axiom,
% 14.42/14.42 class_Lattices_Olattice(tc_nat) ).
% 14.42/14.42
% 14.42/14.42 cnf(clsarity_nat__Orderings_Oorder,axiom,
% 14.42/14.42 class_Orderings_Oorder(tc_nat) ).
% 14.42/14.42
% 14.42/14.42 cnf(clsarity_nat__Orderings_Obot,axiom,
% 14.42/14.42 class_Orderings_Obot(tc_nat) ).
% 14.42/14.42
% 14.42/14.42 cnf(clsarity_nat__HOL_Oord,axiom,
% 14.42/14.42 class_HOL_Oord(tc_nat) ).
% 14.42/14.42
% 14.42/14.42 cnf(clsarity_bool__Lattices_Oupper__semilattice,axiom,
% 14.42/14.42 class_Lattices_Oupper__semilattice(tc_bool) ).
% 14.42/14.42
% 14.42/14.42 cnf(clsarity_bool__Lattices_Olower__semilattice,axiom,
% 14.42/14.42 class_Lattices_Olower__semilattice(tc_bool) ).
% 14.42/14.42
% 14.42/14.42 cnf(clsarity_bool__Lattices_Odistrib__lattice,axiom,
% 14.42/14.42 class_Lattices_Odistrib__lattice(tc_bool) ).
% 14.42/14.42
% 14.42/14.42 cnf(clsarity_bool__Lattices_Obounded__lattice,axiom,
% 14.42/14.42 class_Lattices_Obounded__lattice(tc_bool) ).
% 14.42/14.42
% 14.42/14.42 cnf(clsarity_bool__Lattices_Oboolean__algebra,axiom,
% 14.42/14.42 class_Lattices_Oboolean__algebra(tc_bool) ).
% 14.42/14.42
% 14.42/14.42 cnf(clsarity_bool__Finite__Set_Ofinite_Ofinite,axiom,
% 14.42/14.42 class_Finite__Set_Ofinite_Ofinite(tc_bool) ).
% 14.42/14.42
% 14.42/14.42 cnf(clsarity_bool__Orderings_Opreorder,axiom,
% 14.42/14.42 class_Orderings_Opreorder(tc_bool) ).
% 14.42/14.42
% 14.42/14.42 cnf(clsarity_bool__Lattices_Olattice,axiom,
% 14.42/14.42 class_Lattices_Olattice(tc_bool) ).
% 14.42/14.42
% 14.42/14.42 cnf(clsarity_bool__Orderings_Oorder,axiom,
% 14.42/14.42 class_Orderings_Oorder(tc_bool) ).
% 14.42/14.42
% 14.42/14.42 cnf(clsarity_bool__Orderings_Otop,axiom,
% 14.42/14.42 class_Orderings_Otop(tc_bool) ).
% 14.42/14.42
% 14.42/14.42 cnf(clsarity_bool__Orderings_Obot,axiom,
% 14.42/14.42 class_Orderings_Obot(tc_bool) ).
% 14.42/14.42
% 14.42/14.42 cnf(clsarity_bool__HOL_Oord,axiom,
% 14.42/14.42 class_HOL_Oord(tc_bool) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_ATP__Linkup_Oequal__imp__fequal_0,axiom,
% 14.42/14.42 c_fequal(V_x,V_x,T_a) ).
% 14.42/14.42
% 14.42/14.42 cnf(cls_ATP__Linkup_Ofequal__imp__equal_0,axiom,
% 14.42/14.42 ( V_X = V_Y
% 14.42/14.42 | ~ c_fequal(V_X,V_Y,T_a) ) ).
% 14.42/14.42
% 14.42/14.42 %------------------------------------------------------------------------------
% 14.42/14.42 %-------------------------------------------
% 14.42/14.42 % Proof found
% 14.42/14.42 % SZS status Theorem for theBenchmark
% 14.42/14.42 % SZS output start Proof
% 14.42/14.42 %ClaNum:1013(EqnAxiom:166)
% 14.42/14.42 %VarNum:6024(SingletonVarNum:2208)
% 14.42/14.42 %MaxLitNum:7
% 14.42/14.42 %MaxfuncDepth:6
% 14.42/14.42 %SharedTerms:57
% 14.42/14.42 %goalClause: 189 192 241 276 278 351
% 14.42/14.42 %singleGoalClaCount:6
% 14.42/14.42 [167]P1(a1)
% 14.42/14.42 [168]P1(a2)
% 14.42/14.42 [169]P18(a1)
% 14.42/14.42 [170]P18(a2)
% 14.42/14.42 [171]P19(a1)
% 14.42/14.42 [172]P19(a2)
% 14.42/14.42 [173]P20(a1)
% 14.42/14.42 [174]P2(a1)
% 14.42/14.42 [175]P2(a2)
% 14.42/14.42 [176]P3(a1)
% 14.42/14.42 [177]P3(a2)
% 14.42/14.42 [178]P4(a1)
% 14.42/14.42 [179]P4(a2)
% 14.42/14.42 [180]P5(a2)
% 14.42/14.42 [181]P6(a2)
% 14.42/14.42 [182]P21(a1)
% 14.42/14.42 [183]P7(a1)
% 14.42/14.42 [184]P7(a2)
% 14.42/14.42 [185]P28(a1)
% 14.42/14.42 [186]P29(a1)
% 14.42/14.42 [187]P30(a2)
% 14.42/14.42 [188]P8(a2)
% 14.42/14.42 [189]P33(a44)
% 14.42/14.42 [190]P23(a1)
% 14.42/14.42 [191]P23(a2)
% 14.42/14.42 [192]P9(a45,a3)
% 14.42/14.42 [214]P9(f30(a6,a3,a40),a3)
% 14.42/14.42 [241]E(f38(a48,a45,a3,a42),a46)
% 14.42/14.42 [278]P10(a46,f38(a48,a45,a3,a42),f43(a42,a2))
% 14.42/14.42 [276]E(f5(f38(a48,a45,a3,a42),a42),f5(a46,a42))
% 14.42/14.42 [351]~P34(f41(f41(a47,a46),f37(f49(a44),f29(f43(a42,a2)),a42)))
% 14.42/14.42 [194]P10(x1941,x1941,a1)
% 14.42/14.42 [336]~P12(x3361,x3361,a1)
% 14.42/14.42 [196]E(f4(x1961,x1961,a1),f26(a1))
% 14.42/14.42 [197]P10(f26(a1),x1971,a1)
% 14.42/14.42 [201]P12(x2011,f28(x2011),a1)
% 14.42/14.42 [204]P12(f26(a1),f28(x2041),a1)
% 14.42/14.42 [330]~E(f28(x3301),x3301)
% 14.42/14.42 [334]~E(f28(x3341),f26(a1))
% 14.42/14.42 [339]~P12(x3391,f26(a1),a1)
% 14.42/14.42 [340]~P10(f28(x3401),x3401,a1)
% 14.42/14.42 [198]E(f4(x1981,f26(a1),a1),x1981)
% 14.42/14.42 [199]E(f4(f26(a1),x1991,a1),f26(a1))
% 14.42/14.42 [206]P9(f29(f43(x2061,a2)),x2061)
% 14.42/14.42 [215]E(f27(f29(f43(x2151,a2)),f43(x2151,a2)),f34(f43(x2151,a2)))
% 14.42/14.42 [216]E(f27(f34(f43(x2161,a2)),f43(x2161,a2)),f29(f43(x2161,a2)))
% 14.42/14.42 [337]~E(f34(f43(x3371,a2)),f29(f43(x3371,a2)))
% 14.42/14.42 [207]E(f5(f29(f43(x2071,a2)),x2071),f26(a1))
% 14.42/14.42 [350]~P12(f26(a1),f5(f29(f43(x3501,a2)),x3501),a1)
% 14.42/14.42 [195]P11(x1951,x1951,x1952)
% 14.42/14.42 [210]P10(x2101,x2101,f43(x2102,a2))
% 14.42/14.42 [227]P10(f4(x2271,x2272,a1),x2271,a1)
% 14.42/14.42 [231]P12(f4(x2311,x2312,a1),f28(x2311),a1)
% 14.42/14.42 [342]~P12(x3421,x3421,f43(x3422,a2))
% 14.42/14.42 [211]E(f4(x2111,x2111,f43(x2112,a2)),f29(f43(x2112,a2)))
% 14.42/14.42 [212]P16(x2121,f34(f43(x2122,a2)),x2122)
% 14.42/14.42 [213]E(f27(f27(x2131,f43(x2132,a2)),f43(x2132,a2)),x2131)
% 14.42/14.42 [217]E(f4(f28(x2171),f28(x2172),a1),f4(x2171,x2172,a1))
% 14.42/14.42 [219]P10(x2191,f34(f43(x2192,a2)),f43(x2192,a2))
% 14.42/14.42 [220]P10(f29(f43(x2201,a2)),x2202,f43(x2201,a2))
% 14.42/14.42 [221]E(f4(x2211,f29(f43(x2212,a2)),f43(x2212,a2)),x2211)
% 14.42/14.42 [225]E(f4(x2251,f34(f43(x2252,a2)),f43(x2252,a2)),f29(f43(x2252,a2)))
% 14.42/14.42 [226]E(f4(f29(f43(x2261,a2)),x2262,f43(x2261,a2)),f29(f43(x2261,a2)))
% 14.42/14.42 [232]E(f4(f34(f43(x2321,a2)),x2322,f43(x2321,a2)),f27(x2322,f43(x2321,a2)))
% 14.42/14.42 [347]~P16(x3471,f29(f43(x3472,a2)),x3472)
% 14.42/14.42 [348]~P12(x3481,f29(f43(x3482,a2)),f43(x3482,a2))
% 14.42/14.42 [222]P34(f41(f34(f43(x2221,a2)),x2222))
% 14.42/14.42 [235]E(f41(f41(f31(f43(x2351,a2)),x2352),f29(f43(x2351,a2))),x2352)
% 14.42/14.42 [236]E(f41(f41(f32(f43(x2361,a2)),x2362),f34(f43(x2361,a2))),x2362)
% 14.42/14.42 [238]E(f41(f41(f31(f43(x2381,a2)),x2382),f34(f43(x2381,a2))),f34(f43(x2381,a2)))
% 14.42/14.42 [239]E(f41(f41(f32(f43(x2391,a2)),x2392),f29(f43(x2391,a2))),f29(f43(x2391,a2)))
% 14.42/14.42 [242]E(f41(f41(f31(f43(x2421,a2)),x2422),f27(x2422,f43(x2421,a2))),f34(f43(x2421,a2)))
% 14.42/14.42 [243]E(f41(f41(f32(f43(x2431,a2)),x2432),f27(x2432,f43(x2431,a2))),f29(f43(x2431,a2)))
% 14.42/14.42 [349]~P34(f41(f29(f43(x3491,a2)),x3492))
% 14.42/14.42 [223]E(f41(f41(f31(f43(x2231,a2)),x2232),x2232),x2232)
% 14.42/14.42 [224]E(f41(f41(f32(f43(x2241,a2)),x2242),x2242),x2242)
% 14.42/14.42 [245]E(f41(f41(f31(f43(x2451,a2)),f29(f43(x2451,a2))),x2452),x2452)
% 14.42/14.42 [246]E(f41(f41(f32(f43(x2461,a2)),f34(f43(x2461,a2))),x2462),x2462)
% 14.42/14.42 [249]E(f41(f41(f31(f43(x2491,a2)),f34(f43(x2491,a2))),x2492),f34(f43(x2491,a2)))
% 14.42/14.42 [250]E(f41(f41(f32(f43(x2501,a2)),f29(f43(x2501,a2))),x2502),f29(f43(x2501,a2)))
% 14.42/14.42 [259]E(f41(f41(f31(f43(x2591,a2)),f27(x2592,f43(x2591,a2))),x2592),f34(f43(x2591,a2)))
% 14.42/14.42 [260]E(f41(f41(f32(f43(x2601,a2)),f27(x2602,f43(x2601,a2))),x2602),f29(f43(x2601,a2)))
% 14.42/14.42 [230]P16(x2301,f37(x2301,x2302,x2303),x2303)
% 14.42/14.42 [234]P10(x2341,f37(x2342,x2341,x2343),f43(x2343,a2))
% 14.42/14.42 [237]E(f37(x2371,f37(x2371,x2372,x2373),x2373),f37(x2371,x2372,x2373))
% 14.42/14.42 [240]P10(f4(x2401,x2402,f43(x2403,a2)),x2401,f43(x2403,a2))
% 14.42/14.42 [244]P34(f41(f37(x2441,x2442,x2443),x2441))
% 14.42/14.42 [255]P13(x2551,f29(f43(x2552,a2)),x2552,x2553)
% 14.42/14.42 [257]E(f4(f4(x2571,x2572,f43(x2573,a2)),x2572,f43(x2573,a2)),f4(x2571,x2572,f43(x2573,a2)))
% 14.42/14.42 [258]E(f4(f4(x2581,x2582,a1),x2583,a1),f4(f4(x2581,x2583,a1),x2582,a1))
% 14.42/14.42 [268]E(f4(f4(f28(x2681),x2682,a1),f28(x2683),a1),f4(f4(x2681,x2682,a1),x2683,a1))
% 14.42/14.42 [343]~E(f37(x3431,x3432,x3433),f29(f43(x3433,a2)))
% 14.42/14.42 [344]~E(f29(f43(x3441,a2)),f37(x3442,x3443,x3441))
% 14.42/14.42 [253]E(f41(f41(f32(f43(x2531,a2)),x2532),f27(x2533,f43(x2531,a2))),f4(x2532,x2533,f43(x2531,a2)))
% 14.42/14.42 [262]E(f41(f41(f32(f43(x2621,a2)),x2622),f4(x2623,x2622,f43(x2621,a2))),f29(f43(x2621,a2)))
% 14.42/14.42 [264]E(f39(x2641,f29(f43(x2642,a2)),x2643,x2642),f29(f43(x2643,a2)))
% 14.42/14.42 [265]E(f39(x2651,f34(f43(x2652,a2)),x2653,x2652),f34(f43(x2653,a2)))
% 14.42/14.42 [266]E(f38(x2661,f29(f43(x2662,a2)),x2662,x2663),f29(f43(x2663,a2)))
% 14.42/14.42 [287]E(f41(f41(f32(f43(x2871,a2)),f27(x2872,f43(x2871,a2))),f27(x2873,f43(x2871,a2))),f27(f41(f41(f31(f43(x2871,a2)),x2872),x2873),f43(x2871,a2)))
% 14.42/14.42 [288]E(f41(f41(f31(f43(x2881,a2)),f27(x2882,f43(x2881,a2))),f27(x2883,f43(x2881,a2))),f27(f41(f41(f32(f43(x2881,a2)),x2882),x2883),f43(x2881,a2)))
% 14.42/14.42 [289]E(f37(x2891,f4(x2892,f37(x2891,f29(f43(x2893,a2)),x2893),f43(x2893,a2)),x2893),f37(x2891,x2892,x2893))
% 14.42/14.42 [247]E(f41(f19(x2471,x2472),f37(x2473,f29(f43(x2472,a2)),x2472)),x2473)
% 14.42/14.42 [251]E(f41(f41(f31(f43(x2511,a2)),x2512),x2513),f41(f41(f31(f43(x2511,a2)),x2513),x2512))
% 14.42/14.42 [252]E(f41(f41(f32(f43(x2521,a2)),x2522),x2523),f41(f41(f32(f43(x2521,a2)),x2523),x2522))
% 14.42/14.42 [254]E(f4(x2541,f27(x2542,f43(x2543,a2)),f43(x2543,a2)),f41(f41(f32(f43(x2543,a2)),x2541),x2542))
% 14.42/14.42 [269]P10(x2691,f41(f41(f31(f43(x2692,a2)),x2693),x2691),f43(x2692,a2))
% 14.42/14.42 [270]P10(x2701,f41(f41(f31(f43(x2702,a2)),x2701),x2703),f43(x2702,a2))
% 14.42/14.42 [271]P10(f41(f41(f32(f43(x2711,a2)),x2712),x2713),x2713,f43(x2711,a2))
% 14.42/14.42 [272]P10(f41(f41(f32(f43(x2721,a2)),x2722),x2723),x2722,f43(x2721,a2))
% 14.42/14.42 [274]E(f41(f41(f31(f43(x2741,a2)),x2742),f4(x2743,x2742,f43(x2741,a2))),f41(f41(f31(f43(x2741,a2)),x2742),x2743))
% 14.42/14.42 [275]E(f41(f41(f31(f43(x2751,a2)),f27(x2752,f43(x2751,a2))),x2753),f27(f4(x2752,x2753,f43(x2751,a2)),f43(x2751,a2)))
% 14.42/14.42 [282]E(f41(f41(f31(f43(x2821,a2)),f4(x2822,x2823,f43(x2821,a2))),x2823),f41(f41(f31(f43(x2821,a2)),x2822),x2823))
% 14.42/14.42 [279]E(f41(f41(f31(f43(x2791,a2)),x2792),f41(f41(f31(f43(x2791,a2)),x2792),x2793)),f41(f41(f31(f43(x2791,a2)),x2792),x2793))
% 14.42/14.42 [280]E(f41(f41(f32(f43(x2801,a2)),x2802),f41(f41(f32(f43(x2801,a2)),x2802),x2803)),f41(f41(f32(f43(x2801,a2)),x2802),x2803))
% 14.42/14.42 [283]E(f41(f41(f31(f43(x2831,a2)),f37(x2832,f29(f43(x2831,a2)),x2831)),x2833),f37(x2832,x2833,x2831))
% 14.42/14.42 [291]E(f41(f41(f31(f43(x2911,a2)),f4(x2912,x2913,f43(x2911,a2))),f41(f41(f32(f43(x2911,a2)),x2912),x2913)),x2912)
% 14.42/14.42 [218]E(f41(f7(x2181,x2182,x2183),x2184),x2181)
% 14.42/14.42 [261]E(f37(x2611,f37(x2612,x2613,x2614),x2614),f37(x2612,f37(x2611,x2613,x2614),x2614))
% 14.42/14.42 [284]E(f4(f4(x2841,x2842,f43(x2843,a2)),f37(x2844,f29(f43(x2843,a2)),x2843),f43(x2843,a2)),f4(x2841,f37(x2844,x2842,x2843),f43(x2843,a2)))
% 14.42/14.42 [293]E(f4(f4(x2931,f37(x2932,f29(f43(x2933,a2)),x2933),f43(x2933,a2)),x2934,f43(x2933,a2)),f4(x2931,f37(x2932,x2934,x2933),f43(x2933,a2)))
% 14.42/14.42 [302]E(f4(f41(f41(f32(f43(x3021,a2)),x3022),x3023),f41(f41(f32(f43(x3021,a2)),x3024),x3023),f43(x3021,a2)),f4(f41(f41(f32(f43(x3021,a2)),x3022),x3023),x3024,f43(x3021,a2)))
% 14.42/14.42 [309]E(f20(x3091,x3092,f41(x3091,x3092),x3093,x3094),x3091)
% 14.42/14.42 [314]P10(f38(x3141,f39(x3141,x3142,x3143,x3144),x3143,x3144),x3142,f43(x3144,a2))
% 14.42/14.42 [326]P14(x3261,x3262,f29(f43(x3263,a2)),x3262,x3263,x3264)
% 14.42/14.42 [327]P15(x3271,x3272,f29(f43(x3273,a2)),x3272,x3273,x3274)
% 14.42/14.42 [285]E(f4(f41(f41(f32(f43(x2851,a2)),x2852),x2853),x2854,f43(x2851,a2)),f41(f41(f32(f43(x2851,a2)),x2852),f4(x2853,x2854,f43(x2851,a2))))
% 14.42/14.42 [286]P16(f41(x2861,x2862),f38(x2861,f34(f43(x2863,a2)),x2863,x2864),x2864)
% 14.42/14.42 [294]E(f39(x2941,f27(x2942,f43(x2943,a2)),x2944,x2943),f27(f39(x2941,x2942,x2944,x2943),f43(x2944,a2)))
% 14.42/14.42 [298]E(f4(f41(f41(f32(f43(x2981,a2)),x2982),x2983),f41(f41(f32(f43(x2981,a2)),x2982),x2984),f43(x2981,a2)),f41(f41(f32(f43(x2981,a2)),x2982),f4(x2983,x2984,f43(x2981,a2))))
% 14.42/14.42 [299]E(f41(f41(f32(f43(x2991,a2)),f4(x2992,x2993,f43(x2991,a2))),f4(x2992,x2994,f43(x2991,a2))),f4(x2992,f41(f41(f31(f43(x2991,a2)),x2993),x2994),f43(x2991,a2)))
% 14.42/14.42 [300]E(f41(f41(f31(f43(x3001,a2)),f4(x3002,x3003,f43(x3001,a2))),f4(x3002,x3004,f43(x3001,a2))),f4(x3002,f41(f41(f32(f43(x3001,a2)),x3003),x3004),f43(x3001,a2)))
% 14.42/14.42 [301]E(f41(f41(f31(f43(x3011,a2)),f4(x3012,x3013,f43(x3011,a2))),f4(x3014,x3013,f43(x3011,a2))),f4(f41(f41(f31(f43(x3011,a2)),x3012),x3014),x3013,f43(x3011,a2)))
% 14.42/14.42 [303]P16(x3031,f39(x3032,f37(f41(x3032,x3031),f29(f43(x3033,a2)),x3033),x3034,x3033),x3034)
% 14.42/14.42 [304]E(f4(f41(f41(f32(f43(x3041,a2)),x3042),x3043),f41(f41(f32(f43(x3041,a2)),x3044),x3043),f43(x3041,a2)),f41(f41(f32(f43(x3041,a2)),f4(x3042,x3044,f43(x3041,a2))),x3043))
% 14.42/14.42 [313]E(f38(x3131,f39(x3131,x3132,x3133,x3134),x3133,x3134),f41(f41(f32(f43(x3134,a2)),x3132),f38(x3131,f34(f43(x3133,a2)),x3133,x3134)))
% 14.42/14.42 [281]E(f37(x2811,f41(f41(f31(f43(x2812,a2)),x2813),x2814),x2812),f41(f41(f31(f43(x2812,a2)),x2813),f37(x2811,x2814,x2812)))
% 14.42/14.42 [290]E(f37(x2901,f41(f41(f31(f43(x2902,a2)),x2903),x2904),x2902),f41(f41(f31(f43(x2902,a2)),f37(x2901,x2903,x2902)),x2904))
% 14.42/14.42 [292]E(f41(f41(f32(f43(x2921,a2)),f37(x2922,x2923,x2921)),f37(x2922,x2924,x2921)),f37(x2922,f41(f41(f32(f43(x2921,a2)),x2923),x2924),x2921))
% 14.42/14.42 [295]E(f41(f41(f31(f43(x2951,a2)),x2952),f41(f41(f31(f43(x2951,a2)),x2953),x2954)),f41(f41(f31(f43(x2951,a2)),x2953),f41(f41(f31(f43(x2951,a2)),x2952),x2954)))
% 14.42/14.42 [296]E(f41(f41(f32(f43(x2961,a2)),x2962),f41(f41(f32(f43(x2961,a2)),x2963),x2964)),f41(f41(f32(f43(x2961,a2)),x2963),f41(f41(f32(f43(x2961,a2)),x2962),x2964)))
% 14.42/14.42 [310]E(f41(f41(f32(f43(x3101,a2)),f41(f41(f31(f43(x3101,a2)),x3102),x3103)),f41(f41(f31(f43(x3101,a2)),x3102),x3104)),f41(f41(f31(f43(x3101,a2)),x3102),f41(f41(f32(f43(x3101,a2)),x3103),x3104)))
% 14.42/14.42 [311]E(f41(f41(f31(f43(x3111,a2)),f41(f41(f32(f43(x3111,a2)),x3112),x3113)),f41(f41(f32(f43(x3111,a2)),x3112),x3114)),f41(f41(f32(f43(x3111,a2)),x3112),f41(f41(f31(f43(x3111,a2)),x3113),x3114)))
% 14.42/14.42 [328]E(f41(f41(f32(f43(x3281,a2)),f41(f41(f32(f43(x3281,a2)),f41(f41(f31(f43(x3281,a2)),x3282),x3283)),f41(f41(f31(f43(x3281,a2)),x3283),x3284))),f41(f41(f31(f43(x3281,a2)),x3284),x3282)),f41(f41(f31(f43(x3281,a2)),f41(f41(f31(f43(x3281,a2)),f41(f41(f32(f43(x3281,a2)),x3282),x3283)),f41(f41(f32(f43(x3281,a2)),x3283),x3284))),f41(f41(f32(f43(x3281,a2)),x3284),x3282)))
% 14.42/14.42 [305]E(f41(f41(f31(f43(x3051,a2)),f41(f41(f31(f43(x3051,a2)),x3052),x3053)),x3054),f41(f41(f31(f43(x3051,a2)),x3052),f41(f41(f31(f43(x3051,a2)),x3053),x3054)))
% 14.42/14.42 [306]E(f41(f41(f32(f43(x3061,a2)),f41(f41(f32(f43(x3061,a2)),x3062),x3063)),x3064),f41(f41(f32(f43(x3061,a2)),x3062),f41(f41(f32(f43(x3061,a2)),x3063),x3064)))
% 14.42/14.42 [315]E(f41(f41(f32(f43(x3151,a2)),f41(f41(f31(f43(x3151,a2)),x3152),x3153)),f41(f41(f31(f43(x3151,a2)),x3154),x3153)),f41(f41(f31(f43(x3151,a2)),f41(f41(f32(f43(x3151,a2)),x3152),x3154)),x3153))
% 14.42/14.42 [316]E(f41(f41(f31(f43(x3161,a2)),f41(f41(f32(f43(x3161,a2)),x3162),x3163)),f41(f41(f32(f43(x3161,a2)),x3164),x3163)),f41(f41(f32(f43(x3161,a2)),f41(f41(f31(f43(x3161,a2)),x3162),x3164)),x3163))
% 14.42/14.42 [297]E(f38(x2971,f37(x2972,x2973,x2974),x2974,x2975),f37(f41(x2971,x2972),f38(x2971,x2973,x2974,x2975),x2975))
% 14.42/14.42 [321]E(f41(f20(x3211,x3212,x3213,x3214,x3215),x3212),x3213)
% 14.42/14.42 [322]E(f41(f41(f31(f43(x3221,a2)),f39(x3222,f37(x3223,f29(f43(x3224,a2)),x3224),x3221,x3224)),f39(x3222,x3225,x3221,x3224)),f39(x3222,f37(x3223,x3225,x3224),x3221,x3224))
% 14.42/14.42 [312]E(f4(f39(x3121,x3122,x3123,x3124),f39(x3121,x3125,x3123,x3124),f43(x3123,a2)),f39(x3121,f4(x3122,x3125,f43(x3124,a2)),x3123,x3124))
% 14.42/14.42 [323]P10(f4(f38(x3231,x3232,x3233,x3234),f38(x3231,x3235,x3233,x3234),f43(x3234,a2)),f38(x3231,f4(x3232,x3235,f43(x3233,a2)),x3233,x3234),f43(x3234,a2))
% 14.42/14.42 [317]E(f41(f41(f31(f43(x3171,a2)),f39(x3172,x3173,x3171,x3174)),f39(x3172,x3175,x3171,x3174)),f39(x3172,f41(f41(f31(f43(x3174,a2)),x3173),x3175),x3171,x3174))
% 14.42/14.42 [318]E(f41(f41(f32(f43(x3181,a2)),f39(x3182,x3183,x3181,x3184)),f39(x3182,x3185,x3181,x3184)),f39(x3182,f41(f41(f32(f43(x3184,a2)),x3183),x3185),x3181,x3184))
% 14.42/14.42 [319]E(f41(f41(f31(f43(x3191,a2)),f38(x3192,x3193,x3194,x3191)),f38(x3192,x3195,x3194,x3191)),f38(x3192,f41(f41(f31(f43(x3194,a2)),x3193),x3195),x3194,x3191))
% 14.42/14.42 [324]P10(f38(x3241,f41(f41(f32(f43(x3242,a2)),x3243),x3244),x3242,x3245),f41(f41(f32(f43(x3245,a2)),f38(x3241,x3243,x3242,x3245)),f38(x3241,x3244,x3242,x3245)),f43(x3245,a2))
% 14.42/14.42 [325]E(f20(f20(x3251,x3252,x3253,x3254,x3255),x3252,x3256,x3254,x3255),f20(x3251,x3252,x3256,x3254,x3255))
% 14.42/14.42 [387]E(x3871,f26(a1))+P12(f26(a1),x3871,a1)
% 14.42/14.42 [415]E(x4151,f26(a1))+~P10(x4151,f26(a1),a1)
% 14.42/14.42 [359]~P20(x3591)+E(f19(f36(x3591),x3591),f21(x3591))
% 14.42/14.42 [360]~P20(x3601)+E(f19(f35(x3601),x3601),f22(x3601))
% 14.42/14.42 [361]~P24(x3611)+E(f27(f26(x3611),x3611),f26(x3611))
% 14.42/14.42 [362]~P25(x3621)+E(f27(f26(x3621),x3621),f26(x3621))
% 14.42/14.42 [363]~P6(x3631)+E(f27(f29(x3631),x3631),f34(x3631))
% 14.42/14.42 [364]~P6(x3641)+E(f27(f34(x3641),x3641),f29(x3641))
% 14.42/14.42 [427]E(x4271,f26(a1))+~P12(x4271,f28(f26(a1)),a1)
% 14.42/14.42 [515]~P16(x5151,a45,a3)+P33(f33(f41(a6,x5151),a40))
% 14.42/14.42 [692]~P9(f34(f43(x6921,a2)),x6921)+P12(f26(a1),f5(f34(f43(x6921,a2)),x6921),a1)
% 14.42/14.42 [612]~P12(f26(a1),x6121,a1)+E(f28(f4(x6121,f28(f26(a1)),a1)),x6121)
% 14.42/14.42 [354]~P8(x3542)+P9(x3541,x3542)
% 14.42/14.42 [392]~P18(x3922)+P10(x3921,x3921,x3922)
% 14.42/14.42 [393]~P19(x3932)+P10(x3931,x3931,x3932)
% 14.42/14.42 [416]~P12(x4162,x4162,x4161)+~P18(x4161)
% 14.42/14.42 [417]~P12(x4172,x4172,x4171)+~P19(x4171)
% 14.42/14.42 [418]~P12(x4182,x4182,x4181)+~P20(x4181)
% 14.42/14.42 [426]P10(x4262,x4261,a1)+P10(x4261,x4262,a1)
% 14.42/14.42 [458]~P12(x4581,x4582,a1)+P10(x4581,x4582,a1)
% 14.42/14.42 [353]E(x3531,x3532)+~E(f28(x3531),f28(x3532))
% 14.42/14.42 [357]P9(x3571,x3572)+E(f5(x3571,x3572),f26(a1))
% 14.42/14.42 [366]~P3(x3662)+P1(f43(x3661,x3662))
% 14.42/14.42 [367]~P18(x3672)+P18(f43(x3671,x3672))
% 14.42/14.42 [368]~P19(x3682)+P19(f43(x3681,x3682))
% 14.42/14.42 [369]~P3(x3692)+P2(f43(x3691,x3692))
% 14.42/14.42 [370]~P3(x3702)+P3(f43(x3701,x3702))
% 14.42/14.42 [371]~P4(x3712)+P4(f43(x3711,x3712))
% 14.42/14.42 [372]~P5(x3722)+P5(f43(x3721,x3722))
% 14.42/14.42 [373]~P6(x3732)+P6(f43(x3731,x3732))
% 14.42/14.42 [374]~P7(x3742)+P7(f43(x3741,x3742))
% 14.42/14.42 [375]~P30(x3752)+P30(f43(x3751,x3752))
% 14.42/14.42 [376]~P23(x3762)+P23(f43(x3761,x3762))
% 14.42/14.42 [395]~P24(x3952)+E(f4(x3951,x3951,x3952),f26(x3952))
% 14.42/14.42 [396]~P22(x3962)+E(f4(x3961,x3961,x3962),f26(x3962))
% 14.42/14.42 [399]~P30(x3992)+P10(x3991,f34(x3992),x3992)
% 14.42/14.42 [400]~P23(x4001)+P10(f29(x4001),x4002,x4001)
% 14.42/14.42 [437]P12(x4371,x4372,a1)+P12(x4372,f28(x4371),a1)
% 14.42/14.42 [439]P10(x4391,x4392,a1)+P10(f28(x4392),x4391,a1)
% 14.42/14.42 [459]~P10(x4591,x4592,a1)+E(f4(x4591,x4592,a1),f26(a1))
% 14.42/14.42 [464]P10(x4641,x4642,a1)+~E(f4(x4641,x4642,a1),f26(a1))
% 14.42/14.42 [468]~P12(x4681,x4682,a1)+P12(x4681,f28(x4682),a1)
% 14.42/14.42 [469]~P10(x4691,x4692,a1)+P12(x4691,f28(x4692),a1)
% 14.42/14.42 [471]~P10(x4711,x4712,a1)+P10(x4711,f28(x4712),a1)
% 14.42/14.42 [473]~P12(x4731,x4732,a1)+P10(f28(x4731),x4732,a1)
% 14.42/14.42 [474]P9(x4741,x4742)+~P12(f26(a1),f5(x4741,x4742),a1)
% 14.42/14.42 [480]P10(x4801,x4802,a1)+~P12(x4801,f28(x4802),a1)
% 14.42/14.42 [481]P12(x4811,x4812,a1)+~P12(f28(x4811),x4812,a1)
% 14.42/14.42 [483]P12(x4831,x4832,a1)+~P10(f28(x4831),x4832,a1)
% 14.42/14.42 [484]P10(x4841,x4842,a1)+~P10(f28(x4841),x4842,a1)
% 14.42/14.42 [500]~P12(x5001,x5002,a1)+P12(f28(x5001),f28(x5002),a1)
% 14.42/14.42 [501]~P10(x5011,x5012,a1)+P10(f28(x5011),f28(x5012),a1)
% 14.42/14.42 [517]P12(x5171,x5172,a1)+~P12(f28(x5171),f28(x5172),a1)
% 14.42/14.42 [518]P10(x5181,x5182,a1)+~P10(f28(x5181),f28(x5182),a1)
% 14.42/14.42 [539]~P12(x5391,x5392,a1)+~P12(x5392,f28(x5391),a1)
% 14.42/14.42 [540]~P10(x5401,x5402,a1)+~P10(f28(x5402),x5401,a1)
% 14.42/14.42 [633]~P12(x6332,x6331,a1)+P12(f26(a1),f4(x6331,x6332,a1),a1)
% 14.42/14.42 [700]P12(x7001,x7002,a1)+~P12(f26(a1),f4(x7002,x7001,a1),a1)
% 14.42/14.42 [383]~P24(x3832)+E(f27(f27(x3831,x3832),x3832),x3831)
% 14.42/14.42 [384]~P6(x3842)+E(f27(f27(x3841,x3842),x3842),x3841)
% 14.42/14.42 [397]~P5(x3971)+E(f41(f41(f31(x3971),x3972),f29(x3971)),x3972)
% 14.42/14.42 [398]~P5(x3981)+E(f41(f41(f32(x3981),x3982),f34(x3981)),x3982)
% 14.42/14.42 [401]~P24(x4012)+E(f4(x4011,f26(x4012),x4012),x4011)
% 14.42/14.42 [402]~P5(x4021)+E(f41(f41(f31(x4021),x4022),f34(x4021)),f34(x4021))
% 14.42/14.42 [403]~P5(x4031)+E(f41(f41(f32(x4031),x4032),f29(x4031)),f29(x4031))
% 14.42/14.42 [411]~P24(x4111)+E(f4(f26(x4111),x4112,x4111),f27(x4112,x4111))
% 14.42/14.42 [413]~P6(x4131)+E(f41(f41(f31(x4131),x4132),f27(x4132,x4131)),f34(x4131))
% 14.42/14.42 [414]~P6(x4141)+E(f41(f41(f32(x4141),x4142),f27(x4142,x4141)),f29(x4141))
% 14.42/14.42 [448]E(f8(x4481,f26(a1),x4482),f29(f43(x4482,a2)))+~E(f5(x4481,x4482),f28(f26(a1)))
% 14.42/14.42 [449]E(f9(x4491,f26(a1),x4492),f29(f43(x4492,a2)))+~E(f5(x4491,x4492),f28(f26(a1)))
% 14.42/14.42 [569]~P10(x5692,x5691,f43(a42,a2))+P34(f41(f41(a47,x5691),x5692))
% 14.42/14.42 [619]~P10(x6191,f29(f43(x6192,a2)),f43(x6192,a2))+E(x6191,f29(f43(x6192,a2)))
% 14.42/14.42 [632]~P10(x6322,x6321,a1)+E(f4(x6321,f4(x6321,x6322,a1),a1),x6322)
% 14.42/14.42 [665]~P10(x6652,x6651,a1)+E(f28(f4(x6651,x6652,a1)),f4(f28(x6651),x6652,a1))
% 14.42/14.42 [670]~P12(f26(a1),x6701,a1)+P12(f4(x6701,f28(x6702),a1),x6701,a1)
% 14.42/14.42 [675]~P10(x6751,f27(x6751,f43(x6752,a2)),f43(x6752,a2))+E(x6751,f29(f43(x6752,a2)))
% 14.42/14.42 [388]~P1(x3881)+E(f41(f41(f31(x3881),x3882),x3882),x3882)
% 14.42/14.42 [389]~P20(x3891)+E(f41(f41(f35(x3891),x3892),x3892),x3892)
% 14.42/14.42 [390]~P2(x3901)+E(f41(f41(f32(x3901),x3902),x3902),x3902)
% 14.42/14.42 [391]~P20(x3911)+E(f41(f41(f36(x3911),x3912),x3912),x3912)
% 14.42/14.42 [404]~P5(x4041)+E(f41(f41(f31(x4041),f29(x4041)),x4042),x4042)
% 14.42/14.42 [405]~P5(x4051)+E(f41(f41(f32(x4051),f34(x4051)),x4052),x4052)
% 14.42/14.42 [408]~P5(x4081)+E(f41(f41(f31(x4081),f34(x4081)),x4082),f34(x4081))
% 14.42/14.42 [409]~P5(x4091)+E(f41(f41(f32(x4091),f29(x4091)),x4092),f29(x4091))
% 14.42/14.42 [440]~P6(x4401)+E(f41(f41(f31(x4401),f27(x4402,x4401)),x4402),f34(x4401))
% 14.42/14.42 [441]~P6(x4411)+E(f41(f41(f32(x4411),f27(x4412,x4411)),x4412),f29(x4411))
% 14.42/14.42 [628]~P20(x6281)+E(f41(f21(x6281),f37(x6282,f29(f43(x6281,a2)),x6281)),x6282)
% 14.42/14.42 [629]~P20(x6291)+E(f41(f22(x6291),f37(x6292,f29(f43(x6291,a2)),x6291)),x6292)
% 14.42/14.42 [828]P16(x8281,f29(f43(x8282,a2)),x8282)+E(f5(f37(x8281,f29(f43(x8282,a2)),x8282),x8282),f28(f5(f29(f43(x8282,a2)),x8282)))
% 14.42/14.42 [994]P34(f41(f41(a47,x9941),f37(f41(a48,x9942),f29(f43(a42,a2)),a42)))+~P34(f41(f41(a47,f37(f41(a48,x9942),x9941,a42)),f37(f49(f33(f41(a6,x9942),a40)),f29(f43(a42,a2)),a42)))
% 14.42/14.42 [412]E(x4121,x4122)+~P11(x4121,x4122,x4123)
% 14.42/14.42 [425]P16(x4251,x4252,x4253)+~P34(f41(x4252,x4251))
% 14.42/14.42 [442]~P16(x4422,x4421,x4423)+P34(f41(x4421,x4422))
% 14.42/14.42 [465]~P16(x4651,x4652,x4653)+E(f37(x4651,x4652,x4653),x4652)
% 14.42/14.42 [475]~P9(x4752,x4753)+P9(f37(x4751,x4752,x4753),x4753)
% 14.42/14.42 [577]~P12(x5771,x5772,f43(x5773,a2))+P10(x5771,x5772,f43(x5773,a2))
% 14.42/14.42 [590]P9(x5901,x5902)+~P9(f37(x5903,x5901,x5902),x5902)
% 14.42/14.42 [630]~P12(x6301,x6303,a1)+P12(f4(x6301,x6302,a1),x6303,a1)
% 14.42/14.42 [768]~P10(x7681,x7683,a1)+P10(f4(x7681,x7682,a1),f4(x7683,x7682,a1),a1)
% 14.42/14.42 [769]~P10(x7693,x7692,a1)+P10(f4(x7691,x7692,a1),f4(x7691,x7693,a1),a1)
% 14.42/14.42 [450]E(x4501,x4502)+~E(f27(x4501,f43(x4503,a2)),f27(x4502,f43(x4503,a2)))
% 14.42/14.42 [463]~P6(x4631)+E(f41(f41(f32(x4631),x4632),f27(x4633,x4631)),f4(x4632,x4633,x4631))
% 14.42/14.42 [510]~E(f5(x5101,x5103),f28(x5102))+E(f5(f8(x5101,x5102,x5103),x5103),x5102)
% 14.42/14.42 [511]~E(f5(x5111,x5113),f28(x5112))+E(f5(f9(x5111,x5112,x5113),x5113),x5112)
% 14.42/14.42 [552]P16(x5521,x5522,x5523)+P16(x5521,f27(x5522,f43(x5523,a2)),x5523)
% 14.42/14.42 [556]~P22(x5563)+E(f27(f4(x5561,x5562,x5563),x5563),f4(x5562,x5561,x5563))
% 14.42/14.42 [563]~P9(x5631,x5633)+P9(f4(x5631,x5632,f43(x5633,a2)),x5633)
% 14.42/14.42 [691]~P16(x6911,x6912,x6913)+~P16(x6911,f27(x6912,f43(x6913,a2)),x6913)
% 14.42/14.42 [765]~P9(x7651,x7652)+P10(f5(x7651,x7652),f5(f37(x7653,x7651,x7652),x7652),a1)
% 14.42/14.42 [767]~P10(x7673,x7671,f43(x7672,a2))+P10(f27(x7671,f43(x7672,a2)),f27(x7673,f43(x7672,a2)),f43(x7672,a2))
% 14.42/14.42 [812]P10(x8121,x8122,f43(x8123,a2))+~P10(f27(x8122,f43(x8123,a2)),f27(x8121,f43(x8123,a2)),f43(x8123,a2))
% 14.42/14.42 [824]P16(x8241,x8242,x8243)+E(f4(f37(x8241,x8242,x8243),f37(x8241,f29(f43(x8243,a2)),x8243),f43(x8243,a2)),x8242)
% 14.42/14.42 [431]~P1(x4311)+E(f41(f41(f31(x4311),x4312),x4313),f41(f41(f31(x4311),x4313),x4312))
% 14.42/14.42 [432]~P3(x4321)+E(f41(f41(f31(x4321),x4322),x4323),f41(f41(f31(x4321),x4323),x4322))
% 14.42/14.42 [433]~P20(x4331)+E(f41(f41(f35(x4331),x4332),x4333),f41(f41(f35(x4331),x4333),x4332))
% 14.42/14.42 [434]~P2(x4341)+E(f41(f41(f32(x4341),x4342),x4343),f41(f41(f32(x4341),x4343),x4342))
% 14.42/14.42 [435]~P3(x4351)+E(f41(f41(f32(x4351),x4352),x4353),f41(f41(f32(x4351),x4353),x4352))
% 14.42/14.42 [436]~P20(x4361)+E(f41(f41(f36(x4361),x4362),x4363),f41(f41(f36(x4361),x4363),x4362))
% 14.42/14.42 [525]~P1(x5252)+P10(x5251,f41(f41(f31(x5252),x5253),x5251),x5252)
% 14.42/14.42 [526]~P3(x5262)+P10(x5261,f41(f41(f31(x5262),x5263),x5261),x5262)
% 14.42/14.42 [527]~P1(x5272)+P10(x5271,f41(f41(f31(x5272),x5271),x5273),x5272)
% 14.42/14.42 [528]~P3(x5282)+P10(x5281,f41(f41(f31(x5282),x5281),x5283),x5282)
% 14.42/14.42 [529]~P20(x5292)+P10(x5291,f41(f41(f36(x5292),x5293),x5291),x5292)
% 14.42/14.42 [530]~P20(x5302)+P10(x5301,f41(f41(f36(x5302),x5301),x5303),x5302)
% 14.42/14.42 [531]~P20(x5311)+P10(f41(f41(f35(x5311),x5312),x5313),x5313,x5311)
% 14.42/14.42 [532]~P20(x5321)+P10(f41(f41(f35(x5321),x5322),x5323),x5322,x5321)
% 14.42/14.42 [533]~P2(x5331)+P10(f41(f41(f32(x5331),x5332),x5333),x5333,x5331)
% 14.42/14.42 [534]~P3(x5341)+P10(f41(f41(f32(x5341),x5342),x5343),x5343,x5341)
% 14.42/14.42 [535]~P2(x5351)+P10(f41(f41(f32(x5351),x5352),x5353),x5352,x5351)
% 14.42/14.42 [536]~P3(x5361)+P10(f41(f41(f32(x5361),x5362),x5363),x5362,x5361)
% 14.42/14.42 [723]~P21(x7233)+E(f23(x7231,f29(f43(x7232,a2)),x7232,x7233),f26(x7233))
% 14.42/14.42 [746]~P26(x7461)+E(f27(f41(f41(f32(x7461),f27(x7462,x7461)),f27(x7463,x7461)),x7461),f41(f41(f31(x7461),x7462),x7463))
% 14.42/14.42 [747]~P26(x7471)+E(f27(f41(f41(f31(x7471),f27(x7472,x7471)),f27(x7473,x7471)),x7471),f41(f41(f32(x7471),x7472),x7473))
% 14.42/14.42 [749]E(x7491,x7492)+~E(f37(x7491,f29(f43(x7493,a2)),x7493),f37(x7492,f29(f43(x7493,a2)),x7493))
% 14.42/14.42 [784]~P21(x7841)+E(f23(f7(f26(x7841),x7841,x7842),x7843,x7842,x7841),f26(x7841))
% 14.42/14.42 [808]E(x8081,x8082)+~P16(x8081,f37(x8082,f29(f43(x8083,a2)),x8083),x8083)
% 14.42/14.42 [809]~P10(x8092,x8093,f43(x8091,a2))+E(f41(f41(f31(f43(x8091,a2)),x8092),f4(x8093,x8092,f43(x8091,a2))),x8093)
% 14.42/14.42 [894]~P16(x8941,x8942,x8943)+E(f37(x8941,f4(x8942,f37(x8941,f29(f43(x8943,a2)),x8943),f43(x8943,a2)),x8943),x8942)
% 14.42/14.42 [947]~P9(x9471,x9473)+P10(f5(f4(x9471,f37(x9472,f29(f43(x9473,a2)),x9473),f43(x9473,a2)),x9473),f5(x9471,x9473),a1)
% 14.42/14.42 [521]~P3(x5211)+E(f41(f41(f31(x5211),x5212),f41(f41(f32(x5211),x5212),x5213)),x5212)
% 14.42/14.42 [522]~P20(x5221)+E(f41(f41(f35(x5221),x5222),f41(f41(f36(x5221),x5222),x5223)),x5222)
% 14.42/14.42 [523]~P3(x5231)+E(f41(f41(f32(x5231),x5232),f41(f41(f31(x5231),x5232),x5233)),x5232)
% 14.42/14.42 [524]~P20(x5241)+E(f41(f41(f36(x5241),x5242),f41(f41(f35(x5241),x5242),x5243)),x5242)
% 14.42/14.42 [595]~P1(x5951)+E(f41(f41(f31(x5951),x5952),f41(f41(f31(x5951),x5952),x5953)),f41(f41(f31(x5951),x5952),x5953))
% 14.42/14.42 [596]~P3(x5961)+E(f41(f41(f31(x5961),x5962),f41(f41(f31(x5961),x5962),x5963)),f41(f41(f31(x5961),x5962),x5963))
% 14.42/14.42 [597]~P20(x5971)+E(f41(f41(f35(x5971),x5972),f41(f41(f35(x5971),x5972),x5973)),f41(f41(f35(x5971),x5972),x5973))
% 14.42/14.42 [598]~P2(x5981)+E(f41(f41(f32(x5981),x5982),f41(f41(f32(x5981),x5982),x5983)),f41(f41(f32(x5981),x5982),x5983))
% 14.42/14.42 [599]~P3(x5991)+E(f41(f41(f32(x5991),x5992),f41(f41(f32(x5991),x5992),x5993)),f41(f41(f32(x5991),x5992),x5993))
% 14.42/14.42 [600]~P20(x6001)+E(f41(f41(f36(x6001),x6002),f41(f41(f36(x6001),x6002),x6003)),f41(f41(f36(x6001),x6002),x6003))
% 14.42/14.42 [666]~P26(x6661)+E(f41(f41(f32(x6661),f27(x6662,x6661)),f27(x6663,x6661)),f27(f41(f41(f31(x6661),x6662),x6663),x6661))
% 14.42/14.42 [667]~P6(x6671)+E(f41(f41(f32(x6671),f27(x6672,x6671)),f27(x6673,x6671)),f27(f41(f41(f31(x6671),x6672),x6673),x6671))
% 14.42/14.42 [668]~P26(x6681)+E(f41(f41(f31(x6681),f27(x6682,x6681)),f27(x6683,x6681)),f27(f41(f41(f32(x6681),x6682),x6683),x6681))
% 14.42/14.42 [669]~P6(x6691)+E(f41(f41(f31(x6691),f27(x6692,x6691)),f27(x6693,x6691)),f27(f41(f41(f32(x6691),x6692),x6693),x6691))
% 14.42/14.42 [681]~P10(x6812,x6813,f43(x6811,a2))+E(f41(f41(f31(f43(x6811,a2)),x6812),x6813),x6813)
% 14.42/14.42 [682]~P10(x6823,x6822,f43(x6821,a2))+E(f41(f41(f31(f43(x6821,a2)),x6822),x6823),x6822)
% 14.42/14.42 [683]~P10(x6833,x6832,f43(x6831,a2))+E(f41(f41(f32(f43(x6831,a2)),x6832),x6833),x6833)
% 14.42/14.42 [684]~P10(x6842,x6843,f43(x6841,a2))+E(f41(f41(f32(f43(x6841,a2)),x6842),x6843),x6842)
% 14.42/14.42 [695]E(x6951,f29(f43(x6952,a2)))+~E(f41(f41(f31(f43(x6952,a2)),x6953),x6951),f29(f43(x6952,a2)))
% 14.42/14.42 [696]E(x6961,f29(f43(x6962,a2)))+~E(f41(f41(f31(f43(x6962,a2)),x6961),x6963),f29(f43(x6962,a2)))
% 14.42/14.42 [701]P10(x7011,x7012,f43(x7013,a2))+~E(f41(f41(f31(f43(x7013,a2)),x7011),x7012),x7012)
% 14.42/14.42 [742]~P9(x7423,x7421)+P9(f41(f41(f32(f43(x7421,a2)),x7422),x7423),x7421)
% 14.42/14.42 [743]~P9(x7432,x7431)+P9(f41(f41(f32(f43(x7431,a2)),x7432),x7433),x7431)
% 14.42/14.42 [773]E(f4(x7731,x7732,f43(x7733,a2)),x7731)+~E(f41(f41(f32(f43(x7733,a2)),x7731),x7732),f29(f43(x7733,a2)))
% 14.42/14.42 [795]~P10(x7952,f27(x7953,f43(x7951,a2)),f43(x7951,a2))+E(f41(f41(f32(f43(x7951,a2)),x7952),x7953),f29(f43(x7951,a2)))
% 14.42/14.42 [801]P10(x8011,f27(x8012,f43(x8013,a2)),f43(x8013,a2))+~E(f41(f41(f32(f43(x8013,a2)),x8011),x8012),f29(f43(x8013,a2)))
% 14.42/14.42 [834]P9(x8341,x8342)+~P9(f41(f41(f31(f43(x8342,a2)),x8343),x8341),x8342)
% 14.42/14.42 [835]P9(x8351,x8352)+~P9(f41(f41(f31(f43(x8352,a2)),x8351),x8353),x8352)
% 14.42/14.42 [952]~P9(x9521,x9523)+E(f28(f5(f4(x9521,f37(x9522,f29(f43(x9523,a2)),x9523),f43(x9523,a2)),x9523)),f5(f37(x9522,x9521,x9523),x9523))
% 14.42/14.42 [951]~P9(f41(f41(f32(f43(x9512,a2)),x9511),x9513),x9512)+E(f4(f5(x9511,x9512),f5(f41(f41(f32(f43(x9512,a2)),x9511),x9513),x9512),a1),f5(f4(x9511,x9513,f43(x9512,a2)),x9512))
% 14.42/14.42 [638]~P16(x6381,x6383,x6384)+P16(x6381,f37(x6382,x6383,x6384),x6384)
% 14.42/14.42 [702]~P10(x7021,x7023,f43(x7024,a2))+P10(x7021,f37(x7022,x7023,x7024),f43(x7024,a2))
% 14.42/14.42 [770]P16(x7701,x7702,x7703)+~P10(f37(x7701,x7704,x7703),x7702,f43(x7703,a2))
% 14.42/14.42 [783]~P10(f37(x7834,x7831,x7833),x7832,f43(x7833,a2))+P10(x7831,x7832,f43(x7833,a2))
% 14.42/14.42 [797]~P10(x7972,x7974,f43(x7973,a2))+P10(f37(x7971,x7972,x7973),f37(x7971,x7974,x7973),f43(x7973,a2))
% 14.42/14.42 [849]~P9(x8492,x8493)+P9(f38(x8491,x8492,x8493,x8494),x8494)
% 14.42/14.42 [969]~P13(x9692,x9691,x9693,x9694)+P13(f25(x9691,x9692,x9693,x9694),f38(x9692,x9691,x9693,x9694),x9694,x9693)
% 14.42/14.42 [693]~P34(f41(x6932,x6934))+P34(f41(f37(x6931,x6932,x6933),x6934))
% 14.42/14.42 [774]~P16(x7741,x7744,x7743)+E(f4(f37(x7741,x7742,x7743),x7744,f43(x7743,a2)),f4(x7742,x7744,f43(x7743,a2)))
% 14.42/14.42 [785]P16(x7851,x7852,x7853)+~P16(x7851,f4(x7852,x7854,f43(x7853,a2)),x7853)
% 14.42/14.42 [796]~P16(x7961,x7962,x7963)+~P16(x7961,f4(x7964,x7962,f43(x7963,a2)),x7963)
% 14.42/14.42 [817]P16(x8171,x8174,x8172)+E(f39(f7(x8171,x8172,x8173),x8174,x8173,x8172),f29(f43(x8173,a2)))
% 14.42/14.42 [827]~E(f38(x8273,x8271,x8272,x8274),f29(f43(x8274,a2)))+E(x8271,f29(f43(x8272,a2)))
% 14.42/14.42 [829]~P16(x8291,x8294,x8292)+E(f39(f7(x8291,x8292,x8293),x8294,x8293,x8292),f34(f43(x8293,a2)))
% 14.42/14.42 [876]~P9(f4(x8761,x8763,f43(x8764,a2)),x8764)+P9(f4(x8761,f37(x8762,x8763,x8764),f43(x8764,a2)),x8764)
% 14.42/14.42 [897]~P9(f4(x8971,f37(x8974,x8972,x8973),f43(x8973,a2)),x8973)+P9(f4(x8971,x8972,f43(x8973,a2)),x8973)
% 14.42/14.42 [910]~P13(x9101,x9102,x9103,x9104)+E(f5(f38(x9101,x9102,x9103,x9104),x9104),f5(x9102,x9103))
% 14.42/14.42 [932]~P13(x9322,f34(f43(x9321,a2)),x9321,x9323)+E(f41(f25(f34(f43(x9321,a2)),x9322,x9321,x9323),f41(x9322,x9324)),x9324)
% 14.42/14.42 [933]~P9(x9332,x9333)+P10(f5(f38(x9331,x9332,x9333,x9334),x9334),f5(x9332,x9333),a1)
% 14.42/14.42 [944]~P13(x9441,f34(f43(x9443,a2)),x9443,x9444)+E(f39(x9441,f38(x9441,x9442,x9443,x9444),x9443,x9444),x9442)
% 14.42/14.42 [970]~P13(x9702,x9701,x9703,x9704)+E(f38(f25(x9701,x9702,x9703,x9704),f38(x9702,x9701,x9703,x9704),x9704,x9703),x9701)
% 14.42/14.42 [820]P16(x8201,x8203,x8204)+E(f37(x8201,f4(x8202,x8203,f43(x8204,a2)),x8204),f4(f37(x8201,x8202,x8204),x8203,f43(x8204,a2)))
% 14.42/14.42 [836]E(x8361,f29(f43(x8362,a2)))+E(f38(f7(x8363,x8364,x8362),x8361,x8362,x8364),f37(x8363,f29(f43(x8364,a2)),x8364))
% 14.42/14.42 [934]P16(x9343,x9342,x9344)+E(f23(x9341,f4(x9342,f37(x9343,f29(f43(x9344,a2)),x9344),f43(x9344,a2)),x9344,a1),f23(x9341,x9342,x9344,a1))
% 14.42/14.42 [961]~P16(x9613,x9612,x9614)+E(f23(x9611,f4(x9612,f37(x9613,f29(f43(x9614,a2)),x9614),f43(x9614,a2)),x9614,a1),f4(f23(x9611,x9612,x9614,a1),f41(x9611,x9613),a1))
% 14.42/14.42 [983]~P13(x9831,f34(f43(x9833,a2)),x9833,x9834)+P10(f38(x9831,f27(x9832,f43(x9833,a2)),x9833,x9834),f27(f38(x9831,x9832,x9833,x9834),f43(x9834,a2)),f43(x9834,a2))
% 14.42/14.42 [728]~P1(x7281)+E(f41(f41(f31(x7281),x7282),f41(f41(f31(x7281),x7283),x7284)),f41(f41(f31(x7281),x7283),f41(f41(f31(x7281),x7282),x7284)))
% 14.42/14.42 [729]~P3(x7291)+E(f41(f41(f31(x7291),x7292),f41(f41(f31(x7291),x7293),x7294)),f41(f41(f31(x7291),x7293),f41(f41(f31(x7291),x7292),x7294)))
% 14.42/14.42 [730]~P20(x7301)+E(f41(f41(f35(x7301),x7302),f41(f41(f35(x7301),x7303),x7304)),f41(f41(f35(x7301),x7303),f41(f41(f35(x7301),x7302),x7304)))
% 14.42/14.42 [731]~P2(x7311)+E(f41(f41(f32(x7311),x7312),f41(f41(f32(x7311),x7313),x7314)),f41(f41(f32(x7311),x7313),f41(f41(f32(x7311),x7312),x7314)))
% 14.42/14.42 [732]~P3(x7321)+E(f41(f41(f32(x7321),x7322),f41(f41(f32(x7321),x7323),x7324)),f41(f41(f32(x7321),x7323),f41(f41(f32(x7321),x7322),x7324)))
% 14.42/14.42 [733]~P20(x7331)+E(f41(f41(f36(x7331),x7332),f41(f41(f36(x7331),x7333),x7334)),f41(f41(f36(x7331),x7333),f41(f41(f36(x7331),x7332),x7334)))
% 14.42/14.42 [813]~P16(x8131,x8134,x8132)+P16(x8131,f41(f41(f31(f43(x8132,a2)),x8133),x8134),x8132)
% 14.42/14.42 [814]~P16(x8141,x8143,x8142)+P16(x8141,f41(f41(f31(f43(x8142,a2)),x8143),x8144),x8142)
% 14.42/14.42 [823]P16(x8233,x8232,x8231)+E(f41(f41(f32(f43(x8231,a2)),x8232),f37(x8233,x8234,x8231)),f41(f41(f32(f43(x8231,a2)),x8232),x8234))
% 14.42/14.42 [845]~P4(x8451)+E(f41(f41(f32(x8451),f41(f41(f31(x8451),x8452),x8453)),f41(f41(f31(x8451),x8452),x8454)),f41(f41(f31(x8451),x8452),f41(f41(f32(x8451),x8453),x8454)))
% 14.42/14.42 [846]~P20(x8461)+E(f41(f41(f36(x8461),f41(f41(f35(x8461),x8462),x8463)),f41(f41(f35(x8461),x8462),x8464)),f41(f41(f35(x8461),x8462),f41(f41(f36(x8461),x8463),x8464)))
% 14.42/14.42 [847]~P4(x8471)+E(f41(f41(f31(x8471),f41(f41(f32(x8471),x8472),x8473)),f41(f41(f32(x8471),x8472),x8474)),f41(f41(f32(x8471),x8472),f41(f41(f31(x8471),x8473),x8474)))
% 14.42/14.42 [848]~P20(x8481)+E(f41(f41(f35(x8481),f41(f41(f36(x8481),x8482),x8483)),f41(f41(f36(x8481),x8482),x8484)),f41(f41(f36(x8481),x8482),f41(f41(f35(x8481),x8483),x8484)))
% 14.42/14.42 [850]~P27(x8501)+E(f41(f41(f35(x8501),f4(x8502,x8503,x8501)),f4(x8504,x8503,x8501)),f4(f41(f41(f35(x8501),x8502),x8504),x8503,x8501))
% 14.42/14.42 [851]~P27(x8511)+E(f41(f41(f36(x8511),f4(x8512,x8513,x8511)),f4(x8514,x8513,x8511)),f4(f41(f41(f36(x8511),x8512),x8514),x8513,x8511))
% 14.42/14.42 [854]P16(x8542,x8544,x8541)+E(f41(f41(f32(f43(x8541,a2)),f37(x8542,x8543,x8541)),x8544),f41(f41(f32(f43(x8541,a2)),x8543),x8544))
% 14.42/14.42 [858]P16(x8581,x8582,x8583)+~P16(x8581,f41(f41(f32(f43(x8583,a2)),x8584),x8582),x8583)
% 14.42/14.42 [859]P16(x8591,x8592,x8593)+~P16(x8591,f41(f41(f32(f43(x8593,a2)),x8592),x8594),x8593)
% 14.42/14.42 [878]P10(x8781,x8782,f43(x8783,a2))+~P10(x8781,f41(f41(f32(f43(x8783,a2)),x8784),x8782),f43(x8783,a2))
% 14.42/14.42 [879]P10(x8791,x8792,f43(x8793,a2))+~P10(x8791,f41(f41(f32(f43(x8793,a2)),x8792),x8794),f43(x8793,a2))
% 14.42/14.42 [880]P10(x8801,x8802,f43(x8803,a2))+~P10(f41(f41(f31(f43(x8803,a2)),x8804),x8801),x8802,f43(x8803,a2))
% 14.42/14.42 [881]P10(x8811,x8812,f43(x8813,a2))+~P10(f41(f41(f31(f43(x8813,a2)),x8811),x8814),x8812,f43(x8813,a2))
% 14.42/14.42 [895]~P10(f4(x8951,x8953,f43(x8952,a2)),x8954,f43(x8952,a2))+P10(x8951,f41(f41(f31(f43(x8952,a2)),x8953),x8954),f43(x8952,a2))
% 14.42/14.42 [900]P10(f4(x9001,x9002,f43(x9003,a2)),x9004,f43(x9003,a2))+~P10(x9001,f41(f41(f31(f43(x9003,a2)),x9002),x9004),f43(x9003,a2))
% 14.42/14.42 [925]~P3(x9251)+P10(f41(f41(f31(x9251),x9252),f41(f41(f32(x9251),x9253),x9254)),f41(f41(f32(x9251),f41(f41(f31(x9251),x9252),x9253)),f41(f41(f31(x9251),x9252),x9254)),x9251)
% 14.42/14.42 [926]~P20(x9261)+P10(f41(f41(f36(x9261),x9262),f41(f41(f35(x9261),x9263),x9264)),f41(f41(f35(x9261),f41(f41(f36(x9261),x9262),x9263)),f41(f41(f36(x9261),x9262),x9264)),x9261)
% 14.42/14.42 [927]~P3(x9271)+P10(f41(f41(f31(x9271),f41(f41(f32(x9271),x9272),x9273)),f41(f41(f32(x9271),x9272),x9274)),f41(f41(f32(x9271),x9272),f41(f41(f31(x9271),x9273),x9274)),x9271)
% 14.42/14.42 [928]~P20(x9281)+P10(f41(f41(f36(x9281),f41(f41(f35(x9281),x9282),x9283)),f41(f41(f35(x9281),x9282),x9284)),f41(f41(f35(x9281),x9282),f41(f41(f36(x9281),x9283),x9284)),x9281)
% 14.42/14.42 [802]~P1(x8021)+E(f41(f41(f31(x8021),f41(f41(f31(x8021),x8022),x8023)),x8024),f41(f41(f31(x8021),x8022),f41(f41(f31(x8021),x8023),x8024)))
% 14.42/14.42 [803]~P3(x8031)+E(f41(f41(f31(x8031),f41(f41(f31(x8031),x8032),x8033)),x8034),f41(f41(f31(x8031),x8032),f41(f41(f31(x8031),x8033),x8034)))
% 14.42/14.42 [804]~P20(x8041)+E(f41(f41(f35(x8041),f41(f41(f35(x8041),x8042),x8043)),x8044),f41(f41(f35(x8041),x8042),f41(f41(f35(x8041),x8043),x8044)))
% 14.42/14.42 [805]~P2(x8051)+E(f41(f41(f32(x8051),f41(f41(f32(x8051),x8052),x8053)),x8054),f41(f41(f32(x8051),x8052),f41(f41(f32(x8051),x8053),x8054)))
% 14.42/14.42 [806]~P3(x8061)+E(f41(f41(f32(x8061),f41(f41(f32(x8061),x8062),x8063)),x8064),f41(f41(f32(x8061),x8062),f41(f41(f32(x8061),x8063),x8064)))
% 14.42/14.42 [807]~P20(x8071)+E(f41(f41(f36(x8071),f41(f41(f36(x8071),x8072),x8073)),x8074),f41(f41(f36(x8071),x8072),f41(f41(f36(x8071),x8073),x8074)))
% 14.42/14.42 [868]~P4(x8681)+E(f41(f41(f32(x8681),f41(f41(f31(x8681),x8682),x8683)),f41(f41(f31(x8681),x8684),x8683)),f41(f41(f31(x8681),f41(f41(f32(x8681),x8682),x8684)),x8683))
% 14.42/14.42 [869]~P20(x8691)+E(f41(f41(f36(x8691),f41(f41(f35(x8691),x8692),x8693)),f41(f41(f35(x8691),x8694),x8693)),f41(f41(f35(x8691),f41(f41(f36(x8691),x8692),x8694)),x8693))
% 14.42/14.42 [870]~P4(x8701)+E(f41(f41(f31(x8701),f41(f41(f32(x8701),x8702),x8703)),f41(f41(f32(x8701),x8704),x8703)),f41(f41(f32(x8701),f41(f41(f31(x8701),x8702),x8704)),x8703))
% 14.42/14.42 [871]~P20(x8711)+E(f41(f41(f35(x8711),f41(f41(f36(x8711),x8712),x8713)),f41(f41(f36(x8711),x8714),x8713)),f41(f41(f36(x8711),f41(f41(f35(x8711),x8712),x8714)),x8713))
% 14.42/14.42 [882]~P34(f41(x8823,x8824))+P34(f41(f41(f41(f31(f43(x8821,a2)),x8822),x8823),x8824))
% 14.42/14.42 [883]~P34(f41(x8832,x8834))+P34(f41(f41(f41(f31(f43(x8831,a2)),x8832),x8833),x8834))
% 14.42/14.42 [891]~P16(x8911,x8913,x8912)+E(f37(x8911,f41(f41(f32(f43(x8912,a2)),x8913),x8914),x8912),f41(f41(f32(f43(x8912,a2)),x8913),f37(x8911,x8914,x8912)))
% 14.42/14.42 [898]~P16(x8981,x8984,x8982)+E(f37(x8981,f41(f41(f32(f43(x8982,a2)),x8983),x8984),x8982),f41(f41(f32(f43(x8982,a2)),f37(x8981,x8983,x8982)),x8984))
% 14.42/14.42 [915]P34(f41(x9151,x9152))+~P34(f41(f41(f41(f32(f43(x9153,a2)),x9154),x9151),x9152))
% 14.42/14.42 [916]P34(f41(x9161,x9162))+~P34(f41(f41(f41(f32(f43(x9163,a2)),x9161),x9164),x9162))
% 14.42/14.42 [946]~P10(x9464,x9462,f43(x9461,a2))+E(f41(f41(f31(f43(x9461,a2)),f41(f41(f32(f43(x9461,a2)),x9462),x9463)),x9464),f41(f41(f32(f43(x9461,a2)),x9462),f41(f41(f31(f43(x9461,a2)),x9463),x9464)))
% 14.42/14.42 [975]P10(x9751,x9752,f43(x9753,a2))+~E(f41(f41(f31(f43(x9753,a2)),f41(f41(f32(f43(x9753,a2)),x9752),x9754)),x9751),f41(f41(f32(f43(x9753,a2)),x9752),f41(f41(f31(f43(x9753,a2)),x9754),x9751)))
% 14.42/14.42 [887]~P16(x8872,x8873,x8874)+P16(f41(x8871,x8872),f38(x8871,x8873,x8874,x8875),x8875)
% 14.42/14.42 [890]~P16(f41(x8902,x8901),x8903,x8905)+P16(x8901,f39(x8902,x8903,x8904,x8905),x8904)
% 14.42/14.42 [901]P13(x9011,x9012,x9013,x9014)+~P13(x9011,f37(x9015,x9012,x9013),x9013,x9014)
% 14.42/14.42 [914]~P16(x9142,f39(x9141,x9143,x9145,x9144),x9145)+P16(f41(x9141,x9142),x9143,x9144)
% 14.42/14.42 [940]~P10(x9402,x9405,f43(x9404,a2))+P10(f39(x9401,x9402,x9403,x9404),f39(x9401,x9405,x9403,x9404),f43(x9403,a2))
% 14.42/14.42 [942]~P10(x9422,x9425,f43(x9423,a2))+P10(f38(x9421,x9422,x9423,x9424),f38(x9421,x9425,x9423,x9424),f43(x9424,a2))
% 14.42/14.42 [976]~E(f20(x9761,x9762,x9763,x9764,x9765),x9761)+E(f41(x9761,x9762),x9763)
% 14.42/14.42 [997]~P10(x9972,f38(x9973,x9971,x9974,x9975),f43(x9975,a2))+P10(f18(x9971,x9972,x9973,x9974,x9975),x9971,f43(x9974,a2))
% 14.42/14.42 [899]~P13(x8991,x8992,x8994,x8995)+P13(x8991,f4(x8992,x8993,f43(x8994,a2)),x8994,x8995)
% 14.42/14.42 [909]~P16(x9092,x9093,x9094)+E(f37(f41(x9091,x9092),f38(x9091,x9093,x9094,x9095),x9095),f38(x9091,x9093,x9094,x9095))
% 14.42/14.42 [936]~P34(f41(x9362,f41(x9361,x9365)))+P34(f41(f39(x9361,x9362,x9363,x9364),x9365))
% 14.42/14.42 [973]P34(f41(x9731,f41(x9732,x9733)))+~P34(f41(f39(x9732,x9731,x9734,x9735),x9733))
% 14.42/14.42 [1000]~P10(x10003,f38(x10001,x10002,x10004,x10005),f43(x10005,a2))+E(f38(x10001,f18(x10002,x10003,x10001,x10004,x10005),x10004,x10005),x10003)
% 14.42/14.42 [1010]E(x10101,x10102)+~P14(x10103,x10102,f29(f43(x10104,a2)),x10101,x10104,x10105)
% 14.42/14.42 [852]~P16(x8525,x8524,x8523)+E(f38(f7(x8521,x8522,x8523),x8524,x8523,x8522),f37(x8521,f29(f43(x8522,a2)),x8522))
% 14.42/14.42 [977]~P13(x9771,f34(f43(x9773,a2)),x9773,x9774)+E(f4(f38(x9771,x9772,x9773,x9774),f38(x9771,x9775,x9773,x9774),f43(x9774,a2)),f38(x9771,f4(x9772,x9775,f43(x9773,a2)),x9773,x9774))
% 14.42/14.42 [995]~P13(x9951,f37(x9952,x9953,x9954),x9954,x9955)+~P16(f41(x9951,x9952),f38(x9951,f4(x9953,f37(x9952,f29(f43(x9954,a2)),x9954),f43(x9954,a2)),x9954,x9955),x9955)
% 14.42/14.42 [929]P13(x9291,x9292,x9293,x9294)+~P13(x9291,f41(f41(f31(f43(x9293,a2)),x9295),x9292),x9293,x9294)
% 14.42/14.42 [930]P13(x9301,x9302,x9303,x9304)+~P13(x9301,f41(f41(f31(f43(x9303,a2)),x9302),x9305),x9303,x9304)
% 14.42/14.42 [964]E(f41(x9641,x9642),x9643)+~P16(x9642,f39(x9641,f37(x9643,f29(f43(x9644,a2)),x9644),x9645,x9644),x9645)
% 14.42/14.42 [999]~P13(x9992,f41(f41(f31(f43(x9995,a2)),x9993),x9994),x9995,x9991)+E(f41(f41(f32(f43(x9991,a2)),f38(x9992,f4(x9993,x9994,f43(x9995,a2)),x9995,x9991)),f38(x9992,f4(x9994,x9993,f43(x9995,a2)),x9995,x9991)),f29(f43(x9991,a2)))
% 14.42/14.42 [989]~P13(x9892,f34(f43(x9894,a2)),x9894,x9891)+E(f41(f41(f32(f43(x9891,a2)),f38(x9892,x9893,x9894,x9891)),f38(x9892,x9895,x9894,x9891)),f38(x9892,f41(f41(f32(f43(x9894,a2)),x9893),x9895),x9894,x9891))
% 14.42/14.42 [1009]P9(x10091,x10092)+~P14(x10093,x10094,x10091,x10095,x10092,x10096)
% 14.42/14.42 [986]E(x9861,x9862)+E(f41(f20(x9863,x9861,x9864,x9865,x9866),x9862),f41(x9863,x9862))
% 14.42/14.42 [992]P16(x9922,x9926,x9924)+E(f38(f20(x9921,x9922,x9923,x9924,x9925),x9926,x9924,x9925),f38(x9921,x9926,x9924,x9925))
% 14.42/14.42 [1005]~P16(x10054,x10053,x10055)+E(f37(x10051,f38(x10052,f4(x10053,f37(x10054,f29(f43(x10055,a2)),x10055),f43(x10055,a2)),x10055,x10056),x10056),f38(f20(x10052,x10054,x10051,x10055,x10056),x10053,x10055,x10056))
% 14.42/14.42 [1007]E(x10071,x10072)+E(f20(f20(x10073,x10071,x10074,x10075,x10076),x10072,x10077,x10075,x10076),f20(f20(x10073,x10072,x10077,x10075,x10076),x10071,x10074,x10075,x10076))
% 14.42/14.42 [355]~P20(x3551)+~P2(x3551)+E(f35(x3551),f32(x3551))
% 14.42/14.42 [356]~P1(x3561)+~P20(x3561)+E(f36(x3561),f31(x3561))
% 14.42/14.42 [430]E(x4301,x4302)+P12(x4302,x4301,a1)+P12(x4301,x4302,a1)
% 14.42/14.42 [462]E(x4621,x4622)+P12(x4621,x4622,a1)+~P10(x4621,x4622,a1)
% 14.42/14.42 [537]E(x5371,x5372)+~P10(x5372,x5371,a1)+~P10(x5371,x5372,a1)
% 14.42/14.42 [365]~P25(x3652)+~E(f27(x3651,x3652),x3651)+E(x3651,f26(x3652))
% 14.42/14.42 [377]~P24(x3772)+~E(f27(x3771,x3772),f26(x3772))+E(x3771,f26(x3772))
% 14.42/14.42 [378]~P24(x3781)+~E(f27(x3782,x3781),f26(x3781))+E(f26(x3781),x3782)
% 14.42/14.42 [379]~P8(x3792)+~P8(x3791)+P8(f43(x3791,x3792))
% 14.42/14.42 [406]~P31(x4062)+~P17(x4062)+E(f4(x4061,x4061,x4062),f26(x4062))
% 14.42/14.42 [495]~P12(x4951,x4952,a1)+E(f28(x4951),x4952)+P12(f28(x4951),x4952,a1)
% 14.42/14.42 [496]E(x4961,x4962)+P12(x4962,x4961,a1)+~P12(x4962,f28(x4961),a1)
% 14.42/14.42 [498]E(x4981,x4982)+P12(x4981,x4982,a1)+~P12(x4981,f28(x4982),a1)
% 14.42/14.42 [514]P10(x5141,x5142,a1)+E(x5141,f28(x5142))+~P10(x5141,f28(x5142),a1)
% 14.42/14.42 [538]E(x5381,x5382)+~E(f4(x5382,x5381,a1),f26(a1))+~E(f4(x5381,x5382,a1),f26(a1))
% 14.42/14.42 [541]E(x5411,x5412)+~P10(x5412,x5411,a1)+~P12(x5411,f28(x5412),a1)
% 14.42/14.42 [558]~P35(x5582)+~P12(x5581,f26(x5582),x5582)+P12(x5581,f27(x5581,x5582),x5582)
% 14.42/14.42 [559]~P26(x5592)+~P10(x5591,f26(x5592),x5592)+P10(x5591,f27(x5591,x5592),x5592)
% 14.42/14.42 [560]~P25(x5602)+~P10(x5601,f26(x5602),x5602)+P10(x5601,f27(x5601,x5602),x5602)
% 14.42/14.42 [561]~P26(x5612)+~P10(f26(x5612),x5611,x5612)+P10(f27(x5611,x5612),x5611,x5612)
% 14.42/14.42 [562]~P25(x5622)+~P10(f26(x5622),x5621,x5622)+P10(f27(x5621,x5622),x5621,x5622)
% 14.42/14.42 [564]~P27(x5641)+~P12(x5642,f26(x5641),x5641)+P12(f26(x5641),f27(x5642,x5641),x5641)
% 14.42/14.42 [565]~P27(x5651)+~P10(x5652,f26(x5651),x5651)+P10(f26(x5651),f27(x5652,x5651),x5651)
% 14.42/14.42 [566]~P27(x5662)+~P12(f26(x5662),x5661,x5662)+P12(f27(x5661,x5662),f26(x5662),x5662)
% 14.42/14.42 [567]~P27(x5672)+~P10(f26(x5672),x5671,x5672)+P10(f27(x5671,x5672),f26(x5672),x5672)
% 14.42/14.42 [570]~P35(x5702)+~P12(x5701,f27(x5701,x5702),x5702)+P12(x5701,f26(x5702),x5702)
% 14.42/14.42 [571]~P26(x5712)+~P10(x5711,f27(x5711,x5712),x5712)+P10(x5711,f26(x5712),x5712)
% 14.42/14.42 [572]~P25(x5722)+~P10(x5721,f27(x5721,x5722),x5722)+P10(x5721,f26(x5722),x5722)
% 14.42/14.42 [573]~P26(x5731)+~P10(f27(x5732,x5731),x5732,x5731)+P10(f26(x5731),x5732,x5731)
% 14.42/14.42 [574]~P25(x5741)+~P10(f27(x5742,x5741),x5742,x5741)+P10(f26(x5741),x5742,x5741)
% 14.42/14.42 [586]~P27(x5862)+~P12(f26(x5862),f27(x5861,x5862),x5862)+P12(x5861,f26(x5862),x5862)
% 14.42/14.42 [587]~P27(x5872)+~P10(f26(x5872),f27(x5871,x5872),x5872)+P10(x5871,f26(x5872),x5872)
% 14.42/14.42 [588]~P27(x5881)+~P12(f27(x5882,x5881),f26(x5881),x5881)+P12(f26(x5881),x5882,x5881)
% 14.42/14.42 [589]~P27(x5891)+~P10(f27(x5892,x5891),f26(x5891),x5891)+P10(f26(x5891),x5892,x5891)
% 14.42/14.42 [748]P12(f4(x7481,x7482,a1),x7481,a1)+~P12(f26(a1),x7482,a1)+~P12(f26(a1),x7481,a1)
% 14.42/14.42 [410]~P9(x4101,x4102)+~E(f5(x4101,x4102),f26(a1))+E(x4101,f29(f43(x4102,a2)))
% 14.42/14.42 [456]~P9(x4561,x4562)+P12(f26(a1),f5(x4561,x4562),a1)+E(x4561,f29(f43(x4562,a2)))
% 14.42/14.42 [466]~P26(x4662)+E(x4661,f26(x4662))+~E(f41(f41(f31(x4662),x4661),f27(x4661,x4662)),f26(x4662))
% 14.42/14.42 [467]~P26(x4672)+E(x4671,f26(x4672))+~E(f41(f41(f32(x4672),x4671),f27(x4671,x4672)),f26(x4672))
% 14.42/14.42 [594]~P9(x5941,x5942)+P9(f27(x5941,f43(x5942,a2)),x5942)+~P9(f34(f43(x5942,a2)),x5942)
% 14.42/14.42 [614]~P9(x6142,x6141)+~P9(f27(x6142,f43(x6141,a2)),x6141)+P9(f34(f43(x6141,a2)),x6141)
% 14.42/14.42 [671]E(x6711,f34(f43(x6712,a2)))+~P9(f34(f43(x6712,a2)),x6712)+~E(f5(x6711,x6712),f5(f34(f43(x6712,a2)),x6712))
% 14.42/14.42 [922]~P33(x9222)+P16(f50(x9221,a47,a45,a48),a45,a3)+P34(f41(f41(a47,x9221),f37(f49(x9222),f29(f43(a42,a2)),a42)))
% 14.42/14.42 [1008]~P33(x10082)+~P34(f41(f41(a47,x10081),f37(f41(a48,f50(x10081,a47,a45,a48)),f29(f43(a42,a2)),a42)))+P34(f41(f41(a47,x10081),f37(f49(x10082),f29(f43(a42,a2)),a42)))
% 14.42/14.42 [445]P10(x4452,x4451,x4453)+~P20(x4453)+P12(x4451,x4452,x4453)
% 14.42/14.42 [447]P10(x4472,x4471,x4473)+~P20(x4473)+P10(x4471,x4472,x4473)
% 14.42/14.42 [493]~P18(x4933)+~P12(x4931,x4932,x4933)+P10(x4931,x4932,x4933)
% 14.42/14.42 [494]~P19(x4943)+~P12(x4941,x4942,x4943)+P10(x4941,x4942,x4943)
% 14.42/14.42 [543]~P12(x5433,x5432,x5431)+~P18(x5431)+~P12(x5432,x5433,x5431)
% 14.42/14.42 [544]~P10(x5443,x5442,x5441)+~P18(x5441)+~P12(x5442,x5443,x5441)
% 14.42/14.42 [545]~P12(x5453,x5452,x5451)+~P19(x5451)+~P12(x5452,x5453,x5451)
% 14.42/14.42 [546]~P12(x5463,x5462,x5461)+~P20(x5461)+~P12(x5462,x5463,x5461)
% 14.42/14.42 [548]~P10(x5483,x5482,x5481)+~P20(x5481)+~P12(x5482,x5483,x5481)
% 14.42/14.42 [611]~P10(x6111,x6113,a1)+P10(x6111,x6112,a1)+~P10(x6113,x6112,a1)
% 14.42/14.42 [385]~P24(x3853)+E(x3851,x3852)+~E(f27(x3851,x3853),f27(x3852,x3853))
% 14.42/14.42 [386]~P6(x3863)+E(x3861,x3862)+~E(f27(x3861,x3863),f27(x3862,x3863))
% 14.42/14.42 [423]~P24(x4233)+E(x4231,x4232)+~E(f4(x4231,x4232,x4233),f26(x4233))
% 14.42/14.42 [424]~P22(x4243)+E(x4241,x4242)+~E(f4(x4241,x4242,x4243),f26(x4243))
% 14.42/14.42 [520]P9(x5201,x5202)+~P9(x5203,x5202)+~P10(x5201,x5203,f43(x5202,a2))
% 14.42/14.42 [578]~P27(x5782)+~P12(x5783,x5781,x5782)+P12(f27(x5781,x5782),f27(x5783,x5782),x5782)
% 14.42/14.42 [579]~P27(x5792)+~P10(x5793,x5791,x5792)+P10(f27(x5791,x5792),f27(x5793,x5792),x5792)
% 14.42/14.42 [583]E(x5831,x5832)+~P10(x5831,x5832,f43(x5833,a2))+P12(x5831,x5832,f43(x5833,a2))
% 14.42/14.42 [603]~P27(x6033)+~P12(x6032,f27(x6031,x6033),x6033)+P12(x6031,f27(x6032,x6033),x6033)
% 14.42/14.42 [605]~P27(x6053)+~P10(x6052,f27(x6051,x6053),x6053)+P10(x6051,f27(x6052,x6053),x6053)
% 14.42/14.42 [607]~P27(x6072)+~P12(f27(x6073,x6072),x6071,x6072)+P12(f27(x6071,x6072),x6073,x6072)
% 14.42/14.42 [609]~P27(x6092)+~P10(f27(x6093,x6092),x6091,x6092)+P10(f27(x6091,x6092),x6093,x6092)
% 14.42/14.42 [615]~P12(x6151,x6153,a1)+~P12(x6153,x6152,a1)+P12(f28(x6151),x6152,a1)
% 14.42/14.42 [617]~P27(x6173)+P12(x6171,x6172,x6173)+~P12(f27(x6172,x6173),f27(x6171,x6173),x6173)
% 14.42/14.42 [618]~P27(x6183)+P10(x6181,x6182,x6183)+~P10(f27(x6182,x6183),f27(x6181,x6183),x6183)
% 14.42/14.42 [636]E(x6361,x6362)+~P10(x6361,x6362,f43(x6363,a2))+~P10(x6362,x6361,f43(x6363,a2))
% 14.42/14.42 [639]~P9(x6393,x6392)+~P12(x6391,x6393,f43(x6392,a2))+P12(f5(x6391,x6392),f5(x6393,x6392),a1)
% 14.42/14.42 [640]~P9(x6403,x6402)+~P10(x6401,x6403,f43(x6402,a2))+P10(f5(x6401,x6402),f5(x6403,x6402),a1)
% 14.42/14.42 [672]~P27(x6723)+~P12(x6721,x6722,x6723)+P12(f4(x6721,x6722,x6723),f26(x6723),x6723)
% 14.42/14.42 [673]~P27(x6733)+~P10(x6731,x6732,x6733)+P10(f4(x6731,x6732,x6733),f26(x6733),x6733)
% 14.42/14.42 [744]~P27(x7443)+P12(x7441,x7442,x7443)+~P12(f4(x7441,x7442,x7443),f26(x7443),x7443)
% 14.42/14.42 [745]~P27(x7453)+P10(x7451,x7452,x7453)+~P10(f4(x7451,x7452,x7453),f26(x7453),x7453)
% 14.42/14.42 [815]~P12(x8151,x8153,a1)+~P10(x8152,x8151,a1)+P12(f4(x8151,x8152,a1),f4(x8153,x8152,a1),a1)
% 14.42/14.42 [816]~P12(x8163,x8162,a1)+~P12(x8163,x8161,a1)+P12(f4(x8161,x8162,a1),f4(x8161,x8163,a1),a1)
% 14.42/14.42 [938]~P9(x9382,x9383)+P13(x9381,x9382,x9383,x9383)+~P10(x9382,f38(x9381,x9382,x9383,x9383),f43(x9383,a2))
% 14.42/14.42 [613]P16(x6133,x6131,x6132)+E(f5(x6131,x6132),f26(a1))+E(f5(f37(x6133,x6131,x6132),x6132),f28(f5(x6131,x6132)))
% 14.42/14.42 [616]P16(x6161,x6162,x6163)+~P9(x6162,x6163)+E(f5(f37(x6161,x6162,x6163),x6163),f28(f5(x6162,x6163)))
% 14.42/14.42 [634]~P9(x6342,x6343)+~P16(x6341,x6342,x6343)+E(f5(f37(x6341,x6342,x6343),x6343),f5(x6342,x6343))
% 14.42/14.42 [699]P9(x6991,x6992)+~P9(x6993,x6992)+~P9(f4(x6991,x6993,f43(x6992,a2)),x6992)
% 14.42/14.42 [832]~P10(x8322,x8323,a1)+~P10(x8322,x8321,a1)+E(f4(f4(x8321,x8322,a1),f4(x8323,x8322,a1),a1),f4(x8321,x8323,a1))
% 14.42/14.42 [837]~P12(x8372,x8373,a1)+~P34(f41(x8371,f4(x8372,x8373,a1)))+P34(f41(x8371,f26(a1)))
% 14.42/14.42 [419]~P5(x4192)+E(x4191,f29(x4192))+~E(f41(f41(f31(x4192),x4193),x4191),f29(x4192))
% 14.42/14.42 [420]~P5(x4202)+E(x4201,f34(x4202))+~E(f41(f41(f32(x4202),x4203),x4201),f34(x4202))
% 14.42/14.42 [421]~P5(x4212)+E(x4211,f29(x4212))+~E(f41(f41(f31(x4212),x4211),x4213),f29(x4212))
% 14.42/14.42 [422]~P5(x4222)+E(x4221,f34(x4222))+~E(f41(f41(f32(x4222),x4221),x4223),f34(x4222))
% 14.42/14.42 [476]~P1(x4763)+P10(x4761,x4762,x4763)+~E(f41(f41(f31(x4763),x4761),x4762),x4762)
% 14.42/14.42 [477]~P20(x4773)+P10(x4771,x4772,x4773)+~E(f41(f41(f35(x4773),x4771),x4772),x4771)
% 14.42/14.42 [478]~P2(x4783)+P10(x4781,x4782,x4783)+~E(f41(f41(f32(x4783),x4781),x4782),x4781)
% 14.42/14.42 [479]~P20(x4793)+P10(x4791,x4792,x4793)+~E(f41(f41(f36(x4793),x4791),x4792),x4792)
% 14.42/14.42 [485]~P1(x4851)+~P10(x4852,x4853,x4851)+E(f41(f41(f31(x4851),x4852),x4853),x4853)
% 14.42/14.42 [486]~P1(x4861)+~P10(x4863,x4862,x4861)+E(f41(f41(f31(x4861),x4862),x4863),x4862)
% 14.42/14.42 [487]~P20(x4871)+~P10(x4873,x4872,x4871)+E(f41(f41(f35(x4871),x4872),x4873),x4873)
% 14.42/14.42 [488]~P20(x4881)+~P10(x4882,x4883,x4881)+E(f41(f41(f35(x4881),x4882),x4883),x4882)
% 14.42/14.42 [489]~P2(x4891)+~P10(x4893,x4892,x4891)+E(f41(f41(f32(x4891),x4892),x4893),x4893)
% 14.42/14.42 [490]~P2(x4901)+~P10(x4902,x4903,x4901)+E(f41(f41(f32(x4901),x4902),x4903),x4902)
% 14.42/14.42 [491]~P20(x4911)+~P10(x4912,x4913,x4911)+E(f41(f41(f36(x4911),x4912),x4913),x4913)
% 14.42/14.42 [492]~P20(x4921)+~P10(x4923,x4922,x4921)+E(f41(f41(f36(x4921),x4922),x4923),x4922)
% 14.42/14.42 [799]~P9(x7993,x7992)+~P10(x7993,x7991,f43(x7992,a2))+E(f4(f5(x7991,x7992),f5(x7993,x7992),a1),f5(f4(x7991,x7993,f43(x7992,a2)),x7992))
% 14.42/14.42 [857]~P10(x8571,f37(x8573,f29(f43(x8572,a2)),x8572),f43(x8572,a2))+E(x8571,f29(f43(x8572,a2)))+E(x8571,f37(x8573,f29(f43(x8572,a2)),x8572))
% 14.42/14.42 [892]P16(x8922,x8921,x8923)+~P9(x8921,x8923)+E(f5(f4(x8921,f37(x8922,f29(f43(x8923,a2)),x8923),f43(x8923,a2)),x8923),f5(x8921,x8923))
% 14.42/14.42 [955]~P9(x9551,x9553)+~P16(x9552,x9551,x9553)+P12(f5(f4(x9551,f37(x9552,f29(f43(x9553,a2)),x9553),f43(x9553,a2)),x9553),f5(x9551,x9553),a1)
% 14.42/14.42 [772]~P9(x7723,x7721)+~P9(x7722,x7721)+P9(f41(f41(f31(f43(x7721,a2)),x7722),x7723),x7721)
% 14.42/14.42 [950]~P9(x9501,x9503)+~P16(x9502,x9501,x9503)+E(f28(f5(f4(x9501,f37(x9502,f29(f43(x9503,a2)),x9503),f43(x9503,a2)),x9503)),f5(x9501,x9503))
% 14.42/14.42 [550]~P22(x5504)+E(x5501,x5502)+~E(f4(x5503,x5503,x5504),f4(x5501,x5502,x5504))
% 14.42/14.42 [551]~P22(x5513)+E(x5511,x5512)+~E(f4(x5511,x5512,x5513),f4(x5514,x5514,x5513))
% 14.42/14.42 [581]~P10(x5813,x5811,f43(x5814,a2))+P34(f41(x5811,x5812))+~P34(f41(x5813,x5812))
% 14.42/14.42 [601]~P7(x6014)+P10(x6011,x6012,f43(x6013,x6014))+~P12(x6011,x6012,f43(x6013,x6014))
% 14.42/14.42 [674]~P7(x6741)+~P12(x6742,x6743,f43(x6744,x6741))+~P10(x6743,x6742,f43(x6744,x6741))
% 14.42/14.42 [676]P16(x6761,x6762,x6763)+~P16(x6761,x6764,x6763)+~P12(x6764,x6762,f43(x6763,a2))
% 14.42/14.42 [680]P16(x6801,x6802,x6803)+~P16(x6801,x6804,x6803)+~P10(x6804,x6802,f43(x6803,a2))
% 14.42/14.42 [686]P9(x6862,x6863)+~P21(x6864)+E(f23(x6861,x6862,x6863,x6864),f26(x6864))
% 14.42/14.42 [724]E(x7241,x7242)+P16(x7241,x7243,x7244)+~P16(x7241,f37(x7242,x7243,x7244),x7244)
% 14.42/14.42 [738]~P12(x7381,x7384,f43(x7383,a2))+~P12(x7384,x7382,f43(x7383,a2))+P12(x7381,x7382,f43(x7383,a2))
% 14.42/14.42 [739]~P10(x7391,x7394,f43(x7393,a2))+~P12(x7394,x7392,f43(x7393,a2))+P12(x7391,x7392,f43(x7393,a2))
% 14.42/14.42 [740]~P10(x7404,x7402,f43(x7403,a2))+~P12(x7401,x7404,f43(x7403,a2))+P12(x7401,x7402,f43(x7403,a2))
% 14.42/14.42 [741]~P10(x7411,x7414,f43(x7413,a2))+~P10(x7414,x7412,f43(x7413,a2))+P10(x7411,x7412,f43(x7413,a2))
% 14.42/14.42 [791]~P16(x7912,x7913,x7914)+~P12(x7911,x7913,f43(x7914,a2))+P12(x7911,f37(x7912,x7913,x7914),f43(x7914,a2))
% 14.42/14.42 [792]~P16(x7921,x7924,x7923)+~P10(x7922,x7924,f43(x7923,a2))+P10(f37(x7921,x7922,x7923),x7924,f43(x7923,a2))
% 14.42/14.42 [811]P16(x8111,x8112,x8113)+~P10(x8112,f37(x8111,x8114,x8113),f43(x8113,a2))+P10(x8112,x8114,f43(x8113,a2))
% 14.42/14.42 [825]~P16(x8254,x8252,x8253)+~P12(x8251,f37(x8254,x8252,x8253),f43(x8253,a2))+P12(x8251,x8252,f43(x8253,a2))
% 14.42/14.42 [943]P9(x9431,x9432)+~P13(x9433,x9431,x9432,x9434)+~P9(f38(x9433,x9431,x9432,x9434),x9434)
% 14.42/14.42 [776]~P16(x7761,x7764,x7763)+P16(x7761,x7762,x7763)+P16(x7761,f4(x7764,x7762,f43(x7763,a2)),x7763)
% 14.42/14.42 [798]E(x7981,x7982)+P34(f41(x7983,x7981))+~P34(f41(f37(x7982,x7983,x7984),x7981))
% 14.42/14.42 [830]~P10(x8301,x8302,f43(x8304,a2))+~P10(x8303,x8301,f43(x8304,a2))+E(f4(x8301,f4(x8302,x8303,f43(x8304,a2)),f43(x8304,a2)),x8303)
% 14.42/14.42 [917]~P9(x9172,x9174)+P9(f39(x9171,x9172,x9173,x9174),x9173)+~P13(x9171,f34(f43(x9173,a2)),x9173,x9174)
% 14.42/14.42 [921]~P16(x9212,x9211,x9213)+~P10(x9211,f37(x9212,x9214,x9213),f43(x9213,a2))+P10(f4(x9211,f37(x9212,f29(f43(x9213,a2)),x9213),f43(x9213,a2)),x9214,f43(x9213,a2))
% 14.42/14.42 [931]~P9(x9312,x9313)+P13(x9311,x9312,x9313,x9314)+~E(f5(f38(x9311,x9312,x9313,x9314),x9314),f5(x9312,x9313))
% 14.42/14.42 [949]~P16(x9492,x9491,x9494)+P10(x9491,f37(x9492,x9493,x9494),f43(x9494,a2))+~P10(f4(x9491,f37(x9492,f29(f43(x9494,a2)),x9494),f43(x9494,a2)),x9493,f43(x9494,a2))
% 14.42/14.42 [641]~P1(x6412)+~P12(x6411,x6414,x6412)+P12(x6411,f41(f41(f31(x6412),x6413),x6414),x6412)
% 14.42/14.42 [642]~P1(x6422)+~P12(x6421,x6423,x6422)+P12(x6421,f41(f41(f31(x6422),x6423),x6424),x6422)
% 14.42/14.42 [644]~P20(x6442)+~P12(x6441,x6444,x6442)+P12(x6441,f41(f41(f36(x6442),x6443),x6444),x6442)
% 14.42/14.42 [646]~P20(x6462)+~P12(x6461,x6463,x6462)+P12(x6461,f41(f41(f36(x6462),x6463),x6464),x6462)
% 14.42/14.42 [647]~P1(x6472)+~P10(x6471,x6474,x6472)+P10(x6471,f41(f41(f31(x6472),x6473),x6474),x6472)
% 14.42/14.42 [648]~P1(x6482)+~P10(x6481,x6483,x6482)+P10(x6481,f41(f41(f31(x6482),x6483),x6484),x6482)
% 14.42/14.42 [650]~P20(x6502)+~P10(x6501,x6504,x6502)+P10(x6501,f41(f41(f36(x6502),x6503),x6504),x6502)
% 14.42/14.43 [652]~P20(x6522)+~P10(x6521,x6523,x6522)+P10(x6521,f41(f41(f36(x6522),x6523),x6524),x6522)
% 14.42/14.43 [654]~P20(x6541)+~P12(x6543,x6544,x6541)+P12(f41(f41(f35(x6541),x6542),x6543),x6544,x6541)
% 14.42/14.43 [656]~P20(x6561)+~P12(x6562,x6564,x6561)+P12(f41(f41(f35(x6561),x6562),x6563),x6564,x6561)
% 14.42/14.43 [657]~P2(x6571)+~P12(x6573,x6574,x6571)+P12(f41(f41(f32(x6571),x6572),x6573),x6574,x6571)
% 14.42/14.43 [658]~P2(x6581)+~P12(x6582,x6584,x6581)+P12(f41(f41(f32(x6581),x6582),x6583),x6584,x6581)
% 14.42/14.43 [660]~P20(x6601)+~P10(x6603,x6604,x6601)+P10(f41(f41(f35(x6601),x6602),x6603),x6604,x6601)
% 14.42/14.43 [662]~P20(x6621)+~P10(x6622,x6624,x6621)+P10(f41(f41(f35(x6621),x6622),x6623),x6624,x6621)
% 14.42/14.43 [663]~P2(x6631)+~P10(x6633,x6634,x6631)+P10(f41(f41(f32(x6631),x6632),x6633),x6634,x6631)
% 14.42/14.43 [664]~P2(x6641)+~P10(x6642,x6644,x6641)+P10(f41(f41(f32(x6641),x6642),x6643),x6644,x6641)
% 14.42/14.43 [703]~P20(x7033)+P12(x7031,x7032,x7033)+~P12(x7031,f41(f41(f35(x7033),x7034),x7032),x7033)
% 14.42/14.43 [704]~P20(x7043)+P12(x7041,x7042,x7043)+~P12(x7041,f41(f41(f35(x7043),x7042),x7044),x7043)
% 14.42/14.43 [706]~P20(x7063)+P10(x7061,x7062,x7063)+~P10(x7061,f41(f41(f35(x7063),x7064),x7062),x7063)
% 14.42/14.43 [708]~P20(x7083)+P10(x7081,x7082,x7083)+~P10(x7081,f41(f41(f35(x7083),x7082),x7084),x7083)
% 14.42/14.43 [710]~P2(x7103)+P10(x7101,x7102,x7103)+~P10(x7101,f41(f41(f32(x7103),x7104),x7102),x7103)
% 14.42/14.43 [712]~P2(x7123)+P10(x7121,x7122,x7123)+~P10(x7121,f41(f41(f32(x7123),x7122),x7124),x7123)
% 14.42/14.43 [713]~P20(x7133)+P12(x7131,x7132,x7133)+~P12(f41(f41(f36(x7133),x7134),x7131),x7132,x7133)
% 14.42/14.43 [714]~P20(x7143)+P12(x7141,x7142,x7143)+~P12(f41(f41(f36(x7143),x7141),x7144),x7142,x7143)
% 14.42/14.43 [716]~P1(x7163)+P10(x7161,x7162,x7163)+~P10(f41(f41(f31(x7163),x7164),x7161),x7162,x7163)
% 14.42/14.43 [718]~P1(x7183)+P10(x7181,x7182,x7183)+~P10(f41(f41(f31(x7183),x7181),x7184),x7182,x7183)
% 14.42/14.43 [720]~P20(x7203)+P10(x7201,x7202,x7203)+~P10(f41(f41(f36(x7203),x7204),x7201),x7202,x7203)
% 14.42/14.43 [722]~P20(x7223)+P10(x7221,x7222,x7223)+~P10(f41(f41(f36(x7223),x7221),x7224),x7222,x7223)
% 14.42/14.43 [966]~P9(x9664,x9663)+~P10(x9664,x9662,f43(x9663,a2))+E(f4(f23(x9661,x9662,x9663,a1),f23(x9661,x9664,x9663,a1),a1),f23(x9661,f4(x9662,x9664,f43(x9663,a2)),x9663,a1))
% 14.42/14.43 [974]~P13(x9741,f34(f43(x9744,a2)),x9744,x9743)+E(f16(f41(x9741,x9742),x9741,x9743,x9744),x9742)+~P16(f41(x9741,x9742),f38(x9741,f34(f43(x9744,a2)),x9744,x9743),x9743)
% 14.42/14.43 [979]~P13(x9791,f34(f43(x9794,a2)),x9794,x9793)+E(f41(x9791,f16(x9792,x9791,x9793,x9794)),x9792)+~P16(x9792,f38(x9791,f34(f43(x9794,a2)),x9794,x9793),x9793)
% 14.42/14.43 [819]~P16(x8194,x8193,x8191)+~P16(x8194,x8192,x8191)+~E(f41(f41(f32(f43(x8191,a2)),x8192),x8193),f29(f43(x8191,a2)))
% 14.42/14.43 [842]~P16(x8421,x8424,x8422)+~P16(x8421,x8423,x8422)+P16(x8421,f41(f41(f32(f43(x8422,a2)),x8423),x8424),x8422)
% 14.42/14.43 [861]~P10(x8611,x8613,f43(x8612,a2))+~P10(x8611,x8614,f43(x8612,a2))+P10(x8611,f41(f41(f32(f43(x8612,a2)),x8613),x8614),f43(x8612,a2))
% 14.42/14.43 [863]~P10(x8632,x8634,f43(x8631,a2))+~P10(x8633,x8634,f43(x8631,a2))+P10(f41(f41(f31(f43(x8631,a2)),x8632),x8633),x8634,f43(x8631,a2))
% 14.42/14.43 [877]P16(x8771,x8772,x8773)+P16(x8771,x8774,x8773)+~P16(x8771,f41(f41(f31(f43(x8773,a2)),x8772),x8774),x8773)
% 14.42/14.43 [893]~P34(f41(x8933,x8934))+~P34(f41(x8932,x8934))+P34(f41(f41(f41(f32(f43(x8931,a2)),x8932),x8933),x8934))
% 14.42/14.43 [918]P34(f41(x9181,x9182))+P34(f41(x9183,x9182))+~P34(f41(f41(f41(f31(f43(x9184,a2)),x9181),x9183),x9182))
% 14.42/14.43 [631]~P7(x6314)+P10(f41(x6311,x6312),f41(x6313,x6312),x6314)+~P10(x6311,x6313,f43(x6315,x6314))
% 14.42/14.43 [896]P13(x8961,x8962,x8963,x8964)+~P13(x8961,x8965,x8963,x8964)+~P10(x8962,x8965,f43(x8963,a2))
% 14.42/14.43 [912]P9(x9121,x9122)+~P9(x9123,x9124)+~P10(x9121,f38(x9125,x9123,x9124,x9122),f43(x9122,a2))
% 14.42/14.43 [996]~P9(x9962,x9965)+~P10(x9962,f38(x9963,x9961,x9964,x9965),f43(x9965,a2))+P9(f13(x9961,x9962,x9963,x9964,x9965),x9964)
% 14.42/14.43 [998]~P9(x9982,x9985)+~P10(x9982,f38(x9983,x9981,x9984,x9985),f43(x9985,a2))+P10(f13(x9981,x9982,x9983,x9984,x9985),x9981,f43(x9984,a2))
% 14.42/14.43 [844]E(x8441,x8442)+~E(f41(x8443,x8441),f41(x8443,x8442))+~P13(x8443,f34(f43(x8444,a2)),x8444,x8445)
% 14.42/14.43 [872]~P10(x8721,x8724,f43(x8723,a2))+~P10(x8725,x8722,f43(x8723,a2))+P10(f4(x8721,x8722,f43(x8723,a2)),f4(x8724,x8725,f43(x8723,a2)),f43(x8723,a2))
% 14.42/14.43 [920]~P16(x9205,x9201,x9203)+~P13(x9202,x9201,x9203,x9204)+E(f41(f25(x9201,x9202,x9203,x9204),f41(x9202,x9205)),x9205)
% 14.42/14.43 [945]E(x9451,x9452)+~E(f38(x9453,x9451,x9454,x9455),f38(x9453,x9452,x9454,x9455))+~P13(x9453,f34(f43(x9454,a2)),x9454,x9455)
% 14.42/14.43 [959]P16(x9591,x9592,x9593)+~P16(f41(x9594,x9591),f38(x9594,x9592,x9593,x9595),x9595)+~P13(x9594,f34(f43(x9593,a2)),x9593,x9595)
% 14.42/14.43 [978]~P10(x9782,f38(x9781,x9785,x9783,x9784),f43(x9784,a2))+P10(f39(x9781,x9782,x9783,x9784),x9785,f43(x9783,a2))+~P13(x9781,f34(f43(x9783,a2)),x9783,x9784)
% 14.42/14.43 [982]~P10(f38(x9824,x9821,x9823,x9825),f38(x9824,x9822,x9823,x9825),f43(x9825,a2))+P10(x9821,x9822,f43(x9823,a2))+~P13(x9824,f34(f43(x9823,a2)),x9823,x9825)
% 14.42/14.43 [1001]~P9(x10013,x10015)+~P10(x10013,f38(x10011,x10012,x10014,x10015),f43(x10015,a2))+E(f38(x10011,f13(x10012,x10013,x10011,x10014,x10015),x10014,x10015),x10013)
% 14.42/14.43 [971]~P13(x9713,f34(f43(x9714,a2)),x9714,x9715)+P34(f41(x9711,x9712))+P16(f15(x9711,x9713,x9714,x9715),f38(x9713,f34(f43(x9714,a2)),x9714,x9715),x9715)
% 14.42/14.43 [984]~P13(x9841,x9842,x9843,x9844)+~P16(x9845,f38(x9841,x9842,x9843,x9844),x9844)+E(f41(x9841,f41(f25(x9842,x9841,x9843,x9844),x9845)),x9845)
% 14.42/14.43 [988]~P13(x9881,x9883,x9884,x9885)+P13(x9881,f37(x9882,x9883,x9884),x9884,x9885)+P16(f41(x9881,x9882),f38(x9881,f4(x9883,f37(x9882,f29(f43(x9884,a2)),x9884),f43(x9884,a2)),x9884,x9885),x9885)
% 14.42/14.43 [903]E(x9031,x9032)+E(x9031,x9033)+~E(f37(x9034,f37(x9031,f29(f43(x9035,a2)),x9035),x9035),f37(x9033,f37(x9032,f29(f43(x9035,a2)),x9035),x9035))
% 14.42/14.43 [904]E(x9041,x9042)+E(x9043,x9042)+~E(f37(x9043,f37(x9041,f29(f43(x9044,a2)),x9044),x9044),f37(x9045,f37(x9042,f29(f43(x9044,a2)),x9044),x9044))
% 14.42/14.43 [905]E(x9051,x9052)+E(x9053,x9052)+~E(f37(x9053,f37(x9051,f29(f43(x9054,a2)),x9054),x9054),f37(x9052,f37(x9055,f29(f43(x9054,a2)),x9054),x9054))
% 14.42/14.43 [906]E(x9061,x9062)+E(x9061,x9063)+~E(f37(x9061,f37(x9064,f29(f43(x9065,a2)),x9065),x9065),f37(x9063,f37(x9062,f29(f43(x9065,a2)),x9065),x9065))
% 14.42/14.43 [907]~P10(x9072,x9074,f43(x9071,a2))+~P10(x9073,x9075,f43(x9071,a2))+P10(f41(f41(f31(f43(x9071,a2)),x9072),x9073),f41(f41(f31(f43(x9071,a2)),x9074),x9075),f43(x9071,a2))
% 14.42/14.43 [908]~P10(x9082,x9084,f43(x9081,a2))+~P10(x9083,x9085,f43(x9081,a2))+P10(f41(f41(f32(f43(x9081,a2)),x9082),x9083),f41(f41(f32(f43(x9081,a2)),x9084),x9085),f43(x9081,a2))
% 14.42/14.43 [968]E(x9681,x9682)+~E(f38(x9683,x9681,x9684,x9685),f38(x9683,x9682,x9684,x9685))+~P13(x9683,f41(f41(f31(f43(x9684,a2)),x9681),x9682),x9684,x9685)
% 14.42/14.43 [923]~P16(x9232,x9235,x9236)+P16(f41(x9231,x9232),x9233,x9234)+~P10(f38(x9231,x9235,x9236,x9234),x9233,f43(x9234,a2))
% 14.42/14.43 [1002]~P13(x10022,x10023,x10024,x10025)+P13(f20(x10022,x10026,x10021,x10024,x10025),x10023,x10024,x10025)+P16(x10021,f38(x10022,x10023,x10024,x10025),x10025)
% 14.42/14.43 [1011]~P14(x10114,x10115,x10112,x10116,x10113,x10117)+P16(x10111,x10112,x10113)+P14(x10114,x10115,f37(x10111,x10112,x10113),f41(f41(x10114,x10111),x10116),x10113,x10117)
% 14.42/14.43 [1012]~P16(x10124,x10123,x10126)+P14(x10121,x10122,x10123,f41(f41(x10121,x10124),x10125),x10126,x10127)+~P14(x10121,x10122,f4(x10123,f37(x10124,f29(f43(x10126,a2)),x10126),f43(x10126,a2)),x10125,x10126,x10127)
% 14.42/14.43 [1013]~P16(x10134,x10133,x10136)+P15(x10131,x10132,x10133,f41(f41(x10131,x10134),x10135),x10136,x10137)+~P15(x10131,x10132,f4(x10133,f37(x10134,f29(f43(x10136,a2)),x10136),f43(x10136,a2)),x10135,x10136,x10137)
% 14.42/14.43 [512]~P20(x5122)+~P9(x5121,x5122)+P16(f41(f21(x5122),x5121),x5121,x5122)+E(x5121,f29(f43(x5122,a2)))
% 14.42/14.43 [513]~P20(x5132)+~P9(x5131,x5132)+P16(f41(f22(x5132),x5131),x5131,x5132)+E(x5131,f29(f43(x5132,a2)))
% 14.42/14.43 [516]~P20(x5161)+~P26(x5161)+P12(x5162,f26(x5161),x5161)+E(f41(f41(f31(x5161),x5162),f27(x5162,x5161)),x5162)
% 14.42/14.43 [584]~P20(x5841)+~P26(x5841)+~P12(x5842,f26(x5841),x5841)+E(f41(f41(f31(x5841),x5842),f27(x5842,x5841)),f27(x5842,x5841))
% 14.42/14.43 [454]P12(x4541,x4542,x4543)+~P20(x4543)+E(x4541,x4542)+P12(x4542,x4541,x4543)
% 14.42/14.43 [455]P12(x4551,x4552,x4553)+~P35(x4553)+E(x4551,x4552)+P12(x4552,x4551,x4553)
% 14.42/14.43 [507]~P19(x5073)+~P10(x5071,x5072,x5073)+E(x5071,x5072)+P12(x5071,x5072,x5073)
% 14.42/14.43 [509]~P20(x5093)+~P10(x5091,x5092,x5093)+E(x5091,x5092)+P12(x5091,x5092,x5093)
% 14.42/14.43 [555]~P10(x5552,x5551,x5553)+~P10(x5551,x5552,x5553)+E(x5551,x5552)+~P19(x5553)
% 14.42/14.43 [585]P10(x5852,x5851,x5853)+~P18(x5853)+~P10(x5851,x5852,x5853)+P12(x5851,x5852,x5853)
% 14.42/14.43 [428]~P31(x4283)+~P17(x4283)+E(x4281,x4282)+~E(f4(x4281,x4282,x4283),f26(x4283))
% 14.42/14.43 [727]E(x7271,x7272)+~P9(x7272,x7273)+~P10(x7271,x7272,f43(x7273,a2))+~P10(f5(x7272,x7273),f5(x7271,x7273),a1)
% 14.42/14.43 [750]E(x7501,x7502)+~P10(x7503,x7502,a1)+~P10(x7503,x7501,a1)+~E(f4(x7501,x7503,a1),f4(x7502,x7503,a1))
% 14.42/14.43 [788]~P9(x7882,x7883)+~P10(x7881,x7882,f43(x7883,a2))+P12(x7881,x7882,f43(x7883,a2))+~P12(f5(x7881,x7883),f5(x7882,x7883),a1)
% 14.42/14.43 [874]~P10(x8743,x8741,a1)+P12(x8741,x8742,a1)+~P10(x8743,x8742,a1)+~P12(f4(x8741,x8743,a1),f4(x8742,x8743,a1),a1)
% 14.42/14.43 [875]~P10(x8753,x8751,a1)+P10(x8751,x8752,a1)+~P10(x8753,x8752,a1)+~P10(f4(x8751,x8753,a1),f4(x8752,x8753,a1),a1)
% 14.42/14.43 [965]~P9(x9652,x9653)+~P13(x9651,x9652,x9653,x9653)+~P10(f38(x9651,x9652,x9653,x9653),x9652,f43(x9653,a2))+E(f38(x9651,x9652,x9653,x9653),x9652)
% 14.42/14.43 [591]~P20(x5912)+~P9(x5913,x5912)+~P16(x5911,x5913,x5912)+P10(x5911,f41(f21(x5912),x5913),x5912)
% 14.42/14.43 [592]~P20(x5921)+~P9(x5922,x5921)+~P16(x5923,x5922,x5921)+P10(f41(f22(x5921),x5922),x5923,x5921)
% 14.42/14.43 [576]~P6(x5762)+E(f27(x5761,x5762),x5763)+~E(f41(f41(f31(x5762),x5761),x5763),f34(x5762))+~E(f41(f41(f32(x5762),x5761),x5763),f29(x5762))
% 14.42/14.43 [687]~P2(x6871)+~P9(x6872,x6871)+~P16(x6873,x6872,x6871)+P10(f41(f19(f32(x6871),x6871),x6872),x6873,x6871)
% 14.42/14.43 [688]~P20(x6882)+~P9(x6881,x6882)+E(x6881,f29(f43(x6882,a2)))+E(f41(f41(f36(x6882),x6883),f41(f21(x6882),x6881)),f41(f21(x6882),f37(x6883,x6881,x6882)))
% 14.42/14.43 [689]~P20(x6892)+~P9(x6891,x6892)+E(x6891,f29(f43(x6892,a2)))+E(f41(f41(f35(x6892),x6893),f41(f22(x6892),x6891)),f41(f22(x6892),f37(x6893,x6891,x6892)))
% 14.42/14.43 [620]~P18(x6203)+~P12(x6201,x6204,x6203)+P12(x6201,x6202,x6203)+~P12(x6204,x6202,x6203)
% 14.42/14.43 [621]~P18(x6213)+~P10(x6211,x6214,x6213)+P12(x6211,x6212,x6213)+~P12(x6214,x6212,x6213)
% 14.42/14.43 [622]~P18(x6223)+~P10(x6224,x6222,x6223)+P12(x6221,x6222,x6223)+~P12(x6221,x6224,x6223)
% 14.42/14.43 [623]~P19(x6233)+~P12(x6231,x6234,x6233)+P12(x6231,x6232,x6233)+~P12(x6234,x6232,x6233)
% 14.42/14.43 [624]~P19(x6243)+~P10(x6241,x6244,x6243)+P12(x6241,x6242,x6243)+~P12(x6244,x6242,x6243)
% 14.42/14.43 [625]~P19(x6253)+~P10(x6254,x6252,x6253)+P12(x6251,x6252,x6253)+~P12(x6251,x6254,x6253)
% 14.42/14.43 [626]~P18(x6263)+~P10(x6261,x6264,x6263)+P10(x6261,x6262,x6263)+~P10(x6264,x6262,x6263)
% 14.42/14.43 [627]~P19(x6273)+~P10(x6271,x6274,x6273)+P10(x6271,x6272,x6273)+~P10(x6274,x6272,x6273)
% 14.42/14.43 [690]P16(x6903,x6901,x6904)+E(x6901,x6902)+P16(x6903,x6902,x6904)+~E(f37(x6903,x6901,x6904),f37(x6903,x6902,x6904))
% 14.42/14.43 [694]~P7(x6944)+P12(x6941,x6942,f43(x6943,x6944))+P10(x6942,x6941,f43(x6943,x6944))+~P10(x6941,x6942,f43(x6943,x6944))
% 14.42/14.43 [800]P16(x8001,x8002,x8003)+P16(x8001,x8004,x8003)+~P10(x8004,x8002,f43(x8003,a2))+P12(x8004,f37(x8001,x8002,x8003),f43(x8003,a2))
% 14.42/14.43 [831]P16(x8311,x8312,x8313)+P16(x8311,x8314,x8313)+~P12(x8314,f37(x8311,x8312,x8313),f43(x8313,a2))+P10(x8314,x8312,f43(x8313,a2))
% 14.42/14.43 [833]P16(x8331,x8332,x8333)+~P10(x8332,x8334,f43(x8333,a2))+~P12(x8332,x8334,f43(x8333,a2))+P12(x8332,f37(x8331,x8334,x8333),f43(x8333,a2))
% 14.42/14.43 [843]~P9(x8433,x8434)+~P16(x8432,x8433,x8434)+E(f41(x8431,x8432),f26(a1))+~E(f23(x8431,x8433,x8434,a1),f26(a1))
% 14.42/14.43 [924]~P16(x9241,x9244,x9243)+P16(x9241,x9242,x9243)+~P12(x9244,f37(x9241,x9242,x9243),f43(x9243,a2))+P12(f4(x9244,f37(x9241,f29(f43(x9243,a2)),x9243),f43(x9243,a2)),x9242,f43(x9243,a2))
% 14.42/14.43 [954]~P16(x9541,x9544,x9543)+P16(x9541,x9542,x9543)+P12(x9544,f37(x9541,x9542,x9543),f43(x9543,a2))+~P12(f4(x9544,f37(x9541,f29(f43(x9543,a2)),x9543),f43(x9543,a2)),x9542,f43(x9543,a2))
% 14.42/14.43 [956]P16(x9561,x9562,x9563)+~P10(x9564,x9562,f43(x9563,a2))+P12(x9564,f37(x9561,x9562,x9563),f43(x9563,a2))+~P12(f4(x9564,f37(x9561,f29(f43(x9563,a2)),x9563),f43(x9563,a2)),x9562,f43(x9563,a2))
% 14.42/14.43 [958]~P16(x9582,x9581,x9584)+~P12(x9581,x9583,f43(x9584,a2))+P12(x9581,f37(x9582,x9583,x9584),f43(x9584,a2))+~P12(f4(x9581,f37(x9582,f29(f43(x9584,a2)),x9584),f43(x9584,a2)),x9583,f43(x9584,a2))
% 14.42/14.43 [960]~P10(x9601,x9603,f43(x9604,a2))+~P12(x9601,x9603,f43(x9604,a2))+P12(x9601,f37(x9602,x9603,x9604),f43(x9604,a2))+~P12(f4(x9601,f37(x9602,f29(f43(x9604,a2)),x9604),f43(x9604,a2)),x9603,f43(x9604,a2))
% 14.42/14.43 [751]~P20(x7512)+~P12(x7511,x7514,x7512)+~P12(x7511,x7513,x7512)+P12(x7511,f41(f41(f35(x7512),x7513),x7514),x7512)
% 14.42/14.43 [754]~P20(x7542)+~P10(x7541,x7544,x7542)+~P10(x7541,x7543,x7542)+P10(x7541,f41(f41(f35(x7542),x7543),x7544),x7542)
% 14.42/14.43 [757]~P2(x7572)+~P10(x7571,x7574,x7572)+~P10(x7571,x7573,x7572)+P10(x7571,f41(f41(f32(x7572),x7573),x7574),x7572)
% 14.42/14.43 [758]~P20(x7581)+~P12(x7583,x7584,x7581)+~P12(x7582,x7584,x7581)+P12(f41(f41(f36(x7581),x7582),x7583),x7584,x7581)
% 14.42/14.43 [761]~P1(x7611)+~P10(x7613,x7614,x7611)+~P10(x7612,x7614,x7611)+P10(f41(f41(f31(x7611),x7612),x7613),x7614,x7611)
% 14.42/14.43 [764]~P20(x7641)+~P10(x7643,x7644,x7641)+~P10(x7642,x7644,x7641)+P10(f41(f41(f36(x7641),x7642),x7643),x7644,x7641)
% 14.42/14.43 [779]~P20(x7793)+P12(x7791,x7792,x7793)+P12(x7791,x7794,x7793)+~P12(x7791,f41(f41(f36(x7793),x7792),x7794),x7793)
% 14.42/14.43 [780]~P20(x7803)+P10(x7801,x7802,x7803)+P10(x7801,x7804,x7803)+~P10(x7801,f41(f41(f36(x7803),x7802),x7804),x7803)
% 14.42/14.43 [781]~P20(x7813)+P12(x7811,x7812,x7813)+P12(x7814,x7812,x7813)+~P12(f41(f41(f35(x7813),x7811),x7814),x7812,x7813)
% 14.42/14.43 [782]~P20(x7823)+P10(x7821,x7822,x7823)+P10(x7824,x7822,x7823)+~P10(f41(f41(f35(x7823),x7821),x7824),x7822,x7823)
% 14.42/14.43 [1004]~P9(x10041,x10043)+~P16(x10044,x10041,x10043)+~P16(x10042,x10041,x10043)+P12(f5(f4(f4(x10041,f37(x10042,f29(f43(x10043,a2)),x10043),f43(x10043,a2)),f37(x10044,f29(f43(x10043,a2)),x10043),f43(x10043,a2)),x10043),f5(x10041,x10043),a1)
% 14.42/14.43 [734]~P27(x7343)+~P12(x7344,x7345,x7343)+P12(x7341,x7342,x7343)+~E(f4(x7344,x7345,x7343),f4(x7341,x7342,x7343))
% 14.42/14.43 [735]~P27(x7353)+~P12(x7354,x7355,x7353)+P12(x7351,x7352,x7353)+~E(f4(x7351,x7352,x7353),f4(x7354,x7355,x7353))
% 14.42/14.43 [736]~P27(x7363)+~P10(x7365,x7364,x7363)+P10(x7361,x7362,x7363)+~E(f4(x7364,x7365,x7363),f4(x7362,x7361,x7363))
% 14.42/14.43 [737]~P27(x7373)+~P10(x7375,x7374,x7373)+P10(x7371,x7372,x7373)+~E(f4(x7372,x7371,x7373),f4(x7374,x7375,x7373))
% 14.42/14.43 [957]~P9(x9573,x9574)+~P13(x9575,x9571,x9572,x9574)+~P10(f38(x9575,x9571,x9572,x9574),x9573,f43(x9574,a2))+P10(f5(x9571,x9572),f5(x9573,x9574),a1)
% 14.42/14.43 [937]P16(x9373,x9372,x9374)+~P22(x9375)+~P9(x9372,x9374)+E(f23(x9371,f4(x9372,f37(x9373,f29(f43(x9374,a2)),x9374),f43(x9374,a2)),x9374,x9375),f23(x9371,x9372,x9374,x9375))
% 14.42/14.43 [962]~P22(x9625)+~P9(x9622,x9624)+~P16(x9623,x9622,x9624)+E(f23(x9621,f4(x9622,f37(x9623,f29(f43(x9624,a2)),x9624),f43(x9624,a2)),x9624,x9625),f4(f23(x9621,x9622,x9624,x9625),f41(x9621,x9623),x9625))
% 14.42/14.43 [963]~P36(x9635)+~P9(x9632,x9634)+~P16(x9633,x9632,x9634)+E(f23(x9631,f4(x9632,f37(x9633,f29(f43(x9634,a2)),x9634),f43(x9634,a2)),x9634,x9635),f4(f23(x9631,x9632,x9634,x9635),f41(x9631,x9633),x9635))
% 14.42/14.43 [967]~P22(x9674)+~P9(x9672,x9673)+~P10(x9675,x9672,f43(x9673,a2))+E(f4(f23(x9671,x9672,x9673,x9674),f23(x9671,x9675,x9673,x9674),x9674),f23(x9671,f4(x9672,x9675,f43(x9673,a2)),x9673,x9674))
% 14.42/14.43 [1006]~P13(x10061,x10064,x10062,x10065)+~P13(x10061,x10063,x10062,x10065)+P13(x10061,f41(f41(f31(f43(x10062,a2)),x10063),x10064),x10062,x10065)+~E(f41(f41(f32(f43(x10065,a2)),f38(x10061,f4(x10063,x10064,f43(x10062,a2)),x10062,x10065)),f38(x10061,f4(x10064,x10063,f43(x10062,a2)),x10062,x10065)),f29(f43(x10065,a2)))
% 14.42/14.43 [987]~P13(x9872,x9871,x9873,x9874)+~P16(x9875,f38(x9872,x9871,x9873,x9874),x9874)+~P10(x9871,x9876,f43(x9873,a2))+P16(f41(f25(x9871,x9872,x9873,x9874),x9875),x9876,x9873)
% 14.42/14.43 [980]~P13(x9801,x9806,x9803,x9804)+~P10(x9802,x9806,f43(x9803,a2))+~P10(x9805,x9806,f43(x9803,a2))+E(f4(f38(x9801,x9802,x9803,x9804),f38(x9801,x9805,x9803,x9804),f43(x9804,a2)),f38(x9801,f4(x9802,x9805,f43(x9803,a2)),x9803,x9804))
% 14.42/14.43 [991]~P13(x9912,x9916,x9914,x9911)+~P10(x9913,x9916,f43(x9914,a2))+~P10(x9915,x9916,f43(x9914,a2))+E(f41(f41(f32(f43(x9911,a2)),f38(x9912,x9913,x9914,x9911)),f38(x9912,x9915,x9914,x9911)),f38(x9912,f41(f41(f32(f43(x9914,a2)),x9913),x9915),x9914,x9911))
% 14.42/14.43 [697]~P20(x6971)+~P9(x6972,x6971)+~P16(x6973,x6972,x6971)+P16(f10(x6972,x6973,x6971),x6972,x6971)+E(f41(f21(x6971),x6972),x6973)
% 14.42/14.43 [698]~P20(x6981)+~P9(x6982,x6981)+~P16(x6983,x6982,x6981)+P16(f14(x6982,x6983,x6981),x6982,x6981)+E(f41(f22(x6981),x6982),x6983)
% 14.42/14.43 [725]~P20(x7252)+~P9(x7253,x7252)+~P10(x7251,x7253,f43(x7252,a2))+P10(f41(f22(x7252),x7253),f41(f22(x7252),x7251),x7252)+E(x7251,f29(f43(x7252,a2)))
% 14.42/14.43 [726]~P20(x7262)+~P9(x7263,x7262)+~P10(x7261,x7263,f43(x7262,a2))+P10(f41(f21(x7262),x7261),f41(f21(x7262),x7263),x7262)+E(x7261,f29(f43(x7262,a2)))
% 14.42/14.43 [789]~P20(x7891)+~P9(x7892,x7891)+~P16(x7893,x7892,x7891)+~P10(x7893,f14(x7892,x7893,x7891),x7891)+E(f41(f22(x7891),x7892),x7893)
% 14.42/14.43 [790]~P20(x7901)+~P9(x7902,x7901)+~P16(x7903,x7902,x7901)+~P10(f10(x7902,x7903,x7901),x7903,x7901)+E(f41(f21(x7901),x7902),x7903)
% 14.42/14.43 [818]~P20(x8182)+~P9(x8183,x8182)+~P10(x8181,x8183,f43(x8182,a2))+P10(f41(f19(f35(x8182),x8182),x8183),f41(f19(f35(x8182),x8182),x8181),x8182)+E(x8181,f29(f43(x8182,a2)))
% 14.42/14.43 [838]~P9(x8382,x8384)+~P10(x8382,x8383,f43(x8384,a2))+P9(f11(x8383,x8381,x8384),x8384)+P34(f41(x8381,x8382))+~P34(f41(x8381,f29(f43(x8384,a2))))
% 14.42/14.43 [853]~P9(x8532,x8534)+P16(f12(x8533,x8531,x8534),x8533,x8534)+~P10(x8532,x8533,f43(x8534,a2))+P34(f41(x8531,x8532))+~P34(f41(x8531,f29(f43(x8534,a2))))
% 14.42/14.43 [873]~P9(x8732,x8734)+~P10(x8732,x8733,f43(x8734,a2))+P34(f41(x8731,x8732))+P34(f41(x8731,f11(x8733,x8731,x8734)))+~P34(f41(x8731,f29(f43(x8734,a2))))
% 14.42/14.43 [902]~P9(x9022,x9023)+~P16(f12(x9024,x9021,x9023),f11(x9024,x9021,x9023),x9023)+~P10(x9022,x9024,f43(x9023,a2))+P34(f41(x9021,x9022))+~P34(f41(x9021,f29(f43(x9023,a2))))
% 14.42/14.43 [981]~P9(x9812,x9813)+~P10(x9812,x9814,f43(x9813,a2))+P34(f41(x9811,x9812))+~P34(f41(x9811,f37(f12(x9814,x9811,x9813),f11(x9814,x9811,x9813),x9813)))+~P34(f41(x9811,f29(f43(x9813,a2))))
% 14.42/14.43 [793]~P29(x7934)+~P9(x7932,x7933)+~P16(x7935,x7932,x7933)+E(f24(x7931,x7932,x7933,x7934),f26(x7934))+~E(f41(x7931,x7935),f26(x7934))
% 14.42/14.43 [939]P16(x9392,x9394,x9395)+~P32(x9393)+~P9(x9394,x9395)+E(f41(x9391,x9392),f26(x9393))+E(f24(x9391,f4(x9394,f37(x9392,f29(f43(x9395,a2)),x9395),f43(x9395,a2)),x9395,x9393),f24(x9391,x9394,x9395,x9393))
% 14.42/14.43 [867]~P16(x8671,x8674,x8675)+E(x8671,x8672)+~P13(x8673,x8674,x8675,x8676)+~P16(x8672,x8674,x8675)+~E(f41(x8673,x8671),f41(x8673,x8672))
% 14.42/14.43 [855]~P20(x8552)+~P9(x8551,x8552)+~P9(x8553,x8552)+E(x8551,f29(f43(x8552,a2)))+E(x8553,f29(f43(x8552,a2)))+E(f41(f41(f36(x8552),f41(f21(x8552),x8553)),f41(f21(x8552),x8551)),f41(f21(x8552),f41(f41(f31(f43(x8552,a2)),x8553),x8551)))
% 14.42/14.43 [856]~P20(x8562)+~P9(x8561,x8562)+~P9(x8563,x8562)+E(x8561,f29(f43(x8562,a2)))+E(x8563,f29(f43(x8562,a2)))+E(f41(f41(f35(x8562),f41(f22(x8562),x8563)),f41(f22(x8562),x8561)),f41(f22(x8562),f41(f41(f31(f43(x8562,a2)),x8563),x8561)))
% 14.42/14.43 [786]~P20(x7862)+~P9(x7861,x7862)+~P16(x7864,x7861,x7862)+~P12(x7864,x7863,x7862)+P12(f41(f19(f35(x7862),x7862),x7861),x7863,x7862)+E(x7861,f29(f43(x7862,a2)))
% 14.42/14.43 [787]~P20(x7872)+~P9(x7871,x7872)+~P10(x7874,x7873,x7872)+~P16(x7874,x7871,x7872)+P10(f41(f19(f35(x7872),x7872),x7871),x7873,x7872)+E(x7871,f29(f43(x7872,a2)))
% 14.42/14.43 [821]~P20(x8212)+~P9(x8211,x8212)+~P16(x8214,x8211,x8212)+P12(x8213,x8214,x8212)+~P12(x8213,f41(f19(f35(x8212),x8212),x8211),x8212)+E(x8211,f29(f43(x8212,a2)))
% 14.42/14.43 [822]~P2(x8222)+~P9(x8221,x8222)+~P16(x8224,x8221,x8222)+P10(x8223,x8224,x8222)+~P10(x8223,f41(f19(f32(x8222),x8222),x8221),x8222)+E(x8221,f29(f43(x8222,a2)))
% 14.42/14.43 [990]~P9(x9903,x9904)+~P9(x9901,x9902)+~P13(x9905,x9901,x9902,x9904)+~P13(x9906,x9903,x9904,x9902)+~P10(f38(x9905,x9901,x9902,x9904),x9903,f43(x9904,a2))+~P10(f38(x9906,x9903,x9904,x9902),x9901,f43(x9902,a2))+E(f5(x9901,x9902),f5(x9903,x9904))
% 14.42/14.43 %EqnAxiom
% 14.42/14.43 [1]E(x11,x11)
% 14.42/14.43 [2]E(x22,x21)+~E(x21,x22)
% 14.42/14.43 [3]E(x31,x33)+~E(x31,x32)+~E(x32,x33)
% 14.42/14.43 [4]~E(x41,x42)+E(f4(x41,x43,x44),f4(x42,x43,x44))
% 14.42/14.43 [5]~E(x51,x52)+E(f4(x53,x51,x54),f4(x53,x52,x54))
% 14.42/14.43 [6]~E(x61,x62)+E(f4(x63,x64,x61),f4(x63,x64,x62))
% 14.42/14.43 [7]~E(x71,x72)+E(f26(x71),f26(x72))
% 14.42/14.43 [8]~E(x81,x82)+E(f20(x81,x83,x84,x85,x86),f20(x82,x83,x84,x85,x86))
% 14.42/14.43 [9]~E(x91,x92)+E(f20(x93,x91,x94,x95,x96),f20(x93,x92,x94,x95,x96))
% 14.42/14.43 [10]~E(x101,x102)+E(f20(x103,x104,x101,x105,x106),f20(x103,x104,x102,x105,x106))
% 14.42/14.43 [11]~E(x111,x112)+E(f20(x113,x114,x115,x111,x116),f20(x113,x114,x115,x112,x116))
% 14.42/14.43 [12]~E(x121,x122)+E(f20(x123,x124,x125,x126,x121),f20(x123,x124,x125,x126,x122))
% 14.42/14.43 [13]~E(x131,x132)+E(f41(x131,x133),f41(x132,x133))
% 14.42/14.43 [14]~E(x141,x142)+E(f41(x143,x141),f41(x143,x142))
% 14.42/14.43 [15]~E(x151,x152)+E(f43(x151,x153),f43(x152,x153))
% 14.42/14.43 [16]~E(x161,x162)+E(f43(x163,x161),f43(x163,x162))
% 14.42/14.43 [17]~E(x171,x172)+E(f38(x171,x173,x174,x175),f38(x172,x173,x174,x175))
% 14.42/14.43 [18]~E(x181,x182)+E(f38(x183,x181,x184,x185),f38(x183,x182,x184,x185))
% 14.42/14.43 [19]~E(x191,x192)+E(f38(x193,x194,x191,x195),f38(x193,x194,x192,x195))
% 14.42/14.43 [20]~E(x201,x202)+E(f38(x203,x204,x205,x201),f38(x203,x204,x205,x202))
% 14.42/14.43 [21]~E(x211,x212)+E(f37(x211,x213,x214),f37(x212,x213,x214))
% 14.42/14.43 [22]~E(x221,x222)+E(f37(x223,x221,x224),f37(x223,x222,x224))
% 14.42/14.43 [23]~E(x231,x232)+E(f37(x233,x234,x231),f37(x233,x234,x232))
% 14.42/14.43 [24]~E(x241,x242)+E(f27(x241,x243),f27(x242,x243))
% 14.42/14.43 [25]~E(x251,x252)+E(f27(x253,x251),f27(x253,x252))
% 14.42/14.43 [26]~E(x261,x262)+E(f28(x261),f28(x262))
% 14.42/14.43 [27]~E(x271,x272)+E(f31(x271),f31(x272))
% 14.42/14.43 [28]~E(x281,x282)+E(f32(x281),f32(x282))
% 14.42/14.43 [29]~E(x291,x292)+E(f36(x291),f36(x292))
% 14.42/14.43 [30]~E(x301,x302)+E(f39(x301,x303,x304,x305),f39(x302,x303,x304,x305))
% 14.42/14.43 [31]~E(x311,x312)+E(f39(x313,x311,x314,x315),f39(x313,x312,x314,x315))
% 14.42/14.43 [32]~E(x321,x322)+E(f39(x323,x324,x321,x325),f39(x323,x324,x322,x325))
% 14.42/14.43 [33]~E(x331,x332)+E(f39(x333,x334,x335,x331),f39(x333,x334,x335,x332))
% 14.42/14.43 [34]~E(x341,x342)+E(f35(x341),f35(x342))
% 14.42/14.43 [35]~E(x351,x352)+E(f25(x351,x353,x354,x355),f25(x352,x353,x354,x355))
% 14.42/14.43 [36]~E(x361,x362)+E(f25(x363,x361,x364,x365),f25(x363,x362,x364,x365))
% 14.42/14.43 [37]~E(x371,x372)+E(f25(x373,x374,x371,x375),f25(x373,x374,x372,x375))
% 14.42/14.43 [38]~E(x381,x382)+E(f25(x383,x384,x385,x381),f25(x383,x384,x385,x382))
% 14.42/14.43 [39]~E(x391,x392)+E(f5(x391,x393),f5(x392,x393))
% 14.42/14.43 [40]~E(x401,x402)+E(f5(x403,x401),f5(x403,x402))
% 14.42/14.43 [41]~E(x411,x412)+E(f34(x411),f34(x412))
% 14.42/14.43 [42]~E(x421,x422)+E(f29(x421),f29(x422))
% 14.42/14.43 [43]~E(x431,x432)+E(f19(x431,x433),f19(x432,x433))
% 14.42/14.43 [44]~E(x441,x442)+E(f19(x443,x441),f19(x443,x442))
% 14.42/14.43 [45]~E(x451,x452)+E(f22(x451),f22(x452))
% 14.42/14.43 [46]~E(x461,x462)+E(f23(x461,x463,x464,x465),f23(x462,x463,x464,x465))
% 14.42/14.43 [47]~E(x471,x472)+E(f23(x473,x471,x474,x475),f23(x473,x472,x474,x475))
% 14.42/14.43 [48]~E(x481,x482)+E(f23(x483,x484,x481,x485),f23(x483,x484,x482,x485))
% 14.42/14.43 [49]~E(x491,x492)+E(f23(x493,x494,x495,x491),f23(x493,x494,x495,x492))
% 14.42/14.43 [50]~E(x501,x502)+E(f24(x501,x503,x504,x505),f24(x502,x503,x504,x505))
% 14.42/14.43 [51]~E(x511,x512)+E(f24(x513,x511,x514,x515),f24(x513,x512,x514,x515))
% 14.42/14.43 [52]~E(x521,x522)+E(f24(x523,x524,x521,x525),f24(x523,x524,x522,x525))
% 14.42/14.43 [53]~E(x531,x532)+E(f24(x533,x534,x535,x531),f24(x533,x534,x535,x532))
% 14.42/14.43 [54]~E(x541,x542)+E(f10(x541,x543,x544),f10(x542,x543,x544))
% 14.42/14.43 [55]~E(x551,x552)+E(f10(x553,x551,x554),f10(x553,x552,x554))
% 14.42/14.43 [56]~E(x561,x562)+E(f10(x563,x564,x561),f10(x563,x564,x562))
% 14.42/14.43 [57]~E(x571,x572)+E(f18(x571,x573,x574,x575,x576),f18(x572,x573,x574,x575,x576))
% 14.42/14.43 [58]~E(x581,x582)+E(f18(x583,x581,x584,x585,x586),f18(x583,x582,x584,x585,x586))
% 14.42/14.43 [59]~E(x591,x592)+E(f18(x593,x594,x591,x595,x596),f18(x593,x594,x592,x595,x596))
% 14.42/14.43 [60]~E(x601,x602)+E(f18(x603,x604,x605,x601,x606),f18(x603,x604,x605,x602,x606))
% 14.42/14.43 [61]~E(x611,x612)+E(f18(x613,x614,x615,x616,x611),f18(x613,x614,x615,x616,x612))
% 14.42/14.43 [62]~E(x621,x622)+E(f49(x621),f49(x622))
% 14.42/14.43 [63]~E(x631,x632)+E(f14(x631,x633,x634),f14(x632,x633,x634))
% 14.42/14.43 [64]~E(x641,x642)+E(f14(x643,x641,x644),f14(x643,x642,x644))
% 14.42/14.43 [65]~E(x651,x652)+E(f14(x653,x654,x651),f14(x653,x654,x652))
% 14.42/14.43 [66]~E(x661,x662)+E(f7(x661,x663,x664),f7(x662,x663,x664))
% 14.42/14.43 [67]~E(x671,x672)+E(f7(x673,x671,x674),f7(x673,x672,x674))
% 14.42/14.43 [68]~E(x681,x682)+E(f7(x683,x684,x681),f7(x683,x684,x682))
% 14.42/14.43 [69]~E(x691,x692)+E(f21(x691),f21(x692))
% 14.42/14.43 [70]~E(x701,x702)+E(f8(x701,x703,x704),f8(x702,x703,x704))
% 14.42/14.43 [71]~E(x711,x712)+E(f8(x713,x711,x714),f8(x713,x712,x714))
% 14.42/14.43 [72]~E(x721,x722)+E(f8(x723,x724,x721),f8(x723,x724,x722))
% 14.42/14.43 [73]~E(x731,x732)+E(f17(x731,x733,x734,x735,x736),f17(x732,x733,x734,x735,x736))
% 14.42/14.43 [74]~E(x741,x742)+E(f17(x743,x741,x744,x745,x746),f17(x743,x742,x744,x745,x746))
% 14.42/14.43 [75]~E(x751,x752)+E(f17(x753,x754,x751,x755,x756),f17(x753,x754,x752,x755,x756))
% 14.42/14.43 [76]~E(x761,x762)+E(f17(x763,x764,x765,x761,x766),f17(x763,x764,x765,x762,x766))
% 14.42/14.43 [77]~E(x771,x772)+E(f17(x773,x774,x775,x776,x771),f17(x773,x774,x775,x776,x772))
% 14.42/14.43 [78]~E(x781,x782)+E(f13(x781,x783,x784,x785,x786),f13(x782,x783,x784,x785,x786))
% 14.42/14.43 [79]~E(x791,x792)+E(f13(x793,x791,x794,x795,x796),f13(x793,x792,x794,x795,x796))
% 14.42/14.43 [80]~E(x801,x802)+E(f13(x803,x804,x801,x805,x806),f13(x803,x804,x802,x805,x806))
% 14.42/14.43 [81]~E(x811,x812)+E(f13(x813,x814,x815,x811,x816),f13(x813,x814,x815,x812,x816))
% 14.42/14.43 [82]~E(x821,x822)+E(f13(x823,x824,x825,x826,x821),f13(x823,x824,x825,x826,x822))
% 14.42/14.43 [83]~E(x831,x832)+E(f50(x831,x833,x834,x835),f50(x832,x833,x834,x835))
% 14.42/14.43 [84]~E(x841,x842)+E(f50(x843,x841,x844,x845),f50(x843,x842,x844,x845))
% 14.42/14.43 [85]~E(x851,x852)+E(f50(x853,x854,x851,x855),f50(x853,x854,x852,x855))
% 14.42/14.43 [86]~E(x861,x862)+E(f50(x863,x864,x865,x861),f50(x863,x864,x865,x862))
% 14.42/14.43 [87]~E(x871,x872)+E(f11(x871,x873,x874),f11(x872,x873,x874))
% 14.42/14.43 [88]~E(x881,x882)+E(f11(x883,x881,x884),f11(x883,x882,x884))
% 14.42/14.43 [89]~E(x891,x892)+E(f11(x893,x894,x891),f11(x893,x894,x892))
% 14.42/14.43 [90]~E(x901,x902)+E(f16(x901,x903,x904,x905),f16(x902,x903,x904,x905))
% 14.42/14.43 [91]~E(x911,x912)+E(f16(x913,x911,x914,x915),f16(x913,x912,x914,x915))
% 14.42/14.43 [92]~E(x921,x922)+E(f16(x923,x924,x921,x925),f16(x923,x924,x922,x925))
% 14.42/14.43 [93]~E(x931,x932)+E(f16(x933,x934,x935,x931),f16(x933,x934,x935,x932))
% 14.42/14.43 [94]~E(x941,x942)+E(f33(x941,x943),f33(x942,x943))
% 14.42/14.43 [95]~E(x951,x952)+E(f33(x953,x951),f33(x953,x952))
% 14.42/14.43 [96]~E(x961,x962)+E(f12(x961,x963,x964),f12(x962,x963,x964))
% 14.42/14.43 [97]~E(x971,x972)+E(f12(x973,x971,x974),f12(x973,x972,x974))
% 14.42/14.43 [98]~E(x981,x982)+E(f12(x983,x984,x981),f12(x983,x984,x982))
% 14.42/14.43 [99]~E(x991,x992)+E(f9(x991,x993,x994),f9(x992,x993,x994))
% 14.42/14.43 [100]~E(x1001,x1002)+E(f9(x1003,x1001,x1004),f9(x1003,x1002,x1004))
% 14.42/14.43 [101]~E(x1011,x1012)+E(f9(x1013,x1014,x1011),f9(x1013,x1014,x1012))
% 14.42/14.43 [102]~E(x1021,x1022)+E(f30(x1021,x1023,x1024),f30(x1022,x1023,x1024))
% 14.42/14.43 [103]~E(x1031,x1032)+E(f30(x1033,x1031,x1034),f30(x1033,x1032,x1034))
% 14.42/14.43 [104]~E(x1041,x1042)+E(f30(x1043,x1044,x1041),f30(x1043,x1044,x1042))
% 14.42/14.43 [105]~E(x1051,x1052)+E(f15(x1051,x1053,x1054,x1055),f15(x1052,x1053,x1054,x1055))
% 14.42/14.43 [106]~E(x1061,x1062)+E(f15(x1063,x1061,x1064,x1065),f15(x1063,x1062,x1064,x1065))
% 14.42/14.43 [107]~E(x1071,x1072)+E(f15(x1073,x1074,x1071,x1075),f15(x1073,x1074,x1072,x1075))
% 14.42/14.43 [108]~E(x1081,x1082)+E(f15(x1083,x1084,x1085,x1081),f15(x1083,x1084,x1085,x1082))
% 14.42/14.43 [109]~P1(x1091)+P1(x1092)+~E(x1091,x1092)
% 14.42/14.43 [110]P15(x1102,x1103,x1104,x1105,x1106,x1107)+~E(x1101,x1102)+~P15(x1101,x1103,x1104,x1105,x1106,x1107)
% 14.42/14.43 [111]P15(x1113,x1112,x1114,x1115,x1116,x1117)+~E(x1111,x1112)+~P15(x1113,x1111,x1114,x1115,x1116,x1117)
% 14.42/14.43 [112]P15(x1123,x1124,x1122,x1125,x1126,x1127)+~E(x1121,x1122)+~P15(x1123,x1124,x1121,x1125,x1126,x1127)
% 14.42/14.43 [113]P15(x1133,x1134,x1135,x1132,x1136,x1137)+~E(x1131,x1132)+~P15(x1133,x1134,x1135,x1131,x1136,x1137)
% 14.42/14.43 [114]P15(x1143,x1144,x1145,x1146,x1142,x1147)+~E(x1141,x1142)+~P15(x1143,x1144,x1145,x1146,x1141,x1147)
% 14.42/14.43 [115]P15(x1153,x1154,x1155,x1156,x1157,x1152)+~E(x1151,x1152)+~P15(x1153,x1154,x1155,x1156,x1157,x1151)
% 14.42/14.43 [116]~P18(x1161)+P18(x1162)+~E(x1161,x1162)
% 14.42/14.43 [117]P13(x1172,x1173,x1174,x1175)+~E(x1171,x1172)+~P13(x1171,x1173,x1174,x1175)
% 14.42/14.43 [118]P13(x1183,x1182,x1184,x1185)+~E(x1181,x1182)+~P13(x1183,x1181,x1184,x1185)
% 14.42/14.43 [119]P13(x1193,x1194,x1192,x1195)+~E(x1191,x1192)+~P13(x1193,x1194,x1191,x1195)
% 14.42/14.43 [120]P13(x1203,x1204,x1205,x1202)+~E(x1201,x1202)+~P13(x1203,x1204,x1205,x1201)
% 14.42/14.43 [121]~P19(x1211)+P19(x1212)+~E(x1211,x1212)
% 14.42/14.43 [122]P10(x1222,x1223,x1224)+~E(x1221,x1222)+~P10(x1221,x1223,x1224)
% 14.42/14.43 [123]P10(x1233,x1232,x1234)+~E(x1231,x1232)+~P10(x1233,x1231,x1234)
% 14.42/14.43 [124]P10(x1243,x1244,x1242)+~E(x1241,x1242)+~P10(x1243,x1244,x1241)
% 14.42/14.43 [125]~P20(x1251)+P20(x1252)+~E(x1251,x1252)
% 14.42/14.43 [126]~P2(x1261)+P2(x1262)+~E(x1261,x1262)
% 14.42/14.43 [127]P16(x1272,x1273,x1274)+~E(x1271,x1272)+~P16(x1271,x1273,x1274)
% 14.42/14.43 [128]P16(x1283,x1282,x1284)+~E(x1281,x1282)+~P16(x1283,x1281,x1284)
% 14.42/14.43 [129]P16(x1293,x1294,x1292)+~E(x1291,x1292)+~P16(x1293,x1294,x1291)
% 14.42/14.43 [130]~P3(x1301)+P3(x1302)+~E(x1301,x1302)
% 14.42/14.43 [131]P12(x1312,x1313,x1314)+~E(x1311,x1312)+~P12(x1311,x1313,x1314)
% 14.42/14.43 [132]P12(x1323,x1322,x1324)+~E(x1321,x1322)+~P12(x1323,x1321,x1324)
% 14.42/14.43 [133]P12(x1333,x1334,x1332)+~E(x1331,x1332)+~P12(x1333,x1334,x1331)
% 14.42/14.43 [134]~P4(x1341)+P4(x1342)+~E(x1341,x1342)
% 14.42/14.43 [135]~P34(x1351)+P34(x1352)+~E(x1351,x1352)
% 14.42/14.43 [136]~P5(x1361)+P5(x1362)+~E(x1361,x1362)
% 14.42/14.43 [137]~P6(x1371)+P6(x1372)+~E(x1371,x1372)
% 14.42/14.43 [138]~P21(x1381)+P21(x1382)+~E(x1381,x1382)
% 14.42/14.43 [139]~P7(x1391)+P7(x1392)+~E(x1391,x1392)
% 14.42/14.43 [140]~P27(x1401)+P27(x1402)+~E(x1401,x1402)
% 14.42/14.43 [141]~P28(x1411)+P28(x1412)+~E(x1411,x1412)
% 14.42/14.43 [142]~P29(x1421)+P29(x1422)+~E(x1421,x1422)
% 14.42/14.43 [143]~P30(x1431)+P30(x1432)+~E(x1431,x1432)
% 14.42/14.43 [144]~P8(x1441)+P8(x1442)+~E(x1441,x1442)
% 14.42/14.43 [145]~P33(x1451)+P33(x1452)+~E(x1451,x1452)
% 14.42/14.43 [146]~P23(x1461)+P23(x1462)+~E(x1461,x1462)
% 14.42/14.43 [147]~P25(x1471)+P25(x1472)+~E(x1471,x1472)
% 14.42/14.43 [148]P9(x1482,x1483)+~E(x1481,x1482)+~P9(x1481,x1483)
% 14.42/14.43 [149]P9(x1493,x1492)+~E(x1491,x1492)+~P9(x1493,x1491)
% 14.42/14.43 [150]~P17(x1501)+P17(x1502)+~E(x1501,x1502)
% 14.42/14.43 [151]~P26(x1511)+P26(x1512)+~E(x1511,x1512)
% 14.42/14.43 [152]P11(x1522,x1523,x1524)+~E(x1521,x1522)+~P11(x1521,x1523,x1524)
% 14.42/14.43 [153]P11(x1533,x1532,x1534)+~E(x1531,x1532)+~P11(x1533,x1531,x1534)
% 14.42/14.43 [154]P11(x1543,x1544,x1542)+~E(x1541,x1542)+~P11(x1543,x1544,x1541)
% 14.42/14.43 [155]~P31(x1551)+P31(x1552)+~E(x1551,x1552)
% 14.42/14.43 [156]~P22(x1561)+P22(x1562)+~E(x1561,x1562)
% 14.42/14.43 [157]~P35(x1571)+P35(x1572)+~E(x1571,x1572)
% 14.42/14.43 [158]~P24(x1581)+P24(x1582)+~E(x1581,x1582)
% 14.42/14.43 [159]P14(x1592,x1593,x1594,x1595,x1596,x1597)+~E(x1591,x1592)+~P14(x1591,x1593,x1594,x1595,x1596,x1597)
% 14.42/14.43 [160]P14(x1603,x1602,x1604,x1605,x1606,x1607)+~E(x1601,x1602)+~P14(x1603,x1601,x1604,x1605,x1606,x1607)
% 14.42/14.43 [161]P14(x1613,x1614,x1612,x1615,x1616,x1617)+~E(x1611,x1612)+~P14(x1613,x1614,x1611,x1615,x1616,x1617)
% 14.42/14.43 [162]P14(x1623,x1624,x1625,x1622,x1626,x1627)+~E(x1621,x1622)+~P14(x1623,x1624,x1625,x1621,x1626,x1627)
% 14.42/14.43 [163]P14(x1633,x1634,x1635,x1636,x1632,x1637)+~E(x1631,x1632)+~P14(x1633,x1634,x1635,x1636,x1631,x1637)
% 14.42/14.43 [164]P14(x1643,x1644,x1645,x1646,x1647,x1642)+~E(x1641,x1642)+~P14(x1643,x1644,x1645,x1646,x1647,x1641)
% 14.42/14.43 [165]~P36(x1651)+P36(x1652)+~E(x1651,x1652)
% 14.42/14.43 [166]~P32(x1661)+P32(x1662)+~E(x1661,x1662)
% 14.42/14.43
% 14.42/14.43 %-------------------------------------------
% 14.42/14.45 cnf(1014,plain,
% 14.42/14.45 (E(a46,f38(a48,a45,a3,a42))),
% 14.42/14.45 inference(scs_inference,[],[241,2])).
% 14.42/14.45 cnf(1015,plain,
% 14.42/14.45 (~P12(f28(x10151),x10151,a1)),
% 14.42/14.45 inference(scs_inference,[],[241,340,2,458])).
% 14.42/14.45 cnf(1017,plain,
% 14.42/14.45 (P10(x10171,f28(x10171),a1)),
% 14.42/14.45 inference(scs_inference,[],[241,340,2,458,426])).
% 14.42/14.45 cnf(1019,plain,
% 14.42/14.45 (~P12(x10191,x10191,a2)),
% 14.42/14.45 inference(scs_inference,[],[172,241,340,2,458,426,417])).
% 14.42/14.45 cnf(1021,plain,
% 14.42/14.45 (~P11(f28(x10211),x10211,x10212)),
% 14.42/14.45 inference(scs_inference,[],[172,241,330,340,2,458,426,417,412])).
% 14.42/14.45 cnf(1023,plain,
% 14.42/14.45 (P9(x10231,a2)),
% 14.42/14.45 inference(scs_inference,[],[172,188,241,330,340,2,458,426,417,412,354])).
% 14.42/14.45 cnf(1025,plain,
% 14.42/14.45 (~P12(x10251,f4(x10251,x10252,a1),a1)),
% 14.42/14.45 inference(scs_inference,[],[336,172,188,241,330,340,2,458,426,417,412,354,630])).
% 14.42/14.45 cnf(1026,plain,
% 14.42/14.45 (~P12(x10261,x10261,a1)),
% 14.42/14.45 inference(rename_variables,[],[336])).
% 14.42/14.45 cnf(1028,plain,
% 14.42/14.45 (~P10(f28(f28(x10281)),x10281,a1)),
% 14.42/14.45 inference(scs_inference,[],[336,172,188,241,330,340,2,458,426,417,412,354,630,540])).
% 14.42/14.45 cnf(1030,plain,
% 14.42/14.45 (P10(x10301,f28(f28(x10301)),a1)),
% 14.42/14.45 inference(scs_inference,[],[336,172,188,241,330,340,2,458,426,417,412,354,630,540,484])).
% 14.42/14.45 cnf(1034,plain,
% 14.42/14.45 (P12(x10341,f28(f28(f28(x10341))),a1)),
% 14.42/14.45 inference(scs_inference,[],[336,172,188,241,330,340,2,458,426,417,412,354,630,540,484,483,481])).
% 14.42/14.45 cnf(1036,plain,
% 14.42/14.45 (~P10(f28(f28(f28(x10361))),x10361,a1)),
% 14.42/14.45 inference(scs_inference,[],[336,172,188,241,330,340,2,458,426,417,412,354,630,540,484,483,481,471])).
% 14.42/14.45 cnf(1040,plain,
% 14.42/14.45 (~P30(a1)),
% 14.42/14.45 inference(scs_inference,[],[336,172,188,241,330,340,2,458,426,417,412,354,630,540,484,483,481,471,468,399])).
% 14.42/14.46 cnf(1046,plain,
% 14.42/14.46 (P16(x10461,f37(x10461,x10462,x10463),x10464)),
% 14.42/14.46 inference(scs_inference,[],[336,172,188,241,351,330,340,244,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425])).
% 14.42/14.46 cnf(1048,plain,
% 14.42/14.46 (~P10(f37(f49(a44),f29(f43(a42,a2)),a42),a46,f43(a42,a2))),
% 14.42/14.46 inference(scs_inference,[],[336,172,188,241,351,330,340,244,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569])).
% 14.42/14.46 cnf(1051,plain,
% 14.42/14.46 (~E(f28(x10511),x10511)),
% 14.42/14.46 inference(rename_variables,[],[330])).
% 14.42/14.46 cnf(1054,plain,
% 14.42/14.46 (P10(x10541,f37(x10542,x10541,x10543),f43(x10543,a2))),
% 14.42/14.46 inference(rename_variables,[],[234])).
% 14.42/14.46 cnf(1057,plain,
% 14.42/14.46 (~E(f28(x10571),x10571)),
% 14.42/14.46 inference(rename_variables,[],[330])).
% 14.42/14.46 cnf(1060,plain,
% 14.42/14.46 (P10(x10601,f37(x10602,x10601,x10603),f43(x10603,a2))),
% 14.42/14.46 inference(rename_variables,[],[234])).
% 14.42/14.46 cnf(1063,plain,
% 14.42/14.46 (P10(x10631,f37(x10632,x10631,x10633),f43(x10633,a2))),
% 14.42/14.46 inference(rename_variables,[],[234])).
% 14.42/14.46 cnf(1066,plain,
% 14.42/14.46 (P10(f4(x10661,x10662,f43(x10663,a2)),x10661,f43(x10663,a2))),
% 14.42/14.46 inference(rename_variables,[],[240])).
% 14.42/14.46 cnf(1069,plain,
% 14.42/14.46 (P10(f4(x10691,x10692,f43(x10693,a2)),x10691,f43(x10693,a2))),
% 14.42/14.46 inference(rename_variables,[],[240])).
% 14.42/14.46 cnf(1072,plain,
% 14.42/14.46 (P10(x10721,f37(x10722,x10721,x10723),f43(x10723,a2))),
% 14.42/14.46 inference(rename_variables,[],[234])).
% 14.42/14.46 cnf(1076,plain,
% 14.42/14.46 (~P10(f28(f29(f43(x10761,a2))),f27(f28(f29(f43(x10761,a2))),f43(x10761,a2)),f43(x10761,a2))),
% 14.42/14.46 inference(scs_inference,[],[336,172,188,241,278,351,330,1051,1057,340,234,1054,1060,1063,244,240,1066,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675])).
% 14.42/14.46 cnf(1077,plain,
% 14.42/14.46 (~E(f28(x10771),x10771)),
% 14.42/14.46 inference(rename_variables,[],[330])).
% 14.42/14.46 cnf(1079,plain,
% 14.42/14.46 (~P16(x10791,f39(x10792,f29(f43(x10793,a2)),x10794,x10793),x10794)),
% 14.42/14.46 inference(scs_inference,[],[336,172,188,241,278,351,330,1051,1057,340,234,1054,1060,1063,347,244,240,1066,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914])).
% 14.42/14.46 cnf(1080,plain,
% 14.42/14.46 (~P16(x10801,f29(f43(x10802,a2)),x10802)),
% 14.42/14.46 inference(rename_variables,[],[347])).
% 14.42/14.46 cnf(1094,plain,
% 14.42/14.46 (P10(x10941,x10941,f43(x10942,a2))),
% 14.42/14.46 inference(rename_variables,[],[210])).
% 14.42/14.46 cnf(1101,plain,
% 14.42/14.46 (P9(f29(f43(x11011,a2)),x11011)),
% 14.42/14.46 inference(rename_variables,[],[206])).
% 14.42/14.46 cnf(1102,plain,
% 14.42/14.46 (~P30(f20(a1,x11021,f41(a1,x11021),x11022,x11023))),
% 14.42/14.46 inference(scs_inference,[],[195,336,172,188,241,278,351,210,330,1051,1057,340,326,234,1054,1060,1063,347,309,206,244,240,1066,349,246,262,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143])).
% 14.42/14.46 cnf(1103,plain,
% 14.42/14.46 (E(f20(x11031,x11032,f41(x11031,x11032),x11033,x11034),x11031)),
% 14.42/14.46 inference(rename_variables,[],[309])).
% 14.42/14.46 cnf(1105,plain,
% 14.42/14.46 (E(f20(x11051,x11052,f41(x11051,x11052),x11053,x11054),x11051)),
% 14.42/14.46 inference(rename_variables,[],[309])).
% 14.42/14.46 cnf(1107,plain,
% 14.42/14.46 (~P12(x11071,x11071,a1)),
% 14.42/14.46 inference(rename_variables,[],[336])).
% 14.42/14.46 cnf(1108,plain,
% 14.42/14.46 (~E(x11081,f28(x11081))),
% 14.42/14.46 inference(scs_inference,[],[195,336,1026,1107,172,188,241,278,351,210,330,1051,1057,201,340,326,234,1054,1060,1063,347,231,309,1103,206,244,240,1066,349,246,262,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131])).
% 14.42/14.46 cnf(1109,plain,
% 14.42/14.46 (~P12(x11091,x11091,a1)),
% 14.42/14.46 inference(rename_variables,[],[336])).
% 14.42/14.46 cnf(1111,plain,
% 14.42/14.46 (P16(x11111,f34(f43(x11112,a2)),x11112)),
% 14.42/14.46 inference(rename_variables,[],[212])).
% 14.42/14.46 cnf(1112,plain,
% 14.42/14.46 (~E(f38(x11121,f34(f43(x11122,a2)),x11122,x11123),f29(f43(x11123,a2)))),
% 14.42/14.46 inference(scs_inference,[],[195,336,1026,1107,172,188,241,278,351,210,330,1051,1057,201,340,326,234,1054,1060,1063,212,347,1080,231,309,1103,206,244,240,1066,349,286,246,262,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128])).
% 14.42/14.46 cnf(1113,plain,
% 14.42/14.46 (P16(f41(x11131,x11132),f38(x11131,f34(f43(x11133,a2)),x11133,x11134),x11134)),
% 14.42/14.46 inference(rename_variables,[],[286])).
% 14.42/14.46 cnf(1114,plain,
% 14.42/14.46 (~P16(x11141,f29(f43(x11142,a2)),x11142)),
% 14.42/14.46 inference(rename_variables,[],[347])).
% 14.42/14.46 cnf(1115,plain,
% 14.42/14.46 (P16(a46,f37(f38(a48,a45,a3,a42),x11151,x11152),x11152)),
% 14.42/14.46 inference(scs_inference,[],[195,336,1026,1107,172,188,241,278,351,230,210,330,1051,1057,201,340,326,234,1054,1060,1063,212,347,1080,231,309,1103,206,244,240,1066,349,286,246,262,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127])).
% 14.42/14.46 cnf(1116,plain,
% 14.42/14.46 (P16(x11161,f37(x11161,x11162,x11163),x11163)),
% 14.42/14.46 inference(rename_variables,[],[230])).
% 14.42/14.46 cnf(1118,plain,
% 14.42/14.46 (P10(x11181,x11181,f43(x11182,a2))),
% 14.42/14.46 inference(rename_variables,[],[210])).
% 14.42/14.46 cnf(1120,plain,
% 14.42/14.46 (P10(f26(a1),x11201,a1)),
% 14.42/14.46 inference(rename_variables,[],[197])).
% 14.42/14.46 cnf(1121,plain,
% 14.42/14.46 (~P10(f28(x11211),x11211,a1)),
% 14.42/14.46 inference(rename_variables,[],[340])).
% 14.42/14.46 cnf(1127,plain,
% 14.42/14.46 (~E(f28(x11271),x11271)),
% 14.42/14.46 inference(rename_variables,[],[330])).
% 14.42/14.46 cnf(1129,plain,
% 14.42/14.46 (P10(f4(x11291,x11292,a1),x11291,a1)),
% 14.42/14.46 inference(rename_variables,[],[227])).
% 14.42/14.46 cnf(1130,plain,
% 14.42/14.46 (P10(f26(a1),x11301,a1)),
% 14.42/14.46 inference(rename_variables,[],[197])).
% 14.42/14.46 cnf(1135,plain,
% 14.42/14.46 (P10(f26(a1),x11351,a1)),
% 14.42/14.46 inference(rename_variables,[],[197])).
% 14.42/14.46 cnf(1138,plain,
% 14.42/14.46 (P10(f4(x11381,x11382,f43(x11383,a2)),x11381,f43(x11383,a2))),
% 14.42/14.46 inference(rename_variables,[],[240])).
% 14.42/14.46 cnf(1139,plain,
% 14.42/14.46 (P13(x11391,f29(f43(x11392,a2)),x11392,x11393)),
% 14.42/14.46 inference(rename_variables,[],[255])).
% 14.42/14.46 cnf(1142,plain,
% 14.42/14.46 (P10(f4(x11421,x11422,f43(x11423,a2)),x11421,f43(x11423,a2))),
% 14.42/14.46 inference(rename_variables,[],[240])).
% 14.42/14.46 cnf(1144,plain,
% 14.42/14.46 (E(f34(f43(x11441,a2)),f37(x11442,f34(f43(x11441,a2)),x11441))),
% 14.42/14.46 inference(scs_inference,[],[195,336,1026,1107,171,172,188,197,1120,1130,241,278,351,230,210,1094,330,1051,1057,1077,201,340,227,326,327,234,1054,1060,1063,1072,255,212,347,1080,1114,231,309,1103,206,244,240,1066,1069,1138,219,349,286,350,246,262,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636])).
% 14.42/14.46 cnf(1145,plain,
% 14.42/14.46 (P10(x11451,f37(x11452,x11451,x11453),f43(x11453,a2))),
% 14.42/14.46 inference(rename_variables,[],[234])).
% 14.42/14.46 cnf(1149,plain,
% 14.42/14.46 (P10(x11491,f37(x11492,x11491,x11493),f43(x11493,a2))),
% 14.42/14.46 inference(rename_variables,[],[234])).
% 14.42/14.46 cnf(1150,plain,
% 14.42/14.46 (~E(f29(f43(x11501,a2)),f37(x11502,x11503,x11501))),
% 14.42/14.46 inference(rename_variables,[],[344])).
% 14.42/14.46 cnf(1153,plain,
% 14.42/14.46 (P10(f4(x11531,x11532,f43(x11533,a2)),x11531,f43(x11533,a2))),
% 14.42/14.46 inference(rename_variables,[],[240])).
% 14.42/14.46 cnf(1156,plain,
% 14.42/14.46 (P12(x11561,f28(x11561),a1)),
% 14.42/14.46 inference(rename_variables,[],[201])).
% 14.42/14.46 cnf(1160,plain,
% 14.42/14.46 (P10(x11601,f41(f41(f36(a1),x11601),x11602),a1)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,336,1026,1107,192,171,172,173,188,197,1120,1130,241,278,351,230,210,1094,330,1051,1057,1077,201,340,227,326,327,234,1054,1060,1063,1072,1145,255,212,347,1080,1114,231,309,1103,206,244,240,1066,1069,1138,1142,219,344,349,286,350,246,262,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722])).
% 14.42/14.46 cnf(1161,plain,
% 14.42/14.46 (P10(x11611,x11611,a1)),
% 14.42/14.46 inference(rename_variables,[],[194])).
% 14.42/14.46 cnf(1163,plain,
% 14.42/14.46 (P10(x11631,f41(f41(f36(a1),x11632),x11631),a1)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,336,1026,1107,192,171,172,173,188,197,1120,1130,241,278,351,230,210,1094,330,1051,1057,1077,201,340,227,326,327,234,1054,1060,1063,1072,1145,255,212,347,1080,1114,231,309,1103,206,244,240,1066,1069,1138,1142,219,344,349,286,350,246,262,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720])).
% 14.42/14.46 cnf(1164,plain,
% 14.42/14.46 (P10(x11641,x11641,a1)),
% 14.42/14.46 inference(rename_variables,[],[194])).
% 14.42/14.46 cnf(1166,plain,
% 14.42/14.46 (P10(x11661,f41(f41(f31(a1),x11661),x11662),a1)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,336,1026,1107,192,167,171,172,173,188,197,1120,1130,241,278,351,230,210,1094,330,1051,1057,1077,201,340,227,326,327,234,1054,1060,1063,1072,1145,255,212,347,1080,1114,231,309,1103,206,244,240,1066,1069,1138,1142,219,344,349,286,350,246,262,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718])).
% 14.42/14.46 cnf(1167,plain,
% 14.42/14.46 (P10(x11671,x11671,a1)),
% 14.42/14.46 inference(rename_variables,[],[194])).
% 14.42/14.46 cnf(1170,plain,
% 14.42/14.46 (P10(x11701,x11701,a1)),
% 14.42/14.46 inference(rename_variables,[],[194])).
% 14.42/14.46 cnf(1172,plain,
% 14.42/14.46 (P12(x11721,f28(f41(f41(f36(a1),x11721),x11722)),a1)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,336,1026,1107,192,167,171,172,173,188,197,1120,1130,241,278,351,230,210,1094,330,1051,1057,1077,201,1156,340,227,326,327,234,1054,1060,1063,1072,1145,255,212,347,1080,1114,231,309,1103,206,244,240,1066,1069,1138,1142,219,344,349,286,350,246,262,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714])).
% 14.42/14.46 cnf(1173,plain,
% 14.42/14.46 (P12(x11731,f28(x11731),a1)),
% 14.42/14.46 inference(rename_variables,[],[201])).
% 14.42/14.46 cnf(1176,plain,
% 14.42/14.46 (P12(x11761,f28(x11761),a1)),
% 14.42/14.46 inference(rename_variables,[],[201])).
% 14.42/14.46 cnf(1178,plain,
% 14.42/14.46 (P10(f41(f41(f32(a1),x11781),x11782),x11781,a1)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,336,1026,1107,192,167,171,172,173,174,188,197,1120,1130,241,278,351,230,210,1094,330,1051,1057,1077,201,1156,1173,340,227,326,327,234,1054,1060,1063,1072,1145,255,212,347,1080,1114,231,309,1103,206,244,240,1066,1069,1138,1142,219,344,349,286,350,246,262,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712])).
% 14.42/14.46 cnf(1179,plain,
% 14.42/14.46 (P10(x11791,x11791,a1)),
% 14.42/14.46 inference(rename_variables,[],[194])).
% 14.42/14.46 cnf(1182,plain,
% 14.42/14.46 (P10(x11821,x11821,a1)),
% 14.42/14.46 inference(rename_variables,[],[194])).
% 14.42/14.46 cnf(1184,plain,
% 14.42/14.46 (P10(f41(f41(f35(a1),x11841),x11842),x11841,a1)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,336,1026,1107,192,167,171,172,173,174,188,197,1120,1130,241,278,351,230,210,1094,330,1051,1057,1077,201,1156,1173,340,227,326,327,234,1054,1060,1063,1072,1145,255,212,347,1080,1114,231,309,1103,206,244,240,1066,1069,1138,1142,219,344,349,286,350,246,262,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708])).
% 14.42/14.46 cnf(1185,plain,
% 14.42/14.46 (P10(x11851,x11851,a1)),
% 14.42/14.46 inference(rename_variables,[],[194])).
% 14.42/14.46 cnf(1188,plain,
% 14.42/14.46 (P10(x11881,x11881,a1)),
% 14.42/14.46 inference(rename_variables,[],[194])).
% 14.42/14.46 cnf(1190,plain,
% 14.42/14.46 (~P12(x11901,f41(f41(f32(a1),x11901),x11902),a1)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,336,1026,1107,1109,192,167,171,172,173,174,188,197,1120,1130,241,278,351,230,210,1094,330,1051,1057,1077,201,1156,1173,340,227,326,327,234,1054,1060,1063,1072,1145,255,212,347,1080,1114,231,309,1103,206,244,240,1066,1069,1138,1142,219,344,349,286,350,246,262,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658])).
% 14.42/14.46 cnf(1191,plain,
% 14.42/14.46 (~P12(x11911,x11911,a1)),
% 14.42/14.46 inference(rename_variables,[],[336])).
% 14.42/14.46 cnf(1194,plain,
% 14.42/14.46 (~P12(x11941,x11941,a1)),
% 14.42/14.46 inference(rename_variables,[],[336])).
% 14.42/14.46 cnf(1196,plain,
% 14.42/14.46 (~P12(x11961,f41(f41(f35(a1),x11961),x11962),a1)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,336,1026,1107,1109,1191,1194,192,167,171,172,173,174,188,197,1120,1130,241,278,351,230,210,1094,330,1051,1057,1077,201,1156,1173,340,227,326,327,234,1054,1060,1063,1072,1145,255,212,347,1080,1114,231,309,1103,206,244,240,1066,1069,1138,1142,219,344,349,286,350,246,262,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656])).
% 14.42/14.46 cnf(1197,plain,
% 14.42/14.46 (~P12(x11971,x11971,a1)),
% 14.42/14.46 inference(rename_variables,[],[336])).
% 14.42/14.46 cnf(1199,plain,
% 14.42/14.46 (~P12(x11991,f41(f41(f35(a1),x11992),x11991),a1)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,336,1026,1107,1109,1191,1194,1197,192,167,171,172,173,174,188,197,1120,1130,241,278,351,230,210,1094,330,1051,1057,1077,201,1156,1173,340,227,326,327,234,1054,1060,1063,1072,1145,255,212,347,1080,1114,231,309,1103,206,244,240,1066,1069,1138,1142,219,344,349,286,350,246,262,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654])).
% 14.42/14.46 cnf(1200,plain,
% 14.42/14.46 (~P12(x12001,x12001,a1)),
% 14.42/14.46 inference(rename_variables,[],[336])).
% 14.42/14.46 cnf(1203,plain,
% 14.42/14.46 (~P10(f28(x12031),x12031,a1)),
% 14.42/14.46 inference(rename_variables,[],[340])).
% 14.42/14.46 cnf(1205,plain,
% 14.42/14.46 (~P10(f28(f41(f41(f36(a1),x12051),x12052)),x12052,a1)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,336,1026,1107,1109,1191,1194,1197,192,167,171,172,173,174,188,197,1120,1130,241,278,351,230,210,1094,330,1051,1057,1077,201,1156,1173,340,1121,1203,227,326,327,234,1054,1060,1063,1072,1145,255,212,347,1080,1114,231,309,1103,206,244,240,1066,1069,1138,1142,219,344,349,286,350,246,262,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650])).
% 14.42/14.46 cnf(1206,plain,
% 14.42/14.46 (~P10(f28(x12061),x12061,a1)),
% 14.42/14.46 inference(rename_variables,[],[340])).
% 14.42/14.46 cnf(1208,plain,
% 14.42/14.46 (~P10(f28(f41(f41(f31(a1),x12081),x12082)),x12081,a1)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,336,1026,1107,1109,1191,1194,1197,192,167,171,172,173,174,188,197,1120,1130,241,278,351,230,210,1094,330,1051,1057,1077,201,1156,1173,340,1121,1203,1206,227,326,327,234,1054,1060,1063,1072,1145,255,212,347,1080,1114,231,309,1103,206,244,240,1066,1069,1138,1142,219,344,349,286,350,246,262,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648])).
% 14.42/14.46 cnf(1209,plain,
% 14.42/14.46 (~P10(f28(x12091),x12091,a1)),
% 14.42/14.46 inference(rename_variables,[],[340])).
% 14.42/14.46 cnf(1212,plain,
% 14.42/14.46 (~P10(f28(x12121),x12121,a1)),
% 14.42/14.46 inference(rename_variables,[],[340])).
% 14.42/14.46 cnf(1215,plain,
% 14.42/14.46 (~P12(x12151,x12151,a1)),
% 14.42/14.46 inference(rename_variables,[],[336])).
% 14.42/14.46 cnf(1217,plain,
% 14.42/14.46 (~P12(f41(f41(f36(a1),x12171),x12172),x12172,a1)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,336,1026,1107,1109,1191,1194,1197,1200,1215,192,167,171,172,173,174,188,197,1120,1130,241,278,351,230,210,1094,330,1051,1057,1077,201,1156,1173,340,1121,1203,1206,1209,227,326,327,234,1054,1060,1063,1072,1145,255,212,347,1080,1114,231,309,1103,206,244,240,1066,1069,1138,1142,219,344,349,286,350,246,262,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644])).
% 14.42/14.46 cnf(1218,plain,
% 14.42/14.46 (~P12(x12181,x12181,a1)),
% 14.42/14.46 inference(rename_variables,[],[336])).
% 14.42/14.46 cnf(1221,plain,
% 14.42/14.46 (~P12(x12211,x12211,a1)),
% 14.42/14.46 inference(rename_variables,[],[336])).
% 14.42/14.46 cnf(1223,plain,
% 14.42/14.46 (~P12(f41(f41(f31(a1),x12231),x12232),x12232,a1)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,171,172,173,174,188,197,1120,1130,241,278,351,230,210,1094,330,1051,1057,1077,201,1156,1173,340,1121,1203,1206,1209,227,326,327,234,1054,1060,1063,1072,1145,255,212,347,1080,1114,231,309,1103,206,244,240,1066,1069,1138,1142,219,344,349,286,350,246,262,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641])).
% 14.42/14.46 cnf(1229,plain,
% 14.42/14.46 (~E(f29(f43(x12291,a2)),f37(x12292,x12293,x12291))),
% 14.42/14.46 inference(rename_variables,[],[344])).
% 14.42/14.46 cnf(1232,plain,
% 14.42/14.46 (E(f4(f26(a1),x12321,a1),f26(a1))),
% 14.42/14.46 inference(rename_variables,[],[199])).
% 14.42/14.46 cnf(1239,plain,
% 14.42/14.46 (~P16(x12391,f4(x12392,f37(x12391,x12393,x12394),f43(x12394,a2)),x12394)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,171,172,173,174,188,197,1120,1130,241,278,351,230,1116,210,1094,330,1051,1057,1077,201,1156,1173,340,1121,1203,1206,1209,227,326,327,234,1054,1060,1063,1072,1145,255,212,347,1080,1114,231,309,1103,206,244,240,1066,1069,1138,1142,219,344,1150,199,1232,349,286,350,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819])).
% 14.42/14.46 cnf(1240,plain,
% 14.42/14.46 (E(f41(f41(f32(f43(x12401,a2)),x12402),f4(x12403,x12402,f43(x12401,a2))),f29(f43(x12401,a2)))),
% 14.42/14.46 inference(rename_variables,[],[262])).
% 14.42/14.46 cnf(1243,plain,
% 14.42/14.46 (P10(f4(x12431,x12432,f43(x12433,a2)),x12431,f43(x12433,a2))),
% 14.42/14.46 inference(rename_variables,[],[240])).
% 14.42/14.46 cnf(1246,plain,
% 14.42/14.46 (~P12(x12461,x12461,f43(x12462,a2))),
% 14.42/14.46 inference(rename_variables,[],[342])).
% 14.42/14.46 cnf(1248,plain,
% 14.42/14.46 (~P12(f37(x12481,x12482,x12483),x12482,f43(x12483,a2))),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,171,172,173,174,188,197,1120,1130,241,278,351,230,1116,210,1094,342,1246,330,1051,1057,1077,201,1156,1173,340,1121,1203,1206,1209,227,326,327,234,1054,1060,1063,1072,1145,1149,255,212,347,1080,1114,231,309,1103,206,244,240,1066,1069,1138,1142,1153,219,344,1150,199,1232,349,286,350,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739])).
% 14.42/14.46 cnf(1249,plain,
% 14.42/14.46 (P10(x12491,f37(x12492,x12491,x12493),f43(x12493,a2))),
% 14.42/14.46 inference(rename_variables,[],[234])).
% 14.42/14.46 cnf(1251,plain,
% 14.42/14.46 (~P10(f37(x12511,f29(f43(x12512,a2)),x12512),f29(f43(x12512,a2)),f43(x12512,a2))),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,171,172,173,174,184,188,197,1120,1130,241,278,351,230,1116,210,1094,342,1246,330,1051,1057,1077,201,1156,1173,340,1121,1203,1206,1209,227,326,327,234,1054,1060,1063,1072,1145,1149,255,212,347,1080,1114,231,309,1103,206,244,240,1066,1069,1138,1142,1153,219,344,1150,199,1232,349,286,350,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674])).
% 14.42/14.46 cnf(1257,plain,
% 14.42/14.46 (~E(f5(f28(f29(f43(a2,a2))),a2),f26(a1))),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,171,172,173,174,184,188,197,1120,1130,339,241,278,351,230,1116,210,1094,342,1246,330,1051,1057,1077,1127,201,1156,1173,1176,340,1121,1203,1206,1209,227,326,327,234,1054,1060,1063,1072,1145,1149,255,212,347,1080,1114,231,309,1103,206,244,240,1066,1069,1138,1142,1153,219,344,1150,199,1232,349,286,350,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410])).
% 14.42/14.46 cnf(1258,plain,
% 14.42/14.46 (~E(f28(x12581),x12581)),
% 14.42/14.46 inference(rename_variables,[],[330])).
% 14.42/14.46 cnf(1261,plain,
% 14.42/14.46 (~E(f28(x12611),x12611)),
% 14.42/14.46 inference(rename_variables,[],[330])).
% 14.42/14.46 cnf(1263,plain,
% 14.42/14.46 (P16(f41(x12631,x12632),f38(x12631,f37(x12632,x12633,x12634),x12634,x12635),x12635)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,171,172,173,174,184,188,197,1120,1130,339,241,278,351,230,1116,210,1094,1118,342,1246,330,1051,1057,1077,1127,1258,201,1156,1173,1176,340,1121,1203,1206,1209,227,326,327,234,1054,1060,1063,1072,1145,1149,255,212,347,1080,1114,231,309,1103,206,244,240,1066,1069,1138,1142,1153,219,344,1150,199,1232,349,286,350,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923])).
% 14.42/14.46 cnf(1264,plain,
% 14.42/14.46 (P10(x12641,x12641,f43(x12642,a2))),
% 14.42/14.46 inference(rename_variables,[],[210])).
% 14.42/14.46 cnf(1266,plain,
% 14.42/14.46 (P10(f4(f37(x12661,x12662,x12663),f37(x12661,x12664,x12663),f43(x12663,a2)),x12662,f43(x12663,a2))),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,171,172,173,174,184,188,197,1120,1130,339,241,278,351,230,1116,210,1094,1118,342,1246,330,1051,1057,1077,1127,1258,201,1156,1173,1176,340,1121,1203,1206,1209,227,326,327,234,1054,1060,1063,1072,1145,1149,255,212,347,1080,1114,231,309,1103,206,244,240,1066,1069,1138,1142,1153,1243,219,344,1150,199,1232,349,286,350,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811])).
% 14.42/14.46 cnf(1267,plain,
% 14.42/14.46 (P10(f4(x12671,x12672,f43(x12673,a2)),x12671,f43(x12673,a2))),
% 14.42/14.46 inference(rename_variables,[],[240])).
% 14.42/14.46 cnf(1270,plain,
% 14.42/14.46 (P10(x12701,x12701,f43(x12702,a2))),
% 14.42/14.46 inference(rename_variables,[],[210])).
% 14.42/14.46 cnf(1273,plain,
% 14.42/14.46 (P16(x12731,f37(x12731,x12732,x12733),x12733)),
% 14.42/14.46 inference(rename_variables,[],[230])).
% 14.42/14.46 cnf(1275,plain,
% 14.42/14.46 (P10(f37(x12751,x12752,x12753),f37(x12751,f4(f37(x12751,x12752,x12753),f37(x12751,f29(f43(x12753,a2)),x12753),f43(x12753,a2)),x12753),f43(x12753,a2))),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,171,172,173,174,184,188,197,1120,1130,339,241,278,351,230,1116,1273,210,1094,1118,1264,1270,342,1246,330,1051,1057,1077,1127,1258,201,1156,1173,1176,340,1121,1203,1206,1209,227,326,327,234,1054,1060,1063,1072,1145,1149,255,212,347,1080,1114,231,309,1103,206,244,240,1066,1069,1138,1142,1153,1243,219,344,1150,199,1232,349,286,350,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949])).
% 14.42/14.46 cnf(1276,plain,
% 14.42/14.46 (P10(x12761,x12761,f43(x12762,a2))),
% 14.42/14.46 inference(rename_variables,[],[210])).
% 14.42/14.46 cnf(1278,plain,
% 14.42/14.46 (P12(f4(x12781,x12782,a1),f28(f28(x12781)),a1)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,171,172,173,174,184,188,197,1120,1130,339,241,278,351,230,1116,1273,210,1094,1118,1264,1270,342,1246,330,1051,1057,1077,1127,1258,201,1156,1173,1176,340,1121,1203,1206,1209,227,326,327,234,1054,1060,1063,1072,1145,1149,255,212,347,1080,1114,231,309,1103,206,244,240,1066,1069,1138,1142,1153,1243,219,344,1150,199,1232,349,286,350,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623])).
% 14.42/14.46 cnf(1279,plain,
% 14.42/14.46 (P12(x12791,f28(x12791),a1)),
% 14.42/14.46 inference(rename_variables,[],[201])).
% 14.42/14.46 cnf(1282,plain,
% 14.42/14.46 (P12(f4(x12821,x12822,a1),f28(x12821),a1)),
% 14.42/14.46 inference(rename_variables,[],[231])).
% 14.42/14.46 cnf(1285,plain,
% 14.42/14.46 (P10(f26(a1),x12851,a1)),
% 14.42/14.46 inference(rename_variables,[],[197])).
% 14.42/14.46 cnf(1288,plain,
% 14.42/14.46 (E(f4(x12881,f29(f43(x12882,a2)),f43(x12882,a2)),x12881)),
% 14.42/14.46 inference(rename_variables,[],[221])).
% 14.42/14.46 cnf(1289,plain,
% 14.42/14.46 (P10(f29(f43(x12891,a2)),x12892,f43(x12891,a2))),
% 14.42/14.46 inference(rename_variables,[],[220])).
% 14.42/14.46 cnf(1292,plain,
% 14.42/14.46 (E(f4(x12921,f29(f43(x12922,a2)),f43(x12922,a2)),x12921)),
% 14.42/14.46 inference(rename_variables,[],[221])).
% 14.42/14.46 cnf(1293,plain,
% 14.42/14.46 (~P12(x12931,f29(f43(x12932,a2)),f43(x12932,a2))),
% 14.42/14.46 inference(rename_variables,[],[348])).
% 14.42/14.46 cnf(1295,plain,
% 14.42/14.46 (P12(f4(f29(f43(x12951,a2)),x12952,f43(x12951,a2)),f37(x12953,f29(f43(x12951,a2)),x12951),f43(x12951,a2))),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,169,171,172,173,174,184,188,197,1120,1130,1135,339,241,278,351,230,1116,1273,210,1094,1118,1264,1270,342,1246,330,1051,1057,1077,1127,1258,201,1156,1173,1176,340,1121,1203,1206,1209,227,326,327,234,1054,1060,1063,1072,1145,1149,255,212,347,1080,1114,231,309,1103,206,244,240,1066,1069,1138,1142,1153,1243,1267,219,220,348,344,1150,199,1232,349,286,221,1288,350,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800])).
% 14.42/14.46 cnf(1296,plain,
% 14.42/14.46 (P10(f4(x12961,x12962,f43(x12963,a2)),x12961,f43(x12963,a2))),
% 14.42/14.46 inference(rename_variables,[],[240])).
% 14.42/14.46 cnf(1298,plain,
% 14.42/14.46 (P12(f29(f43(x12981,a2)),f37(x12982,f37(x12983,f29(f43(x12981,a2)),x12981),x12981),f43(x12981,a2))),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,169,171,172,173,174,184,188,197,1120,1130,1135,339,241,278,351,230,1116,1273,210,1094,1118,1264,1270,342,1246,330,1051,1057,1077,1127,1258,201,1156,1173,1176,340,1121,1203,1206,1209,227,326,327,234,1054,1060,1063,1072,1145,1149,1249,255,212,347,1080,1114,231,309,1103,206,244,240,1066,1069,1138,1142,1153,1243,1267,219,220,348,344,1150,199,1232,349,286,221,1288,350,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833])).
% 14.42/14.46 cnf(1299,plain,
% 14.42/14.46 (P10(x12991,f37(x12992,x12991,x12993),f43(x12993,a2))),
% 14.42/14.46 inference(rename_variables,[],[234])).
% 14.42/14.46 cnf(1303,plain,
% 14.42/14.46 (~P12(f37(x13031,x13032,x13033),f37(x13031,f4(f37(x13031,x13032,x13033),f37(x13031,f29(f43(x13033,a2)),x13033),f43(x13033,a2)),x13033),f43(x13033,a2))),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,169,171,172,173,174,184,188,197,1120,1130,1135,339,241,278,351,230,1116,1273,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,201,1156,1173,1176,340,1121,1203,1206,1209,227,326,327,234,1054,1060,1063,1072,1145,1149,1249,255,1139,212,347,1080,1114,231,309,1103,206,244,240,1066,1069,1138,1142,1153,1243,1267,219,220,348,344,1150,199,1232,349,286,221,1288,350,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924])).
% 14.42/14.46 cnf(1305,plain,
% 14.42/14.46 (~P13(f19(x13051,x13052),f37(f29(f43(x13052,a2)),f37(f37(f41(f19(x13051,x13052),f29(f43(x13052,a2))),f29(f43(x13052,a2)),x13052),x13053,x13054),x13054),x13054,x13055)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,169,171,172,173,174,184,188,197,1120,1130,1135,339,241,278,351,230,1116,1273,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,201,1156,1173,1176,340,1121,1203,1206,1209,227,326,327,234,1054,1060,1063,1072,1145,1149,1249,255,1139,212,347,1080,1114,231,309,1103,206,244,240,1066,1069,1138,1142,1153,1243,1267,219,220,348,343,344,1150,199,1232,349,286,221,1288,350,247,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867])).
% 14.42/14.46 cnf(1306,plain,
% 14.42/14.46 (E(f41(f19(x13061,x13062),f37(x13063,f29(f43(x13062,a2)),x13062)),x13063)),
% 14.42/14.46 inference(rename_variables,[],[247])).
% 14.42/14.46 cnf(1307,plain,
% 14.42/14.46 (P16(x13071,f37(x13071,x13072,x13073),x13073)),
% 14.42/14.46 inference(rename_variables,[],[230])).
% 14.42/14.46 cnf(1308,plain,
% 14.42/14.46 (~E(f37(x13081,x13082,x13083),f29(f43(x13083,a2)))),
% 14.42/14.46 inference(rename_variables,[],[343])).
% 14.42/14.46 cnf(1314,plain,
% 14.42/14.46 (~P12(f28(x13141),f28(f26(a1)),a1)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,169,171,172,173,174,184,188,197,1120,1130,1135,339,241,278,351,230,1116,1273,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,201,1156,1173,1176,340,1121,1203,1206,1209,227,326,327,234,1054,1060,1063,1072,1145,1149,1249,255,1139,212,347,1080,1114,231,334,309,1103,206,244,240,1066,1069,1138,1142,1153,1243,1267,219,220,348,343,344,1150,199,1232,349,286,221,1288,350,247,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427])).
% 14.42/14.46 cnf(1316,plain,
% 14.42/14.46 (~P14(x13161,x13162,f29(f43(x13163,a2)),f28(x13162),x13163,x13164)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,169,171,172,173,174,184,188,197,1120,1130,1135,339,241,278,351,230,1116,1273,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,201,1156,1173,1176,340,1121,1203,1206,1209,227,326,327,234,1054,1060,1063,1072,1145,1149,1249,255,1139,212,347,1080,1114,231,334,309,1103,206,244,240,1066,1069,1138,1142,1153,1243,1267,219,220,348,343,344,1150,199,1232,349,286,221,1288,350,247,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010])).
% 14.42/14.46 cnf(1318,plain,
% 14.42/14.46 (~P16(f28(x13181),f37(x13181,f29(f43(x13182,a2)),x13182),x13182)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,169,171,172,173,174,184,188,197,1120,1130,1135,339,241,278,351,230,1116,1273,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,201,1156,1173,1176,340,1121,1203,1206,1209,227,326,327,234,1054,1060,1063,1072,1145,1149,1249,255,1139,212,347,1080,1114,231,334,309,1103,206,244,240,1066,1069,1138,1142,1153,1243,1267,219,220,348,343,344,1150,199,1232,349,286,221,1288,350,247,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808])).
% 14.42/14.46 cnf(1322,plain,
% 14.42/14.46 (P10(f41(f41(f32(a2),x13221),x13222),x13221,a2)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,169,171,172,173,174,177,184,188,197,1120,1130,1135,339,241,278,351,230,1116,1273,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,201,1156,1173,1176,340,1121,1203,1206,1209,227,326,327,234,1054,1060,1063,1072,1145,1149,1249,255,1139,212,347,1080,1114,231,1282,334,309,1103,206,244,240,1066,1069,1138,1142,1153,1243,1267,219,220,348,343,344,1150,199,1232,349,286,221,1288,350,247,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536])).
% 14.42/14.46 cnf(1324,plain,
% 14.42/14.46 (P10(f41(f41(f32(a2),x13241),x13242),x13242,a2)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,169,171,172,173,174,177,184,188,197,1120,1130,1135,339,241,278,351,230,1116,1273,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,201,1156,1173,1176,340,1121,1203,1206,1209,227,326,327,234,1054,1060,1063,1072,1145,1149,1249,255,1139,212,347,1080,1114,231,1282,334,309,1103,206,244,240,1066,1069,1138,1142,1153,1243,1267,219,220,348,343,344,1150,199,1232,349,286,221,1288,350,247,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534])).
% 14.42/14.46 cnf(1326,plain,
% 14.42/14.46 (P10(x13261,f41(f41(f31(a2),x13261),x13262),a2)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,169,171,172,173,174,177,184,188,197,1120,1130,1135,339,241,278,351,230,1116,1273,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,201,1156,1173,1176,340,1121,1203,1206,1209,227,326,327,234,1054,1060,1063,1072,1145,1149,1249,255,1139,212,347,1080,1114,231,1282,334,309,1103,206,244,240,1066,1069,1138,1142,1153,1243,1267,219,220,348,343,344,1150,199,1232,349,286,221,1288,350,247,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528])).
% 14.42/14.46 cnf(1328,plain,
% 14.42/14.46 (P10(x13281,f41(f41(f31(a2),x13282),x13281),a2)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,169,171,172,173,174,177,184,188,197,1120,1130,1135,339,241,278,351,230,1116,1273,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,201,1156,1173,1176,340,1121,1203,1206,1209,227,326,327,234,1054,1060,1063,1072,1145,1149,1249,255,1139,212,347,1080,1114,231,1282,334,309,1103,206,244,240,1066,1069,1138,1142,1153,1243,1267,219,220,348,343,344,1150,199,1232,349,286,221,1288,350,247,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526])).
% 14.42/14.46 cnf(1330,plain,
% 14.42/14.46 (P33(f33(f41(a6,f50(a46,a47,a45,a48)),a40))),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,169,171,172,173,174,177,184,188,197,1120,1130,1135,339,241,278,351,230,1116,1273,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,201,1156,1173,1176,340,1121,1203,1206,1209,227,326,327,234,1054,1060,1063,1072,1145,1149,1249,255,1139,212,347,1080,1114,231,1282,334,309,1103,206,244,240,1066,1069,1138,1142,1153,1243,1267,219,220,348,343,344,1150,199,1232,349,286,221,1288,350,247,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515])).
% 14.42/14.46 cnf(1332,plain,
% 14.42/14.46 (~P12(f28(f41(f41(f36(a1),x13321),x13322)),f28(x13321),a1)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,169,171,172,173,174,177,184,188,197,1120,1130,1135,339,241,278,351,230,1116,1273,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,201,1156,1173,1176,340,1121,1203,1206,1209,227,326,327,234,1054,1060,1063,1072,1145,1149,1249,255,1139,212,347,1080,1114,231,1282,334,309,1103,206,244,240,1066,1069,1138,1142,1153,1243,1267,219,220,348,343,344,1150,199,1232,349,286,221,1288,350,247,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480])).
% 14.42/14.46 cnf(1334,plain,
% 14.42/14.46 (P10(f28(f4(x13341,x13342,a1)),f28(x13341),a1)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,169,171,172,173,174,177,184,188,197,1120,1130,1135,339,241,278,351,230,1116,1273,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,201,1156,1173,1176,340,1121,1203,1206,1209,227,326,327,234,1054,1060,1063,1072,1145,1149,1249,255,1139,212,347,1080,1114,231,1282,334,309,1103,206,244,240,1066,1069,1138,1142,1153,1243,1267,219,220,348,343,344,1150,199,1232,349,286,221,1288,350,247,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473])).
% 14.42/14.46 cnf(1338,plain,
% 14.42/14.46 (P10(f28(x13381),f28(f41(f41(f36(a1),x13381),x13382)),a1)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,169,171,172,173,174,177,184,188,197,1120,1130,1135,339,241,278,351,230,1116,1273,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,201,1156,1173,1176,340,1121,1203,1206,1209,227,326,327,234,1054,1060,1063,1072,1145,1149,1249,255,1139,212,347,1080,1114,231,1282,334,309,1103,206,244,240,1066,1069,1138,1142,1153,1243,1267,219,220,348,343,344,1150,199,1232,349,286,221,1288,350,247,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439])).
% 14.42/14.46 cnf(1342,plain,
% 14.42/14.46 (P10(f29(a1),x13421,a1)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,169,171,172,173,174,177,184,188,190,197,1120,1130,1135,339,241,278,351,230,1116,1273,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,201,1156,1173,1176,340,1121,1203,1206,1209,227,326,327,234,1054,1060,1063,1072,1145,1149,1249,255,1139,212,347,1080,1114,231,1282,334,309,1103,206,244,240,1066,1069,1138,1142,1153,1243,1267,219,220,348,343,344,1150,199,1232,349,286,221,1288,350,247,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400])).
% 14.42/14.46 cnf(1366,plain,
% 14.42/14.46 (P2(f43(x13661,a1))),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,169,171,172,173,174,176,177,178,180,181,183,184,187,188,190,197,1120,1130,1135,339,241,278,351,230,1116,1273,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,201,1156,1173,1176,340,1121,1203,1206,1209,227,326,327,234,1054,1060,1063,1072,1145,1149,1249,255,1139,212,347,1080,1114,231,1282,334,309,1103,206,244,240,1066,1069,1138,1142,1153,1243,1267,219,220,348,343,344,1150,199,1232,349,286,221,1288,350,247,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400,391,390,389,388,376,375,374,373,372,371,370,369])).
% 14.42/14.46 cnf(1368,plain,
% 14.42/14.46 (P19(f43(x13681,a1))),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,169,171,172,173,174,176,177,178,180,181,183,184,187,188,190,197,1120,1130,1135,339,241,278,351,230,1116,1273,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,201,1156,1173,1176,340,1121,1203,1206,1209,227,326,327,234,1054,1060,1063,1072,1145,1149,1249,255,1139,212,347,1080,1114,231,1282,334,309,1103,206,244,240,1066,1069,1138,1142,1153,1243,1267,219,220,348,343,344,1150,199,1232,349,286,221,1288,350,247,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400,391,390,389,388,376,375,374,373,372,371,370,369,368])).
% 14.42/14.46 cnf(1370,plain,
% 14.42/14.46 (P18(f43(x13701,a1))),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,169,171,172,173,174,176,177,178,180,181,183,184,187,188,190,197,1120,1130,1135,339,241,278,351,230,1116,1273,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,201,1156,1173,1176,340,1121,1203,1206,1209,227,326,327,234,1054,1060,1063,1072,1145,1149,1249,255,1139,212,347,1080,1114,231,1282,334,309,1103,206,244,240,1066,1069,1138,1142,1153,1243,1267,219,220,348,343,344,1150,199,1232,349,286,221,1288,350,247,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400,391,390,389,388,376,375,374,373,372,371,370,369,368,367])).
% 14.42/14.46 cnf(1372,plain,
% 14.42/14.46 (P1(f43(x13721,a1))),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,169,171,172,173,174,176,177,178,180,181,183,184,187,188,190,197,1120,1130,1135,339,241,278,351,230,1116,1273,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,201,1156,1173,1176,340,1121,1203,1206,1209,227,326,327,234,1054,1060,1063,1072,1145,1149,1249,255,1139,212,347,1080,1114,231,1282,334,309,1103,206,244,240,1066,1069,1138,1142,1153,1243,1267,219,220,348,343,344,1150,199,1232,349,286,221,1288,350,247,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400,391,390,389,388,376,375,374,373,372,371,370,369,368,367,366])).
% 14.42/14.46 cnf(1374,plain,
% 14.42/14.46 (P12(f4(f28(f26(a1)),f28(x13741),a1),f28(f26(a1)),a1)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,169,171,172,173,174,176,177,178,180,181,183,184,187,188,190,197,1120,1130,1135,339,241,278,351,230,1116,1273,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,201,1156,1173,1176,1279,340,1121,1203,1206,1209,227,326,327,234,1054,1060,1063,1072,1145,1149,1249,255,1139,212,347,1080,1114,231,1282,334,309,1103,206,244,240,1066,1069,1138,1142,1153,1243,1267,219,220,348,343,344,1150,199,1232,349,286,221,1288,350,247,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400,391,390,389,388,376,375,374,373,372,371,370,369,368,367,366,670])).
% 14.42/14.46 cnf(1448,plain,
% 14.42/14.46 (E(f25(x14481,x14482,x14483,f38(a48,a45,a3,a42)),f25(x14481,x14482,x14483,a46))),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,169,171,172,173,174,176,177,178,180,181,183,184,187,188,190,197,1120,1130,1135,339,241,278,351,230,1116,1273,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,201,1156,1173,1176,1279,340,1121,1203,1206,1209,227,326,327,234,1054,1060,1063,1072,1145,1149,1249,255,1139,212,347,1080,1114,231,1282,334,309,1103,206,244,240,1066,1069,1138,1142,1153,1243,1267,219,220,348,343,344,1150,199,1232,349,286,221,1288,350,247,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400,391,390,389,388,376,375,374,373,372,371,370,369,368,367,366,670,612,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,74,73,72,71,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38])).
% 14.42/14.46 cnf(1483,plain,
% 14.42/14.46 (~P13(f19(x14831,x14832),f41(f41(f31(f43(x14833,a2)),f37(f29(f43(x14832,a2)),f37(f37(f41(f19(x14831,x14832),f29(f43(x14832,a2))),f29(f43(x14832,a2)),x14832),x14834,x14833),x14833)),x14835),x14833,x14836)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,169,171,172,173,174,176,177,178,180,181,183,184,187,188,190,197,1120,1130,1135,339,241,278,351,230,1116,1273,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,201,1156,1173,1176,1279,340,1121,1203,1206,1209,227,326,327,234,1054,1060,1063,1072,1145,1149,1249,255,1139,212,347,1080,1114,231,1282,334,309,1103,206,244,240,1066,1069,1138,1142,1153,1243,1267,219,220,348,343,344,1150,199,1232,349,286,221,1288,350,247,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400,391,390,389,388,376,375,374,373,372,371,370,369,368,367,366,670,612,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,74,73,72,71,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,930])).
% 14.42/14.46 cnf(1487,plain,
% 14.42/14.46 (~P13(f19(x14871,x14872),f37(x14873,f37(f29(f43(x14872,a2)),f37(f37(f41(f19(x14871,x14872),f29(f43(x14872,a2))),f29(f43(x14872,a2)),x14872),x14874,x14875),x14875),x14875),x14875,x14876)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,169,171,172,173,174,176,177,178,180,181,183,184,187,188,190,197,1120,1130,1135,339,241,278,351,230,1116,1273,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,201,1156,1173,1176,1279,340,1121,1203,1206,1209,227,326,327,234,1054,1060,1063,1072,1145,1149,1249,255,1139,212,347,1080,1114,231,1282,334,309,1103,206,244,240,1066,1069,1138,1142,1153,1243,1267,219,220,348,343,344,1150,199,1232,349,286,221,1288,350,247,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400,391,390,389,388,376,375,374,373,372,371,370,369,368,367,366,670,612,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,74,73,72,71,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,930,929,901])).
% 14.42/14.46 cnf(1489,plain,
% 14.42/14.46 (P13(x14891,f4(f29(f43(x14892,a2)),x14893,f43(x14892,a2)),x14892,x14894)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,169,171,172,173,174,176,177,178,180,181,183,184,187,188,190,197,1120,1130,1135,339,241,278,351,230,1116,1273,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,201,1156,1173,1176,1279,340,1121,1203,1206,1209,227,326,327,234,1054,1060,1063,1072,1145,1149,1249,255,1139,212,347,1080,1114,231,1282,334,309,1103,206,244,240,1066,1069,1138,1142,1153,1243,1267,219,220,348,343,344,1150,199,1232,349,286,221,1288,350,247,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400,391,390,389,388,376,375,374,373,372,371,370,369,368,367,366,670,612,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,74,73,72,71,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,930,929,901,899])).
% 14.42/14.46 cnf(1491,plain,
% 14.42/14.46 (~P16(f41(f25(f29(f43(x14911,a2)),x14912,x14911,x14913),x14914),f41(f41(f32(f43(x14911,a2)),f29(f43(x14911,a2))),x14915),x14911)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,169,171,172,173,174,176,177,178,180,181,183,184,187,188,190,197,1120,1130,1135,339,241,278,351,230,1116,1273,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,201,1156,1173,1176,1279,340,1121,1203,1206,1209,227,326,327,234,1054,1060,1063,1072,1145,1149,1249,255,1139,212,347,1080,1114,231,1282,334,309,1103,206,244,240,1066,1069,1138,1142,1153,1243,1267,219,220,348,343,344,1150,199,1232,349,286,221,1288,350,247,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400,391,390,389,388,376,375,374,373,372,371,370,369,368,367,366,670,612,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,74,73,72,71,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,930,929,901,899,859])).
% 14.42/14.46 cnf(1495,plain,
% 14.42/14.46 (P9(f38(x14951,a45,a3,x14952),x14952)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,169,171,172,173,174,176,177,178,180,181,183,184,187,188,190,197,1120,1130,1135,339,241,278,351,230,1116,1273,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,201,1156,1173,1176,1279,340,1121,1203,1206,1209,227,326,327,234,1054,1060,1063,1072,1145,1149,1249,255,1139,212,347,1080,1114,231,1282,334,309,1103,206,244,240,1066,1069,1138,1142,1153,1243,1267,219,220,348,343,344,1150,199,1232,349,286,221,1288,350,247,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400,391,390,389,388,376,375,374,373,372,371,370,369,368,367,366,670,612,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,74,73,72,71,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,930,929,901,899,859,858,849])).
% 14.42/14.46 cnf(1499,plain,
% 14.42/14.46 (P16(x14991,f41(f41(f31(f43(x14992,a2)),x14993),f37(x14991,x14994,x14992)),x14992)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,169,171,172,173,174,176,177,178,180,181,183,184,187,188,190,197,1120,1130,1135,339,241,278,351,230,1116,1273,1307,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,201,1156,1173,1176,1279,340,1121,1203,1206,1209,227,326,327,234,1054,1060,1063,1072,1145,1149,1249,255,1139,212,347,1080,1114,231,1282,334,309,1103,206,244,240,1066,1069,1138,1142,1153,1243,1267,219,220,348,343,344,1150,199,1232,349,286,221,1288,350,247,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400,391,390,389,388,376,375,374,373,372,371,370,369,368,367,366,670,612,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,74,73,72,71,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,930,929,901,899,859,858,849,814,813])).
% 14.42/14.46 cnf(1501,plain,
% 14.42/14.46 (~P16(x15011,f4(x15012,f34(f43(x15013,a2)),f43(x15013,a2)),x15013)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,169,171,172,173,174,176,177,178,180,181,183,184,187,188,190,197,1120,1130,1135,339,241,278,351,230,1116,1273,1307,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,201,1156,1173,1176,1279,340,1121,1203,1206,1209,227,326,327,234,1054,1060,1063,1072,1145,1149,1249,255,1139,212,1111,347,1080,1114,231,1282,334,309,1103,206,244,240,1066,1069,1138,1142,1153,1243,1267,219,220,348,343,344,1150,199,1232,349,286,221,1288,350,247,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400,391,390,389,388,376,375,374,373,372,371,370,369,368,367,366,670,612,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,74,73,72,71,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,930,929,901,899,859,858,849,814,813,796])).
% 14.42/14.46 cnf(1509,plain,
% 14.42/14.46 (~E(f37(f28(x15091),f29(f43(x15092,a2)),x15092),f37(x15091,f29(f43(x15092,a2)),x15092))),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,169,171,172,173,174,176,177,178,180,181,183,184,187,188,190,197,1120,1130,1135,1285,339,241,278,351,230,1116,1273,1307,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,201,1156,1173,1176,1279,340,1121,1203,1206,1209,227,326,327,234,1054,1060,1063,1072,1145,1149,1249,255,1139,212,1111,347,1080,1114,231,1282,334,309,1103,206,244,240,1066,1069,1138,1142,1153,1243,1267,219,220,348,343,344,1150,199,1232,349,286,221,1288,350,247,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400,391,390,389,388,376,375,374,373,372,371,370,369,368,367,366,670,612,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,74,73,72,71,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,930,929,901,899,859,858,849,814,813,796,785,769,768,749])).
% 14.42/14.46 cnf(1535,plain,
% 14.42/14.46 (~P10(f28(f28(f41(f41(f36(a1),x15351),x15352))),f28(x15351),a1)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,169,171,172,173,174,176,177,178,180,181,182,183,184,187,188,190,197,1120,1130,1135,1285,339,241,214,278,351,230,1116,1273,1307,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,201,1156,1173,1176,1279,340,1121,1203,1206,1209,227,326,327,234,1054,1060,1063,1072,1145,1149,1249,255,1139,212,1111,347,1080,1114,231,1282,334,309,1103,206,244,240,1066,1069,1138,1142,1153,1243,1267,219,220,348,343,344,1150,199,1232,349,286,221,1288,350,247,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400,391,390,389,388,376,375,374,373,372,371,370,369,368,367,366,670,612,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,74,73,72,71,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,930,929,901,899,859,858,849,814,813,796,785,769,768,749,743,742,723,691,638,577,563,552,524,523,522,521,518])).
% 14.42/14.46 cnf(1537,plain,
% 14.42/14.46 (~P12(f28(f26(a1)),f28(f5(f29(f43(x15371,a2)),x15371)),a1)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,169,171,172,173,174,176,177,178,180,181,182,183,184,187,188,190,197,1120,1130,1135,1285,339,241,214,278,351,230,1116,1273,1307,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,201,1156,1173,1176,1279,340,1121,1203,1206,1209,227,326,327,234,1054,1060,1063,1072,1145,1149,1249,255,1139,212,1111,347,1080,1114,231,1282,334,309,1103,206,244,240,1066,1069,1138,1142,1153,1243,1267,219,220,348,343,344,1150,199,1232,349,286,221,1288,350,247,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400,391,390,389,388,376,375,374,373,372,371,370,369,368,367,366,670,612,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,74,73,72,71,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,930,929,901,899,859,858,849,814,813,796,785,769,768,749,743,742,723,691,638,577,563,552,524,523,522,521,518,517])).
% 14.42/14.46 cnf(1543,plain,
% 14.42/14.46 (~E(f4(f28(x15431),x15431,a1),f26(a1))),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,169,171,172,173,174,176,177,178,180,181,182,183,184,187,188,190,197,1120,1130,1135,1285,339,241,214,278,351,230,1116,1273,1307,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,201,1156,1173,1176,1279,340,1121,1203,1206,1209,1212,227,326,327,234,1054,1060,1063,1072,1145,1149,1249,255,1139,212,1111,347,1080,1114,231,1282,334,309,1103,206,244,240,1066,1069,1138,1142,1153,1243,1267,219,220,348,343,344,1150,199,1232,349,286,221,1288,350,247,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400,391,390,389,388,376,375,374,373,372,371,370,369,368,367,366,670,612,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,74,73,72,71,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,930,929,901,899,859,858,849,814,813,796,785,769,768,749,743,742,723,691,638,577,563,552,524,523,522,521,518,517,501,475,464])).
% 14.42/14.46 cnf(1571,plain,
% 14.42/14.46 (~E(f28(f28(x15711)),f28(f26(a1)))),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,168,169,171,172,173,174,175,176,177,178,180,181,182,183,184,187,188,190,197,1120,1130,1135,1285,339,241,214,278,351,230,1116,1273,1307,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,201,1156,1173,1176,1279,340,1121,1203,1206,1209,1212,227,1129,326,327,234,1054,1060,1063,1072,1145,1149,1249,255,1139,212,1111,347,1080,1114,231,1282,334,309,1103,206,244,240,1066,1069,1138,1142,1153,1243,1267,219,220,348,343,344,1150,199,1232,349,286,221,1288,350,247,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400,391,390,389,388,376,375,374,373,372,371,370,369,368,367,366,670,612,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,74,73,72,71,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,930,929,901,899,859,858,849,814,813,796,785,769,768,749,743,742,723,691,638,577,563,552,524,523,522,521,518,517,501,475,464,459,450,436,435,434,433,432,431,405,404,398,397,384,353])).
% 14.42/14.46 cnf(1579,plain,
% 14.42/14.46 (P16(f41(x15791,f41(x15792,x15793)),f38(x15791,f38(x15792,f34(f43(x15794,a2)),x15794,x15795),x15795,x15796),x15796)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,168,169,171,172,173,174,175,176,177,178,180,181,182,183,184,187,188,190,197,1120,1130,1135,1285,339,241,214,278,351,230,1116,1273,1307,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,201,1156,1173,1176,1279,340,1121,1203,1206,1209,1212,227,1129,326,327,234,1054,1060,1063,1072,1145,1149,1249,255,1139,212,1111,347,1080,1114,231,1282,334,309,1103,206,244,240,1066,1069,1138,1142,1153,1243,1267,219,220,348,343,344,1150,199,1232,349,286,1113,221,1288,350,247,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400,391,390,389,388,376,375,374,373,372,371,370,369,368,367,366,670,612,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,74,73,72,71,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,930,929,901,899,859,858,849,814,813,796,785,769,768,749,743,742,723,691,638,577,563,552,524,523,522,521,518,517,501,475,464,459,450,436,435,434,433,432,431,405,404,398,397,384,353,700,633,986,887])).
% 14.42/14.46 cnf(1589,plain,
% 14.42/14.46 (E(f41(f41(f36(a1),x15891),f41(f41(f36(a1),x15891),x15892)),f41(f41(f36(a1),x15891),x15892))),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,1188,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,168,169,171,172,173,174,175,176,177,178,180,181,182,183,184,187,188,190,197,1120,1130,1135,1285,339,241,214,278,351,230,1116,1273,1307,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,201,1156,1173,1176,1279,340,1121,1203,1206,1209,1212,227,1129,326,327,234,1054,1060,1063,1072,1145,1149,1249,255,1139,212,1111,347,1080,1114,231,1282,334,309,1103,206,244,240,1066,1069,1138,1142,1153,1243,1267,219,220,348,343,344,1150,199,1232,349,286,1113,221,1288,350,247,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400,391,390,389,388,376,375,374,373,372,371,370,369,368,367,366,670,612,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,74,73,72,71,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,930,929,901,899,859,858,849,814,813,796,785,769,768,749,743,742,723,691,638,577,563,552,524,523,522,521,518,517,501,475,464,459,450,436,435,434,433,432,431,405,404,398,397,384,353,700,633,986,887,852,632,629,628,600])).
% 14.42/14.46 cnf(1613,plain,
% 14.42/14.46 (E(f41(f41(f32(a2),f29(a2)),x16131),f29(a2))),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,1188,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,168,169,171,172,173,174,175,176,177,178,180,181,182,183,184,187,188,190,197,1120,1130,1135,1285,339,241,214,278,351,230,1116,1273,1307,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,201,1156,1173,1176,1279,340,1121,1203,1206,1209,1212,227,1129,326,327,234,1054,1060,1063,1072,1145,1149,1249,255,1139,212,1111,347,1080,1114,231,1282,334,309,1103,206,244,240,1066,1069,1138,1142,1153,1243,1267,219,220,348,343,344,1150,199,1232,349,286,1113,221,1288,350,247,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400,391,390,389,388,376,375,374,373,372,371,370,369,368,367,366,670,612,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,74,73,72,71,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,930,929,901,899,859,858,849,814,813,796,785,769,768,749,743,742,723,691,638,577,563,552,524,523,522,521,518,517,501,475,464,459,450,436,435,434,433,432,431,405,404,398,397,384,353,700,633,986,887,852,632,629,628,600,599,598,597,596,595,465,463,441,440,414,413,409])).
% 14.42/14.46 cnf(1615,plain,
% 14.42/14.46 (E(f41(f41(f31(a2),f34(a2)),x16151),f34(a2))),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,1188,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,168,169,171,172,173,174,175,176,177,178,180,181,182,183,184,187,188,190,197,1120,1130,1135,1285,339,241,214,278,351,230,1116,1273,1307,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,201,1156,1173,1176,1279,340,1121,1203,1206,1209,1212,227,1129,326,327,234,1054,1060,1063,1072,1145,1149,1249,255,1139,212,1111,347,1080,1114,231,1282,334,309,1103,206,244,240,1066,1069,1138,1142,1153,1243,1267,219,220,348,343,344,1150,199,1232,349,286,1113,221,1288,350,247,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400,391,390,389,388,376,375,374,373,372,371,370,369,368,367,366,670,612,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,74,73,72,71,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,930,929,901,899,859,858,849,814,813,796,785,769,768,749,743,742,723,691,638,577,563,552,524,523,522,521,518,517,501,475,464,459,450,436,435,434,433,432,431,405,404,398,397,384,353,700,633,986,887,852,632,629,628,600,599,598,597,596,595,465,463,441,440,414,413,409,408])).
% 14.42/14.46 cnf(1633,plain,
% 14.42/14.46 (~P34(f41(f41(f41(f32(f43(x16331,a2)),f41(a47,a46)),x16332),f37(f49(a44),f29(f43(a42,a2)),a42)))),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,1188,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,168,169,171,172,173,174,175,176,177,178,180,181,182,183,184,187,188,190,197,1120,1130,1135,1285,339,241,214,278,351,230,1116,1273,1307,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,201,1156,1173,1176,1279,340,1121,1203,1206,1209,1212,227,1129,326,327,234,1054,1060,1063,1072,1145,1149,1249,255,1139,212,1111,347,1080,1114,231,1282,334,309,1103,206,244,240,1066,1069,1138,1142,1153,1243,1267,219,220,348,343,344,1150,199,1232,349,286,1113,221,1288,350,247,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400,391,390,389,388,376,375,374,373,372,371,370,369,368,367,366,670,612,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,74,73,72,71,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,930,929,901,899,859,858,849,814,813,796,785,769,768,749,743,742,723,691,638,577,563,552,524,523,522,521,518,517,501,475,464,459,450,436,435,434,433,432,431,405,404,398,397,384,353,700,633,986,887,852,632,629,628,600,599,598,597,596,595,465,463,441,440,414,413,409,408,403,402,364,363,360,359,1007,933,916])).
% 14.42/14.46 cnf(1642,plain,
% 14.42/14.46 (~E(f28(x16421),x16421)),
% 14.42/14.46 inference(rename_variables,[],[330])).
% 14.42/14.46 cnf(1676,plain,
% 14.42/14.46 (~E(f41(f41(f31(f43(x16761,a2)),f28(f29(f43(x16761,a2)))),x16762),f29(f43(x16761,a2)))),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,1188,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,168,169,171,172,173,174,175,176,177,178,180,181,182,183,184,187,188,190,197,1120,1130,1135,1285,339,241,214,278,351,230,1116,1273,1307,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,1642,201,1156,1173,1176,1279,340,1121,1203,1206,1209,1212,227,1129,326,327,234,1054,1060,1063,1072,1145,1149,1249,255,1139,212,1111,347,1080,1114,231,1282,334,309,1103,206,244,240,1066,1069,1138,1142,1153,1243,1267,219,220,348,343,344,1150,199,1232,349,286,1113,221,1288,350,247,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400,391,390,389,388,376,375,374,373,372,371,370,369,368,367,366,670,612,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,74,73,72,71,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,930,929,901,899,859,858,849,814,813,796,785,769,768,749,743,742,723,691,638,577,563,552,524,523,522,521,518,517,501,475,464,459,450,436,435,434,433,432,431,405,404,398,397,384,353,700,633,986,887,852,632,629,628,600,599,598,597,596,595,465,463,441,440,414,413,409,408,403,402,364,363,360,359,1007,933,916,915,883,882,836,829,817,807,806,805,804,803,802,784,733,732,731,730,729,728,701,696])).
% 14.42/14.46 cnf(1677,plain,
% 14.42/14.46 (~E(f28(x16771),x16771)),
% 14.42/14.46 inference(rename_variables,[],[330])).
% 14.42/14.46 cnf(1680,plain,
% 14.42/14.46 (~E(f28(x16801),x16801)),
% 14.42/14.46 inference(rename_variables,[],[330])).
% 14.42/14.46 cnf(1682,plain,
% 14.42/14.46 (P34(f41(f37(x16821,f37(f41(x16822,x16823),f29(f43(x16824,a2)),x16825),x16826),f41(x16822,x16823)))),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,1188,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,168,169,171,172,173,174,175,176,177,178,180,181,182,183,184,187,188,190,197,1120,1130,1135,1285,339,241,214,278,351,230,1116,1273,1307,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,1642,1677,201,1156,1173,1176,1279,340,1121,1203,1206,1209,1212,227,1129,326,327,234,1054,1060,1063,1072,1145,1149,1249,255,1139,212,1111,347,1080,1114,231,1282,334,309,1103,206,244,240,1066,1069,1138,1142,1153,1243,1267,219,220,348,343,344,1150,199,1232,349,286,1113,221,1288,350,247,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400,391,390,389,388,376,375,374,373,372,371,370,369,368,367,366,670,612,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,74,73,72,71,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,930,929,901,899,859,858,849,814,813,796,785,769,768,749,743,742,723,691,638,577,563,552,524,523,522,521,518,517,501,475,464,459,450,436,435,434,433,432,431,405,404,398,397,384,353,700,633,986,887,852,632,629,628,600,599,598,597,596,595,465,463,441,440,414,413,409,408,403,402,364,363,360,359,1007,933,916,915,883,882,836,829,817,807,806,805,804,803,802,784,733,732,731,730,729,728,701,696,695,693])).
% 14.42/14.46 cnf(1698,plain,
% 14.42/14.46 (P10(f41(f41(f36(a1),f41(f41(f35(a1),x16981),x16982)),f41(f41(f35(a1),x16981),x16983)),f41(f41(f35(a1),x16981),f41(f41(f36(a1),x16982),x16983)),a1)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,1188,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,168,169,171,172,173,174,175,176,177,178,180,181,182,183,184,187,188,190,197,1120,1130,1135,1285,339,241,214,278,351,230,1116,1273,1307,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,1642,1677,201,1156,1173,1176,1279,340,1121,1203,1206,1209,1212,227,1129,326,327,234,1054,1060,1063,1072,1145,1149,1249,255,1139,212,1111,347,1080,1114,231,1282,334,309,1103,206,244,240,1066,1069,1138,1142,1153,1243,1267,219,220,348,343,344,1150,199,1232,349,286,1113,221,1288,350,247,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400,391,390,389,388,376,375,374,373,372,371,370,369,368,367,366,670,612,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,74,73,72,71,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,930,929,901,899,859,858,849,814,813,796,785,769,768,749,743,742,723,691,638,577,563,552,524,523,522,521,518,517,501,475,464,459,450,436,435,434,433,432,431,405,404,398,397,384,353,700,633,986,887,852,632,629,628,600,599,598,597,596,595,465,463,441,440,414,413,409,408,403,402,364,363,360,359,1007,933,916,915,883,882,836,829,817,807,806,805,804,803,802,784,733,732,731,730,729,728,701,696,695,693,684,683,682,681,665,942,940,928])).
% 14.42/14.46 cnf(1762,plain,
% 14.42/14.46 (P13(f25(f29(f43(x17621,a2)),x17622,x17621,x17623),f38(x17622,f29(f43(x17621,a2)),x17621,x17623),x17623,x17621)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,1188,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,168,169,171,172,173,174,175,176,177,178,180,181,182,183,184,187,188,190,197,1120,1130,1135,1285,339,241,214,278,351,230,1116,1273,1307,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,1642,1677,201,1156,1173,1176,1279,340,1121,1203,1206,1209,1212,227,1129,326,327,234,1054,1060,1063,1072,1145,1149,1249,255,1139,212,1111,347,1080,1114,231,1282,334,309,1103,206,244,240,1066,1069,1138,1142,1153,1243,1267,1296,219,220,348,343,344,1150,199,1232,349,286,1113,221,1288,350,247,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400,391,390,389,388,376,375,374,373,372,371,370,369,368,367,366,670,612,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,74,73,72,71,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,930,929,901,899,859,858,849,814,813,796,785,769,768,749,743,742,723,691,638,577,563,552,524,523,522,521,518,517,501,475,464,459,450,436,435,434,433,432,431,405,404,398,397,384,353,700,633,986,887,852,632,629,628,600,599,598,597,596,595,465,463,441,440,414,413,409,408,403,402,364,363,360,359,1007,933,916,915,883,882,836,829,817,807,806,805,804,803,802,784,733,732,731,730,729,728,701,696,695,693,684,683,682,681,665,942,940,928,927,926,925,909,890,871,870,869,868,848,847,846,845,765,669,667,992,854,823,812,809,774,767,947,910,894,828,824,795,511,510,969])).
% 14.42/14.46 cnf(1792,plain,
% 14.42/14.46 (~P14(x17921,f29(f43(x17922,a2)),f20(f29(f43(x17923,a2)),x17924,f41(f29(f43(x17923,a2)),x17924),x17925,x17926),f28(f29(f43(x17922,a2))),x17923,x17927)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,1188,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,168,169,171,172,173,174,175,176,177,178,180,181,182,183,184,187,188,190,197,1120,1130,1135,1285,339,241,214,278,351,230,1116,1273,1307,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,1642,1677,201,1156,1173,1176,1279,340,1121,1203,1206,1209,1212,227,1129,326,327,234,1054,1060,1063,1072,1145,1149,1249,1299,255,1139,212,1111,347,1080,1114,231,1282,334,309,1103,1105,206,244,240,1066,1069,1138,1142,1153,1243,1267,1296,219,220,348,343,344,1150,199,1232,349,286,1113,221,1288,350,247,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400,391,390,389,388,376,375,374,373,372,371,370,369,368,367,366,670,612,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,74,73,72,71,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,930,929,901,899,859,858,849,814,813,796,785,769,768,749,743,742,723,691,638,577,563,552,524,523,522,521,518,517,501,475,464,459,450,436,435,434,433,432,431,405,404,398,397,384,353,700,633,986,887,852,632,629,628,600,599,598,597,596,595,465,463,441,440,414,413,409,408,403,402,364,363,360,359,1007,933,916,915,883,882,836,829,817,807,806,805,804,803,802,784,733,732,731,730,729,728,701,696,695,693,684,683,682,681,665,942,940,928,927,926,925,909,890,871,870,869,868,848,847,846,845,765,669,667,992,854,823,812,809,774,767,947,910,894,828,824,795,511,510,969,952,934,898,895,891,820,975,961,946,1005,970,997,1000,951,161])).
% 14.42/14.46 cnf(1794,plain,
% 14.42/14.46 (~E(a1,x17941)+P23(x17941)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,1188,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,168,169,171,172,173,174,175,176,177,178,180,181,182,183,184,187,188,190,197,1120,1130,1135,1285,339,241,214,278,351,230,1116,1273,1307,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,1642,1677,201,1156,1173,1176,1279,340,1121,1203,1206,1209,1212,227,1129,326,327,234,1054,1060,1063,1072,1145,1149,1249,1299,255,1139,212,1111,347,1080,1114,231,1282,334,309,1103,1105,206,244,240,1066,1069,1138,1142,1153,1243,1267,1296,219,220,348,343,344,1150,199,1232,349,286,1113,221,1288,350,247,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400,391,390,389,388,376,375,374,373,372,371,370,369,368,367,366,670,612,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,74,73,72,71,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,930,929,901,899,859,858,849,814,813,796,785,769,768,749,743,742,723,691,638,577,563,552,524,523,522,521,518,517,501,475,464,459,450,436,435,434,433,432,431,405,404,398,397,384,353,700,633,986,887,852,632,629,628,600,599,598,597,596,595,465,463,441,440,414,413,409,408,403,402,364,363,360,359,1007,933,916,915,883,882,836,829,817,807,806,805,804,803,802,784,733,732,731,730,729,728,701,696,695,693,684,683,682,681,665,942,940,928,927,926,925,909,890,871,870,869,868,848,847,846,845,765,669,667,992,854,823,812,809,774,767,947,910,894,828,824,795,511,510,969,952,934,898,895,891,820,975,961,946,1005,970,997,1000,951,161,153,146])).
% 14.42/14.46 cnf(1797,plain,
% 14.42/14.46 (~P13(f19(x17971,x17972),f41(f7(f37(f29(f43(x17972,a2)),f37(f37(f41(f19(x17971,x17972),f29(f43(x17972,a2))),f29(f43(x17972,a2)),x17972),x17973,x17974),x17974),x17975,x17976),x17977),x17974,x17978)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,1188,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,168,169,171,172,173,174,175,176,177,178,180,181,182,183,184,187,188,190,197,1120,1130,1135,1285,339,241,214,278,351,230,1116,1273,1307,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,1642,1677,201,1156,1173,1176,1279,340,1121,1203,1206,1209,1212,227,1129,326,327,234,1054,1060,1063,1072,1145,1149,1249,1299,255,1139,212,1111,347,1080,1114,231,1282,334,309,1103,1105,321,218,206,244,240,1066,1069,1138,1142,1153,1243,1267,1296,219,220,348,343,344,1150,199,1232,349,286,1113,221,1288,350,247,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400,391,390,389,388,376,375,374,373,372,371,370,369,368,367,366,670,612,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,74,73,72,71,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,930,929,901,899,859,858,849,814,813,796,785,769,768,749,743,742,723,691,638,577,563,552,524,523,522,521,518,517,501,475,464,459,450,436,435,434,433,432,431,405,404,398,397,384,353,700,633,986,887,852,632,629,628,600,599,598,597,596,595,465,463,441,440,414,413,409,408,403,402,364,363,360,359,1007,933,916,915,883,882,836,829,817,807,806,805,804,803,802,784,733,732,731,730,729,728,701,696,695,693,684,683,682,681,665,942,940,928,927,926,925,909,890,871,870,869,868,848,847,846,845,765,669,667,992,854,823,812,809,774,767,947,910,894,828,824,795,511,510,969,952,934,898,895,891,820,975,961,946,1005,970,997,1000,951,161,153,146,133,124,118])).
% 14.42/14.46 cnf(1798,plain,
% 14.42/14.46 (~P13(f4(f19(x17981,x17982),f26(a1),a1),f37(f29(f43(x17982,a2)),f37(f37(f41(f19(x17981,x17982),f29(f43(x17982,a2))),f29(f43(x17982,a2)),x17982),x17983,x17984),x17984),x17984,x17985)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,1188,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,168,169,171,172,173,174,175,176,177,178,180,181,182,183,184,187,188,190,197,1120,1130,1135,1285,339,241,214,278,351,230,1116,1273,1307,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,1642,1677,201,1156,1173,1176,1279,340,1121,1203,1206,1209,1212,227,1129,326,327,234,1054,1060,1063,1072,1145,1149,1249,1299,255,1139,212,1111,347,1080,1114,231,1282,334,309,1103,1105,321,218,206,198,244,240,1066,1069,1138,1142,1153,1243,1267,1296,219,220,348,343,344,1150,199,1232,349,286,1113,221,1288,350,247,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400,391,390,389,388,376,375,374,373,372,371,370,369,368,367,366,670,612,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,74,73,72,71,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,930,929,901,899,859,858,849,814,813,796,785,769,768,749,743,742,723,691,638,577,563,552,524,523,522,521,518,517,501,475,464,459,450,436,435,434,433,432,431,405,404,398,397,384,353,700,633,986,887,852,632,629,628,600,599,598,597,596,595,465,463,441,440,414,413,409,408,403,402,364,363,360,359,1007,933,916,915,883,882,836,829,817,807,806,805,804,803,802,784,733,732,731,730,729,728,701,696,695,693,684,683,682,681,665,942,940,928,927,926,925,909,890,871,870,869,868,848,847,846,845,765,669,667,992,854,823,812,809,774,767,947,910,894,828,824,795,511,510,969,952,934,898,895,891,820,975,961,946,1005,970,997,1000,951,161,153,146,133,124,118,117])).
% 14.42/14.46 cnf(1799,plain,
% 14.42/14.46 (~P10(f41(f41(f36(a1),f28(x17991)),x17992),x17991,a1)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,1188,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,168,169,171,172,173,174,175,176,177,178,180,181,182,183,184,187,188,190,197,1120,1130,1135,1285,339,241,214,278,351,230,1116,1273,1307,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,1642,1677,201,1156,1173,1176,1279,340,1121,1203,1206,1209,1212,227,1129,326,327,234,1054,1060,1063,1072,1145,1149,1249,1299,255,1139,212,1111,347,1080,1114,231,1282,334,309,1103,1105,321,218,206,198,244,240,1066,1069,1138,1142,1153,1243,1267,1296,219,220,348,343,344,1150,199,1232,349,286,1113,221,1288,350,247,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400,391,390,389,388,376,375,374,373,372,371,370,369,368,367,366,670,612,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,74,73,72,71,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,930,929,901,899,859,858,849,814,813,796,785,769,768,749,743,742,723,691,638,577,563,552,524,523,522,521,518,517,501,475,464,459,450,436,435,434,433,432,431,405,404,398,397,384,353,700,633,986,887,852,632,629,628,600,599,598,597,596,595,465,463,441,440,414,413,409,408,403,402,364,363,360,359,1007,933,916,915,883,882,836,829,817,807,806,805,804,803,802,784,733,732,731,730,729,728,701,696,695,693,684,683,682,681,665,942,940,928,927,926,925,909,890,871,870,869,868,848,847,846,845,765,669,667,992,854,823,812,809,774,767,947,910,894,828,824,795,511,510,969,952,934,898,895,891,820,975,961,946,1005,970,997,1000,951,161,153,146,133,124,118,117,611])).
% 14.42/14.46 cnf(1805,plain,
% 14.42/14.46 (~P12(f28(f41(f41(f36(a1),x18051),x18052)),x18051,a1)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,1188,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,168,169,171,172,173,174,175,176,177,178,180,181,182,183,184,187,188,190,197,1120,1130,1135,1285,339,241,214,278,351,230,1116,1273,1307,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,1642,1677,201,1156,1173,1176,1279,340,1121,1203,1206,1209,1212,227,1129,326,327,234,1054,1060,1063,1072,1145,1149,1249,1299,255,1139,212,1111,347,1080,1114,231,1282,334,309,1103,1105,321,218,206,198,244,240,1066,1069,1138,1142,1153,1243,1267,1296,219,220,348,343,344,1150,199,1232,349,286,1113,221,1288,350,247,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400,391,390,389,388,376,375,374,373,372,371,370,369,368,367,366,670,612,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,74,73,72,71,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,930,929,901,899,859,858,849,814,813,796,785,769,768,749,743,742,723,691,638,577,563,552,524,523,522,521,518,517,501,475,464,459,450,436,435,434,433,432,431,405,404,398,397,384,353,700,633,986,887,852,632,629,628,600,599,598,597,596,595,465,463,441,440,414,413,409,408,403,402,364,363,360,359,1007,933,916,915,883,882,836,829,817,807,806,805,804,803,802,784,733,732,731,730,729,728,701,696,695,693,684,683,682,681,665,942,940,928,927,926,925,909,890,871,870,869,868,848,847,846,845,765,669,667,992,854,823,812,809,774,767,947,910,894,828,824,795,511,510,969,952,934,898,895,891,820,975,961,946,1005,970,997,1000,951,161,153,146,133,124,118,117,611,548,546,545])).
% 14.42/14.46 cnf(1817,plain,
% 14.42/14.46 (P12(f28(f4(f26(a1),x18171,a1)),f28(f41(f41(f36(a1),f28(f26(a1))),x18172)),a1)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,1188,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,168,169,171,172,173,174,175,176,177,178,180,181,182,183,184,187,188,190,197,1120,1130,1135,1285,339,241,214,278,351,230,1116,1273,1307,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,1642,1677,201,1156,1173,1176,1279,340,1121,1203,1206,1209,1212,227,1129,326,327,234,1054,1060,1063,1072,1145,1149,1249,1299,255,1139,212,1111,347,1080,1114,231,1282,334,309,1103,1105,321,218,206,198,244,240,1066,1069,1138,1142,1153,1243,1267,1296,219,220,348,343,344,1150,199,1232,349,286,1113,221,1288,350,247,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400,391,390,389,388,376,375,374,373,372,371,370,369,368,367,366,670,612,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,74,73,72,71,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,930,929,901,899,859,858,849,814,813,796,785,769,768,749,743,742,723,691,638,577,563,552,524,523,522,521,518,517,501,475,464,459,450,436,435,434,433,432,431,405,404,398,397,384,353,700,633,986,887,852,632,629,628,600,599,598,597,596,595,465,463,441,440,414,413,409,408,403,402,364,363,360,359,1007,933,916,915,883,882,836,829,817,807,806,805,804,803,802,784,733,732,731,730,729,728,701,696,695,693,684,683,682,681,665,942,940,928,927,926,925,909,890,871,870,869,868,848,847,846,845,765,669,667,992,854,823,812,809,774,767,947,910,894,828,824,795,511,510,969,952,934,898,895,891,820,975,961,946,1005,970,997,1000,951,161,153,146,133,124,118,117,611,548,546,545,544,543,447,445,430,615])).
% 14.42/14.46 cnf(1823,plain,
% 14.42/14.46 (P8(f43(a2,a2))),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,1188,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,168,169,171,172,173,174,175,176,177,178,180,181,182,183,184,187,188,190,197,1120,1130,1135,1285,339,241,214,278,351,230,1116,1273,1307,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,1642,1677,201,1156,1173,1176,1279,340,1121,1203,1206,1209,1212,227,1129,326,327,234,1054,1060,1063,1072,1145,1149,1249,1299,255,1139,212,1111,347,1080,1114,231,1282,334,204,309,1103,1105,321,218,206,198,244,240,1066,1069,1138,1142,1153,1243,1267,1296,219,220,348,343,344,1150,199,1232,349,286,1113,221,1288,350,247,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400,391,390,389,388,376,375,374,373,372,371,370,369,368,367,366,670,612,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,74,73,72,71,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,930,929,901,899,859,858,849,814,813,796,785,769,768,749,743,742,723,691,638,577,563,552,524,523,522,521,518,517,501,475,464,459,450,436,435,434,433,432,431,405,404,398,397,384,353,700,633,986,887,852,632,629,628,600,599,598,597,596,595,465,463,441,440,414,413,409,408,403,402,364,363,360,359,1007,933,916,915,883,882,836,829,817,807,806,805,804,803,802,784,733,732,731,730,729,728,701,696,695,693,684,683,682,681,665,942,940,928,927,926,925,909,890,871,870,869,868,848,847,846,845,765,669,667,992,854,823,812,809,774,767,947,910,894,828,824,795,511,510,969,952,934,898,895,891,820,975,961,946,1005,970,997,1000,951,161,153,146,133,124,118,117,611,548,546,545,544,543,447,445,430,615,676,541,379])).
% 14.42/14.46 cnf(1825,plain,
% 14.42/14.46 (~P16(f28(x18251),f37(x18251,f39(x18252,f29(f43(x18253,a2)),x18254,x18253),x18254),x18254)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,1188,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,168,169,171,172,173,174,175,176,177,178,180,181,182,183,184,187,188,190,197,1120,1130,1135,1285,339,241,214,278,351,230,1116,1273,1307,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,1642,1677,1680,201,1156,1173,1176,1279,340,1121,1203,1206,1209,1212,227,1129,326,327,234,1054,1060,1063,1072,1145,1149,1249,1299,255,1139,212,1111,347,1080,1114,231,1282,334,204,309,1103,1105,321,218,206,198,244,240,1066,1069,1138,1142,1153,1243,1267,1296,219,220,348,343,344,1150,199,1232,349,286,1113,221,1288,350,247,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400,391,390,389,388,376,375,374,373,372,371,370,369,368,367,366,670,612,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,74,73,72,71,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,930,929,901,899,859,858,849,814,813,796,785,769,768,749,743,742,723,691,638,577,563,552,524,523,522,521,518,517,501,475,464,459,450,436,435,434,433,432,431,405,404,398,397,384,353,700,633,986,887,852,632,629,628,600,599,598,597,596,595,465,463,441,440,414,413,409,408,403,402,364,363,360,359,1007,933,916,915,883,882,836,829,817,807,806,805,804,803,802,784,733,732,731,730,729,728,701,696,695,693,684,683,682,681,665,942,940,928,927,926,925,909,890,871,870,869,868,848,847,846,845,765,669,667,992,854,823,812,809,774,767,947,910,894,828,824,795,511,510,969,952,934,898,895,891,820,975,961,946,1005,970,997,1000,951,161,153,146,133,124,118,117,611,548,546,545,544,543,447,445,430,615,676,541,379,724])).
% 14.42/14.46 cnf(1827,plain,
% 14.42/14.46 (~P34(f41(f41(a47,a46),f37(f41(a48,f50(a46,a47,a45,a48)),f29(f43(a42,a2)),a42)))),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,1188,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,168,169,171,172,173,174,175,176,177,178,180,181,182,183,184,187,188,190,197,1120,1130,1135,1285,339,241,214,278,351,230,1116,1273,1307,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,1642,1677,1680,201,1156,1173,1176,1279,340,1121,1203,1206,1209,1212,227,1129,326,327,234,1054,1060,1063,1072,1145,1149,1249,1299,255,1139,212,1111,347,1080,1114,231,1282,334,204,309,1103,1105,321,218,206,198,244,240,1066,1069,1138,1142,1153,1243,1267,1296,219,220,348,343,344,1150,199,1232,349,286,1113,221,1288,350,247,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400,391,390,389,388,376,375,374,373,372,371,370,369,368,367,366,670,612,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,74,73,72,71,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,930,929,901,899,859,858,849,814,813,796,785,769,768,749,743,742,723,691,638,577,563,552,524,523,522,521,518,517,501,475,464,459,450,436,435,434,433,432,431,405,404,398,397,384,353,700,633,986,887,852,632,629,628,600,599,598,597,596,595,465,463,441,440,414,413,409,408,403,402,364,363,360,359,1007,933,916,915,883,882,836,829,817,807,806,805,804,803,802,784,733,732,731,730,729,728,701,696,695,693,684,683,682,681,665,942,940,928,927,926,925,909,890,871,870,869,868,848,847,846,845,765,669,667,992,854,823,812,809,774,767,947,910,894,828,824,795,511,510,969,952,934,898,895,891,820,975,961,946,1005,970,997,1000,951,161,153,146,133,124,118,117,611,548,546,545,544,543,447,445,430,615,676,541,379,724,1008])).
% 14.42/14.46 cnf(1837,plain,
% 14.42/14.46 (~P16(f41(f25(f29(f43(x18371,a2)),x18372,x18371,x18373),x18374),f41(f41(f31(f43(x18371,a2)),f29(f43(x18371,a2))),f29(f43(x18371,a2))),x18371)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,1188,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,168,169,171,172,173,174,175,176,177,178,180,181,182,183,184,187,188,190,197,1120,1130,1135,1285,339,241,214,278,351,230,1116,1273,1307,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,1642,1677,1680,201,1156,1173,1176,1279,340,1121,1203,1206,1209,1212,227,1129,326,327,234,1054,1060,1063,1072,1145,1149,1249,1299,255,1139,212,1111,347,1080,1114,231,1282,334,204,309,1103,1105,321,218,206,198,244,240,1066,1069,1138,1142,1153,1243,1267,1296,219,220,348,343,344,1150,199,1232,349,286,1113,221,1288,350,247,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400,391,390,389,388,376,375,374,373,372,371,370,369,368,367,366,670,612,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,74,73,72,71,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,930,929,901,899,859,858,849,814,813,796,785,769,768,749,743,742,723,691,638,577,563,552,524,523,522,521,518,517,501,475,464,459,450,436,435,434,433,432,431,405,404,398,397,384,353,700,633,986,887,852,632,629,628,600,599,598,597,596,595,465,463,441,440,414,413,409,408,403,402,364,363,360,359,1007,933,916,915,883,882,836,829,817,807,806,805,804,803,802,784,733,732,731,730,729,728,701,696,695,693,684,683,682,681,665,942,940,928,927,926,925,909,890,871,870,869,868,848,847,846,845,765,669,667,992,854,823,812,809,774,767,947,910,894,828,824,795,511,510,969,952,934,898,895,891,820,975,961,946,1005,970,997,1000,951,161,153,146,133,124,118,117,611,548,546,545,544,543,447,445,430,615,676,541,379,724,1008,906,905,904,903,877])).
% 14.42/14.46 cnf(1839,plain,
% 14.42/14.46 (P16(f41(x18391,x18392),f41(f41(f32(f43(x18393,a2)),f37(f41(x18391,x18392),x18394,x18393)),f37(f41(x18391,x18392),x18394,x18393)),x18393)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,1188,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,168,169,171,172,173,174,175,176,177,178,180,181,182,183,184,187,188,190,197,1120,1130,1135,1285,339,241,214,278,351,230,1116,1273,1307,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,1642,1677,1680,201,1156,1173,1176,1279,340,1121,1203,1206,1209,1212,227,1129,326,327,234,1054,1060,1063,1072,1145,1149,1249,1299,255,1139,212,1111,347,1080,1114,231,1282,334,204,309,1103,1105,321,218,206,198,244,240,1066,1069,1138,1142,1153,1243,1267,1296,219,220,348,343,344,1150,199,1232,349,286,1113,221,1288,350,247,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400,391,390,389,388,376,375,374,373,372,371,370,369,368,367,366,670,612,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,74,73,72,71,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,930,929,901,899,859,858,849,814,813,796,785,769,768,749,743,742,723,691,638,577,563,552,524,523,522,521,518,517,501,475,464,459,450,436,435,434,433,432,431,405,404,398,397,384,353,700,633,986,887,852,632,629,628,600,599,598,597,596,595,465,463,441,440,414,413,409,408,403,402,364,363,360,359,1007,933,916,915,883,882,836,829,817,807,806,805,804,803,802,784,733,732,731,730,729,728,701,696,695,693,684,683,682,681,665,942,940,928,927,926,925,909,890,871,870,869,868,848,847,846,845,765,669,667,992,854,823,812,809,774,767,947,910,894,828,824,795,511,510,969,952,934,898,895,891,820,975,961,946,1005,970,997,1000,951,161,153,146,133,124,118,117,611,548,546,545,544,543,447,445,430,615,676,541,379,724,1008,906,905,904,903,877,842])).
% 14.42/14.46 cnf(1841,plain,
% 14.42/14.46 (P34(f41(f39(x18411,f37(f41(x18411,f4(f26(a1),f28(f26(a1)),a1)),f29(f43(x18412,a2)),x18413),x18414,x18415),f26(a1)))),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,1188,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,168,169,171,172,173,174,175,176,177,178,180,181,182,183,184,187,188,190,197,1120,1130,1135,1285,339,241,214,278,351,230,1116,1273,1307,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,1642,1677,1680,201,1156,1173,1176,1279,340,1121,1203,1206,1209,1212,227,1129,326,327,234,1054,1060,1063,1072,1145,1149,1249,1299,255,1139,212,1111,347,1080,1114,231,1282,334,204,309,1103,1105,321,218,206,198,244,240,1066,1069,1138,1142,1153,1243,1267,1296,219,220,348,343,344,1150,199,1232,349,286,1113,221,1288,350,247,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400,391,390,389,388,376,375,374,373,372,371,370,369,368,367,366,670,612,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,74,73,72,71,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,930,929,901,899,859,858,849,814,813,796,785,769,768,749,743,742,723,691,638,577,563,552,524,523,522,521,518,517,501,475,464,459,450,436,435,434,433,432,431,405,404,398,397,384,353,700,633,986,887,852,632,629,628,600,599,598,597,596,595,465,463,441,440,414,413,409,408,403,402,364,363,360,359,1007,933,916,915,883,882,836,829,817,807,806,805,804,803,802,784,733,732,731,730,729,728,701,696,695,693,684,683,682,681,665,942,940,928,927,926,925,909,890,871,870,869,868,848,847,846,845,765,669,667,992,854,823,812,809,774,767,947,910,894,828,824,795,511,510,969,952,934,898,895,891,820,975,961,946,1005,970,997,1000,951,161,153,146,133,124,118,117,611,548,546,545,544,543,447,445,430,615,676,541,379,724,1008,906,905,904,903,877,842,837])).
% 14.42/14.46 cnf(1853,plain,
% 14.42/14.46 (~E(f41(f41(f36(a1),f28(x18531)),x18531),x18531)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,1188,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,168,169,171,172,173,174,175,176,177,178,180,181,182,183,184,187,188,190,197,1120,1130,1135,1285,339,241,214,278,351,230,1116,1273,1307,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,1642,1677,1680,201,1156,1173,1176,1279,340,1121,1203,1206,1209,1212,227,1129,326,327,234,1054,1060,1063,1072,1145,1149,1249,1299,255,1139,212,1111,347,1080,1114,231,1282,334,204,309,1103,1105,321,218,206,198,244,240,1066,1069,1138,1142,1153,1243,1267,1296,219,220,348,343,344,1150,199,1232,349,286,1113,221,1288,350,247,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400,391,390,389,388,376,375,374,373,372,371,370,369,368,367,366,670,612,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,74,73,72,71,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,930,929,901,899,859,858,849,814,813,796,785,769,768,749,743,742,723,691,638,577,563,552,524,523,522,521,518,517,501,475,464,459,450,436,435,434,433,432,431,405,404,398,397,384,353,700,633,986,887,852,632,629,628,600,599,598,597,596,595,465,463,441,440,414,413,409,408,403,402,364,363,360,359,1007,933,916,915,883,882,836,829,817,807,806,805,804,803,802,784,733,732,731,730,729,728,701,696,695,693,684,683,682,681,665,942,940,928,927,926,925,909,890,871,870,869,868,848,847,846,845,765,669,667,992,854,823,812,809,774,767,947,910,894,828,824,795,511,510,969,952,934,898,895,891,820,975,961,946,1005,970,997,1000,951,161,153,146,133,124,118,117,611,548,546,545,544,543,447,445,430,615,676,541,379,724,1008,906,905,904,903,877,842,837,776,772,631,490,486,479])).
% 14.42/14.46 cnf(1855,plain,
% 14.42/14.46 (~E(f41(f41(f32(a1),f28(x18551)),x18551),f28(x18551))),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,1188,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,168,169,171,172,173,174,175,176,177,178,180,181,182,183,184,187,188,190,197,1120,1130,1135,1285,339,241,214,278,351,230,1116,1273,1307,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,1642,1677,1680,201,1156,1173,1176,1279,340,1121,1203,1206,1209,1212,227,1129,326,327,234,1054,1060,1063,1072,1145,1149,1249,1299,255,1139,212,1111,347,1080,1114,231,1282,334,204,309,1103,1105,321,218,206,198,244,240,1066,1069,1138,1142,1153,1243,1267,1296,219,220,348,343,344,1150,199,1232,349,286,1113,221,1288,350,247,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400,391,390,389,388,376,375,374,373,372,371,370,369,368,367,366,670,612,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,74,73,72,71,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,930,929,901,899,859,858,849,814,813,796,785,769,768,749,743,742,723,691,638,577,563,552,524,523,522,521,518,517,501,475,464,459,450,436,435,434,433,432,431,405,404,398,397,384,353,700,633,986,887,852,632,629,628,600,599,598,597,596,595,465,463,441,440,414,413,409,408,403,402,364,363,360,359,1007,933,916,915,883,882,836,829,817,807,806,805,804,803,802,784,733,732,731,730,729,728,701,696,695,693,684,683,682,681,665,942,940,928,927,926,925,909,890,871,870,869,868,848,847,846,845,765,669,667,992,854,823,812,809,774,767,947,910,894,828,824,795,511,510,969,952,934,898,895,891,820,975,961,946,1005,970,997,1000,951,161,153,146,133,124,118,117,611,548,546,545,544,543,447,445,430,615,676,541,379,724,1008,906,905,904,903,877,842,837,776,772,631,490,486,479,478])).
% 14.42/14.46 cnf(1857,plain,
% 14.42/14.46 (~E(f41(f41(f35(a1),f28(x18571)),x18571),f28(x18571))),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,1188,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,168,169,171,172,173,174,175,176,177,178,180,181,182,183,184,187,188,190,197,1120,1130,1135,1285,339,241,214,278,351,230,1116,1273,1307,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,1642,1677,1680,201,1156,1173,1176,1279,340,1121,1203,1206,1209,1212,227,1129,326,327,234,1054,1060,1063,1072,1145,1149,1249,1299,255,1139,212,1111,347,1080,1114,231,1282,334,204,309,1103,1105,321,218,206,198,244,240,1066,1069,1138,1142,1153,1243,1267,1296,219,220,348,343,344,1150,199,1232,349,286,1113,221,1288,350,247,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400,391,390,389,388,376,375,374,373,372,371,370,369,368,367,366,670,612,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,74,73,72,71,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,930,929,901,899,859,858,849,814,813,796,785,769,768,749,743,742,723,691,638,577,563,552,524,523,522,521,518,517,501,475,464,459,450,436,435,434,433,432,431,405,404,398,397,384,353,700,633,986,887,852,632,629,628,600,599,598,597,596,595,465,463,441,440,414,413,409,408,403,402,364,363,360,359,1007,933,916,915,883,882,836,829,817,807,806,805,804,803,802,784,733,732,731,730,729,728,701,696,695,693,684,683,682,681,665,942,940,928,927,926,925,909,890,871,870,869,868,848,847,846,845,765,669,667,992,854,823,812,809,774,767,947,910,894,828,824,795,511,510,969,952,934,898,895,891,820,975,961,946,1005,970,997,1000,951,161,153,146,133,124,118,117,611,548,546,545,544,543,447,445,430,615,676,541,379,724,1008,906,905,904,903,877,842,837,776,772,631,490,486,479,478,477])).
% 14.42/14.46 cnf(1859,plain,
% 14.42/14.46 (~E(f41(f41(f31(a1),f28(x18591)),x18591),x18591)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,1188,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,168,169,171,172,173,174,175,176,177,178,180,181,182,183,184,187,188,190,197,1120,1130,1135,1285,339,241,214,278,351,230,1116,1273,1307,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,1642,1677,1680,201,1156,1173,1176,1279,340,1121,1203,1206,1209,1212,227,1129,326,327,234,1054,1060,1063,1072,1145,1149,1249,1299,255,1139,212,1111,347,1080,1114,231,1282,334,204,309,1103,1105,321,218,206,198,244,240,1066,1069,1138,1142,1153,1243,1267,1296,219,220,348,343,344,1150,199,1232,349,286,1113,221,1288,350,247,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400,391,390,389,388,376,375,374,373,372,371,370,369,368,367,366,670,612,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,74,73,72,71,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,930,929,901,899,859,858,849,814,813,796,785,769,768,749,743,742,723,691,638,577,563,552,524,523,522,521,518,517,501,475,464,459,450,436,435,434,433,432,431,405,404,398,397,384,353,700,633,986,887,852,632,629,628,600,599,598,597,596,595,465,463,441,440,414,413,409,408,403,402,364,363,360,359,1007,933,916,915,883,882,836,829,817,807,806,805,804,803,802,784,733,732,731,730,729,728,701,696,695,693,684,683,682,681,665,942,940,928,927,926,925,909,890,871,870,869,868,848,847,846,845,765,669,667,992,854,823,812,809,774,767,947,910,894,828,824,795,511,510,969,952,934,898,895,891,820,975,961,946,1005,970,997,1000,951,161,153,146,133,124,118,117,611,548,546,545,544,543,447,445,430,615,676,541,379,724,1008,906,905,904,903,877,842,837,776,772,631,490,486,479,478,477,476])).
% 14.42/14.46 cnf(1867,plain,
% 14.42/14.46 (~P13(f19(x18671,x18672),f34(f43(x18673,a2)),x18673,x18674)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,1188,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,168,169,171,172,173,174,175,176,177,178,180,181,182,183,184,187,188,190,197,1120,1130,1135,1285,339,241,214,278,351,230,1116,1273,1307,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,1642,1677,1680,201,1156,1173,1176,1279,340,1121,1203,1206,1209,1212,227,1129,326,327,234,1054,1060,1063,1072,1145,1149,1249,1299,255,1139,212,1111,347,1080,1114,231,1282,334,204,309,1103,1105,321,218,206,198,244,240,1066,1069,1138,1142,1153,1243,1267,1296,219,220,348,343,1308,344,1150,199,1232,349,286,1113,221,1288,350,247,1306,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400,391,390,389,388,376,375,374,373,372,371,370,369,368,367,366,670,612,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,74,73,72,71,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,930,929,901,899,859,858,849,814,813,796,785,769,768,749,743,742,723,691,638,577,563,552,524,523,522,521,518,517,501,475,464,459,450,436,435,434,433,432,431,405,404,398,397,384,353,700,633,986,887,852,632,629,628,600,599,598,597,596,595,465,463,441,440,414,413,409,408,403,402,364,363,360,359,1007,933,916,915,883,882,836,829,817,807,806,805,804,803,802,784,733,732,731,730,729,728,701,696,695,693,684,683,682,681,665,942,940,928,927,926,925,909,890,871,870,869,868,848,847,846,845,765,669,667,992,854,823,812,809,774,767,947,910,894,828,824,795,511,510,969,952,934,898,895,891,820,975,961,946,1005,970,997,1000,951,161,153,146,133,124,118,117,611,548,546,545,544,543,447,445,430,615,676,541,379,724,1008,906,905,904,903,877,842,837,776,772,631,490,486,479,478,477,476,386,356,355,844])).
% 14.42/14.46 cnf(1869,plain,
% 14.42/14.46 (P12(f4(f28(f26(a1)),f28(f26(a1)),a1),f4(f28(f26(a1)),f26(a1),a1),a1)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,1188,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,168,169,171,172,173,174,175,176,177,178,180,181,182,183,184,187,188,190,197,1120,1130,1135,1285,339,241,214,278,351,230,1116,1273,1307,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,1642,1677,1680,201,1156,1173,1176,1279,340,1121,1203,1206,1209,1212,227,1129,326,327,234,1054,1060,1063,1072,1145,1149,1249,1299,255,1139,212,1111,347,1080,1114,231,1282,334,204,309,1103,1105,321,218,206,198,244,240,1066,1069,1138,1142,1153,1243,1267,1296,219,220,348,343,1308,344,1150,199,1232,349,286,1113,221,1288,350,247,1306,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400,391,390,389,388,376,375,374,373,372,371,370,369,368,367,366,670,612,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,74,73,72,71,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,930,929,901,899,859,858,849,814,813,796,785,769,768,749,743,742,723,691,638,577,563,552,524,523,522,521,518,517,501,475,464,459,450,436,435,434,433,432,431,405,404,398,397,384,353,700,633,986,887,852,632,629,628,600,599,598,597,596,595,465,463,441,440,414,413,409,408,403,402,364,363,360,359,1007,933,916,915,883,882,836,829,817,807,806,805,804,803,802,784,733,732,731,730,729,728,701,696,695,693,684,683,682,681,665,942,940,928,927,926,925,909,890,871,870,869,868,848,847,846,845,765,669,667,992,854,823,812,809,774,767,947,910,894,828,824,795,511,510,969,952,934,898,895,891,820,975,961,946,1005,970,997,1000,951,161,153,146,133,124,118,117,611,548,546,545,544,543,447,445,430,615,676,541,379,724,1008,906,905,904,903,877,842,837,776,772,631,490,486,479,478,477,476,386,356,355,844,816])).
% 14.42/14.46 cnf(1875,plain,
% 14.42/14.46 (~E(f41(f41(f32(a2),f28(f34(a2))),x18751),f34(a2))),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,1188,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,168,169,171,172,173,174,175,176,177,178,180,181,182,183,184,187,188,190,197,1120,1130,1135,1285,339,241,214,278,351,230,1116,1273,1307,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,1642,1677,1680,201,1156,1173,1176,1279,340,1121,1203,1206,1209,1212,227,1129,326,327,234,1054,1060,1063,1072,1145,1149,1249,1299,255,1139,212,1111,347,1080,1114,231,1282,334,204,309,1103,1105,321,218,206,198,244,240,1066,1069,1138,1142,1153,1243,1267,1296,219,220,348,343,1308,344,1150,199,1232,349,286,1113,221,1288,350,247,1306,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400,391,390,389,388,376,375,374,373,372,371,370,369,368,367,366,670,612,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,74,73,72,71,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,930,929,901,899,859,858,849,814,813,796,785,769,768,749,743,742,723,691,638,577,563,552,524,523,522,521,518,517,501,475,464,459,450,436,435,434,433,432,431,405,404,398,397,384,353,700,633,986,887,852,632,629,628,600,599,598,597,596,595,465,463,441,440,414,413,409,408,403,402,364,363,360,359,1007,933,916,915,883,882,836,829,817,807,806,805,804,803,802,784,733,732,731,730,729,728,701,696,695,693,684,683,682,681,665,942,940,928,927,926,925,909,890,871,870,869,868,848,847,846,845,765,669,667,992,854,823,812,809,774,767,947,910,894,828,824,795,511,510,969,952,934,898,895,891,820,975,961,946,1005,970,997,1000,951,161,153,146,133,124,118,117,611,548,546,545,544,543,447,445,430,615,676,541,379,724,1008,906,905,904,903,877,842,837,776,772,631,490,486,479,478,477,476,386,356,355,844,816,815,798,422])).
% 14.42/14.46 cnf(1876,plain,
% 14.42/14.46 (~E(f28(x18761),x18761)),
% 14.42/14.46 inference(rename_variables,[],[330])).
% 14.42/14.46 cnf(1878,plain,
% 14.42/14.46 (~E(f41(f41(f31(a2),f28(f29(a2))),x18781),f29(a2))),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,1188,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,168,169,171,172,173,174,175,176,177,178,180,181,182,183,184,187,188,190,197,1120,1130,1135,1285,339,241,214,278,351,230,1116,1273,1307,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,1642,1677,1680,1876,201,1156,1173,1176,1279,340,1121,1203,1206,1209,1212,227,1129,326,327,234,1054,1060,1063,1072,1145,1149,1249,1299,255,1139,212,1111,347,1080,1114,231,1282,334,204,309,1103,1105,321,218,206,198,244,240,1066,1069,1138,1142,1153,1243,1267,1296,219,220,348,343,1308,344,1150,199,1232,349,286,1113,221,1288,350,247,1306,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400,391,390,389,388,376,375,374,373,372,371,370,369,368,367,366,670,612,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,74,73,72,71,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,930,929,901,899,859,858,849,814,813,796,785,769,768,749,743,742,723,691,638,577,563,552,524,523,522,521,518,517,501,475,464,459,450,436,435,434,433,432,431,405,404,398,397,384,353,700,633,986,887,852,632,629,628,600,599,598,597,596,595,465,463,441,440,414,413,409,408,403,402,364,363,360,359,1007,933,916,915,883,882,836,829,817,807,806,805,804,803,802,784,733,732,731,730,729,728,701,696,695,693,684,683,682,681,665,942,940,928,927,926,925,909,890,871,870,869,868,848,847,846,845,765,669,667,992,854,823,812,809,774,767,947,910,894,828,824,795,511,510,969,952,934,898,895,891,820,975,961,946,1005,970,997,1000,951,161,153,146,133,124,118,117,611,548,546,545,544,543,447,445,430,615,676,541,379,724,1008,906,905,904,903,877,842,837,776,772,631,490,486,479,478,477,476,386,356,355,844,816,815,798,422,421])).
% 14.42/14.46 cnf(1879,plain,
% 14.42/14.46 (~E(f28(x18791),x18791)),
% 14.42/14.46 inference(rename_variables,[],[330])).
% 14.42/14.46 cnf(1882,plain,
% 14.42/14.46 (~E(f28(x18821),x18821)),
% 14.42/14.46 inference(rename_variables,[],[330])).
% 14.42/14.46 cnf(1887,plain,
% 14.42/14.46 (P14(x18871,f38(a48,a45,a3,a42),f37(f41(f25(f29(f43(f38(a48,a45,a3,a42),a2)),x18872,f38(a48,a45,a3,a42),x18873),x18874),f29(f43(f38(a48,a45,a3,a42),a2)),f38(a48,a45,a3,a42)),f41(f41(x18871,f41(f25(f29(f43(f38(a48,a45,a3,a42),a2)),x18872,f38(a48,a45,a3,a42),x18873),x18874)),f38(a48,a45,a3,a42)),f38(a48,a45,a3,a42),x18875)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,1188,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,168,169,171,172,173,174,175,176,177,178,180,181,182,183,184,187,188,190,197,1120,1130,1135,1285,339,241,214,278,351,230,1116,1273,1307,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,1642,1677,1680,1876,1879,1882,201,1156,1173,1176,1279,340,1121,1203,1206,1209,1212,227,1129,326,327,234,1054,1060,1063,1072,1145,1149,1249,1299,255,1139,212,1111,347,1080,1114,231,1282,334,204,309,1103,1105,321,218,206,198,244,240,1066,1069,1138,1142,1153,1243,1267,1296,219,220,348,343,1308,344,1150,199,1232,349,286,1113,221,1288,350,247,1306,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400,391,390,389,388,376,375,374,373,372,371,370,369,368,367,366,670,612,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,74,73,72,71,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,930,929,901,899,859,858,849,814,813,796,785,769,768,749,743,742,723,691,638,577,563,552,524,523,522,521,518,517,501,475,464,459,450,436,435,434,433,432,431,405,404,398,397,384,353,700,633,986,887,852,632,629,628,600,599,598,597,596,595,465,463,441,440,414,413,409,408,403,402,364,363,360,359,1007,933,916,915,883,882,836,829,817,807,806,805,804,803,802,784,733,732,731,730,729,728,701,696,695,693,684,683,682,681,665,942,940,928,927,926,925,909,890,871,870,869,868,848,847,846,845,765,669,667,992,854,823,812,809,774,767,947,910,894,828,824,795,511,510,969,952,934,898,895,891,820,975,961,946,1005,970,997,1000,951,161,153,146,133,124,118,117,611,548,546,545,544,543,447,445,430,615,676,541,379,724,1008,906,905,904,903,877,842,837,776,772,631,490,486,479,478,477,476,386,356,355,844,816,815,798,422,421,420,419,1011])).
% 14.42/14.46 cnf(1917,plain,
% 14.42/14.46 (P12(f5(f4(a45,f37(f50(a46,a47,a45,a48),f29(f43(a3,a2)),a3),f43(a3,a2)),a3),f5(a45,a3),a1)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,1188,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,168,169,171,172,173,174,175,176,177,178,180,181,182,183,184,187,188,190,197,1120,1130,1135,1285,339,241,214,278,351,230,1116,1273,1307,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,1642,1677,1680,1876,1879,1882,201,1156,1173,1176,1279,340,1121,1203,1206,1209,1212,227,1129,326,327,234,1054,1060,1063,1072,1145,1149,1249,1299,255,1139,212,1111,347,1080,1114,231,1282,334,204,309,1103,1105,321,218,206,198,244,240,1066,1069,1138,1142,1153,1243,1267,1296,314,219,220,348,343,1308,344,1150,199,1232,349,286,1113,221,1288,350,247,1306,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400,391,390,389,388,376,375,374,373,372,371,370,369,368,367,366,670,612,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,74,73,72,71,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,930,929,901,899,859,858,849,814,813,796,785,769,768,749,743,742,723,691,638,577,563,552,524,523,522,521,518,517,501,475,464,459,450,436,435,434,433,432,431,405,404,398,397,384,353,700,633,986,887,852,632,629,628,600,599,598,597,596,595,465,463,441,440,414,413,409,408,403,402,364,363,360,359,1007,933,916,915,883,882,836,829,817,807,806,805,804,803,802,784,733,732,731,730,729,728,701,696,695,693,684,683,682,681,665,942,940,928,927,926,925,909,890,871,870,869,868,848,847,846,845,765,669,667,992,854,823,812,809,774,767,947,910,894,828,824,795,511,510,969,952,934,898,895,891,820,975,961,946,1005,970,997,1000,951,161,153,146,133,124,118,117,611,548,546,545,544,543,447,445,430,615,676,541,379,724,1008,906,905,904,903,877,842,837,776,772,631,490,486,479,478,477,476,386,356,355,844,816,815,798,422,421,420,419,1011,832,640,918,893,863,861,634,616,830,996,908,907,872,998,955])).
% 14.42/14.46 cnf(1941,plain,
% 14.42/14.46 (~P12(f41(f41(f35(a1),f41(f41(f31(a1),x19411),x19412)),f41(f41(f31(a1),x19411),x19412)),f41(f41(f31(a1),x19411),x19412),a1)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,1188,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,168,169,171,172,173,174,175,176,177,178,180,181,182,183,184,187,188,190,197,1120,1130,1135,1285,339,241,214,278,351,230,1116,1273,1307,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,1642,1677,1680,1876,1879,1882,201,1156,1173,1176,1279,340,1121,1203,1206,1209,1212,227,1129,326,327,234,1054,1060,1063,1072,1145,1149,1249,1299,255,1139,212,1111,347,1080,1114,231,1282,334,204,309,1103,1105,321,218,206,1101,198,244,240,1066,1069,1138,1142,1153,1243,1267,1296,314,219,220,348,343,1308,344,1150,199,1232,349,286,1113,221,1288,350,271,247,1306,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400,391,390,389,388,376,375,374,373,372,371,370,369,368,367,366,670,612,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,74,73,72,71,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,930,929,901,899,859,858,849,814,813,796,785,769,768,749,743,742,723,691,638,577,563,552,524,523,522,521,518,517,501,475,464,459,450,436,435,434,433,432,431,405,404,398,397,384,353,700,633,986,887,852,632,629,628,600,599,598,597,596,595,465,463,441,440,414,413,409,408,403,402,364,363,360,359,1007,933,916,915,883,882,836,829,817,807,806,805,804,803,802,784,733,732,731,730,729,728,701,696,695,693,684,683,682,681,665,942,940,928,927,926,925,909,890,871,870,869,868,848,847,846,845,765,669,667,992,854,823,812,809,774,767,947,910,894,828,824,795,511,510,969,952,934,898,895,891,820,975,961,946,1005,970,997,1000,951,161,153,146,133,124,118,117,611,548,546,545,544,543,447,445,430,615,676,541,379,724,1008,906,905,904,903,877,842,837,776,772,631,490,486,479,478,477,476,386,356,355,844,816,815,798,422,421,420,419,1011,832,640,918,893,863,861,634,616,830,996,908,907,872,998,955,950,892,966,799,1001,921,585,509,507,454,782,781])).
% 14.42/14.46 cnf(1943,plain,
% 14.42/14.46 (~P10(f28(x19431),f41(f41(f36(a1),x19431),x19431),a1)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,1188,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,168,169,171,172,173,174,175,176,177,178,180,181,182,183,184,187,188,190,197,1120,1130,1135,1285,339,241,214,278,351,230,1116,1273,1307,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,1642,1677,1680,1876,1879,1882,201,1156,1173,1176,1279,340,1121,1203,1206,1209,1212,227,1129,326,327,234,1054,1060,1063,1072,1145,1149,1249,1299,255,1139,212,1111,347,1080,1114,231,1282,334,204,309,1103,1105,321,218,206,1101,198,244,240,1066,1069,1138,1142,1153,1243,1267,1296,314,219,220,348,343,1308,344,1150,199,1232,349,286,1113,221,1288,350,271,247,1306,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400,391,390,389,388,376,375,374,373,372,371,370,369,368,367,366,670,612,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,74,73,72,71,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,930,929,901,899,859,858,849,814,813,796,785,769,768,749,743,742,723,691,638,577,563,552,524,523,522,521,518,517,501,475,464,459,450,436,435,434,433,432,431,405,404,398,397,384,353,700,633,986,887,852,632,629,628,600,599,598,597,596,595,465,463,441,440,414,413,409,408,403,402,364,363,360,359,1007,933,916,915,883,882,836,829,817,807,806,805,804,803,802,784,733,732,731,730,729,728,701,696,695,693,684,683,682,681,665,942,940,928,927,926,925,909,890,871,870,869,868,848,847,846,845,765,669,667,992,854,823,812,809,774,767,947,910,894,828,824,795,511,510,969,952,934,898,895,891,820,975,961,946,1005,970,997,1000,951,161,153,146,133,124,118,117,611,548,546,545,544,543,447,445,430,615,676,541,379,724,1008,906,905,904,903,877,842,837,776,772,631,490,486,479,478,477,476,386,356,355,844,816,815,798,422,421,420,419,1011,832,640,918,893,863,861,634,616,830,996,908,907,872,998,955,950,892,966,799,1001,921,585,509,507,454,782,781,780])).
% 14.42/14.46 cnf(1949,plain,
% 14.42/14.46 (P10(f41(f41(f31(a1),f26(a1)),f26(a1)),f26(a1),a1)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,1188,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,168,169,171,172,173,174,175,176,177,178,180,181,182,183,184,187,188,190,197,1120,1130,1135,1285,339,241,214,278,351,230,1116,1273,1307,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,1642,1677,1680,1876,1879,1882,201,1156,1173,1176,1279,340,1121,1203,1206,1209,1212,227,1129,326,327,234,1054,1060,1063,1072,1145,1149,1249,1299,255,1139,212,1111,347,1080,1114,231,1282,334,204,309,1103,1105,321,218,206,1101,198,244,240,1066,1069,1138,1142,1153,1243,1267,1296,314,219,220,348,343,1308,344,1150,199,1232,349,286,1113,221,1288,350,271,247,1306,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400,391,390,389,388,376,375,374,373,372,371,370,369,368,367,366,670,612,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,74,73,72,71,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,930,929,901,899,859,858,849,814,813,796,785,769,768,749,743,742,723,691,638,577,563,552,524,523,522,521,518,517,501,475,464,459,450,436,435,434,433,432,431,405,404,398,397,384,353,700,633,986,887,852,632,629,628,600,599,598,597,596,595,465,463,441,440,414,413,409,408,403,402,364,363,360,359,1007,933,916,915,883,882,836,829,817,807,806,805,804,803,802,784,733,732,731,730,729,728,701,696,695,693,684,683,682,681,665,942,940,928,927,926,925,909,890,871,870,869,868,848,847,846,845,765,669,667,992,854,823,812,809,774,767,947,910,894,828,824,795,511,510,969,952,934,898,895,891,820,975,961,946,1005,970,997,1000,951,161,153,146,133,124,118,117,611,548,546,545,544,543,447,445,430,615,676,541,379,724,1008,906,905,904,903,877,842,837,776,772,631,490,486,479,478,477,476,386,356,355,844,816,815,798,422,421,420,419,1011,832,640,918,893,863,861,634,616,830,996,908,907,872,998,955,950,892,966,799,1001,921,585,509,507,454,782,781,780,779,764,761])).
% 14.42/14.46 cnf(1951,plain,
% 14.42/14.46 (P12(f41(f41(f36(a1),f26(a1)),f26(a1)),f28(f26(a1)),a1)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,1188,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,168,169,171,172,173,174,175,176,177,178,180,181,182,183,184,187,188,190,197,1120,1130,1135,1285,339,241,214,278,351,230,1116,1273,1307,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,1642,1677,1680,1876,1879,1882,201,1156,1173,1176,1279,340,1121,1203,1206,1209,1212,227,1129,326,327,234,1054,1060,1063,1072,1145,1149,1249,1299,255,1139,212,1111,347,1080,1114,231,1282,334,204,309,1103,1105,321,218,206,1101,198,244,240,1066,1069,1138,1142,1153,1243,1267,1296,314,219,220,348,343,1308,344,1150,199,1232,349,286,1113,221,1288,350,271,247,1306,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400,391,390,389,388,376,375,374,373,372,371,370,369,368,367,366,670,612,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,74,73,72,71,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,930,929,901,899,859,858,849,814,813,796,785,769,768,749,743,742,723,691,638,577,563,552,524,523,522,521,518,517,501,475,464,459,450,436,435,434,433,432,431,405,404,398,397,384,353,700,633,986,887,852,632,629,628,600,599,598,597,596,595,465,463,441,440,414,413,409,408,403,402,364,363,360,359,1007,933,916,915,883,882,836,829,817,807,806,805,804,803,802,784,733,732,731,730,729,728,701,696,695,693,684,683,682,681,665,942,940,928,927,926,925,909,890,871,870,869,868,848,847,846,845,765,669,667,992,854,823,812,809,774,767,947,910,894,828,824,795,511,510,969,952,934,898,895,891,820,975,961,946,1005,970,997,1000,951,161,153,146,133,124,118,117,611,548,546,545,544,543,447,445,430,615,676,541,379,724,1008,906,905,904,903,877,842,837,776,772,631,490,486,479,478,477,476,386,356,355,844,816,815,798,422,421,420,419,1011,832,640,918,893,863,861,634,616,830,996,908,907,872,998,955,950,892,966,799,1001,921,585,509,507,454,782,781,780,779,764,761,758])).
% 14.42/14.46 cnf(1953,plain,
% 14.42/14.46 (P10(x19531,f41(f41(f32(a2),x19531),x19531),a2)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,1188,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,168,169,171,172,173,174,175,176,177,178,180,181,182,183,184,187,188,190,197,1120,1130,1135,1285,339,241,214,278,351,230,1116,1273,1307,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,1642,1677,1680,1876,1879,1882,201,1156,1173,1176,1279,340,1121,1203,1206,1209,1212,227,1129,326,327,234,1054,1060,1063,1072,1145,1149,1249,1299,255,1139,212,1111,347,1080,1114,231,1282,334,204,309,1103,1105,321,218,206,1101,198,244,240,1066,1069,1138,1142,1153,1243,1267,1296,314,219,220,348,343,1308,344,1150,199,1232,349,286,1113,221,1288,350,271,247,1306,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400,391,390,389,388,376,375,374,373,372,371,370,369,368,367,366,670,612,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,74,73,72,71,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,930,929,901,899,859,858,849,814,813,796,785,769,768,749,743,742,723,691,638,577,563,552,524,523,522,521,518,517,501,475,464,459,450,436,435,434,433,432,431,405,404,398,397,384,353,700,633,986,887,852,632,629,628,600,599,598,597,596,595,465,463,441,440,414,413,409,408,403,402,364,363,360,359,1007,933,916,915,883,882,836,829,817,807,806,805,804,803,802,784,733,732,731,730,729,728,701,696,695,693,684,683,682,681,665,942,940,928,927,926,925,909,890,871,870,869,868,848,847,846,845,765,669,667,992,854,823,812,809,774,767,947,910,894,828,824,795,511,510,969,952,934,898,895,891,820,975,961,946,1005,970,997,1000,951,161,153,146,133,124,118,117,611,548,546,545,544,543,447,445,430,615,676,541,379,724,1008,906,905,904,903,877,842,837,776,772,631,490,486,479,478,477,476,386,356,355,844,816,815,798,422,421,420,419,1011,832,640,918,893,863,861,634,616,830,996,908,907,872,998,955,950,892,966,799,1001,921,585,509,507,454,782,781,780,779,764,761,758,757])).
% 14.42/14.46 cnf(1957,plain,
% 14.42/14.46 (~E(f4(f41(f41(f36(a1),f28(f26(a1))),f26(a1)),f26(a1),a1),f4(f26(a1),f26(a1),a1))),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,1188,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,168,169,171,172,173,174,175,176,177,178,180,181,182,183,184,187,188,190,197,1120,1130,1135,1285,339,241,214,278,351,230,1116,1273,1307,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,1642,1677,1680,1876,1879,1882,201,1156,1173,1176,1279,340,1121,1203,1206,1209,1212,227,1129,326,327,234,1054,1060,1063,1072,1145,1149,1249,1299,255,1139,212,1111,347,1080,1114,231,1282,334,204,309,1103,1105,321,218,206,1101,198,244,240,1066,1069,1138,1142,1153,1243,1267,1296,314,219,220,348,343,1308,344,1150,199,1232,349,286,1113,221,1288,350,271,247,1306,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400,391,390,389,388,376,375,374,373,372,371,370,369,368,367,366,670,612,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,74,73,72,71,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,930,929,901,899,859,858,849,814,813,796,785,769,768,749,743,742,723,691,638,577,563,552,524,523,522,521,518,517,501,475,464,459,450,436,435,434,433,432,431,405,404,398,397,384,353,700,633,986,887,852,632,629,628,600,599,598,597,596,595,465,463,441,440,414,413,409,408,403,402,364,363,360,359,1007,933,916,915,883,882,836,829,817,807,806,805,804,803,802,784,733,732,731,730,729,728,701,696,695,693,684,683,682,681,665,942,940,928,927,926,925,909,890,871,870,869,868,848,847,846,845,765,669,667,992,854,823,812,809,774,767,947,910,894,828,824,795,511,510,969,952,934,898,895,891,820,975,961,946,1005,970,997,1000,951,161,153,146,133,124,118,117,611,548,546,545,544,543,447,445,430,615,676,541,379,724,1008,906,905,904,903,877,842,837,776,772,631,490,486,479,478,477,476,386,356,355,844,816,815,798,422,421,420,419,1011,832,640,918,893,863,861,634,616,830,996,908,907,872,998,955,950,892,966,799,1001,921,585,509,507,454,782,781,780,779,764,761,758,757,751,750])).
% 14.42/14.46 cnf(1959,plain,
% 14.42/14.46 (~P10(f5(f37(x19591,a45,a3),a3),f5(f29(f43(a3,a2)),a3),a1)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,1188,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,168,169,171,172,173,174,175,176,177,178,180,181,182,183,184,187,188,190,197,1120,1130,1135,1285,339,241,214,278,351,230,1116,1273,1307,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,1642,1677,1680,1876,1879,1882,201,1156,1173,1176,1279,340,1121,1203,1206,1209,1212,227,1129,326,327,234,1054,1060,1063,1072,1145,1149,1249,1299,255,1139,212,1111,347,1080,1114,231,1282,334,204,309,1103,1105,321,218,206,1101,198,244,240,1066,1069,1138,1142,1153,1243,1267,1296,314,219,220,1289,348,343,1308,344,1150,1229,199,1232,349,286,1113,221,1288,350,271,247,1306,246,262,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400,391,390,389,388,376,375,374,373,372,371,370,369,368,367,366,670,612,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,74,73,72,71,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,930,929,901,899,859,858,849,814,813,796,785,769,768,749,743,742,723,691,638,577,563,552,524,523,522,521,518,517,501,475,464,459,450,436,435,434,433,432,431,405,404,398,397,384,353,700,633,986,887,852,632,629,628,600,599,598,597,596,595,465,463,441,440,414,413,409,408,403,402,364,363,360,359,1007,933,916,915,883,882,836,829,817,807,806,805,804,803,802,784,733,732,731,730,729,728,701,696,695,693,684,683,682,681,665,942,940,928,927,926,925,909,890,871,870,869,868,848,847,846,845,765,669,667,992,854,823,812,809,774,767,947,910,894,828,824,795,511,510,969,952,934,898,895,891,820,975,961,946,1005,970,997,1000,951,161,153,146,133,124,118,117,611,548,546,545,544,543,447,445,430,615,676,541,379,724,1008,906,905,904,903,877,842,837,776,772,631,490,486,479,478,477,476,386,356,355,844,816,815,798,422,421,420,419,1011,832,640,918,893,863,861,634,616,830,996,908,907,872,998,955,950,892,966,799,1001,921,585,509,507,454,782,781,780,779,764,761,758,757,751,750,727])).
% 14.42/14.46 cnf(1969,plain,
% 14.42/14.46 (P12(f5(f4(f4(a45,f37(f50(a46,a47,a45,a48),f29(f43(a3,a2)),a3),f43(a3,a2)),f37(f50(a46,a47,a45,a48),f29(f43(a3,a2)),a3),f43(a3,a2)),a3),f5(a45,a3),a1)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,1188,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,168,169,171,172,173,174,175,176,177,178,180,181,182,183,184,187,188,190,197,1120,1130,1135,1285,339,241,214,278,351,230,1116,1273,1307,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,1642,1677,1680,1876,1879,1882,201,1156,1173,1176,1279,340,1121,1203,1206,1209,1212,227,1129,326,327,234,1054,1060,1063,1072,1145,1149,1249,1299,255,1139,212,1111,347,1080,1114,231,1282,334,204,309,1103,1105,321,218,206,1101,198,244,240,1066,1069,1138,1142,1153,1243,1267,1296,314,219,220,1289,348,1293,343,1308,344,1150,1229,199,1232,349,286,1113,221,1288,350,271,272,247,1306,246,262,1240,249,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400,391,390,389,388,376,375,374,373,372,371,370,369,368,367,366,670,612,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,74,73,72,71,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,930,929,901,899,859,858,849,814,813,796,785,769,768,749,743,742,723,691,638,577,563,552,524,523,522,521,518,517,501,475,464,459,450,436,435,434,433,432,431,405,404,398,397,384,353,700,633,986,887,852,632,629,628,600,599,598,597,596,595,465,463,441,440,414,413,409,408,403,402,364,363,360,359,1007,933,916,915,883,882,836,829,817,807,806,805,804,803,802,784,733,732,731,730,729,728,701,696,695,693,684,683,682,681,665,942,940,928,927,926,925,909,890,871,870,869,868,848,847,846,845,765,669,667,992,854,823,812,809,774,767,947,910,894,828,824,795,511,510,969,952,934,898,895,891,820,975,961,946,1005,970,997,1000,951,161,153,146,133,124,118,117,611,548,546,545,544,543,447,445,430,615,676,541,379,724,1008,906,905,904,903,877,842,837,776,772,631,490,486,479,478,477,476,386,356,355,844,816,815,798,422,421,420,419,1011,832,640,918,893,863,861,634,616,830,996,908,907,872,998,955,950,892,966,799,1001,921,585,509,507,454,782,781,780,779,764,761,758,757,751,750,727,788,576,991,980,1004])).
% 14.42/14.46 cnf(1971,plain,
% 14.42/14.46 (P9(f37(f41(f25(f29(f43(f38(a48,a45,a3,a42),a2)),x19711,f38(a48,a45,a3,a42),x19712),x19713),f29(f43(f38(a48,a45,a3,a42),a2)),f38(a48,a45,a3,a42)),f38(a48,a45,a3,a42))),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,1188,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,168,169,171,172,173,174,175,176,177,178,180,181,182,183,184,187,188,190,197,1120,1130,1135,1285,339,241,214,278,351,230,1116,1273,1307,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,1642,1677,1680,1876,1879,1882,201,1156,1173,1176,1279,340,1121,1203,1206,1209,1212,227,1129,326,327,234,1054,1060,1063,1072,1145,1149,1249,1299,255,1139,212,1111,347,1080,1114,231,1282,334,204,309,1103,1105,321,218,206,1101,198,244,240,1066,1069,1138,1142,1153,1243,1267,1296,314,219,220,1289,348,1293,343,1308,344,1150,1229,199,1232,349,286,1113,221,1288,350,271,272,247,1306,246,262,1240,249,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400,391,390,389,388,376,375,374,373,372,371,370,369,368,367,366,670,612,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,74,73,72,71,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,930,929,901,899,859,858,849,814,813,796,785,769,768,749,743,742,723,691,638,577,563,552,524,523,522,521,518,517,501,475,464,459,450,436,435,434,433,432,431,405,404,398,397,384,353,700,633,986,887,852,632,629,628,600,599,598,597,596,595,465,463,441,440,414,413,409,408,403,402,364,363,360,359,1007,933,916,915,883,882,836,829,817,807,806,805,804,803,802,784,733,732,731,730,729,728,701,696,695,693,684,683,682,681,665,942,940,928,927,926,925,909,890,871,870,869,868,848,847,846,845,765,669,667,992,854,823,812,809,774,767,947,910,894,828,824,795,511,510,969,952,934,898,895,891,820,975,961,946,1005,970,997,1000,951,161,153,146,133,124,118,117,611,548,546,545,544,543,447,445,430,615,676,541,379,724,1008,906,905,904,903,877,842,837,776,772,631,490,486,479,478,477,476,386,356,355,844,816,815,798,422,421,420,419,1011,832,640,918,893,863,861,634,616,830,996,908,907,872,998,955,950,892,966,799,1001,921,585,509,507,454,782,781,780,779,764,761,758,757,751,750,727,788,576,991,980,1004,1009])).
% 14.42/14.46 cnf(1979,plain,
% 14.42/14.46 (~P24(f41(f20(x19791,x19792,a1,x19793,x19794),x19792))),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,1188,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,168,169,171,172,173,174,175,176,177,178,180,181,182,183,184,187,188,190,197,1120,1130,1135,1285,339,241,214,278,351,230,1116,1273,1307,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,1642,1677,1680,1876,1879,1882,201,1156,1173,1176,1279,340,1121,1203,1206,1209,1212,227,1129,326,327,234,1054,1060,1063,1072,1145,1149,1249,1299,255,1139,212,1111,347,1080,1114,231,1282,334,204,309,1103,1105,321,218,206,1101,198,244,240,1066,1069,1138,1142,1153,1243,1267,1296,314,219,220,1289,348,1293,343,1308,344,1150,1229,199,1232,349,286,1113,221,1288,350,271,272,247,1306,246,262,1240,249,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400,391,390,389,388,376,375,374,373,372,371,370,369,368,367,366,670,612,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,74,73,72,71,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,930,929,901,899,859,858,849,814,813,796,785,769,768,749,743,742,723,691,638,577,563,552,524,523,522,521,518,517,501,475,464,459,450,436,435,434,433,432,431,405,404,398,397,384,353,700,633,986,887,852,632,629,628,600,599,598,597,596,595,465,463,441,440,414,413,409,408,403,402,364,363,360,359,1007,933,916,915,883,882,836,829,817,807,806,805,804,803,802,784,733,732,731,730,729,728,701,696,695,693,684,683,682,681,665,942,940,928,927,926,925,909,890,871,870,869,868,848,847,846,845,765,669,667,992,854,823,812,809,774,767,947,910,894,828,824,795,511,510,969,952,934,898,895,891,820,975,961,946,1005,970,997,1000,951,161,153,146,133,124,118,117,611,548,546,545,544,543,447,445,430,615,676,541,379,724,1008,906,905,904,903,877,842,837,776,772,631,490,486,479,478,477,476,386,356,355,844,816,815,798,422,421,420,419,1011,832,640,918,893,863,861,634,616,830,996,908,907,872,998,955,950,892,966,799,1001,921,585,509,507,454,782,781,780,779,764,761,758,757,751,750,727,788,576,991,980,1004,1009,416,387,976,158])).
% 14.42/14.46 cnf(1980,plain,
% 14.42/14.46 (~P22(f4(f43(x19801,a2),f29(f43(x19802,a2)),f43(x19802,a2)))),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,1188,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,168,169,171,172,173,174,175,176,177,178,180,181,182,183,184,187,188,190,197,1120,1130,1135,1285,339,241,214,278,351,230,1116,1273,1307,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,1642,1677,1680,1876,1879,1882,201,1156,1173,1176,1279,340,1121,1203,1206,1209,1212,227,1129,326,327,234,1054,1060,1063,1072,1145,1149,1249,1299,255,1139,212,1111,347,1080,1114,231,1282,334,204,309,1103,1105,321,218,206,1101,198,244,240,1066,1069,1138,1142,1153,1243,1267,1296,314,219,220,1289,348,1293,343,1308,344,1150,1229,199,1232,349,286,1113,221,1288,1292,350,271,272,247,1306,246,262,1240,249,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400,391,390,389,388,376,375,374,373,372,371,370,369,368,367,366,670,612,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,74,73,72,71,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,930,929,901,899,859,858,849,814,813,796,785,769,768,749,743,742,723,691,638,577,563,552,524,523,522,521,518,517,501,475,464,459,450,436,435,434,433,432,431,405,404,398,397,384,353,700,633,986,887,852,632,629,628,600,599,598,597,596,595,465,463,441,440,414,413,409,408,403,402,364,363,360,359,1007,933,916,915,883,882,836,829,817,807,806,805,804,803,802,784,733,732,731,730,729,728,701,696,695,693,684,683,682,681,665,942,940,928,927,926,925,909,890,871,870,869,868,848,847,846,845,765,669,667,992,854,823,812,809,774,767,947,910,894,828,824,795,511,510,969,952,934,898,895,891,820,975,961,946,1005,970,997,1000,951,161,153,146,133,124,118,117,611,548,546,545,544,543,447,445,430,615,676,541,379,724,1008,906,905,904,903,877,842,837,776,772,631,490,486,479,478,477,476,386,356,355,844,816,815,798,422,421,420,419,1011,832,640,918,893,863,861,634,616,830,996,908,907,872,998,955,950,892,966,799,1001,921,585,509,507,454,782,781,780,779,764,761,758,757,751,750,727,788,576,991,980,1004,1009,416,387,976,158,156])).
% 14.42/14.46 cnf(1982,plain,
% 14.42/14.46 (~P27(f41(f20(x19821,x19822,a1,x19823,x19824),x19822))),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,1188,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,168,169,171,172,173,174,175,176,177,178,180,181,182,183,184,187,188,190,197,1120,1130,1135,1285,339,241,214,278,276,351,230,1116,1273,1307,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,1642,1677,1680,1876,1879,1882,201,1156,1173,1176,1279,340,1121,1203,1206,1209,1212,227,1129,326,327,234,1054,1060,1063,1072,1145,1149,1249,1299,255,1139,212,1111,347,1080,1114,231,1282,334,204,309,1103,1105,321,218,206,1101,198,244,240,1066,1069,1138,1142,1153,1243,1267,1296,314,219,220,1289,348,1293,343,1308,344,1150,1229,199,1232,349,286,1113,221,1288,1292,350,271,272,247,1306,246,262,1240,249,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400,391,390,389,388,376,375,374,373,372,371,370,369,368,367,366,670,612,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,74,73,72,71,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,930,929,901,899,859,858,849,814,813,796,785,769,768,749,743,742,723,691,638,577,563,552,524,523,522,521,518,517,501,475,464,459,450,436,435,434,433,432,431,405,404,398,397,384,353,700,633,986,887,852,632,629,628,600,599,598,597,596,595,465,463,441,440,414,413,409,408,403,402,364,363,360,359,1007,933,916,915,883,882,836,829,817,807,806,805,804,803,802,784,733,732,731,730,729,728,701,696,695,693,684,683,682,681,665,942,940,928,927,926,925,909,890,871,870,869,868,848,847,846,845,765,669,667,992,854,823,812,809,774,767,947,910,894,828,824,795,511,510,969,952,934,898,895,891,820,975,961,946,1005,970,997,1000,951,161,153,146,133,124,118,117,611,548,546,545,544,543,447,445,430,615,676,541,379,724,1008,906,905,904,903,877,842,837,776,772,631,490,486,479,478,477,476,386,356,355,844,816,815,798,422,421,420,419,1011,832,640,918,893,863,861,634,616,830,996,908,907,872,998,955,950,892,966,799,1001,921,585,509,507,454,782,781,780,779,764,761,758,757,751,750,727,788,576,991,980,1004,1009,416,387,976,158,156,148,140])).
% 14.42/14.46 cnf(1987,plain,
% 14.42/14.46 (~E(f37(x19871,x19872,x19873),f29(f43(x19873,a2)))),
% 14.42/14.46 inference(rename_variables,[],[343])).
% 14.42/14.46 cnf(1999,plain,
% 14.42/14.46 (P10(f41(f41(f35(a1),f26(a1)),x19991),f41(f41(f32(a1),x19992),f26(a1)),a1)),
% 14.42/14.46 inference(scs_inference,[],[189,195,194,1161,1164,1167,1170,1179,1182,1185,1188,336,1026,1107,1109,1191,1194,1197,1200,1215,1218,1221,192,167,168,169,171,172,173,174,175,176,177,178,180,181,182,183,184,187,188,190,197,1120,1130,1135,1285,339,241,214,278,276,351,230,1116,1273,1307,210,1094,1118,1264,1270,1276,342,1246,330,1051,1057,1077,1127,1258,1261,1642,1677,1680,1876,1879,1882,201,1156,1173,1176,1279,340,1121,1203,1206,1209,1212,227,1129,326,327,234,1054,1060,1063,1072,1145,1149,1249,1299,255,1139,212,1111,347,1080,1114,231,1282,334,204,309,1103,1105,321,218,206,1101,198,244,240,1066,1069,1138,1142,1153,1243,1267,1296,314,219,220,1289,348,1293,343,1308,1987,344,1150,1229,199,1232,349,286,1113,221,1288,1292,350,271,272,247,1306,246,262,1240,249,293,2,458,426,417,412,354,630,540,484,483,481,471,468,399,500,442,425,569,827,770,619,881,880,879,878,783,702,675,914,973,936,797,801,773,900,163,162,160,152,149,143,135,132,131,129,128,127,123,122,119,114,113,111,3,537,494,462,896,680,636,583,520,748,922,722,720,718,716,714,713,712,710,708,706,658,657,656,654,652,650,648,647,646,644,642,641,912,550,424,423,581,819,741,740,739,674,672,601,410,456,923,811,792,791,949,623,620,555,736,735,800,833,987,924,867,393,415,427,1010,808,539,536,534,528,526,515,480,473,469,439,437,400,391,390,389,388,376,375,374,373,372,371,370,369,368,367,366,670,612,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,74,73,72,71,70,69,68,67,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,930,929,901,899,859,858,849,814,813,796,785,769,768,749,743,742,723,691,638,577,563,552,524,523,522,521,518,517,501,475,464,459,450,436,435,434,433,432,431,405,404,398,397,384,353,700,633,986,887,852,632,629,628,600,599,598,597,596,595,465,463,441,440,414,413,409,408,403,402,364,363,360,359,1007,933,916,915,883,882,836,829,817,807,806,805,804,803,802,784,733,732,731,730,729,728,701,696,695,693,684,683,682,681,665,942,940,928,927,926,925,909,890,871,870,869,868,848,847,846,845,765,669,667,992,854,823,812,809,774,767,947,910,894,828,824,795,511,510,969,952,934,898,895,891,820,975,961,946,1005,970,997,1000,951,161,153,146,133,124,118,117,611,548,546,545,544,543,447,445,430,615,676,541,379,724,1008,906,905,904,903,877,842,837,776,772,631,490,486,479,478,477,476,386,356,355,844,816,815,798,422,421,420,419,1011,832,640,918,893,863,861,634,616,830,996,908,907,872,998,955,950,892,966,799,1001,921,585,509,507,454,782,781,780,779,764,761,758,757,751,750,727,788,576,991,980,1004,1009,416,387,976,158,156,148,140,112,493,498,496,704,703,664,663,662])).
% 14.42/14.46 cnf(2036,plain,
% 14.42/14.46 (P9(x20361,a2)),
% 14.42/14.46 inference(rename_variables,[],[1023])).
% 14.42/14.46 cnf(2038,plain,
% 14.42/14.46 (~P16(x20381,f39(x20382,f37(f28(f41(x20382,x20381)),f29(f43(x20383,a2)),x20383),x20384,x20383),x20384)),
% 14.42/14.46 inference(scs_inference,[],[1108,1023,692,964])).
% 14.42/14.46 cnf(2039,plain,
% 14.42/14.46 (~E(x20391,f28(x20391))),
% 14.42/14.46 inference(rename_variables,[],[1108])).
% 14.42/14.46 cnf(2041,plain,
% 14.42/14.46 (~P34(f41(f41(a47,f37(f41(a48,f50(a46,a47,a45,a48)),a46,a42)),f37(f49(f33(f41(a6,f50(a46,a47,a45,a48)),a40)),f29(f43(a42,a2)),a42)))),
% 14.42/14.46 inference(scs_inference,[],[1108,1827,1023,692,964,994])).
% 14.42/14.46 cnf(2043,plain,
% 14.42/14.46 (~E(f4(f28(x20431),f26(a1),a1),f26(a1))),
% 14.42/14.46 inference(scs_inference,[],[199,334,1108,1827,1023,692,964,994,538])).
% 14.42/14.46 cnf(2047,plain,
% 14.42/14.46 (~P13(f19(x20471,x20472),f41(f7(f37(f29(f43(x20472,a2)),f37(f37(f41(f19(x20471,x20472),f29(f43(x20472,a2))),f29(f43(x20472,a2)),x20472),x20473,x20474),x20474),x20475,x20476),x20477),x20474,x20478)),
% 14.42/14.46 inference(rename_variables,[],[1797])).
% 14.42/14.46 cnf(2048,plain,
% 14.42/14.46 (P9(x20481,a2)),
% 14.42/14.46 inference(rename_variables,[],[1023])).
% 14.42/14.46 cnf(2051,plain,
% 14.42/14.46 (P9(x20511,a2)),
% 14.42/14.46 inference(rename_variables,[],[1023])).
% 14.42/14.46 cnf(2052,plain,
% 14.42/14.46 (~E(f28(x20521),x20521)),
% 14.42/14.46 inference(rename_variables,[],[330])).
% 14.42/14.46 cnf(2055,plain,
% 14.42/14.46 (P13(x20551,f4(f29(f43(x20552,a2)),x20553,f43(x20552,a2)),x20552,x20554)),
% 14.42/14.46 inference(rename_variables,[],[1489])).
% 14.42/14.46 cnf(2056,plain,
% 14.42/14.46 (~E(f41(f41(f31(f43(x20561,a2)),f28(f29(f43(x20561,a2)))),x20562),f29(f43(x20561,a2)))),
% 14.42/14.46 inference(rename_variables,[],[1676])).
% 14.42/14.46 cnf(2061,plain,
% 14.42/14.46 (~P10(f41(f41(f36(a1),x20611),f28(x20612)),x20612,a1)),
% 14.42/14.46 inference(scs_inference,[],[1017,227,199,330,340,334,171,169,1108,1797,1489,1676,1827,1163,1023,2036,2048,692,964,994,538,931,671,984,627,626])).
% 14.42/14.46 cnf(2065,plain,
% 14.42/14.46 (~P12(f28(x20651),x20651,a1)),
% 14.42/14.46 inference(rename_variables,[],[1015])).
% 14.42/14.46 cnf(2070,plain,
% 14.42/14.46 (~P12(f28(f28(f41(f41(f36(a1),x20701),x20702))),f28(x20701),a1)),
% 14.42/14.46 inference(scs_inference,[],[1015,2065,1017,227,199,330,340,334,171,169,1108,1797,1489,1676,1827,1030,1338,1163,1023,2036,2048,692,964,994,538,931,671,984,627,626,625,624,622])).
% 14.42/14.46 cnf(2071,plain,
% 14.42/14.46 (~P12(f28(x20711),x20711,a1)),
% 14.42/14.46 inference(rename_variables,[],[1015])).
% 14.42/14.46 cnf(2073,plain,
% 14.42/14.46 (~P12(f41(f41(f32(a2),x20731),x20731),x20731,a2)),
% 14.42/14.46 inference(scs_inference,[],[1015,2065,1017,170,227,199,330,340,334,171,169,1108,1797,1489,1676,1827,1019,1030,1338,1953,1163,1023,2036,2048,692,964,994,538,931,671,984,627,626,625,624,622,621])).
% 14.42/14.46 cnf(2074,plain,
% 14.42/14.46 (P10(x20741,f41(f41(f32(a2),x20741),x20741),a2)),
% 14.42/14.46 inference(rename_variables,[],[1953])).
% 14.42/14.46 cnf(2078,plain,
% 14.42/14.46 (~P12(f4(f28(x20781),x20781,a1),f4(x20781,x20781,a1),a1)),
% 14.42/14.46 inference(scs_inference,[],[1015,2065,2071,1017,170,194,227,199,330,340,334,171,169,173,1108,1797,1489,1676,1827,1019,1030,1338,1953,1163,1023,2036,2048,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874])).
% 14.42/14.46 cnf(2079,plain,
% 14.42/14.46 (P10(x20791,f28(x20791),a1)),
% 14.42/14.46 inference(rename_variables,[],[1017])).
% 14.42/14.46 cnf(2080,plain,
% 14.42/14.46 (~P12(f28(x20801),x20801,a1)),
% 14.42/14.46 inference(rename_variables,[],[1015])).
% 14.42/14.46 cnf(2082,plain,
% 14.42/14.46 (P10(f41(f19(f32(a2),a2),f34(f43(a2,a2))),x20821,a2)),
% 14.42/14.46 inference(scs_inference,[],[1015,2065,2071,1017,170,194,227,212,199,330,340,334,171,175,169,173,1108,1797,1489,1676,1827,1019,1030,1338,1953,1163,1023,2036,2048,2051,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687])).
% 14.42/14.46 cnf(2083,plain,
% 14.42/14.46 (P9(x20831,a2)),
% 14.42/14.46 inference(rename_variables,[],[1023])).
% 14.42/14.46 cnf(2084,plain,
% 14.42/14.46 (P16(x20841,f34(f43(x20842,a2)),x20842)),
% 14.42/14.46 inference(rename_variables,[],[212])).
% 14.42/14.46 cnf(2087,plain,
% 14.42/14.46 (P9(x20871,a2)),
% 14.42/14.46 inference(rename_variables,[],[1023])).
% 14.42/14.46 cnf(2088,plain,
% 14.42/14.46 (P13(x20881,f29(f43(x20882,a2)),x20882,x20883)),
% 14.42/14.46 inference(rename_variables,[],[255])).
% 14.42/14.46 cnf(2089,plain,
% 14.42/14.46 (P10(x20891,f41(f41(f31(f43(x20892,a2)),x20893),x20891),f43(x20892,a2))),
% 14.42/14.46 inference(rename_variables,[],[269])).
% 14.42/14.46 cnf(2094,plain,
% 14.42/14.46 (P13(f25(f29(f43(x20941,a2)),x20942,x20941,x20943),f38(x20942,f29(f43(x20941,a2)),x20941,x20943),x20943,x20941)),
% 14.42/14.46 inference(rename_variables,[],[1762])).
% 14.42/14.46 cnf(2096,plain,
% 14.42/14.46 (~P12(x20961,x20961,f43(x20962,a2))),
% 14.42/14.46 inference(rename_variables,[],[342])).
% 14.42/14.46 cnf(2099,plain,
% 14.42/14.46 (P9(x20991,a2)),
% 14.42/14.46 inference(rename_variables,[],[1023])).
% 14.42/14.46 cnf(2102,plain,
% 14.42/14.46 (~P12(f34(f43(a2,a2)),f37(f26(a1),f34(f43(a2,a2)),a2),f43(a2,a2))),
% 14.42/14.46 inference(scs_inference,[],[1014,1015,2065,2071,1017,186,269,170,223,194,342,2096,227,212,2084,199,330,255,340,334,171,175,169,173,1108,1797,1762,1489,1295,1867,1676,1827,1019,1030,1338,1953,1163,1023,2036,2048,2051,2083,2087,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825])).
% 14.42/14.46 cnf(2103,plain,
% 14.42/14.46 (P16(x21031,f34(f43(x21032,a2)),x21032)),
% 14.42/14.46 inference(rename_variables,[],[212])).
% 14.42/14.46 cnf(2104,plain,
% 14.42/14.46 (~P12(x21041,x21041,f43(x21042,a2))),
% 14.42/14.46 inference(rename_variables,[],[342])).
% 14.42/14.46 cnf(2107,plain,
% 14.42/14.46 (P10(x21071,f28(x21071),a1)),
% 14.42/14.46 inference(rename_variables,[],[1017])).
% 14.42/14.46 cnf(2108,plain,
% 14.42/14.46 (~P10(f28(x21081),x21081,a1)),
% 14.42/14.46 inference(rename_variables,[],[340])).
% 14.42/14.46 cnf(2112,plain,
% 14.42/14.46 (P10(f41(f41(f32(f43(x21121,a1)),x21122),x21123),x21122,f43(x21121,a1))),
% 14.42/14.46 inference(scs_inference,[],[1014,1015,2065,2071,1017,2079,186,269,170,223,194,342,2096,227,212,2084,199,330,255,340,334,171,175,169,173,1108,1797,1762,1489,1295,1867,1676,1827,1366,1370,1019,1030,1338,1953,1163,1023,2036,2048,2051,2083,2087,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535])).
% 14.42/14.46 cnf(2114,plain,
% 14.42/14.46 (P10(f41(f41(f32(f43(x21141,a1)),x21142),x21143),x21143,f43(x21141,a1))),
% 14.42/14.46 inference(scs_inference,[],[1014,1015,2065,2071,1017,2079,186,269,170,223,194,342,2096,227,212,2084,199,330,255,340,334,171,175,169,173,1108,1797,1762,1489,1295,1867,1676,1827,1366,1370,1019,1030,1338,1953,1163,1023,2036,2048,2051,2083,2087,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533])).
% 14.42/14.46 cnf(2116,plain,
% 14.42/14.46 (P10(x21161,f41(f41(f31(f43(x21162,a1)),x21161),x21163),f43(x21162,a1))),
% 14.42/14.46 inference(scs_inference,[],[1014,1015,2065,2071,1017,2079,186,269,170,223,194,342,2096,227,212,2084,199,330,255,340,334,171,175,169,173,1108,1797,1762,1489,1295,1867,1676,1827,1366,1370,1372,1019,1030,1338,1953,1163,1023,2036,2048,2051,2083,2087,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527])).
% 14.42/14.46 cnf(2118,plain,
% 14.42/14.46 (P10(x21181,f41(f41(f31(f43(x21182,a1)),x21183),x21181),f43(x21182,a1))),
% 14.42/14.46 inference(scs_inference,[],[1014,1015,2065,2071,1017,2079,186,269,170,223,194,342,2096,227,212,2084,199,330,255,340,334,171,175,169,173,1108,1797,1762,1489,1295,1867,1676,1827,1366,1370,1372,1019,1030,1338,1953,1163,1023,2036,2048,2051,2083,2087,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525])).
% 14.42/14.46 cnf(2121,plain,
% 14.42/14.46 (~P16(x21211,f29(f43(x21212,a2)),x21212)),
% 14.42/14.46 inference(rename_variables,[],[347])).
% 14.42/14.46 cnf(2122,plain,
% 14.42/14.46 (~E(f29(f43(x21221,a2)),f37(x21222,x21223,x21221))),
% 14.42/14.46 inference(rename_variables,[],[344])).
% 14.42/14.46 cnf(2124,plain,
% 14.42/14.46 (P12(f38(f19(x21241,x21242),f34(f43(a2,a2)),a2,a2),f34(f43(a2,a2)),f43(a2,a2))),
% 14.42/14.46 inference(scs_inference,[],[1014,1015,2065,2071,1017,2079,186,269,170,223,194,342,2096,227,212,2084,347,219,344,199,330,255,184,340,334,171,175,169,173,1108,1797,1825,1762,1489,1295,1867,1676,1827,1366,1370,1372,1019,1030,1338,1953,1163,1023,2036,2048,2051,2083,2087,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694])).
% 14.42/14.46 cnf(2125,plain,
% 14.42/14.46 (P10(x21251,f34(f43(x21252,a2)),f43(x21252,a2))),
% 14.42/14.46 inference(rename_variables,[],[219])).
% 14.42/14.46 cnf(2129,plain,
% 14.42/14.46 (~P10(f28(x21291),x21291,a1)),
% 14.42/14.46 inference(rename_variables,[],[340])).
% 14.42/14.46 cnf(2132,plain,
% 14.42/14.46 (P10(x21321,f34(a2),a2)),
% 14.42/14.46 inference(scs_inference,[],[1014,1015,2065,2071,1017,2079,186,269,170,223,194,187,342,2096,227,212,2084,347,219,344,199,330,255,184,340,2108,334,171,175,169,173,1108,1797,1825,1762,1489,1887,1295,1867,1676,1827,1495,1366,1370,1372,1019,1030,1338,1953,1163,1023,2036,2048,2051,2083,2087,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399])).
% 14.42/14.46 cnf(2134,plain,
% 14.42/14.46 (~P34(f41(f37(x21341,f39(x21342,f29(f43(x21343,a2)),x21344,x21343),x21344),f28(x21341)))),
% 14.42/14.46 inference(scs_inference,[],[1014,1015,2065,2071,1017,2079,186,269,170,223,194,187,342,2096,227,212,2084,347,219,344,199,330,255,184,340,2108,334,171,175,169,173,1108,1797,1825,1762,1489,1887,1295,1867,1676,1827,1495,1366,1370,1372,1019,1030,1338,1953,1163,1023,2036,2048,2051,2083,2087,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425])).
% 14.42/14.46 cnf(2137,plain,
% 14.42/14.46 (P10(x21371,f41(f41(f31(f43(x21372,a2)),x21373),x21371),f43(x21372,a2))),
% 14.42/14.46 inference(rename_variables,[],[269])).
% 14.42/14.46 cnf(2142,plain,
% 14.42/14.46 (P34(f41(f37(f41(x21421,f4(f26(a1),f28(f26(a1)),a1)),f29(f43(x21422,a2)),x21423),f41(x21421,f26(a1))))),
% 14.42/14.46 inference(scs_inference,[],[1014,1015,2065,2071,1017,2079,186,269,2089,170,223,194,187,342,2096,227,212,2084,347,314,219,344,199,330,255,184,340,2108,334,171,175,169,173,1108,1797,1825,1762,1489,1887,1295,1867,1676,1827,1495,1841,1366,1370,1372,1019,1030,1338,1953,1163,1023,2036,2048,2051,2083,2087,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973])).
% 14.42/14.46 cnf(2144,plain,
% 14.42/14.46 (P8(f43(f43(a2,a2),f43(a2,a2)))),
% 14.42/14.46 inference(scs_inference,[],[1014,1015,2065,2071,1017,2079,186,269,2089,170,223,194,187,342,2096,227,212,2084,347,314,219,344,199,330,255,184,340,2108,334,171,175,169,173,1108,1797,1825,1762,1823,1489,1887,1295,1867,1676,1827,1495,1841,1366,1370,1372,1019,1030,1338,1953,1163,1023,2036,2048,2051,2083,2087,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379])).
% 14.42/14.46 cnf(2146,plain,
% 14.42/14.46 (~P10(f41(f41(f31(a1),f28(x21461)),x21462),x21461,a1)),
% 14.42/14.46 inference(scs_inference,[],[1014,1015,2065,2071,1017,2079,186,269,2089,170,223,194,187,342,2096,227,212,2084,347,314,219,344,199,330,255,184,340,2108,2129,334,171,175,169,167,173,1108,1797,1825,1762,1823,1489,1887,1295,1867,1676,1827,1495,1841,1366,1370,1372,1019,1030,1338,1953,1163,1023,2036,2048,2051,2083,2087,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718])).
% 14.42/14.46 cnf(2148,plain,
% 14.42/14.46 (~P10(f41(f41(f31(a1),x21481),f28(x21482)),x21482,a1)),
% 14.42/14.46 inference(scs_inference,[],[1014,1015,2065,2071,1017,2079,186,269,2089,170,223,194,187,342,2096,227,212,2084,347,314,219,344,199,330,255,184,340,2108,2129,334,171,175,169,167,173,1108,1797,1825,1762,1823,1489,1887,1295,1867,1676,1827,1495,1841,1366,1370,1372,1019,1030,1338,1953,1163,1023,2036,2048,2051,2083,2087,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718,716])).
% 14.42/14.46 cnf(2150,plain,
% 14.42/14.46 (~P10(f28(x21501),f41(f41(f35(a1),x21501),x21502),a1)),
% 14.42/14.46 inference(scs_inference,[],[1014,1015,2065,2071,1017,2079,186,269,2089,170,223,194,187,342,2096,227,212,2084,347,314,219,344,199,330,255,184,340,2108,2129,334,171,175,169,167,173,1108,1797,1825,1762,1823,1489,1887,1295,1867,1676,1827,1495,1841,1366,1370,1372,1019,1030,1338,1953,1163,1023,2036,2048,2051,2083,2087,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718,716,708])).
% 14.42/14.46 cnf(2152,plain,
% 14.42/14.46 (~P10(f28(x21521),f41(f41(f35(a1),x21522),x21521),a1)),
% 14.42/14.46 inference(scs_inference,[],[1014,1015,2065,2071,1017,2079,186,269,2089,170,223,194,187,342,2096,227,212,2084,347,314,219,344,199,330,255,184,340,2108,2129,334,171,175,169,167,173,1108,1797,1825,1762,1823,1489,1887,1295,1867,1676,1827,1495,1841,1366,1370,1372,1019,1030,1338,1953,1163,1023,2036,2048,2051,2083,2087,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718,716,708,706])).
% 14.42/14.46 cnf(2166,plain,
% 14.42/14.46 (P12(f26(a1),f41(f41(f36(a1),x21661),f28(x21662)),a1)),
% 14.42/14.46 inference(scs_inference,[],[1014,1015,2065,2071,1017,2079,2107,186,269,2089,170,223,194,187,342,2096,227,212,2084,347,314,219,344,199,204,330,255,184,340,2108,2129,334,171,175,169,167,173,1108,1797,1825,1762,1823,1489,1887,1295,1867,1676,1827,1495,1841,1366,1370,1372,1019,1030,1338,1953,1163,1023,2036,2048,2051,2083,2087,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718,716,708,706,656,654,652,650,647,646,644])).
% 14.42/14.46 cnf(2170,plain,
% 14.42/14.46 (~P34(f41(f41(a47,f37(f41(a48,f50(a46,a47,a45,a48)),a46,a42)),f37(f41(a48,f50(f37(f41(a48,f50(a46,a47,a45,a48)),a46,a42),a47,a45,a48)),f29(f43(a42,a2)),a42)))),
% 14.42/14.46 inference(scs_inference,[],[1014,1015,2065,2071,1017,2079,2107,186,269,2089,170,223,194,187,342,2096,227,212,2084,347,314,219,344,199,204,330,255,184,340,2108,2129,334,168,171,175,169,167,173,1108,1797,1825,1762,1823,1489,1887,1295,1867,1676,1827,1495,1841,1366,1370,1372,1330,1019,1030,1338,1953,1163,1023,2036,2048,2051,2083,2087,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718,716,708,706,656,654,652,650,647,646,644,641,1008])).
% 14.42/14.46 cnf(2179,plain,
% 14.42/14.46 (~E(f41(f41(f36(a1),f28(f28(x21791))),x21791),x21791)),
% 14.42/14.46 inference(scs_inference,[],[1014,1015,2065,2071,1017,2079,2107,186,337,269,2089,170,223,194,187,342,2096,227,212,2084,347,314,219,344,199,204,330,255,184,340,2108,2129,334,168,171,175,169,167,173,1108,1797,1825,1762,1823,1489,1887,1295,1867,1676,1827,1495,1841,1366,1370,1372,1330,1019,1028,1030,1338,1943,1953,1163,1023,2036,2048,2051,2083,2087,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718,716,708,706,656,654,652,650,647,646,644,641,1008,904,903,514,479])).
% 14.42/14.46 cnf(2181,plain,
% 14.42/14.46 (~E(f41(f41(f32(a1),f28(f28(x21811))),x21811),f28(f28(x21811)))),
% 14.42/14.46 inference(scs_inference,[],[1014,1015,2065,2071,1017,2079,2107,186,337,269,2089,170,223,194,187,342,2096,227,212,2084,347,314,219,344,199,204,330,255,184,340,2108,2129,334,168,171,175,169,174,167,173,1108,1797,1825,1762,1823,1489,1887,1295,1867,1676,1827,1495,1841,1366,1370,1372,1330,1019,1028,1030,1338,1943,1953,1163,1023,2036,2048,2051,2083,2087,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718,716,708,706,656,654,652,650,647,646,644,641,1008,904,903,514,479,478])).
% 14.42/14.46 cnf(2183,plain,
% 14.42/14.46 (~E(f41(f41(f31(a1),f28(f28(x21831))),x21831),x21831)),
% 14.42/14.46 inference(scs_inference,[],[1014,1015,2065,2071,1017,2079,2107,186,337,269,2089,170,223,194,187,342,2096,227,212,2084,347,314,219,344,199,204,330,255,184,340,2108,2129,334,168,171,175,169,174,167,173,1108,1797,1825,1762,1823,1489,1887,1295,1867,1676,1827,1495,1841,1366,1370,1372,1330,1019,1028,1030,1338,1943,1953,1163,1023,2036,2048,2051,2083,2087,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718,716,708,706,656,654,652,650,647,646,644,641,1008,904,903,514,479,478,476])).
% 14.42/14.46 cnf(2189,plain,
% 14.42/14.46 (~P34(f41(f37(f29(f43(x21891,a2)),f29(f43(x21892,a2)),x21893),f34(f43(x21891,a2))))),
% 14.42/14.46 inference(scs_inference,[],[1014,1015,2065,2071,1017,2079,2107,186,337,269,2089,2137,170,223,194,187,342,2096,227,212,2084,347,314,219,344,199,204,330,255,349,184,340,2108,2129,334,168,171,175,169,174,167,173,1108,1797,1825,1762,1823,1489,1887,1295,1867,1676,1827,1495,1841,1366,1370,1372,1330,1019,1028,1030,1338,1943,1953,1163,1023,2036,2048,2051,2083,2087,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718,716,708,706,656,654,652,650,647,646,644,641,1008,904,903,514,479,478,476,674,601,798])).
% 14.42/14.46 cnf(2190,plain,
% 14.42/14.46 (~P34(f41(f29(f43(x21901,a2)),x21902))),
% 14.42/14.46 inference(rename_variables,[],[349])).
% 14.42/14.46 cnf(2207,plain,
% 14.42/14.46 (P10(x22071,f28(x22071),a1)),
% 14.42/14.46 inference(rename_variables,[],[1017])).
% 14.42/14.46 cnf(2208,plain,
% 14.42/14.46 (~E(f28(x22081),x22081)),
% 14.42/14.46 inference(rename_variables,[],[330])).
% 14.42/14.46 cnf(2211,plain,
% 14.42/14.46 (P12(f4(f29(f43(x22111,a2)),f37(x22112,x22113,x22111),f43(x22111,a2)),f37(x22112,f37(x22114,f29(f43(x22111,a2)),x22111),x22111),f43(x22111,a2))),
% 14.42/14.46 inference(scs_inference,[],[1014,1015,2065,2071,2080,1017,2079,2107,186,337,269,2089,2137,170,223,194,187,197,342,2096,227,212,2084,347,2121,314,219,344,199,204,330,2052,255,349,184,340,2108,2129,334,326,168,171,175,169,174,167,173,1108,1797,1825,1682,1762,1823,1489,1239,1887,1295,1867,1676,1633,1827,1495,1841,1366,1370,1372,1330,1019,1028,1030,1338,1943,1953,1163,1023,2036,2048,2051,2083,2087,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718,716,708,706,656,654,652,650,647,646,644,641,1008,904,903,514,479,478,476,674,601,798,1011,918,893,907,781,779,757,750,833])).
% 14.42/14.46 cnf(2212,plain,
% 14.42/14.46 (P12(f4(f29(f43(x22121,a2)),x22122,f43(x22121,a2)),f37(x22123,f29(f43(x22121,a2)),x22121),f43(x22121,a2))),
% 14.42/14.46 inference(rename_variables,[],[1295])).
% 14.42/14.46 cnf(2215,plain,
% 14.42/14.46 (~P16(x22151,f38(x22152,f4(f29(f43(x22153,a2)),x22154,f43(x22153,a2)),x22153,x22155),x22155)),
% 14.42/14.46 inference(scs_inference,[],[1014,1015,2065,2071,2080,1017,2079,2107,186,337,269,2089,2137,170,223,194,187,197,342,2096,227,212,2084,347,2121,240,314,219,344,199,204,330,2052,255,349,184,340,2108,2129,334,326,168,171,175,169,174,167,173,1108,1797,1825,1682,1762,1823,1489,2055,1239,1887,1295,1867,1676,1633,1827,1495,1841,1366,1370,1372,1330,1019,1028,1030,1338,1943,1953,1163,1023,2036,2048,2051,2083,2087,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718,716,708,706,656,654,652,650,647,646,644,641,1008,904,903,514,479,478,476,674,601,798,1011,918,893,907,781,779,757,750,833,987])).
% 14.42/14.46 cnf(2216,plain,
% 14.42/14.46 (P10(f4(x22161,x22162,f43(x22163,a2)),x22161,f43(x22163,a2))),
% 14.42/14.46 inference(rename_variables,[],[240])).
% 14.42/14.46 cnf(2218,plain,
% 14.42/14.46 (~P16(x22181,f29(f43(x22182,a2)),x22182)),
% 14.42/14.46 inference(rename_variables,[],[347])).
% 14.42/14.46 cnf(2221,plain,
% 14.42/14.46 (P16(x22211,f34(f43(x22212,a2)),x22212)),
% 14.42/14.46 inference(rename_variables,[],[212])).
% 14.42/14.46 cnf(2222,plain,
% 14.42/14.46 (P16(x22221,f34(f43(x22222,a2)),x22222)),
% 14.42/14.46 inference(rename_variables,[],[212])).
% 14.42/14.46 cnf(2223,plain,
% 14.42/14.46 (P9(x22231,a2)),
% 14.42/14.46 inference(rename_variables,[],[1023])).
% 14.42/14.46 cnf(2225,plain,
% 14.42/14.46 (P12(f4(f26(a1),x22251,a1),f28(x22252),a1)),
% 14.42/14.46 inference(scs_inference,[],[1014,1015,2065,2071,2080,1017,2079,2107,186,337,269,2089,2137,170,223,194,187,197,342,2096,227,212,2084,2103,347,2121,240,314,219,344,199,204,330,2052,255,349,184,340,2108,2129,334,326,168,171,175,169,174,167,173,1108,1797,1825,1682,1762,1823,1489,2055,1239,1887,1295,1867,1676,1633,1827,1495,1841,1366,1370,1372,1330,1019,1028,1030,1338,1943,1953,1163,1023,2036,2048,2051,2083,2087,2099,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718,716,708,706,656,654,652,650,647,646,644,641,1008,904,903,514,479,478,476,674,601,798,1011,918,893,907,781,779,757,750,833,987,1004,630])).
% 14.42/14.46 cnf(2227,plain,
% 14.42/14.46 (E(x22271,f41(f41(f36(a1),x22271),x22271))),
% 14.42/14.46 inference(scs_inference,[],[1014,1015,2065,2071,2080,1017,2079,2107,186,337,269,2089,2137,170,223,194,187,197,342,2096,227,212,2084,2103,347,2121,240,314,219,344,199,204,330,2052,255,349,184,340,2108,2129,334,326,168,171,175,169,174,167,173,1108,1797,1825,1682,1762,1823,1489,2055,1239,1887,1295,1867,1676,1633,1827,1495,1841,1366,1370,1372,1330,1019,1028,1030,1338,1943,1953,1163,1023,2036,2048,2051,2083,2087,2099,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718,716,708,706,656,654,652,650,647,646,644,641,1008,904,903,514,479,478,476,674,601,798,1011,918,893,907,781,779,757,750,833,987,1004,630,353])).
% 14.42/14.46 cnf(2235,plain,
% 14.42/14.46 (~P16(f41(x22351,x22352),f37(f28(f41(x22351,x22352)),f29(f43(x22353,a2)),x22353),x22353)),
% 14.42/14.46 inference(scs_inference,[],[1014,1015,2065,2071,2080,1017,2079,2107,186,337,269,2089,2137,170,223,194,187,197,342,2096,227,212,2084,2103,347,2121,240,314,219,344,199,204,330,2052,255,349,184,340,2108,2129,334,326,168,171,175,169,174,167,173,1108,1797,1825,1682,1762,1823,1489,2055,1239,1887,1295,1867,1676,1076,1633,1827,1495,1841,1366,1370,1372,1330,1019,1028,1030,1338,1943,1953,1163,1023,2036,2048,2051,2083,2087,2099,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718,716,708,706,656,654,652,650,647,646,644,641,1008,904,903,514,479,478,476,674,601,798,1011,918,893,907,781,779,757,750,833,987,1004,630,353,881,880,878,890])).
% 14.42/14.46 cnf(2247,plain,
% 14.42/14.46 (P10(x22471,f41(f41(f31(f43(x22472,a2)),x22473),x22471),f43(x22472,a2))),
% 14.42/14.46 inference(rename_variables,[],[269])).
% 14.42/14.46 cnf(2250,plain,
% 14.42/14.46 (P10(f41(f41(f35(a1),x22501),x22502),x22501,a1)),
% 14.42/14.46 inference(rename_variables,[],[1184])).
% 14.42/14.46 cnf(2260,plain,
% 14.42/14.46 (~P12(x22601,f26(a1),a1)),
% 14.42/14.46 inference(rename_variables,[],[339])).
% 14.42/14.46 cnf(2262,plain,
% 14.42/14.46 (P12(f41(f41(f32(a1),x22621),f26(a1)),f28(x22622),a1)),
% 14.42/14.46 inference(scs_inference,[],[1014,1015,2065,2071,2080,1017,2079,2107,186,337,269,2089,2137,270,170,223,194,187,197,342,2096,227,212,2084,2103,347,2121,240,314,219,344,199,204,330,2052,255,2088,349,184,339,340,2108,2129,334,326,168,171,175,169,174,167,173,1108,1797,2047,1825,1682,1762,1823,1489,2055,1239,1887,1295,1867,1676,1076,1633,1827,1495,1841,1366,1370,1372,1330,1019,1028,1030,1332,1338,1943,1953,1163,1184,2250,1322,1941,1951,1374,1023,2036,2048,2051,2083,2087,2099,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718,716,708,706,656,654,652,650,647,646,644,641,1008,904,903,514,479,478,476,674,601,798,1011,918,893,907,781,779,757,750,833,987,1004,630,353,881,880,878,890,544,896,714,495,741,585,415,577,500,498,657])).
% 14.42/14.46 cnf(2266,plain,
% 14.42/14.46 (~P10(f41(f41(f35(a1),f28(f28(x22661))),f28(x22661)),x22661,a1)),
% 14.42/14.46 inference(scs_inference,[],[1014,1015,2065,2071,2080,1017,2079,2107,186,337,269,2089,2137,270,170,223,194,187,197,342,2096,227,212,2084,2103,347,2121,206,240,314,219,344,199,204,330,2052,255,2088,349,184,339,340,2108,2129,334,326,168,171,175,169,174,167,173,1108,1797,2047,1825,1682,1762,1823,1489,2055,1239,1887,1295,1867,1676,1076,1633,1827,1495,1841,1366,1370,1372,1330,1019,1028,1030,1332,1338,1943,1953,1163,1184,2250,1322,1941,1951,1374,1023,2036,2048,2051,2083,2087,2099,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718,716,708,706,656,654,652,650,647,646,644,641,1008,904,903,514,479,478,476,674,601,798,1011,918,893,907,781,779,757,750,833,987,1004,630,353,881,880,878,890,544,896,714,495,741,585,415,577,500,498,657,772,782])).
% 14.42/14.46 cnf(2267,plain,
% 14.42/14.46 (~P10(f28(f28(x22671)),x22671,a1)),
% 14.42/14.46 inference(rename_variables,[],[1028])).
% 14.42/14.46 cnf(2273,plain,
% 14.42/14.46 (~P12(x22731,f41(f41(f36(a1),x22731),x22731),a1)),
% 14.42/14.46 inference(scs_inference,[],[1014,1015,2065,2071,2080,1017,2079,2107,186,337,269,2089,2137,270,170,223,194,187,197,342,2096,227,212,2084,2103,347,2121,206,240,314,219,344,199,204,330,2052,255,2088,349,184,339,340,2108,2129,334,326,168,171,175,169,174,167,173,1108,1797,2047,1825,1682,1762,1823,1489,2055,1239,1887,1295,1867,1676,1076,1633,1827,1495,1841,1366,1370,1372,1330,1019,1028,1030,1332,1338,1943,1953,1163,1178,1184,2250,1322,1941,1951,1374,1023,2036,2048,2051,2083,2087,2099,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718,716,708,706,656,654,652,650,647,646,644,641,1008,904,903,514,479,478,476,674,601,798,1011,918,893,907,781,779,757,750,833,987,1004,630,353,881,880,878,890,544,896,714,495,741,585,415,577,500,498,657,772,782,751,540,473])).
% 14.42/14.46 cnf(2275,plain,
% 14.42/14.46 (~P12(f28(f41(f41(f31(a1),x22751),x22752)),x22751,a1)),
% 14.42/14.46 inference(scs_inference,[],[1014,1015,2065,2071,2080,1017,2079,2107,186,337,269,2089,2137,270,170,223,194,187,197,342,2096,227,212,2084,2103,347,2121,206,240,314,219,344,199,204,330,2052,255,2088,349,184,339,340,2108,2129,334,326,168,171,175,169,174,167,173,1108,1797,2047,1825,1682,1762,1823,1489,2055,1239,1887,1295,1867,1676,1076,1633,1827,1495,1841,1366,1370,1372,1330,1019,1028,1030,1208,1332,1338,1943,1953,1163,1178,1184,2250,1322,1941,1951,1374,1023,2036,2048,2051,2083,2087,2099,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718,716,708,706,656,654,652,650,647,646,644,641,1008,904,903,514,479,478,476,674,601,798,1011,918,893,907,781,779,757,750,833,987,1004,630,353,881,880,878,890,544,896,714,495,741,585,415,577,500,498,657,772,782,751,540,473,493])).
% 14.42/14.46 cnf(2283,plain,
% 14.42/14.46 (~P5(a1)),
% 14.42/14.46 inference(scs_inference,[],[1014,1015,2065,2071,2080,1017,2079,2107,186,337,269,2089,2137,270,170,223,194,187,197,342,2096,227,212,2084,2103,347,2121,206,240,314,219,344,199,204,330,2052,255,2088,349,184,339,340,2108,2129,334,326,350,168,171,175,169,174,167,173,1108,1797,2047,1825,1682,1762,1823,1489,2055,1239,1855,1887,1295,1867,1676,1076,1633,1827,1495,1841,1366,1370,1372,1330,1019,1028,1030,1034,1208,1332,1338,1943,1953,1163,1178,1184,2250,1322,1941,1951,1374,1023,2036,2048,2051,2083,2087,2099,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718,716,708,706,656,654,652,650,647,646,644,641,1008,904,903,514,479,478,476,674,601,798,1011,918,893,907,781,779,757,750,833,987,1004,630,353,881,880,878,890,544,896,714,495,741,585,415,577,500,498,657,772,782,751,540,473,493,458,483,439,398])).
% 14.42/14.46 cnf(2284,plain,
% 14.42/14.46 (~E(f41(f41(f32(a1),f28(x22841)),x22841),f28(x22841))),
% 14.42/14.46 inference(rename_variables,[],[1855])).
% 14.42/14.46 cnf(2293,plain,
% 14.42/14.46 (P10(x22931,f41(f41(f31(f43(x22932,a2)),x22933),x22931),f43(x22932,a2))),
% 14.42/14.46 inference(rename_variables,[],[269])).
% 14.42/14.46 cnf(2294,plain,
% 14.42/14.46 (P10(x22941,f41(f41(f31(f43(x22942,a2)),x22941),x22943),f43(x22942,a2))),
% 14.42/14.46 inference(rename_variables,[],[270])).
% 14.42/14.46 cnf(2304,plain,
% 14.42/14.46 (~P10(f28(f41(f19(f32(a2),a2),f34(f43(a2,a2)))),f41(f19(f32(a2),a2),f34(f43(a2,a2))),a2)),
% 14.42/14.46 inference(scs_inference,[],[1014,1015,2065,2071,2080,1017,2079,2107,2207,186,337,269,2089,2137,2247,2293,270,170,223,194,187,197,342,2096,227,212,2084,2103,2222,347,2121,2218,206,240,314,219,344,199,204,330,2052,2208,255,2088,349,172,184,339,340,2108,2129,334,326,350,168,171,175,169,174,167,181,173,1108,2039,1797,2047,1825,1682,1762,1823,1489,2055,1239,1855,1887,1295,1867,1676,1076,1633,1827,1495,1841,1366,1370,1372,1615,1330,1019,1028,1030,1034,1208,1332,1338,1943,1953,1163,1178,1184,2250,1322,1941,1951,1374,1023,2036,2048,2051,2083,2087,2099,2223,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718,716,708,706,656,654,652,650,647,646,644,641,1008,904,903,514,479,478,476,674,601,798,1011,918,893,907,781,779,757,750,833,987,1004,630,353,881,880,878,890,544,896,714,495,741,585,415,577,500,498,657,772,782,751,540,473,493,458,483,439,398,490,634,616,830,892,966,576,555])).
% 14.42/14.46 cnf(2309,plain,
% 14.42/14.46 (~P10(f28(f41(f41(f36(a1),f28(x23091)),x23092)),x23091,a1)),
% 14.42/14.46 inference(scs_inference,[],[1014,1015,2065,2071,2080,1017,2079,2107,2207,186,337,269,2089,2137,2247,2293,270,170,223,194,187,197,342,2096,227,212,2084,2103,2222,347,2121,2218,206,240,314,219,344,199,204,330,2052,2208,255,2088,349,172,184,339,340,2108,2129,334,326,350,168,171,175,169,174,167,181,173,1108,2039,1797,2047,1825,1682,1762,1823,1489,2055,1239,1855,1887,1295,1867,1676,1076,1633,1827,1495,1841,1366,1370,1372,1615,1330,1019,1028,1030,1034,1208,1332,1338,1805,1943,1953,1163,1178,1184,2250,1322,1941,1817,1951,1374,1023,2036,2048,2051,2083,2087,2099,2223,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718,716,708,706,656,654,652,650,647,646,644,641,1008,904,903,514,479,478,476,674,601,798,1011,918,893,907,781,779,757,750,833,987,1004,630,353,881,880,878,890,544,896,714,495,741,585,415,577,500,498,657,772,782,751,540,473,493,458,483,439,398,490,634,616,830,892,966,576,555,480,469])).
% 14.42/14.46 cnf(2310,plain,
% 14.42/14.46 (~P12(f28(f41(f41(f36(a1),x23101),x23102)),x23101,a1)),
% 14.42/14.46 inference(rename_variables,[],[1805])).
% 14.42/14.46 cnf(2312,plain,
% 14.42/14.46 (P12(f41(f41(f35(a1),f28(x23121)),x23121),f28(x23121),a1)),
% 14.42/14.46 inference(scs_inference,[],[1014,1015,2065,2071,2080,1017,2079,2107,2207,186,337,269,2089,2137,2247,2293,270,170,223,194,187,197,342,2096,227,212,2084,2103,2222,347,2121,2218,206,240,314,219,344,199,204,330,2052,2208,255,2088,349,172,184,339,340,2108,2129,334,326,350,168,171,175,169,174,167,181,173,1108,2039,1797,2047,1825,1682,1762,1823,1489,2055,1239,1855,1857,1887,1295,1867,1676,1076,1633,1827,1495,1841,1366,1370,1372,1615,1330,1019,1028,1030,1034,1208,1332,1338,1805,1943,1953,1163,1178,1184,2250,1196,1322,1941,1817,1951,1374,1023,2036,2048,2051,2083,2087,2099,2223,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718,716,708,706,656,654,652,650,647,646,644,641,1008,904,903,514,479,478,476,674,601,798,1011,918,893,907,781,779,757,750,833,987,1004,630,353,881,880,878,890,544,896,714,495,741,585,415,577,500,498,657,772,782,751,540,473,493,458,483,439,398,490,634,616,830,892,966,576,555,480,469,430])).
% 14.42/14.46 cnf(2318,plain,
% 14.42/14.46 (~P14(x23181,x23182,f29(f43(x23183,a2)),f27(f27(f28(x23182),f43(x23184,a2)),f43(x23184,a2)),x23183,x23185)),
% 14.42/14.46 inference(scs_inference,[],[1014,1015,2065,2071,2080,1017,2079,2107,2207,186,337,269,2089,2137,2247,2293,270,170,213,223,194,187,197,342,2096,227,212,2084,2103,2222,347,2121,2218,206,240,314,219,344,199,286,204,330,2052,2208,255,2088,349,172,184,339,340,2108,2129,334,326,350,168,171,175,169,174,167,181,173,1108,2039,1797,2047,1825,1682,1762,1823,1489,2055,1239,1855,1857,1887,1316,1295,1867,1676,1076,1633,1827,1495,1841,1366,1370,1372,1615,1330,1019,1028,1030,1034,1208,1332,1338,1805,1943,1953,1163,1178,1184,2250,1196,1322,1941,1817,1951,1374,1023,2036,2048,2051,2083,2087,2099,2223,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718,716,708,706,656,654,652,650,647,646,644,641,1008,904,903,514,479,478,476,674,601,798,1011,918,893,907,781,779,757,750,833,987,1004,630,353,881,880,878,890,544,896,714,495,741,585,415,577,500,498,657,772,782,751,540,473,493,458,483,439,398,490,634,616,830,892,966,576,555,480,469,430,442,162])).
% 14.42/14.46 cnf(2321,plain,
% 14.42/14.46 (~P14(x23211,a46,f29(f43(x23212,a2)),f28(f38(a48,a45,a3,a42)),x23212,x23213)),
% 14.42/14.46 inference(scs_inference,[],[1014,1015,2065,2071,2080,1017,2079,2107,2207,186,337,269,2089,2137,2247,2293,270,170,325,213,223,194,187,197,342,2096,227,212,2084,2103,2222,347,2121,2218,206,240,314,219,344,199,286,204,330,2052,2208,255,2088,349,172,184,339,340,2108,2129,334,326,350,168,171,175,169,174,167,181,173,1108,2039,1797,2047,1825,1682,1762,1823,1489,2055,1239,1855,1857,1887,1316,1295,1867,1792,1676,1076,1633,1827,1495,1841,1366,1370,1372,1615,1330,1019,1028,1030,1034,1208,1332,1338,1805,1943,1953,1163,1178,1184,2250,1196,1322,1941,1817,1951,1374,1023,2036,2048,2051,2083,2087,2099,2223,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718,716,708,706,656,654,652,650,647,646,644,641,1008,904,903,514,479,478,476,674,601,798,1011,918,893,907,781,779,757,750,833,987,1004,630,353,881,880,878,890,544,896,714,495,741,585,415,577,500,498,657,772,782,751,540,473,493,458,483,439,398,490,634,616,830,892,966,576,555,480,469,430,442,162,161,160])).
% 14.42/14.46 cnf(2323,plain,
% 14.42/14.46 (E(f41(f41(f32(f43(x23231,a2)),x23232),x23232),x23232)),
% 14.42/14.46 inference(rename_variables,[],[224])).
% 14.42/14.46 cnf(2326,plain,
% 14.42/14.46 (E(f41(f41(f32(f43(x23261,a2)),x23262),x23262),x23262)),
% 14.42/14.46 inference(rename_variables,[],[224])).
% 14.42/14.46 cnf(2330,plain,
% 14.42/14.46 (~P12(f28(x23301),x23301,a1)),
% 14.42/14.46 inference(rename_variables,[],[1015])).
% 14.42/14.46 cnf(2331,plain,
% 14.42/14.46 (E(f27(f27(x23311,f43(x23312,a2)),f43(x23312,a2)),x23311)),
% 14.42/14.46 inference(rename_variables,[],[213])).
% 14.42/14.46 cnf(2332,plain,
% 14.42/14.46 (~P10(f28(x23321),x23321,f27(f27(a1,f43(x23322,a2)),f43(x23322,a2)))),
% 14.42/14.46 inference(scs_inference,[],[1014,1015,2065,2071,2080,1017,2079,2107,2207,186,337,269,2089,2137,2247,2293,270,170,325,213,2331,223,224,2323,2326,194,187,197,342,2096,227,212,2084,2103,2222,347,2121,2218,206,240,314,219,344,199,286,204,330,2052,2208,255,2088,349,172,184,339,340,2108,2129,334,326,350,168,171,175,169,174,167,181,173,1108,2039,1021,1797,2047,1825,1682,1762,1823,1489,2055,1239,1855,1857,1887,1316,1982,1295,1867,1792,1676,1076,1633,1980,1827,1495,1841,1366,1370,1372,1615,1330,1019,1028,1030,1034,1208,1332,1338,1805,1943,1953,1163,1178,1184,2250,1196,1322,1941,1817,1951,1374,1023,2036,2048,2051,2083,2087,2099,2223,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718,716,708,706,656,654,652,650,647,646,644,641,1008,904,903,514,479,478,476,674,601,798,1011,918,893,907,781,779,757,750,833,987,1004,630,353,881,880,878,890,544,896,714,495,741,585,415,577,500,498,657,772,782,751,540,473,493,458,483,439,398,490,634,616,830,892,966,576,555,480,469,430,442,162,161,160,156,152,140,133,131,124])).
% 14.42/14.46 cnf(2333,plain,
% 14.42/14.46 (E(f27(f27(x23331,f43(x23332,a2)),f43(x23332,a2)),x23331)),
% 14.42/14.46 inference(rename_variables,[],[213])).
% 14.42/14.46 cnf(2334,plain,
% 14.42/14.46 (~P13(f19(x23341,x23342),f37(x23343,f37(x23343,f37(f29(f43(x23342,a2)),f37(f37(f41(f19(x23341,x23342),f29(f43(x23342,a2))),f29(f43(x23342,a2)),x23342),x23344,x23345),x23345),x23345),x23345),x23345,x23346)),
% 14.42/14.47 inference(scs_inference,[],[1014,1015,2065,2071,2080,1017,2079,2107,2207,186,337,269,2089,2137,2247,2293,270,170,237,325,213,2331,223,224,2323,2326,194,187,197,342,2096,227,212,2084,2103,2222,347,2121,2218,206,240,314,219,344,199,286,204,330,2052,2208,255,2088,349,172,184,339,340,2108,2129,334,326,350,168,171,175,169,174,167,181,173,1108,2039,1021,1797,2047,1825,1682,1487,1762,1823,1489,2055,1239,1855,1857,1887,1316,1982,1295,1867,1792,1676,1076,1633,1980,1827,1495,1841,1366,1370,1372,1615,1330,1019,1028,1030,1034,1208,1332,1338,1805,1943,1953,1163,1178,1184,2250,1196,1322,1941,1817,1951,1374,1023,2036,2048,2051,2083,2087,2099,2223,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718,716,708,706,656,654,652,650,647,646,644,641,1008,904,903,514,479,478,476,674,601,798,1011,918,893,907,781,779,757,750,833,987,1004,630,353,881,880,878,890,544,896,714,495,741,585,415,577,500,498,657,772,782,751,540,473,493,458,483,439,398,490,634,616,830,892,966,576,555,480,469,430,442,162,161,160,156,152,140,133,131,124,118])).
% 14.42/14.47 cnf(2336,plain,
% 14.42/14.47 (~P10(f28(f28(f28(f28(x23361)))),x23361,a1)),
% 14.42/14.47 inference(scs_inference,[],[1014,1015,2065,2071,2080,1017,2079,2107,2207,186,337,269,2089,2137,2247,2293,270,170,237,325,213,2331,223,224,2323,2326,194,187,197,342,2096,227,212,2084,2103,2222,347,2121,2218,206,240,314,219,344,199,286,204,330,2052,2208,255,2088,349,172,184,339,340,2108,2129,334,326,350,168,171,175,169,174,167,181,173,1108,2039,1021,1797,2047,1825,1682,1487,1762,1823,1489,2055,1239,1855,1857,1887,1316,1982,1295,1867,1792,1676,1076,1633,1980,1827,1495,1841,1366,1370,1372,1615,1330,1019,1028,1030,1034,1036,1208,1332,1338,1805,1943,1953,1163,1178,1184,2250,1196,1322,1941,1817,1951,1374,1023,2036,2048,2051,2083,2087,2099,2223,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718,716,708,706,656,654,652,650,647,646,644,641,1008,904,903,514,479,478,476,674,601,798,1011,918,893,907,781,779,757,750,833,987,1004,630,353,881,880,878,890,544,896,714,495,741,585,415,577,500,498,657,772,782,751,540,473,493,458,483,439,398,490,634,616,830,892,966,576,555,480,469,430,442,162,161,160,156,152,140,133,131,124,118,611])).
% 14.42/14.47 cnf(2337,plain,
% 14.42/14.47 (~P10(f28(f28(f28(x23371))),x23371,a1)),
% 14.42/14.47 inference(rename_variables,[],[1036])).
% 14.42/14.47 cnf(2339,plain,
% 14.42/14.47 (~P12(f4(f28(f26(a1)),f26(a1),a1),f4(f28(f26(a1)),f28(f26(a1)),a1),a1)),
% 14.42/14.47 inference(scs_inference,[],[1014,1015,2065,2071,2080,2330,1017,2079,2107,2207,186,337,269,2089,2137,2247,2293,270,170,237,325,213,2331,223,224,2323,2326,194,187,197,342,2096,227,212,2084,2103,2222,347,2121,2218,206,240,314,219,344,199,286,204,330,2052,2208,255,2088,349,172,184,339,340,2108,2129,334,326,350,168,171,175,169,174,167,181,173,1108,2039,1021,1797,2047,1825,1682,1487,1762,1823,1489,2055,1239,1855,1857,1887,1316,1982,1295,1867,1792,1676,1076,1633,1980,1827,1495,1841,1366,1370,1372,1615,1330,1019,1028,1030,1034,1036,1208,1332,1338,1805,1943,1953,1163,1178,1184,2250,1196,1322,1941,1869,1817,1951,1374,1023,2036,2048,2051,2083,2087,2099,2223,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718,716,708,706,656,654,652,650,647,646,644,641,1008,904,903,514,479,478,476,674,601,798,1011,918,893,907,781,779,757,750,833,987,1004,630,353,881,880,878,890,544,896,714,495,741,585,415,577,500,498,657,772,782,751,540,473,493,458,483,439,398,490,634,616,830,892,966,576,555,480,469,430,442,162,161,160,156,152,140,133,131,124,118,611,615])).
% 14.42/14.47 cnf(2340,plain,
% 14.42/14.47 (~P12(f28(x23401),x23401,a1)),
% 14.42/14.47 inference(rename_variables,[],[1015])).
% 14.42/14.47 cnf(2343,plain,
% 14.42/14.47 (~P12(x23431,f29(f43(x23432,a2)),f43(x23432,a2))),
% 14.42/14.47 inference(rename_variables,[],[348])).
% 14.42/14.47 cnf(2357,plain,
% 14.42/14.47 (~P10(f41(f36(a1),f28(f41(x23571,x23572))),x23571,f43(x23573,a1))),
% 14.42/14.47 inference(scs_inference,[],[1014,1015,2065,2071,2080,2330,2340,1017,2079,2107,2207,186,337,269,2089,2137,2247,2293,270,170,237,325,213,2331,223,224,2323,2326,194,183,187,197,342,2096,227,212,2084,2103,2222,347,2121,2218,206,240,314,219,348,344,199,286,204,330,2052,2208,255,2088,349,172,184,339,340,2108,2129,334,326,350,168,171,175,169,174,167,181,173,1108,2039,1021,1797,2047,1825,1682,1487,1762,1823,1489,2055,1239,1855,1857,1887,1316,1982,1295,1867,1792,1676,1076,1633,1980,1827,1495,1841,1366,1370,1372,1615,1330,1019,1028,1030,1034,1036,1115,1208,1332,1338,1805,1943,1953,1163,1178,1184,2250,1196,1322,1799,1941,1869,1817,1951,1374,1023,2036,2048,2051,2083,2087,2099,2223,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718,716,708,706,656,654,652,650,647,646,644,641,1008,904,903,514,479,478,476,674,601,798,1011,918,893,907,781,779,757,750,833,987,1004,630,353,881,880,878,890,544,896,714,495,741,585,415,577,500,498,657,772,782,751,540,473,493,458,483,439,398,490,634,616,830,892,966,576,555,480,469,430,442,162,161,160,156,152,140,133,131,124,118,611,615,583,713,712,710,648,642,842,631])).
% 14.42/14.47 cnf(2365,plain,
% 14.42/14.47 (~E(f41(f41(f35(a1),f28(f28(x23651))),x23651),f28(f28(x23651)))),
% 14.42/14.47 inference(scs_inference,[],[1014,1015,2065,2071,2080,2330,2340,1017,2079,2107,2207,186,337,269,2089,2137,2247,2293,270,170,237,325,213,2331,223,224,2323,2326,194,183,187,197,342,2096,227,212,2084,2103,2222,347,2121,2218,206,240,314,219,348,344,199,286,204,330,2052,2208,255,2088,349,172,184,339,340,2108,2129,334,326,350,168,171,175,169,174,167,181,173,1108,2039,1021,1797,2047,1825,1682,1487,1762,1823,1489,2055,1239,1855,1857,1887,1316,1982,1295,1867,1792,1676,1076,1633,1980,1827,1495,1841,1366,1370,1372,1875,1878,1615,1330,1019,1028,2267,1030,1034,1036,1115,1208,1332,1338,1805,1943,1953,1163,1178,1184,2250,1196,1322,1799,1941,1869,1817,1951,1374,1023,2036,2048,2051,2083,2087,2099,2223,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718,716,708,706,656,654,652,650,647,646,644,641,1008,904,903,514,479,478,476,674,601,798,1011,918,893,907,781,779,757,750,833,987,1004,630,353,881,880,878,890,544,896,714,495,741,585,415,577,500,498,657,772,782,751,540,473,493,458,483,439,398,490,634,616,830,892,966,576,555,480,469,430,442,162,161,160,156,152,140,133,131,124,118,611,615,583,713,712,710,648,642,842,631,489,485,477])).
% 14.42/14.47 cnf(2369,plain,
% 14.42/14.47 (~P13(f41(f36(a1),f28(x23691)),f34(f43(x23692,a2)),x23692,x23693)),
% 14.42/14.47 inference(scs_inference,[],[1014,1015,2065,2071,2080,2330,2340,1017,2079,2107,2207,186,337,269,2089,2137,2247,2293,270,170,237,325,213,2331,223,224,2323,2326,194,183,187,197,342,2096,227,212,2084,2103,2222,347,2121,2218,206,240,314,219,348,344,199,286,204,330,2052,2208,255,2088,349,172,184,339,340,2108,2129,334,326,350,168,171,175,169,174,167,181,173,1108,2039,1021,1797,2047,1825,1682,1487,1762,1823,1489,2055,1239,1853,1855,1857,1887,1316,1589,1982,1295,1867,1792,1676,1076,1633,1980,1827,1495,1841,1366,1370,1372,1875,1878,1615,1330,1019,1028,2267,1030,1034,1036,1115,1208,1332,1338,1805,1943,1953,1163,1178,1184,2250,1196,1322,1799,1941,1869,1817,1951,1374,1023,2036,2048,2051,2083,2087,2099,2223,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718,716,708,706,656,654,652,650,647,646,644,641,1008,904,903,514,479,478,476,674,601,798,1011,918,893,907,781,779,757,750,833,987,1004,630,353,881,880,878,890,544,896,714,495,741,585,415,577,500,498,657,772,782,751,540,473,493,458,483,439,398,490,634,616,830,892,966,576,555,480,469,430,442,162,161,160,156,152,140,133,131,124,118,611,615,583,713,712,710,648,642,842,631,489,485,477,386,844])).
% 14.42/14.47 cnf(2375,plain,
% 14.42/14.47 (~P12(x23751,x23751,f43(x23752,a2))),
% 14.42/14.47 inference(rename_variables,[],[342])).
% 14.42/14.47 cnf(2380,plain,
% 14.42/14.47 (P10(f29(f43(x23801,a2)),x23802,f43(x23801,a2))),
% 14.42/14.47 inference(rename_variables,[],[220])).
% 14.42/14.47 cnf(2382,plain,
% 14.42/14.47 (~P12(f37(x23821,f37(a46,f34(f43(a2,a2)),a2),a2),f34(f43(a2,a2)),f43(a2,a2))),
% 14.42/14.47 inference(scs_inference,[],[1014,1015,2065,2071,2080,2330,2340,1017,2079,2107,2207,186,337,269,2089,2137,2247,2293,270,170,237,325,213,2331,223,224,2323,2326,194,183,187,197,342,2096,2104,227,212,2084,2103,2222,347,2121,2218,206,240,314,219,220,348,344,199,286,204,330,2052,2208,255,2088,349,172,184,339,340,2108,2129,334,326,350,168,171,175,169,174,167,181,173,1108,2039,1021,1797,2047,1825,1682,1487,1762,1823,1489,2055,1239,1853,1855,1857,1887,1316,1589,1982,1295,2212,1867,1792,1676,1076,1633,1248,1980,1827,1495,1841,1366,1370,1372,1875,1878,1615,1330,1019,1028,2267,1030,1034,1036,1115,1208,1332,1338,1805,1943,1953,1163,1178,1184,2250,1196,1322,1799,1941,1869,1817,1048,1951,1374,1023,2036,2048,2051,2083,2087,2099,2223,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718,716,708,706,656,654,652,650,647,646,644,641,1008,904,903,514,479,478,476,674,601,798,1011,918,893,907,781,779,757,750,833,987,1004,630,353,881,880,878,890,544,896,714,495,741,585,415,577,500,498,657,772,782,751,540,473,493,458,483,439,398,490,634,616,830,892,966,576,555,480,469,430,442,162,161,160,156,152,140,133,131,124,118,611,615,583,713,712,710,648,642,842,631,489,485,477,386,844,740,923,792,791])).
% 14.42/14.47 cnf(2387,plain,
% 14.42/14.47 (P10(x23871,f41(f41(f31(f43(x23872,a2)),x23873),x23871),f43(x23872,a2))),
% 14.42/14.47 inference(rename_variables,[],[269])).
% 14.42/14.47 cnf(2389,plain,
% 14.42/14.47 (P10(x23891,f41(f41(f32(f43(x23892,a2)),f41(f41(f31(f43(x23892,a2)),x23893),x23891)),f41(f41(f31(f43(x23892,a2)),x23893),x23891)),f43(x23892,a2))),
% 14.42/14.47 inference(scs_inference,[],[1014,1015,2065,2071,2080,2330,2340,1017,2079,2107,2207,186,337,269,2089,2137,2247,2293,2387,270,170,237,325,213,2331,223,224,2323,2326,194,183,187,197,342,2096,2104,227,212,2084,2103,2222,347,2121,2218,206,240,314,219,220,348,344,199,286,204,330,2052,2208,255,2088,349,172,184,339,340,2108,2129,334,326,350,168,171,175,169,174,167,181,173,1108,2039,1021,1797,2047,1825,1682,1487,1762,1823,1489,2055,1239,1853,1855,1857,1887,1316,1589,1982,1295,2212,1867,1792,1676,1076,1633,1248,1980,1827,1495,1841,1366,1370,1372,1875,1878,1615,1330,1019,1028,2267,1030,1034,1036,1115,1208,1332,1338,1805,1943,1953,1163,1178,1184,2250,1196,1322,1799,1941,1869,1817,1048,1951,1374,1023,2036,2048,2051,2083,2087,2099,2223,1959,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718,716,708,706,656,654,652,650,647,646,644,641,1008,904,903,514,479,478,476,674,601,798,1011,918,893,907,781,779,757,750,833,987,1004,630,353,881,880,878,890,544,896,714,495,741,585,415,577,500,498,657,772,782,751,540,473,493,458,483,439,398,490,634,616,830,892,966,576,555,480,469,430,442,162,161,160,156,152,140,133,131,124,118,611,615,583,713,712,710,648,642,842,631,489,485,477,386,844,740,923,792,791,640,863,861])).
% 14.42/14.47 cnf(2399,plain,
% 14.42/14.47 (P12(f5(f4(f34(f43(a2,a2)),f37(a46,f29(f43(a2,a2)),a2),f43(a2,a2)),a2),f5(f34(f43(a2,a2)),a2),a1)),
% 14.42/14.47 inference(scs_inference,[],[1014,1015,2065,2071,2080,2330,2340,1017,2079,2107,2207,186,337,269,2089,2137,2247,2293,2387,270,170,237,325,213,2331,223,224,2323,2326,194,183,187,197,342,2096,2104,227,212,2084,2103,2222,347,2121,2218,206,240,314,219,220,2380,348,344,199,286,204,330,2052,2208,255,2088,349,172,184,339,340,2108,2129,334,326,350,168,171,175,169,174,167,181,173,1108,2039,1021,1797,2047,1825,1682,1487,1762,1823,1489,2055,1239,1853,1855,1857,1887,1316,1589,1982,1295,2212,1867,1792,1676,1076,1633,1248,1980,1827,1495,1841,1366,1370,1372,1875,1878,1615,1330,1019,1028,2267,1030,1034,1036,1115,1208,1332,1338,1805,1943,1953,1163,1178,1184,2250,1196,1322,1799,1941,1869,1817,1048,1951,1374,1023,2036,2048,2051,2083,2087,2099,2223,1959,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718,716,708,706,656,654,652,650,647,646,644,641,1008,904,903,514,479,478,476,674,601,798,1011,918,893,907,781,779,757,750,833,987,1004,630,353,881,880,878,890,544,896,714,495,741,585,415,577,500,498,657,772,782,751,540,473,493,458,483,439,398,490,634,616,830,892,966,576,555,480,469,430,442,162,161,160,156,152,140,133,131,124,118,611,615,583,713,712,710,648,642,842,631,489,485,477,386,844,740,923,792,791,640,863,861,996,908,872,998,955])).
% 14.42/14.47 cnf(2405,plain,
% 14.42/14.47 (~P10(f5(f37(f41(f25(f29(f43(f38(a48,a45,a3,a42),a2)),x24051,f38(a48,a45,a3,a42),x24052),x24053),f29(f43(f38(a48,a45,a3,a42),a2)),f38(a48,a45,a3,a42)),f38(a48,a45,a3,a42)),f5(f29(f43(f38(a48,a45,a3,a42),a2)),f38(a48,a45,a3,a42)),a1)),
% 14.42/14.47 inference(scs_inference,[],[1014,1015,2065,2071,2080,2330,2340,1017,2079,2107,2207,186,337,269,2089,2137,2247,2293,2387,270,170,237,325,213,2331,223,224,2323,2326,194,183,187,197,342,2096,2104,227,234,212,2084,2103,2222,347,2121,2218,206,240,314,219,220,2380,348,344,2122,199,286,204,330,2052,2208,255,2088,349,172,184,339,340,2108,2129,334,326,350,168,171,175,169,174,167,181,173,1108,2039,1021,1797,2047,1825,1682,1487,1762,1823,1489,2055,1239,1853,1855,1857,1887,1316,1589,1982,1971,1295,2212,1867,1792,1676,1076,1633,1248,1980,1827,1495,1841,1366,1370,1372,1875,1878,1615,1330,1019,1028,2267,1030,1034,1036,1115,1208,1332,1338,1805,1943,1953,1163,1178,1184,2250,1196,1322,1799,1941,1869,1817,1048,1951,1374,1023,2036,2048,2051,2083,2087,2099,2223,1959,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718,716,708,706,656,654,652,650,647,646,644,641,1008,904,903,514,479,478,476,674,601,798,1011,918,893,907,781,779,757,750,833,987,1004,630,353,881,880,878,890,544,896,714,495,741,585,415,577,500,498,657,772,782,751,540,473,493,458,483,439,398,490,634,616,830,892,966,576,555,480,469,430,442,162,161,160,156,152,140,133,131,124,118,611,615,583,713,712,710,648,642,842,631,489,485,477,386,844,740,923,792,791,640,863,861,996,908,872,998,955,764,761,727])).
% 14.42/14.47 cnf(2406,plain,
% 14.42/14.47 (~E(f29(f43(x24061,a2)),f37(x24062,x24063,x24061))),
% 14.42/14.47 inference(rename_variables,[],[344])).
% 14.42/14.47 cnf(2411,plain,
% 14.42/14.47 (P12(x24111,f28(f28(f28(f28(x24111)))),a1)),
% 14.42/14.47 inference(scs_inference,[],[1014,1015,2065,2071,2080,2330,2340,1017,2079,2107,2207,186,337,269,2089,2137,2247,2293,2387,270,170,237,325,213,2331,223,224,2323,2326,194,183,187,197,342,2096,2104,227,234,212,2084,2103,2222,347,2121,2218,206,240,314,219,2125,220,2380,348,344,2122,199,286,204,330,2052,2208,255,2088,349,172,184,339,340,2108,2129,334,326,350,168,171,175,169,174,167,181,173,1108,2039,1021,1797,2047,1825,1682,1487,1762,1823,1489,2055,1239,1853,1855,1857,1887,1316,1589,1982,1971,1295,2212,1867,1792,1676,1076,1633,1248,1980,1827,1495,1841,1366,1370,1372,1875,1878,1615,1330,1019,1028,2267,1030,1034,1036,1115,1208,1332,1338,1805,1943,1953,1163,1178,1184,2250,1196,1322,1799,1941,1869,1817,1048,1951,1374,1023,2036,2048,2051,2083,2087,2099,2223,1959,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718,716,708,706,656,654,652,650,647,646,644,641,1008,904,903,514,479,478,476,674,601,798,1011,918,893,907,781,779,757,750,833,987,1004,630,353,881,880,878,890,544,896,714,495,741,585,415,577,500,498,657,772,782,751,540,473,493,458,483,439,398,490,634,616,830,892,966,576,555,480,469,430,442,162,161,160,156,152,140,133,131,124,118,611,615,583,713,712,710,648,642,842,631,489,485,477,386,844,740,923,792,791,640,863,861,996,908,872,998,955,764,761,727,788,468])).
% 14.42/14.47 cnf(2417,plain,
% 14.42/14.47 (~P10(f37(x24171,f28(f29(f43(x24172,a2))),x24172),f27(f28(f29(f43(x24172,a2))),f43(x24172,a2)),f43(x24172,a2))),
% 14.42/14.47 inference(scs_inference,[],[1014,1015,2065,2071,2080,2330,2340,1017,2079,2107,2207,186,337,269,2089,2137,2247,2293,2387,270,170,237,325,213,2331,223,224,2323,2326,194,183,187,197,342,2096,2104,227,234,212,2084,2103,2222,347,2121,2218,206,240,314,219,2125,220,2380,348,344,2122,199,286,204,330,2052,2208,255,2088,349,172,184,339,340,2108,2129,334,326,350,168,171,175,169,174,167,181,173,1108,2039,1021,1797,2047,1825,1682,1487,1762,1823,1489,2055,1239,1853,1855,1857,1887,1316,1589,1982,1971,1295,2212,1867,1792,1676,1076,1633,1248,1980,1827,1495,1841,1366,1370,1372,1875,1878,1615,1330,1019,1028,2267,1030,1034,1036,1115,1208,1332,1338,1805,1943,1953,1163,1178,1184,2250,1196,1322,1799,1941,1869,1817,1048,1951,1374,1023,2036,2048,2051,2083,2087,2099,2223,1959,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718,716,708,706,656,654,652,650,647,646,644,641,1008,904,903,514,479,478,476,674,601,798,1011,918,893,907,781,779,757,750,833,987,1004,630,353,881,880,878,890,544,896,714,495,741,585,415,577,500,498,657,772,782,751,540,473,493,458,483,439,398,490,634,616,830,892,966,576,555,480,469,430,442,162,161,160,156,152,140,133,131,124,118,611,615,583,713,712,710,648,642,842,631,489,485,477,386,844,740,923,792,791,640,863,861,996,908,872,998,955,764,761,727,788,468,770,879,783])).
% 14.42/14.47 cnf(2420,plain,
% 14.42/14.47 (P11(a46,f38(a48,a45,a3,a42),x24201)),
% 14.42/14.47 inference(scs_inference,[],[1014,1015,2065,2071,2080,2330,2340,1017,2079,2107,2207,186,337,269,2089,2137,2247,2293,2387,270,170,237,325,213,2331,223,224,2323,2326,195,194,183,187,197,342,2096,2104,227,234,212,2084,2103,2222,347,2121,2218,206,240,314,219,2125,220,2380,348,344,2122,199,286,204,330,2052,2208,255,2088,349,172,184,339,340,2108,2129,334,326,350,168,171,175,169,174,167,181,173,1108,2039,1021,1797,2047,1825,1682,1487,1762,1823,1489,2055,1239,1853,1855,1857,1887,1316,1589,1982,1971,1295,2212,1867,1792,1676,1076,1633,1248,1980,1827,1495,1841,1366,1370,1372,1875,1878,1615,1330,1019,1028,2267,1030,1034,1036,1115,1208,1332,1338,1805,1943,1953,1163,1178,1184,2250,1196,1322,1799,1941,1869,1817,1048,1951,1374,1023,2036,2048,2051,2083,2087,2099,2223,1959,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718,716,708,706,656,654,652,650,647,646,644,641,1008,904,903,514,479,478,476,674,601,798,1011,918,893,907,781,779,757,750,833,987,1004,630,353,881,880,878,890,544,896,714,495,741,585,415,577,500,498,657,772,782,751,540,473,493,458,483,439,398,490,634,616,830,892,966,576,555,480,469,430,442,162,161,160,156,152,140,133,131,124,118,611,615,583,713,712,710,648,642,842,631,489,485,477,386,844,740,923,792,791,640,863,861,996,908,872,998,955,764,761,727,788,468,770,879,783,163,153])).
% 14.42/14.47 cnf(2425,plain,
% 14.42/14.47 (E(f27(f27(x24251,f43(x24252,a2)),f43(x24252,a2)),x24251)),
% 14.42/14.47 inference(rename_variables,[],[213])).
% 14.42/14.47 cnf(2435,plain,
% 14.42/14.47 (P10(f28(x24351),f28(f28(f41(f41(f36(a1),x24351),x24352))),a1)),
% 14.42/14.47 inference(scs_inference,[],[1014,1015,2065,2071,2080,2330,2340,1017,2079,2107,2207,186,337,269,2089,2137,2247,2293,2387,270,170,237,325,213,2331,2333,223,224,2323,2326,195,194,183,187,197,342,2096,2104,227,234,212,2084,2103,2222,347,2121,2218,206,240,314,219,2125,220,2380,348,344,2122,199,286,204,330,2052,2208,255,2088,349,172,184,339,340,2108,2129,334,326,350,168,171,175,169,174,167,181,173,1108,2039,1021,1797,2047,1825,1682,1487,1762,1823,1489,2055,1239,1853,1855,1857,1887,1316,1589,1982,1971,1295,2212,1867,1792,1676,1076,1633,1248,1980,1827,1495,1841,1366,1370,1372,1875,1878,1615,1330,1019,1028,2267,1030,1034,1036,1115,1535,1208,1332,1338,1805,1943,1953,1163,1178,1184,2250,1196,1322,1799,1941,1698,1869,1817,1278,1969,1048,1951,1374,1023,2036,2048,2051,2083,2087,2099,2223,1959,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718,716,708,706,656,654,652,650,647,646,644,641,1008,904,903,514,479,478,476,674,601,798,1011,918,893,907,781,779,757,750,833,987,1004,630,353,881,880,878,890,544,896,714,495,741,585,415,577,500,498,657,772,782,751,540,473,493,458,483,439,398,490,634,616,830,892,966,576,555,480,469,430,442,162,161,160,156,152,140,133,131,124,118,611,615,583,713,712,710,648,642,842,631,489,485,477,386,844,740,923,792,791,640,863,861,996,908,872,998,955,764,761,727,788,468,770,879,783,163,153,148,129,122,119,548,546,545,543,447])).
% 14.42/14.47 cnf(2445,plain,
% 14.42/14.47 (P13(f25(f29(f43(x24451,a2)),x24452,x24451,a46),f38(x24452,f29(f43(x24451,a2)),x24451,f38(a48,a45,a3,a42)),f38(a48,a45,a3,a42),x24451)),
% 14.42/14.47 inference(scs_inference,[],[1014,1015,2065,2071,2080,2330,2340,1017,2079,2107,2207,186,337,269,2089,2137,2247,2293,2387,270,170,237,325,213,2331,2333,223,224,2323,2326,195,194,183,187,197,342,2096,2104,227,234,212,2084,2103,2222,347,2121,2218,206,240,314,219,2125,220,2380,348,344,2122,199,286,204,330,2052,2208,255,2088,349,172,184,339,2260,340,2108,2129,334,326,350,168,171,175,169,174,167,181,173,1108,2039,1021,1797,2047,1825,1682,1487,1762,2094,1823,1489,2055,1239,1853,1855,1857,1887,1316,1589,1982,1971,1295,2212,1867,1792,1676,1076,1448,1633,1248,1980,1827,1495,1841,1366,1370,1372,1875,1878,1615,1330,1019,1028,2267,1030,1034,1036,1115,1535,1208,1332,1338,1805,1943,1953,1160,1163,1178,1184,2250,1196,1199,1322,1799,1941,1698,1869,1817,1278,1969,1048,1951,1374,1023,2036,2048,2051,2083,2087,2099,2223,1959,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718,716,708,706,656,654,652,650,647,646,644,641,1008,904,903,514,479,478,476,674,601,798,1011,918,893,907,781,779,757,750,833,987,1004,630,353,881,880,878,890,544,896,714,495,741,585,415,577,500,498,657,772,782,751,540,473,493,458,483,439,398,490,634,616,830,892,966,576,555,480,469,430,442,162,161,160,156,152,140,133,131,124,118,611,615,583,713,712,710,648,642,842,631,489,485,477,386,844,740,923,792,791,640,863,861,996,908,872,998,955,764,761,727,788,468,770,879,783,163,153,148,129,122,119,548,546,545,543,447,445,454,471,801,117])).
% 14.42/14.47 cnf(2450,plain,
% 14.42/14.47 (~P10(f34(f43(f38(a48,a45,a3,a42),a2)),f37(x24501,f39(x24502,f29(f43(x24503,a2)),f38(a48,a45,a3,a42),x24503),f38(a48,a45,a3,a42)),f43(f38(a48,a45,a3,a42),a2))),
% 14.42/14.47 inference(scs_inference,[],[1014,1015,2065,2071,2080,2330,2340,1017,2079,2107,2207,186,337,269,2089,2137,2247,2293,2387,270,170,237,325,213,2331,2333,223,224,2323,2326,195,194,183,187,197,342,2096,2104,227,234,212,2084,2103,2222,2221,347,2121,2218,206,240,314,219,2125,220,2380,348,344,2122,199,286,204,330,2052,2208,255,2088,349,172,184,339,2260,340,2108,2129,334,326,350,168,171,175,169,174,167,181,173,1108,2039,1021,1797,2047,1825,1682,1487,1762,2094,1823,1489,2055,1239,1853,1855,1857,1887,1316,1589,1982,1971,1295,2212,1867,1792,1676,1076,1448,1633,1248,1980,1827,1495,1841,1366,1370,1372,1875,1878,1615,1330,1019,1028,2267,1030,1034,1036,1115,1535,1208,1332,1338,1805,1943,1953,1160,1163,1178,1184,2250,1196,1199,1322,1799,1941,1698,1869,1817,1278,1969,1048,1951,1374,1023,2036,2048,2051,2083,2087,2099,2223,1959,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718,716,708,706,656,654,652,650,647,646,644,641,1008,904,903,514,479,478,476,674,601,798,1011,918,893,907,781,779,757,750,833,987,1004,630,353,881,880,878,890,544,896,714,495,741,585,415,577,500,498,657,772,782,751,540,473,493,458,483,439,398,490,634,616,830,892,966,576,555,480,469,430,442,162,161,160,156,152,140,133,131,124,118,611,615,583,713,712,710,648,642,842,631,489,485,477,386,844,740,923,792,791,640,863,861,996,908,872,998,955,764,761,727,788,468,770,879,783,163,153,148,129,122,119,548,546,545,543,447,445,454,471,801,117,494,680])).
% 14.42/14.47 cnf(2459,plain,
% 14.42/14.47 (~P12(x24591,x24591,f43(x24592,a2))),
% 14.42/14.47 inference(rename_variables,[],[342])).
% 14.42/14.47 cnf(2462,plain,
% 14.42/14.47 (~P10(f37(x24621,f29(f43(x24622,a2)),x24622),f29(f43(x24622,a2)),f43(x24622,a2))),
% 14.42/14.47 inference(rename_variables,[],[1251])).
% 14.42/14.47 cnf(2464,plain,
% 14.42/14.47 (~P10(f28(f28(x24641)),f41(f41(f36(a1),x24641),f28(x24641)),a1)),
% 14.42/14.47 inference(scs_inference,[],[1014,1015,2065,2071,2080,2330,2340,1017,2079,2107,2207,186,337,269,2089,2137,2247,2293,2387,270,170,237,325,213,2331,2333,223,224,2323,2326,195,194,183,187,197,342,2096,2104,2375,227,234,212,2084,2103,2222,2221,347,2121,2218,206,240,314,219,2125,220,2380,348,344,2122,199,286,204,330,2052,2208,255,2088,349,172,184,339,2260,340,2108,2129,334,326,350,168,171,175,169,174,167,181,173,1108,2039,1021,1797,2047,1825,1682,1487,1318,1762,2094,1823,1489,2055,1239,1853,1855,1857,1887,1316,1589,1982,1971,1295,2212,1867,1792,1676,1076,1298,1448,1251,1633,1248,1980,1827,1495,1841,1366,1370,1372,1875,1878,1615,1330,1019,1028,2267,1030,1034,1036,1115,1535,1208,1332,1338,1805,1943,1953,1160,1163,1178,1184,2250,1196,1199,1322,1799,1941,1698,1869,1817,1278,1969,1048,1951,1374,1023,2036,2048,2051,2083,2087,2099,2223,1959,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718,716,708,706,656,654,652,650,647,646,644,641,1008,904,903,514,479,478,476,674,601,798,1011,918,893,907,781,779,757,750,833,987,1004,630,353,881,880,878,890,544,896,714,495,741,585,415,577,500,498,657,772,782,751,540,473,493,458,483,439,398,490,634,616,830,892,966,576,555,480,469,430,442,162,161,160,156,152,140,133,131,124,118,611,615,583,713,712,710,648,642,842,631,489,485,477,386,844,740,923,792,791,640,863,861,996,908,872,998,955,764,761,727,788,468,770,879,783,163,153,148,129,122,119,548,546,545,543,447,445,454,471,801,117,494,680,496,748,739,811,780])).
% 14.42/14.47 cnf(2465,plain,
% 14.42/14.47 (~P10(f28(x24651),x24651,a1)),
% 14.42/14.47 inference(rename_variables,[],[340])).
% 14.42/14.47 cnf(2467,plain,
% 14.42/14.47 (P12(f41(f41(f36(a1),f26(a1)),f26(a1)),f28(x24671),a1)),
% 14.42/14.47 inference(scs_inference,[],[1014,1015,2065,2071,2080,2330,2340,1017,2079,2107,2207,186,337,269,2089,2137,2247,2293,2387,270,170,237,325,213,2331,2333,223,224,2323,2326,195,194,183,187,197,342,2096,2104,2375,227,234,212,2084,2103,2222,2221,347,2121,2218,206,240,314,219,2125,220,2380,348,344,2122,199,286,204,330,2052,2208,255,2088,349,172,184,339,2260,340,2108,2129,334,326,350,168,171,175,169,174,167,181,173,1108,2039,1021,1797,2047,1825,1682,1487,1318,1762,2094,1823,1489,2055,1239,1853,1855,1857,1887,1316,1589,1982,1971,1295,2212,1867,1792,1676,1076,1298,1448,1251,1633,1248,1980,1827,1495,1841,1366,1370,1372,1875,1878,1615,1330,1019,1028,2267,1030,1034,1036,1115,1535,1208,1332,1338,1805,1943,1953,1160,1163,1178,1184,2250,1196,1199,1322,1799,1941,1698,1869,1817,1278,1969,1048,1951,1374,1023,2036,2048,2051,2083,2087,2099,2223,1959,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718,716,708,706,656,654,652,650,647,646,644,641,1008,904,903,514,479,478,476,674,601,798,1011,918,893,907,781,779,757,750,833,987,1004,630,353,881,880,878,890,544,896,714,495,741,585,415,577,500,498,657,772,782,751,540,473,493,458,483,439,398,490,634,616,830,892,966,576,555,480,469,430,442,162,161,160,156,152,140,133,131,124,118,611,615,583,713,712,710,648,642,842,631,489,485,477,386,844,740,923,792,791,640,863,861,996,908,872,998,955,764,761,727,788,468,770,879,783,163,153,148,129,122,119,548,546,545,543,447,445,454,471,801,117,494,680,496,748,739,811,780,758])).
% 14.42/14.47 cnf(2469,plain,
% 14.42/14.47 (P10(x24691,f28(f41(f41(f36(a1),x24692),x24691)),a1)),
% 14.42/14.47 inference(scs_inference,[],[1014,1015,2065,2071,2080,2330,2340,1017,2079,2107,2207,186,337,269,2089,2137,2247,2293,2387,270,170,237,325,213,2331,2333,223,224,2323,2326,195,194,183,187,197,342,2096,2104,2375,227,234,212,2084,2103,2222,2221,347,2121,2218,206,240,314,219,2125,220,2380,348,344,2122,199,286,204,330,2052,2208,255,2088,349,172,184,339,2260,340,2108,2129,334,326,350,168,171,175,169,174,167,181,173,1108,2039,1021,1797,2047,1825,1682,1487,1318,1762,2094,1823,1489,2055,1239,1853,1855,1857,1887,1316,1589,1982,1971,1295,2212,1867,1792,1676,1076,1298,1448,1251,1633,1248,1980,1827,1495,1841,1366,1370,1372,1875,1878,1615,1330,1019,1028,2267,1030,1034,1036,1115,1535,1205,1208,1332,1338,1805,1943,1953,1160,1163,1178,1184,2250,1196,1199,1322,1799,1941,1698,1869,1817,1278,1969,1048,1951,1374,1023,2036,2048,2051,2083,2087,2099,2223,1959,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718,716,708,706,656,654,652,650,647,646,644,641,1008,904,903,514,479,478,476,674,601,798,1011,918,893,907,781,779,757,750,833,987,1004,630,353,881,880,878,890,544,896,714,495,741,585,415,577,500,498,657,772,782,751,540,473,493,458,483,439,398,490,634,616,830,892,966,576,555,480,469,430,442,162,161,160,156,152,140,133,131,124,118,611,615,583,713,712,710,648,642,842,631,489,485,477,386,844,740,923,792,791,640,863,861,996,908,872,998,955,764,761,727,788,468,770,879,783,163,153,148,129,122,119,548,546,545,543,447,445,454,471,801,117,494,680,496,748,739,811,780,758,426])).
% 14.42/14.47 cnf(2471,plain,
% 14.42/14.47 (~P10(f28(f28(f28(f41(f41(f36(a1),x24711),x24712)))),f28(x24711),a1)),
% 14.42/14.47 inference(scs_inference,[],[1014,1015,2065,2071,2080,2330,2340,1017,2079,2107,2207,186,337,269,2089,2137,2247,2293,2387,270,170,237,325,213,2331,2333,223,224,2323,2326,195,194,183,187,197,342,2096,2104,2375,227,234,212,2084,2103,2222,2221,347,2121,2218,206,240,314,219,2125,220,2380,348,344,2122,199,286,204,330,2052,2208,255,2088,349,172,184,339,2260,340,2108,2129,334,326,350,168,171,175,169,174,167,181,173,1108,2039,1021,1797,2047,1825,1682,1487,1318,1762,2094,1823,1489,2055,1239,1853,1855,1857,1887,1316,1589,1982,1971,1295,2212,1867,1792,1676,1076,1298,1448,1251,1633,1248,1980,1827,1495,1841,1366,1370,1372,1875,1878,1615,1330,1019,1028,2267,1030,1034,1036,1115,1535,1205,1208,1332,1338,1805,1943,1953,1160,1163,1178,1184,2250,1196,1199,1322,1799,1941,1698,1869,1817,1278,1969,1048,1951,1374,1023,2036,2048,2051,2083,2087,2099,2223,1959,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718,716,708,706,656,654,652,650,647,646,644,641,1008,904,903,514,479,478,476,674,601,798,1011,918,893,907,781,779,757,750,833,987,1004,630,353,881,880,878,890,544,896,714,495,741,585,415,577,500,498,657,772,782,751,540,473,493,458,483,439,398,490,634,616,830,892,966,576,555,480,469,430,442,162,161,160,156,152,140,133,131,124,118,611,615,583,713,712,710,648,642,842,631,489,485,477,386,844,740,923,792,791,640,863,861,996,908,872,998,955,764,761,727,788,468,770,879,783,163,153,148,129,122,119,548,546,545,543,447,445,454,471,801,117,494,680,496,748,739,811,780,758,426,484])).
% 14.42/14.47 cnf(2475,plain,
% 14.42/14.47 (P12(f41(f41(f32(a1),f26(a1)),x24751),f28(x24752),a1)),
% 14.42/14.47 inference(scs_inference,[],[1014,1015,2065,2071,2080,2330,2340,1017,2079,2107,2207,186,337,269,2089,2137,2247,2293,2387,270,170,237,325,213,2331,2333,223,224,2323,2326,195,194,183,187,197,342,2096,2104,2375,227,234,212,2084,2103,2222,2221,347,2121,2218,206,240,314,219,2125,220,2380,348,344,2122,199,286,204,330,2052,2208,255,2088,349,172,184,339,2260,340,2108,2129,2465,334,326,350,168,171,175,169,174,167,181,173,1108,2039,1021,1797,2047,1825,1682,1487,1318,1762,2094,1823,1489,2055,1239,1853,1855,1857,1887,1316,1589,1982,1971,1295,2212,1867,1792,1676,1076,1298,1448,1251,1633,1248,1980,1827,1495,1841,1366,1370,1372,1875,1878,1615,1330,1019,1028,2267,1030,1034,1036,1115,1535,1205,1208,1332,1338,1805,1943,1953,1160,1163,1178,1184,2250,1196,1199,1322,1799,1941,1698,1869,1817,1278,1969,1048,1951,1374,1023,2036,2048,2051,2083,2087,2099,2223,1959,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718,716,708,706,656,654,652,650,647,646,644,641,1008,904,903,514,479,478,476,674,601,798,1011,918,893,907,781,779,757,750,833,987,1004,630,353,881,880,878,890,544,896,714,495,741,585,415,577,500,498,657,772,782,751,540,473,493,458,483,439,398,490,634,616,830,892,966,576,555,480,469,430,442,162,161,160,156,152,140,133,131,124,118,611,615,583,713,712,710,648,642,842,631,489,485,477,386,844,740,923,792,791,640,863,861,996,908,872,998,955,764,761,727,788,468,770,879,783,163,153,148,129,122,119,548,546,545,543,447,445,454,471,801,117,494,680,496,748,739,811,780,758,426,484,123,658])).
% 14.42/14.47 cnf(2484,plain,
% 14.42/14.47 (P12(x24841,f28(f41(f41(f36(a1),x24841),x24842)),a1)),
% 14.42/14.47 inference(rename_variables,[],[1172])).
% 14.42/14.47 cnf(2486,plain,
% 14.42/14.47 (P12(x24861,f28(f41(f41(f36(a1),f28(x24861)),x24862)),a1)),
% 14.42/14.47 inference(scs_inference,[],[1014,1015,2065,2071,2080,2330,2340,1017,2079,2107,2207,186,337,269,2089,2137,2247,2293,2387,270,170,237,325,213,2331,2333,223,224,2323,2326,195,194,183,187,197,342,2096,2104,2375,227,234,212,2084,2103,2222,2221,347,2121,2218,206,240,314,219,2125,220,2380,348,344,2122,199,286,204,330,2052,2208,255,2088,349,172,184,339,2260,340,2108,2129,2465,334,326,350,168,171,175,169,174,167,181,173,1108,2039,1021,1797,2047,1825,1682,1487,1318,1762,2094,1823,1489,2055,1239,1853,1855,1857,1887,1316,1589,1982,1971,1295,2212,1867,1792,1676,1076,1298,1448,1251,1633,1248,1980,1827,1495,1841,1366,1370,1372,1875,1878,1615,1330,1019,1028,2267,1030,1034,1036,1115,1535,1172,1205,1208,1332,1338,1805,2310,1943,1953,1160,1163,1178,1184,2250,1196,1199,1322,1799,1941,1698,1869,1817,1278,1969,1048,1951,1374,1023,2036,2048,2051,2083,2087,2099,2223,1959,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718,716,708,706,656,654,652,650,647,646,644,641,1008,904,903,514,479,478,476,674,601,798,1011,918,893,907,781,779,757,750,833,987,1004,630,353,881,880,878,890,544,896,714,495,741,585,415,577,500,498,657,772,782,751,540,473,493,458,483,439,398,490,634,616,830,892,966,576,555,480,469,430,442,162,161,160,156,152,140,133,131,124,118,611,615,583,713,712,710,648,642,842,631,489,485,477,386,844,740,923,792,791,640,863,861,996,908,872,998,955,764,761,727,788,468,770,879,783,163,153,148,129,122,119,548,546,545,543,447,445,454,471,801,117,494,680,496,748,739,811,780,758,426,484,123,658,819,539,481,517,437])).
% 14.42/14.47 cnf(2488,plain,
% 14.42/14.47 (~E(f29(f43(x24881,a2)),f34(f43(x24881,a2)))),
% 14.42/14.47 inference(scs_inference,[],[1014,1015,2065,2071,2080,2330,2340,1017,2079,2107,2207,186,337,269,2089,2137,2247,2293,2387,270,170,237,325,213,2331,2333,223,224,2323,2326,195,194,183,187,197,342,2096,2104,2375,227,234,212,2084,2103,2222,2221,347,2121,2218,206,240,314,219,2125,220,2380,348,344,2122,199,286,204,330,2052,2208,255,2088,349,172,184,339,2260,340,2108,2129,2465,334,326,350,168,171,175,169,174,167,181,173,1108,2039,1021,1797,2047,1825,1682,1487,1318,1762,2094,1823,1489,2055,1239,1853,1855,1857,1887,1316,1589,1982,1971,1295,2212,1867,1792,1676,1076,1298,1448,1251,1633,1248,1980,1827,1495,1841,1366,1370,1372,1875,1878,1615,1330,1019,1028,2267,1030,1034,1036,1115,1535,1172,1205,1208,1332,1338,1805,2310,1943,1953,1160,1163,1178,1184,2250,1196,1199,1322,1799,1941,1698,1869,1817,1278,1969,1048,1951,1374,1023,2036,2048,2051,2083,2087,2099,2223,1959,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718,716,708,706,656,654,652,650,647,646,644,641,1008,904,903,514,479,478,476,674,601,798,1011,918,893,907,781,779,757,750,833,987,1004,630,353,881,880,878,890,544,896,714,495,741,585,415,577,500,498,657,772,782,751,540,473,493,458,483,439,398,490,634,616,830,892,966,576,555,480,469,430,442,162,161,160,156,152,140,133,131,124,118,611,615,583,713,712,710,648,642,842,631,489,485,477,386,844,740,923,792,791,640,863,861,996,908,872,998,955,764,761,727,788,468,770,879,783,163,153,148,129,122,119,548,546,545,543,447,445,454,471,801,117,494,680,496,748,739,811,780,758,426,484,123,658,819,539,481,517,437,2])).
% 14.42/14.47 cnf(2500,plain,
% 14.42/14.47 (P10(x25001,f41(f41(f31(f43(x25002,a2)),x25003),x25001),f43(x25002,a2))),
% 14.42/14.47 inference(rename_variables,[],[269])).
% 14.42/14.47 cnf(2514,plain,
% 14.42/14.47 (P10(f4(x25141,x25142,f43(x25143,a2)),x25141,f43(x25143,a2))),
% 14.42/14.47 inference(rename_variables,[],[240])).
% 14.42/14.47 cnf(2515,plain,
% 14.42/14.47 (P13(x25151,f29(f43(x25152,a2)),x25152,x25153)),
% 14.42/14.47 inference(rename_variables,[],[255])).
% 14.42/14.47 cnf(2518,plain,
% 14.42/14.47 (P10(x25181,x25181,f43(x25182,a2))),
% 14.42/14.47 inference(rename_variables,[],[210])).
% 14.42/14.47 cnf(2519,plain,
% 14.42/14.47 (P10(x25191,x25191,f43(x25192,a2))),
% 14.42/14.47 inference(rename_variables,[],[210])).
% 14.42/14.47 cnf(2528,plain,
% 14.42/14.47 (E(f27(f27(x25281,f43(x25282,a2)),f43(x25282,a2)),x25281)),
% 14.42/14.47 inference(rename_variables,[],[213])).
% 14.42/14.47 cnf(2531,plain,
% 14.42/14.47 (~P16(f27(f27(f28(x25311),f43(x25312,a2)),f43(x25312,a2)),f37(x25311,f39(x25313,f29(f43(x25314,a2)),f38(a48,a45,a3,a42),x25314),f38(a48,a45,a3,a42)),f38(a48,a45,a3,a42))),
% 14.42/14.47 inference(scs_inference,[],[1014,1015,2065,2071,2080,2330,2340,1017,2079,2107,2207,186,337,269,2089,2137,2247,2293,2387,2500,270,222,170,237,325,213,2331,2333,2425,2528,223,224,2323,2326,195,194,183,187,197,210,342,2096,2104,2375,227,234,212,2084,2103,2222,2221,347,2121,2218,206,240,2216,314,219,2125,220,2380,348,344,2122,199,286,204,330,2052,2208,255,2088,2515,349,2190,172,184,339,2260,340,2108,2129,2465,334,326,350,168,171,175,169,174,167,181,173,1108,2039,1021,1797,2047,1825,1682,1487,1318,1762,2094,1823,1489,2055,1239,1853,1855,2284,1857,1859,1887,1316,1589,1979,1982,1971,1295,2212,1867,1792,1676,2056,1076,1298,1448,1251,1633,1248,1980,1827,1495,1102,1841,1366,1370,1372,1875,1878,1615,1330,1019,1028,2267,1030,1034,1036,1115,1535,1172,1205,1208,1332,1338,1805,2310,1943,1953,1160,1163,1166,1178,1184,2250,1196,1199,1322,1799,1941,1698,1334,1869,1817,1278,1314,1969,1048,1951,1374,1023,2036,2048,2051,2083,2087,2099,2223,1959,1949,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718,716,708,706,656,654,652,650,647,646,644,641,1008,904,903,514,479,478,476,674,601,798,1011,918,893,907,781,779,757,750,833,987,1004,630,353,881,880,878,890,544,896,714,495,741,585,415,577,500,498,657,772,782,751,540,473,493,458,483,439,398,490,634,616,830,892,966,576,555,480,469,430,442,162,161,160,156,152,140,133,131,124,118,611,615,583,713,712,710,648,642,842,631,489,485,477,386,844,740,923,792,791,640,863,861,996,908,872,998,955,764,761,727,788,468,770,879,783,163,153,148,129,122,119,548,546,545,543,447,445,454,471,801,117,494,680,496,748,739,811,780,758,426,484,123,658,819,539,481,517,437,2,22,795,537,462,636,486,832,950,799,1001,991,980,541,387,158,143,135,127])).
% 14.42/14.47 cnf(2535,plain,
% 14.42/14.47 (~P12(f28(f38(a48,a45,a3,a42)),a46,a1)),
% 14.42/14.47 inference(scs_inference,[],[1014,1015,2065,2071,2080,2330,2340,1017,2079,2107,2207,186,337,269,2089,2137,2247,2293,2387,2500,270,222,170,237,325,213,2331,2333,2425,2528,223,224,2323,2326,195,194,183,187,197,210,342,2096,2104,2375,227,234,212,2084,2103,2222,2221,347,2121,2218,206,240,2216,314,219,2125,220,2380,348,344,2122,2406,199,286,204,330,2052,2208,255,2088,2515,349,2190,172,184,339,2260,340,2108,2129,2465,327,334,326,350,168,171,175,169,174,167,181,173,1108,2039,1021,1797,2047,1825,1682,1487,1318,1762,2094,1823,1489,2055,1239,1853,1855,2284,1857,1859,1887,1316,1589,1979,1982,1971,1295,2212,1867,1792,1676,2056,1076,1298,1448,1251,1633,1248,1980,1827,1495,1102,1841,1366,1370,1372,1875,1878,1615,1330,1019,1028,2267,1030,1034,1036,1115,1535,1172,1205,1208,1332,1338,1805,2310,1943,1953,1160,1163,1166,1178,1184,2250,1196,1199,1322,1799,1941,1698,1334,1869,1817,1278,1314,1969,1048,1951,1374,1023,2036,2048,2051,2083,2087,2099,2223,1959,1949,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718,716,708,706,656,654,652,650,647,646,644,641,1008,904,903,514,479,478,476,674,601,798,1011,918,893,907,781,779,757,750,833,987,1004,630,353,881,880,878,890,544,896,714,495,741,585,415,577,500,498,657,772,782,751,540,473,493,458,483,439,398,490,634,616,830,892,966,576,555,480,469,430,442,162,161,160,156,152,140,133,131,124,118,611,615,583,713,712,710,648,642,842,631,489,485,477,386,844,740,923,792,791,640,863,861,996,908,872,998,955,764,761,727,788,468,770,879,783,163,153,148,129,122,119,548,546,545,543,447,445,454,471,801,117,494,680,496,748,739,811,780,758,426,484,123,658,819,539,481,517,437,2,22,795,537,462,636,486,832,950,799,1001,991,980,541,387,158,143,135,127,112,3,132])).
% 14.42/14.47 cnf(2536,plain,
% 14.42/14.47 (~P16(f41(x25361,a46),f4(x25362,x25362,f43(a3,a2)),a3)),
% 14.42/14.47 inference(scs_inference,[],[1014,1015,2065,2071,2080,2330,2340,1017,2079,2107,2207,186,337,269,2089,2137,2247,2293,2387,2500,270,222,170,237,325,213,2331,2333,2425,2528,211,223,224,2323,2326,195,194,183,187,197,210,342,2096,2104,2375,227,234,212,2084,2103,2222,2221,347,2121,2218,206,240,2216,314,219,2125,220,2380,348,344,2122,2406,199,286,204,330,2052,2208,255,2088,2515,349,2190,172,184,339,2260,340,2108,2129,2465,327,334,326,350,168,171,175,169,174,167,181,173,1108,2039,1021,1797,2047,1825,1682,1487,1318,1762,2094,1823,1489,2055,1239,1853,1855,2284,1857,1859,1887,1316,1589,1979,1982,1971,1295,2212,1867,1792,1676,2056,1076,1298,1448,1251,1633,1248,1980,1827,1495,1102,1841,1366,1370,1372,1875,1878,1615,1330,1019,1028,2267,1030,1034,1036,1115,1535,1172,1205,1208,1332,1338,1805,2310,1943,1953,1160,1163,1166,1178,1184,2250,1196,1199,1322,1799,1941,1698,1334,1869,1817,1278,1314,1969,1048,1951,1374,1023,2036,2048,2051,2083,2087,2099,2223,1959,1949,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718,716,708,706,656,654,652,650,647,646,644,641,1008,904,903,514,479,478,476,674,601,798,1011,918,893,907,781,779,757,750,833,987,1004,630,353,881,880,878,890,544,896,714,495,741,585,415,577,500,498,657,772,782,751,540,473,493,458,483,439,398,490,634,616,830,892,966,576,555,480,469,430,442,162,161,160,156,152,140,133,131,124,118,611,615,583,713,712,710,648,642,842,631,489,485,477,386,844,740,923,792,791,640,863,861,996,908,872,998,955,764,761,727,788,468,770,879,783,163,153,148,129,122,119,548,546,545,543,447,445,454,471,801,117,494,680,496,748,739,811,780,758,426,484,123,658,819,539,481,517,437,2,22,795,537,462,636,486,832,950,799,1001,991,980,541,387,158,143,135,127,112,3,132,128])).
% 14.42/14.47 cnf(2538,plain,
% 14.42/14.47 (~E(a44,x25381)+P33(x25381)),
% 14.42/14.47 inference(scs_inference,[],[189,1014,1015,2065,2071,2080,2330,2340,1017,2079,2107,2207,186,337,269,2089,2137,2247,2293,2387,2500,270,222,170,237,325,213,2331,2333,2425,2528,211,223,224,2323,2326,195,194,183,187,197,210,342,2096,2104,2375,227,234,212,2084,2103,2222,2221,347,2121,2218,206,240,2216,314,219,2125,220,2380,348,344,2122,2406,199,286,204,330,2052,2208,255,2088,2515,349,2190,172,184,339,2260,340,2108,2129,2465,327,334,326,350,168,171,175,169,174,167,181,173,1108,2039,1021,1797,2047,1825,1682,1487,1318,1762,2094,1823,1489,2055,1239,1853,1855,2284,1857,1859,1887,1316,1589,1979,1982,1971,1295,2212,1867,1792,1676,2056,1076,1298,1448,1251,1633,1248,1980,1827,1495,1102,1841,1366,1370,1372,1875,1878,1615,1330,1019,1028,2267,1030,1034,1036,1115,1535,1172,1205,1208,1332,1338,1805,2310,1943,1953,1160,1163,1166,1178,1184,2250,1196,1199,1322,1799,1941,1698,1334,1869,1817,1278,1314,1969,1048,1951,1374,1023,2036,2048,2051,2083,2087,2099,2223,1959,1949,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718,716,708,706,656,654,652,650,647,646,644,641,1008,904,903,514,479,478,476,674,601,798,1011,918,893,907,781,779,757,750,833,987,1004,630,353,881,880,878,890,544,896,714,495,741,585,415,577,500,498,657,772,782,751,540,473,493,458,483,439,398,490,634,616,830,892,966,576,555,480,469,430,442,162,161,160,156,152,140,133,131,124,118,611,615,583,713,712,710,648,642,842,631,489,485,477,386,844,740,923,792,791,640,863,861,996,908,872,998,955,764,761,727,788,468,770,879,783,163,153,148,129,122,119,548,546,545,543,447,445,454,471,801,117,494,680,496,748,739,811,780,758,426,484,123,658,819,539,481,517,437,2,22,795,537,462,636,486,832,950,799,1001,991,980,541,387,158,143,135,127,112,3,132,128,39,145])).
% 14.42/14.47 cnf(2542,plain,
% 14.42/14.47 (~E(f37(x25421,x25422,x25423),f29(f43(x25423,a2)))),
% 14.42/14.47 inference(rename_variables,[],[343])).
% 14.42/14.47 cnf(2544,plain,
% 14.42/14.47 (P13(x25441,f37(x25442,f29(f43(x25443,a2)),x25443),x25443,x25444)),
% 14.42/14.47 inference(scs_inference,[],[189,1014,1015,2065,2071,2080,2330,2340,1017,2079,2107,2207,186,337,269,2089,2137,2247,2293,2387,2500,270,222,170,237,325,213,2331,2333,2425,2528,211,223,224,2323,2326,195,194,183,187,197,210,342,2096,2104,2375,227,234,212,2084,2103,2222,2221,347,2121,2218,206,240,2216,314,219,2125,220,2380,348,343,344,2122,2406,199,286,204,330,2052,2208,255,2088,2515,349,2190,172,184,339,2260,340,2108,2129,2465,327,334,326,350,168,171,175,169,174,167,181,180,173,1108,2039,1021,1797,2047,1825,1682,1487,1318,1762,2094,1823,1489,2055,1239,1853,1855,2284,1857,1859,1887,1509,1316,1589,1979,1982,1971,1295,2212,1867,1792,1676,2056,1076,1298,1448,1251,1633,1248,1980,1827,1495,1102,1841,1366,1370,1372,1875,1878,1615,1330,1019,1028,2267,1030,1034,1036,1115,1535,1172,1205,1208,1332,1338,1805,2310,1943,1953,1160,1163,1166,1178,1184,2250,1196,1199,1322,1799,1941,1698,1334,1869,1817,1278,1314,1969,1048,1951,1374,1023,2036,2048,2051,2083,2087,2099,2223,1959,1949,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718,716,708,706,656,654,652,650,647,646,644,641,1008,904,903,514,479,478,476,674,601,798,1011,918,893,907,781,779,757,750,833,987,1004,630,353,881,880,878,890,544,896,714,495,741,585,415,577,500,498,657,772,782,751,540,473,493,458,483,439,398,490,634,616,830,892,966,576,555,480,469,430,442,162,161,160,156,152,140,133,131,124,118,611,615,583,713,712,710,648,642,842,631,489,485,477,386,844,740,923,792,791,640,863,861,996,908,872,998,955,764,761,727,788,468,770,879,783,163,153,148,129,122,119,548,546,545,543,447,445,454,471,801,117,494,680,496,748,739,811,780,758,426,484,123,658,819,539,481,517,437,2,22,795,537,462,636,486,832,950,799,1001,991,980,541,387,158,143,135,127,112,3,132,128,39,145,136,857,988])).
% 14.42/14.47 cnf(2546,plain,
% 14.42/14.47 (~P12(f4(f37(f28(x25461),f37(x25461,f39(x25462,f29(f43(x25463,a2)),f38(a48,a45,a3,a42),x25463),f38(a48,a45,a3,a42)),f38(a48,a45,a3,a42)),f37(f28(x25461),f29(f43(f38(a48,a45,a3,a42),a2)),f38(a48,a45,a3,a42)),f43(f38(a48,a45,a3,a42),a2)),f37(x25461,f39(x25462,f29(f43(x25463,a2)),f38(a48,a45,a3,a42),x25463),f38(a48,a45,a3,a42)),f43(f38(a48,a45,a3,a42),a2))),
% 14.42/14.47 inference(scs_inference,[],[189,1014,1015,2065,2071,2080,2330,2340,1017,2079,2107,2207,186,337,269,2089,2137,2247,2293,2387,2500,270,222,170,237,325,213,2331,2333,2425,2528,211,223,224,2323,2326,195,194,183,187,197,210,342,2096,2104,2375,2459,227,234,212,2084,2103,2222,2221,347,2121,2218,206,240,2216,314,219,2125,220,2380,348,343,344,2122,2406,199,286,204,330,2052,2208,255,2088,2515,349,2190,172,184,339,2260,340,2108,2129,2465,327,334,326,350,168,171,175,169,174,167,181,180,173,1108,2039,1021,1046,1797,2047,1825,1682,1487,1318,1762,2094,1823,1489,2055,1239,1853,1855,2284,1857,1859,1887,1509,1316,1589,1979,1982,1971,1295,2212,1867,1792,1676,2056,1076,1298,1448,1251,1633,1248,1980,1827,1495,1102,1841,1366,1370,1372,1875,1878,1615,1330,1019,1028,2267,1030,1034,1036,1115,1535,1172,1205,1208,1332,1338,1805,2310,1943,1953,1160,1163,1166,1178,1184,2250,1196,1199,1322,1799,1941,1698,1334,1869,1817,1278,1314,1969,1048,1951,1374,1023,2036,2048,2051,2083,2087,2099,2223,1959,1949,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718,716,708,706,656,654,652,650,647,646,644,641,1008,904,903,514,479,478,476,674,601,798,1011,918,893,907,781,779,757,750,833,987,1004,630,353,881,880,878,890,544,896,714,495,741,585,415,577,500,498,657,772,782,751,540,473,493,458,483,439,398,490,634,616,830,892,966,576,555,480,469,430,442,162,161,160,156,152,140,133,131,124,118,611,615,583,713,712,710,648,642,842,631,489,485,477,386,844,740,923,792,791,640,863,861,996,908,872,998,955,764,761,727,788,468,770,879,783,163,153,148,129,122,119,548,546,545,543,447,445,454,471,801,117,494,680,496,748,739,811,780,758,426,484,123,658,819,539,481,517,437,2,22,795,537,462,636,486,832,950,799,1001,991,980,541,387,158,143,135,127,112,3,132,128,39,145,136,857,988,954])).
% 14.42/14.47 cnf(2552,plain,
% 14.42/14.47 (~P10(f41(f41(f36(a1),x25521),f28(f28(x25522))),x25522,a1)),
% 14.42/14.47 inference(scs_inference,[],[189,1014,1015,2065,2071,2080,2330,2340,1017,2079,2107,2207,186,337,269,2089,2137,2247,2293,2387,2500,270,222,170,237,325,213,2331,2333,2425,2528,211,223,224,2323,2326,195,194,183,187,197,210,342,2096,2104,2375,2459,227,234,212,2084,2103,2222,2221,347,2121,2218,206,240,2216,314,219,2125,220,2380,348,343,344,2122,2406,199,286,204,330,2052,2208,255,2088,2515,349,2190,172,184,339,2260,340,2108,2129,2465,327,334,326,350,168,171,175,169,174,167,181,180,173,1108,2039,1021,1046,1797,2047,1825,1682,1487,1318,1762,2094,1823,1489,2055,1239,1853,1855,2284,1857,1859,1887,1509,1316,1589,1979,1982,1971,1295,2212,1867,1792,1676,2056,1076,1298,1448,1251,2462,1633,1248,1980,1827,1495,1102,1841,1366,1370,1372,1875,1878,1615,1330,1019,1028,2267,1030,1034,1036,1115,1535,1172,1205,1208,1332,1338,1805,2310,1943,1953,1160,1163,1166,1178,1184,2250,1196,1199,1322,1799,1941,1698,1334,1869,1817,1278,1314,1969,1048,1951,1374,1023,2036,2048,2051,2083,2087,2099,2223,1959,1949,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718,716,708,706,656,654,652,650,647,646,644,641,1008,904,903,514,479,478,476,674,601,798,1011,918,893,907,781,779,757,750,833,987,1004,630,353,881,880,878,890,544,896,714,495,741,585,415,577,500,498,657,772,782,751,540,473,493,458,483,439,398,490,634,616,830,892,966,576,555,480,469,430,442,162,161,160,156,152,140,133,131,124,118,611,615,583,713,712,710,648,642,842,631,489,485,477,386,844,740,923,792,791,640,863,861,996,908,872,998,955,764,761,727,788,468,770,879,783,163,153,148,129,122,119,548,546,545,543,447,445,454,471,801,117,494,680,496,748,739,811,780,758,426,484,123,658,819,539,481,517,437,2,22,795,537,462,636,486,832,950,799,1001,991,980,541,387,158,143,135,127,112,3,132,128,39,145,136,857,988,954,831,922,720])).
% 14.42/14.47 cnf(2554,plain,
% 14.42/14.47 (~E(f5(f37(f41(f25(f29(f43(f38(a48,a45,a3,a42),a2)),x25541,f38(a48,a45,a3,a42),x25542),x25543),f29(f43(f38(a48,a45,a3,a42),a2)),f38(a48,a45,a3,a42)),f38(a48,a45,a3,a42)),f26(a1))),
% 14.42/14.47 inference(scs_inference,[],[189,1014,1015,2065,2071,2080,2330,2340,1017,2079,2107,2207,186,337,269,2089,2137,2247,2293,2387,2500,270,222,170,237,325,213,2331,2333,2425,2528,211,223,224,2323,2326,195,194,183,187,197,210,342,2096,2104,2375,2459,227,234,212,2084,2103,2222,2221,347,2121,2218,206,240,2216,314,219,2125,220,2380,348,343,2542,344,2122,2406,199,286,204,330,2052,2208,255,2088,2515,349,2190,172,184,339,2260,340,2108,2129,2465,327,334,326,350,168,171,175,169,174,167,181,180,173,1108,2039,1021,1046,1797,2047,1825,1682,1487,1318,1762,2094,1823,1489,2055,1239,1853,1855,2284,1857,1859,1887,1509,1316,1589,1979,1982,1971,1295,2212,1867,1792,1676,2056,1076,1298,1448,1251,2462,1633,1248,1980,1827,1495,1102,1841,1366,1370,1372,1875,1878,1615,1330,1019,1028,2267,1030,1034,1036,1115,1535,1172,1205,1208,1332,1338,1805,2310,1943,1953,1160,1163,1166,1178,1184,2250,1196,1199,1322,1799,1941,1698,1334,1869,1817,1278,1314,1969,1048,1951,1374,1023,2036,2048,2051,2083,2087,2099,2223,1959,1949,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718,716,708,706,656,654,652,650,647,646,644,641,1008,904,903,514,479,478,476,674,601,798,1011,918,893,907,781,779,757,750,833,987,1004,630,353,881,880,878,890,544,896,714,495,741,585,415,577,500,498,657,772,782,751,540,473,493,458,483,439,398,490,634,616,830,892,966,576,555,480,469,430,442,162,161,160,156,152,140,133,131,124,118,611,615,583,713,712,710,648,642,842,631,489,485,477,386,844,740,923,792,791,640,863,861,996,908,872,998,955,764,761,727,788,468,770,879,783,163,153,148,129,122,119,548,546,545,543,447,445,454,471,801,117,494,680,496,748,739,811,780,758,426,484,123,658,819,539,481,517,437,2,22,795,537,462,636,486,832,950,799,1001,991,980,541,387,158,143,135,127,112,3,132,128,39,145,136,857,988,954,831,922,720,410])).
% 14.42/14.47 cnf(2558,plain,
% 14.42/14.47 (~P12(f28(f28(f28(f28(f38(a48,a45,a3,a42))))),f38(a48,a45,a3,a42),a1)),
% 14.42/14.47 inference(scs_inference,[],[189,1014,1015,2065,2071,2080,2330,2340,1017,2079,2107,2207,186,337,269,2089,2137,2247,2293,2387,2500,270,2294,222,170,237,325,213,2331,2333,2425,2528,211,223,224,2323,2326,195,194,183,187,197,210,342,2096,2104,2375,2459,227,234,212,2084,2103,2222,2221,347,2121,2218,206,240,2216,314,219,2125,220,2380,348,343,2542,344,2122,2406,199,286,204,330,2052,2208,255,2088,2515,349,2190,172,184,339,2260,340,2108,2129,2465,327,334,326,350,168,171,175,169,174,167,181,180,173,1108,2039,1021,1046,1797,2047,1825,1682,1487,1318,1762,2094,1823,1489,2055,1239,1853,1855,2284,1857,1859,1887,1509,1316,1589,1979,1982,1971,1295,2212,1867,1792,1676,2056,1076,1298,1448,1251,2462,1633,1248,1980,1827,1495,1102,1841,1366,1370,1372,1875,1878,1615,1330,1019,1028,2267,1030,1034,1036,1115,1535,1172,1205,1208,1332,1338,1805,2310,1943,1953,1160,1163,1166,1178,1184,2250,1196,1199,1322,1799,1941,1698,1334,1869,1817,1278,1314,1969,1048,1951,1374,1023,2036,2048,2051,2083,2087,2099,2223,1959,1949,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718,716,708,706,656,654,652,650,647,646,644,641,1008,904,903,514,479,478,476,674,601,798,1011,918,893,907,781,779,757,750,833,987,1004,630,353,881,880,878,890,544,896,714,495,741,585,415,577,500,498,657,772,782,751,540,473,493,458,483,439,398,490,634,616,830,892,966,576,555,480,469,430,442,162,161,160,156,152,140,133,131,124,118,611,615,583,713,712,710,648,642,842,631,489,485,477,386,844,740,923,792,791,640,863,861,996,908,872,998,955,764,761,727,788,468,770,879,783,163,153,148,129,122,119,548,546,545,543,447,445,454,471,801,117,494,680,496,748,739,811,780,758,426,484,123,658,819,539,481,517,437,2,22,795,537,462,636,486,832,950,799,1001,991,980,541,387,158,143,135,127,112,3,132,128,39,145,136,857,988,954,831,922,720,410,949,623])).
% 14.42/14.47 cnf(2564,plain,
% 14.42/14.47 (P12(f37(x25641,f39(x25642,f29(f43(x25643,a2)),f38(a48,a45,a3,a42),x25643),f38(a48,a45,a3,a42)),f37(f28(x25641),f37(x25641,f39(x25642,f29(f43(x25643,a2)),f38(a48,a45,a3,a42),x25643),f38(a48,a45,a3,a42)),f38(a48,a45,a3,a42)),f43(f38(a48,a45,a3,a42),a2))),
% 14.42/14.47 inference(scs_inference,[],[189,1014,1015,2065,2071,2080,2330,2340,1017,2079,2107,2207,186,337,269,2089,2137,2247,2293,2387,2500,270,2294,222,170,237,325,213,2331,2333,2425,2528,211,223,224,2323,2326,195,194,183,187,197,210,2519,342,2096,2104,2375,2459,227,234,212,2084,2103,2222,2221,347,2121,2218,206,240,2216,314,219,2125,220,2380,348,2343,343,2542,344,2122,2406,199,286,204,330,2052,2208,255,2088,2515,349,2190,172,184,339,2260,340,2108,2129,2465,327,334,326,350,168,171,175,169,174,167,181,180,173,1108,2039,1021,1046,1797,2047,1825,1682,1487,1318,1762,2094,1823,1489,2055,1239,1853,1855,2284,1857,1859,1887,1509,1316,1589,1979,1982,1971,1295,2212,1867,1792,1676,2056,1076,1298,1448,1251,2462,1633,1248,1980,1827,1495,1102,1841,1366,1370,1372,1875,1878,1615,1330,1019,1028,2267,1030,1034,1036,1115,1535,1172,2484,1205,1208,1332,1338,1805,2310,1943,1953,1160,1163,1166,1178,1184,2250,1196,1199,1322,1799,1941,1698,1334,1869,1817,1278,1314,1969,1048,1951,1374,1023,2036,2048,2051,2083,2087,2099,2223,1959,1949,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718,716,708,706,656,654,652,650,647,646,644,641,1008,904,903,514,479,478,476,674,601,798,1011,918,893,907,781,779,757,750,833,987,1004,630,353,881,880,878,890,544,896,714,495,741,585,415,577,500,498,657,772,782,751,540,473,493,458,483,439,398,490,634,616,830,892,966,576,555,480,469,430,442,162,161,160,156,152,140,133,131,124,118,611,615,583,713,712,710,648,642,842,631,489,485,477,386,844,740,923,792,791,640,863,861,996,908,872,998,955,764,761,727,788,468,770,879,783,163,153,148,129,122,119,548,546,545,543,447,445,454,471,801,117,494,680,496,748,739,811,780,758,426,484,123,658,819,539,481,517,437,2,22,795,537,462,636,486,832,950,799,1001,991,980,541,387,158,143,135,127,112,3,132,128,39,145,136,857,988,954,831,922,720,410,949,623,924,620,800])).
% 14.42/14.47 cnf(2566,plain,
% 14.42/14.47 (~P10(f41(f41(f36(a1),f28(f28(x25661))),x25662),x25661,a1)),
% 14.42/14.47 inference(scs_inference,[],[189,1014,1015,2065,2071,2080,2330,2340,1017,2079,2107,2207,186,337,269,2089,2137,2247,2293,2387,2500,270,2294,222,170,237,325,213,2331,2333,2425,2528,211,223,224,2323,2326,195,194,183,187,197,210,2519,342,2096,2104,2375,2459,227,234,212,2084,2103,2222,2221,347,2121,2218,206,240,2216,314,219,2125,220,2380,348,2343,343,2542,344,2122,2406,199,286,204,330,2052,2208,255,2088,2515,349,2190,172,184,339,2260,340,2108,2129,2465,327,334,326,350,168,171,175,169,174,167,181,180,173,1108,2039,1021,1046,1797,2047,1825,1682,1487,1318,1762,2094,1823,1489,2055,1239,1853,1855,2284,1857,1859,1887,1509,1316,1589,1979,1982,1971,1295,2212,1867,1792,1676,2056,1076,1298,1448,1251,2462,1633,1248,1980,1827,1495,1102,1841,1366,1370,1372,1875,1878,1615,1330,1019,1028,2267,1030,1034,1036,1115,1535,1172,2484,1205,1208,1332,1338,1805,2310,1943,1953,1160,1163,1166,1178,1184,2250,1196,1199,1322,1799,1941,1698,1334,1869,1817,1278,1314,1969,1048,1951,1374,1023,2036,2048,2051,2083,2087,2099,2223,1959,1949,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718,716,708,706,656,654,652,650,647,646,644,641,1008,904,903,514,479,478,476,674,601,798,1011,918,893,907,781,779,757,750,833,987,1004,630,353,881,880,878,890,544,896,714,495,741,585,415,577,500,498,657,772,782,751,540,473,493,458,483,439,398,490,634,616,830,892,966,576,555,480,469,430,442,162,161,160,156,152,140,133,131,124,118,611,615,583,713,712,710,648,642,842,631,489,485,477,386,844,740,923,792,791,640,863,861,996,908,872,998,955,764,761,727,788,468,770,879,783,163,153,148,129,122,119,548,546,545,543,447,445,454,471,801,117,494,680,496,748,739,811,780,758,426,484,123,658,819,539,481,517,437,2,22,795,537,462,636,486,832,950,799,1001,991,980,541,387,158,143,135,127,112,3,132,128,39,145,136,857,988,954,831,922,720,410,949,623,924,620,800,501])).
% 14.42/14.47 cnf(2574,plain,
% 14.42/14.47 (~P10(f37(f28(x25741),x25742,f38(a48,a45,a3,a42)),f39(x25743,f29(f43(x25744,a2)),f38(a48,a45,a3,a42),x25744),f43(f38(a48,a45,a3,a42),a2))),
% 14.42/14.47 inference(scs_inference,[],[189,1014,1015,2065,2071,2080,2330,2340,1017,2079,2107,2207,186,337,269,2089,2137,2247,2293,2387,2500,270,2294,222,170,237,325,213,2331,2333,2425,2528,211,223,224,2323,2326,195,194,183,187,197,210,2519,342,2096,2104,2375,2459,227,234,212,2084,2103,2222,2221,347,2121,2218,206,240,2216,314,219,2125,220,2380,348,2343,343,2542,344,2122,2406,199,286,204,330,2052,2208,255,2088,2515,349,2190,172,184,339,2260,340,2108,2129,2465,327,334,326,350,168,171,175,169,174,167,181,180,173,1108,2039,1021,1046,1797,2047,1825,1682,1487,1318,1762,2094,1823,1489,2055,1239,1853,1855,2284,1857,1859,1887,1509,1316,1589,1979,1982,1971,1295,2212,1867,1792,1676,2056,1076,1298,1448,1251,2462,1633,1248,1980,1827,1495,1102,1841,1366,1370,1372,1875,1878,1615,1330,1019,1028,2267,1030,1034,1036,1115,1535,1172,2484,1205,1208,1332,1338,1805,2310,1943,1953,1160,1163,1166,1178,1184,2250,1190,1196,1199,1322,1799,1941,1698,1334,1869,1817,1999,1278,1314,1969,1048,1951,1374,1023,2036,2048,2051,2083,2087,2099,2223,1959,1949,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718,716,708,706,656,654,652,650,647,646,644,641,1008,904,903,514,479,478,476,674,601,798,1011,918,893,907,781,779,757,750,833,987,1004,630,353,881,880,878,890,544,896,714,495,741,585,415,577,500,498,657,772,782,751,540,473,493,458,483,439,398,490,634,616,830,892,966,576,555,480,469,430,442,162,161,160,156,152,140,133,131,124,118,611,615,583,713,712,710,648,642,842,631,489,485,477,386,844,740,923,792,791,640,863,861,996,908,872,998,955,764,761,727,788,468,770,879,783,163,153,148,129,122,119,548,546,545,543,447,445,454,471,801,117,494,680,496,748,739,811,780,758,426,484,123,658,819,539,481,517,437,2,22,795,537,462,636,486,832,950,799,1001,991,980,541,387,158,143,135,127,112,3,132,128,39,145,136,857,988,954,831,922,720,410,949,623,924,620,800,501,509,827,702])).
% 14.42/14.47 cnf(2578,plain,
% 14.42/14.47 (~P10(f41(f41(f36(a1),f28(f28(f28(x25781)))),x25782),x25781,a1)),
% 14.42/14.47 inference(scs_inference,[],[189,1014,1015,2065,2071,2080,2330,2340,1017,2079,2107,2207,186,337,269,2089,2137,2247,2293,2387,2500,270,2294,222,170,237,325,213,2331,2333,2425,2528,211,223,224,2323,2326,195,194,183,187,197,210,2519,342,2096,2104,2375,2459,227,234,212,2084,2103,2222,2221,347,2121,2218,206,240,2216,314,219,2125,220,2380,348,2343,343,2542,344,2122,2406,199,286,204,330,2052,2208,255,2088,2515,349,2190,172,184,339,2260,340,2108,2129,2465,327,334,326,350,168,171,175,169,174,167,181,180,173,1108,2039,1021,1046,1797,2047,1825,1682,1487,1318,1762,2094,1823,1489,2055,1239,1853,1855,2284,1857,1859,1887,1509,1316,1589,1979,1982,1971,1295,2212,1867,1792,1676,2056,1076,1298,1448,1251,2462,1633,1248,1980,1827,1495,1102,1841,1366,1370,1372,1875,1878,1615,1330,1019,1028,2267,1030,1034,1036,2337,1115,1535,1172,2484,1205,1208,1332,1338,1805,2310,1943,1953,1160,1163,1166,1178,1184,2250,1190,1196,1199,1322,1799,1941,1698,1334,1869,1817,1999,1278,1314,1969,1048,1951,1374,1023,2036,2048,2051,2083,2087,2099,2223,1959,1949,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718,716,708,706,656,654,652,650,647,646,644,641,1008,904,903,514,479,478,476,674,601,798,1011,918,893,907,781,779,757,750,833,987,1004,630,353,881,880,878,890,544,896,714,495,741,585,415,577,500,498,657,772,782,751,540,473,493,458,483,439,398,490,634,616,830,892,966,576,555,480,469,430,442,162,161,160,156,152,140,133,131,124,118,611,615,583,713,712,710,648,642,842,631,489,485,477,386,844,740,923,792,791,640,863,861,996,908,872,998,955,764,761,727,788,468,770,879,783,163,153,148,129,122,119,548,546,545,543,447,445,454,471,801,117,494,680,496,748,739,811,780,758,426,484,123,658,819,539,481,517,437,2,22,795,537,462,636,486,832,950,799,1001,991,980,541,387,158,143,135,127,112,3,132,128,39,145,136,857,988,954,831,922,720,410,949,623,924,620,800,501,509,827,702,113,722])).
% 14.42/14.47 cnf(2590,plain,
% 14.42/14.47 (~P34(f41(f4(f29(f43(x25901,a2)),x25902,f43(x25903,a2)),x25904))),
% 14.42/14.47 inference(scs_inference,[],[189,1014,1015,2065,2071,2080,2330,2340,1017,2079,2107,2207,186,337,269,2089,2137,2247,2293,2387,2500,270,2294,222,170,237,325,213,2331,2333,2425,2528,211,223,224,2323,2326,195,194,183,187,197,210,2519,2518,342,2096,2104,2375,2459,227,234,212,2084,2103,2222,2221,347,2121,2218,206,240,2216,2514,314,219,2125,220,2380,348,2343,343,2542,344,2122,2406,199,286,204,330,2052,2208,255,2088,2515,349,2190,172,184,339,2260,340,2108,2129,2465,327,334,326,350,168,171,175,169,174,167,181,180,173,1108,2039,1021,1046,1797,2047,1825,1682,1487,1318,1762,2094,1823,1489,2055,1239,1853,1855,2284,1857,1859,1887,1509,1316,1589,1979,1982,1971,1295,2212,1867,1792,1676,2056,1076,1298,1448,1251,2462,1633,1248,1980,1827,1495,1102,1841,1366,1370,1372,1875,1878,1615,1330,1019,1028,2267,1030,1034,1036,2337,1115,1535,1172,2484,1205,1208,1332,1338,1805,2310,1943,1953,1160,1163,1166,1178,1184,2250,1190,1196,1199,1322,1799,1941,1698,1334,1869,1817,1999,1278,1314,1969,1048,1951,1374,1023,2036,2048,2051,2083,2087,2099,2223,1959,1949,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718,716,708,706,656,654,652,650,647,646,644,641,1008,904,903,514,479,478,476,674,601,798,1011,918,893,907,781,779,757,750,833,987,1004,630,353,881,880,878,890,544,896,714,495,741,585,415,577,500,498,657,772,782,751,540,473,493,458,483,439,398,490,634,616,830,892,966,576,555,480,469,430,442,162,161,160,156,152,140,133,131,124,118,611,615,583,713,712,710,648,642,842,631,489,485,477,386,844,740,923,792,791,640,863,861,996,908,872,998,955,764,761,727,788,468,770,879,783,163,153,148,129,122,119,548,546,545,543,447,445,454,471,801,117,494,680,496,748,739,811,780,758,426,484,123,658,819,539,481,517,437,2,22,795,537,462,636,486,832,950,799,1001,991,980,541,387,158,143,135,127,112,3,132,128,39,145,136,857,988,954,831,922,720,410,949,623,924,620,800,501,509,827,702,113,722,664,663,912,492,487,581])).
% 14.42/14.47 cnf(2596,plain,
% 14.42/14.47 (E(x25961,f41(f41(f32(a2),x25961),x25961))),
% 14.42/14.47 inference(scs_inference,[],[189,1014,1015,2065,2071,2080,2330,2340,1017,2079,2107,2207,186,337,269,2089,2137,2247,2293,2387,2500,270,2294,222,170,237,325,213,2331,2333,2425,2528,211,223,224,2323,2326,195,194,183,187,197,210,2519,2518,342,2096,2104,2375,2459,227,234,212,2084,2103,2222,2221,347,2121,2218,206,240,2216,2514,314,219,2125,220,2380,348,2343,343,2542,344,2122,2406,199,286,204,330,2052,2208,255,2088,2515,349,2190,172,184,339,2260,340,2108,2129,2465,327,334,326,350,168,171,175,169,174,167,181,180,173,1108,2039,1021,1046,1797,2047,1825,1682,1487,1318,1762,2094,1823,1489,2055,1239,1853,1855,2284,1857,1859,1887,1509,1316,1589,1979,1982,1971,1295,2212,1867,1792,1676,2056,1076,1298,1448,1251,2462,1633,1248,1980,1827,1495,1102,1841,1366,1370,1372,1875,1878,1615,1330,1019,1028,2267,1030,1034,1036,2337,1115,1535,1172,2484,1205,1208,1332,1338,1805,2310,1943,1953,2074,1160,1163,1166,1178,1184,2250,1190,1196,1199,1322,1799,1941,1698,1334,1869,1817,1999,1278,1314,1969,1048,1951,1374,1023,2036,2048,2051,2083,2087,2099,2223,1959,1949,692,964,994,538,931,671,984,627,626,625,624,622,621,754,874,687,957,793,120,738,938,825,875,392,535,533,527,525,690,694,591,159,399,425,569,619,973,379,718,716,708,706,656,654,652,650,647,646,644,641,1008,904,903,514,479,478,476,674,601,798,1011,918,893,907,781,779,757,750,833,987,1004,630,353,881,880,878,890,544,896,714,495,741,585,415,577,500,498,657,772,782,751,540,473,493,458,483,439,398,490,634,616,830,892,966,576,555,480,469,430,442,162,161,160,156,152,140,133,131,124,118,611,615,583,713,712,710,648,642,842,631,489,485,477,386,844,740,923,792,791,640,863,861,996,908,872,998,955,764,761,727,788,468,770,879,783,163,153,148,129,122,119,548,546,545,543,447,445,454,471,801,117,494,680,496,748,739,811,780,758,426,484,123,658,819,539,481,517,437,2,22,795,537,462,636,486,832,950,799,1001,991,980,541,387,158,143,135,127,112,3,132,128,39,145,136,857,988,954,831,922,720,410,949,623,924,620,800,501,509,827,702,113,722,664,663,912,492,487,581,456,13,507])).
% 14.42/14.47 cnf(2629,plain,
% 14.42/14.47 (E(x26291,f41(f41(f36(a1),x26291),x26291))),
% 14.42/14.47 inference(rename_variables,[],[2227])).
% 14.42/14.47 cnf(2631,plain,
% 14.42/14.47 (E(x26311,f41(f41(f36(a1),x26311),x26311))),
% 14.42/14.47 inference(rename_variables,[],[2227])).
% 14.42/14.47 cnf(2633,plain,
% 14.42/14.47 (E(x26331,f41(f41(f36(a1),x26331),x26331))),
% 14.42/14.47 inference(rename_variables,[],[2227])).
% 14.42/14.47 cnf(2635,plain,
% 14.42/14.47 (E(x26351,f41(f41(f36(a1),x26351),x26351))),
% 14.42/14.47 inference(rename_variables,[],[2227])).
% 14.42/14.47 cnf(2637,plain,
% 14.42/14.47 (E(x26371,f41(f41(f36(a1),x26371),x26371))),
% 14.42/14.47 inference(rename_variables,[],[2227])).
% 14.42/14.47 cnf(2639,plain,
% 14.42/14.47 (E(x26391,f41(f41(f36(a1),x26391),x26391))),
% 14.42/14.47 inference(rename_variables,[],[2227])).
% 14.42/14.47 cnf(2641,plain,
% 14.42/14.47 (E(x26411,f41(f41(f36(a1),x26411),x26411))),
% 14.42/14.47 inference(rename_variables,[],[2227])).
% 14.42/14.47 cnf(2643,plain,
% 14.42/14.47 (E(x26431,f41(f41(f36(a1),x26431),x26431))),
% 14.42/14.47 inference(rename_variables,[],[2227])).
% 14.42/14.47 cnf(2645,plain,
% 14.42/14.47 (E(x26451,f41(f41(f36(a1),x26451),x26451))),
% 14.42/14.47 inference(rename_variables,[],[2227])).
% 14.42/14.47 cnf(2647,plain,
% 14.42/14.47 (E(x26471,f41(f41(f36(a1),x26471),x26471))),
% 14.42/14.47 inference(rename_variables,[],[2227])).
% 14.42/14.47 cnf(2648,plain,
% 14.42/14.47 (P20(f41(f41(f36(a1),a1),a1))),
% 14.42/14.47 inference(scs_inference,[],[179,185,186,183,188,182,177,175,181,173,2227,2629,2631,2633,2635,2637,2639,2641,2643,2645,2647,2538,144,142,141,139,138,137,134,130,126,125])).
% 14.42/14.47 cnf(2649,plain,
% 14.42/14.47 (E(x26491,f41(f41(f36(a1),x26491),x26491))),
% 14.42/14.47 inference(rename_variables,[],[2227])).
% 14.42/14.47 cnf(2651,plain,
% 14.42/14.47 (E(x26511,f41(f41(f36(a1),x26511),x26511))),
% 14.42/14.47 inference(rename_variables,[],[2227])).
% 14.42/14.47 cnf(2653,plain,
% 14.42/14.47 (E(x26531,f41(f41(f36(a1),x26531),x26531))),
% 14.42/14.47 inference(rename_variables,[],[2227])).
% 14.42/14.47 cnf(2655,plain,
% 14.42/14.47 (E(x26551,f41(f41(f36(a1),x26551),x26551))),
% 14.42/14.47 inference(rename_variables,[],[2227])).
% 14.42/14.47 cnf(2657,plain,
% 14.42/14.47 (P16(x26571,f37(x26571,x26572,x26573),x26574)),
% 14.42/14.47 inference(rename_variables,[],[1046])).
% 14.42/14.47 cnf(2668,plain,
% 14.42/14.47 (P10(x26681,f41(f41(f36(f41(f41(f36(a1),a1),a1)),x26682),x26681),f41(f41(f36(a1),a1),a1))),
% 14.42/14.47 inference(scs_inference,[],[179,185,186,183,188,170,182,177,172,168,175,181,173,2544,2227,2629,2631,2633,2635,2637,2639,2641,2643,2645,2647,2649,2651,2653,2554,1046,1318,2538,144,142,141,139,138,137,134,130,126,125,121,116,109,920,613,532,531,530,529])).
% 14.42/14.47 cnf(2671,plain,
% 14.42/14.47 (P12(f4(f29(f43(x26711,a2)),f37(x26712,x26713,x26711),f43(x26711,a2)),f37(x26712,f37(x26714,f29(f43(x26711,a2)),x26711),x26711),f43(x26711,a2))),
% 14.42/14.47 inference(rename_variables,[],[2211])).
% 14.42/14.47 cnf(2672,plain,
% 14.42/14.47 (P10(f29(f43(x26721,a2)),x26722,f43(x26721,a2))),
% 14.42/14.47 inference(rename_variables,[],[220])).
% 14.42/14.47 cnf(2675,plain,
% 14.42/14.47 (P12(f4(f29(f43(x26751,a2)),f37(x26752,x26753,x26751),f43(x26751,a2)),f37(x26752,f37(x26754,f29(f43(x26751,a2)),x26751),x26751),f43(x26751,a2))),
% 14.42/14.47 inference(rename_variables,[],[2211])).
% 14.42/14.47 cnf(2676,plain,
% 14.42/14.47 (P9(x26761,a2)),
% 14.42/14.47 inference(rename_variables,[],[1023])).
% 14.42/14.47 cnf(2679,plain,
% 14.42/14.47 (P13(x26791,f37(x26792,f29(f43(x26793,a2)),x26793),x26793,x26794)),
% 14.42/14.47 inference(rename_variables,[],[2544])).
% 14.42/14.47 cnf(2680,plain,
% 14.42/14.47 (P9(f29(f43(x26801,a2)),x26801)),
% 14.42/14.47 inference(rename_variables,[],[206])).
% 14.42/14.47 cnf(2683,plain,
% 14.42/14.47 (P16(f41(x26831,x26832),f38(x26831,f34(f43(x26833,a2)),x26833,x26834),x26834)),
% 14.42/14.47 inference(rename_variables,[],[286])).
% 14.42/14.47 cnf(2684,plain,
% 14.42/14.47 (P9(x26841,a2)),
% 14.42/14.47 inference(rename_variables,[],[1023])).
% 14.42/14.47 cnf(2691,plain,
% 14.42/14.47 (P13(x26911,f37(x26912,f29(f43(x26913,a2)),x26913),x26913,x26914)),
% 14.42/14.47 inference(rename_variables,[],[2544])).
% 14.42/14.47 cnf(2692,plain,
% 14.42/14.47 (~E(f37(x26921,x26922,x26923),f29(f43(x26923,a2)))),
% 14.42/14.47 inference(rename_variables,[],[343])).
% 14.42/14.47 cnf(2693,plain,
% 14.42/14.47 (P16(x26931,f37(x26931,x26932,x26933),x26934)),
% 14.42/14.47 inference(rename_variables,[],[1046])).
% 14.42/14.47 cnf(2701,plain,
% 14.42/14.47 (~P10(f41(f36(a1),f28(f41(x27011,x27012))),x27011,f43(x27013,a1))),
% 14.42/14.47 inference(rename_variables,[],[2357])).
% 14.42/14.47 cnf(2702,plain,
% 14.42/14.47 (P10(f41(f41(f32(f43(x27021,a1)),x27022),x27023),x27022,f43(x27021,a1))),
% 14.42/14.47 inference(rename_variables,[],[2112])).
% 14.42/14.47 cnf(2704,plain,
% 14.42/14.47 (P10(f4(f41(f41(f32(f43(x27041,a2)),f37(f41(x27042,x27043),x27044,x27041)),f37(f41(x27042,x27043),x27044,x27041)),f37(f41(x27042,x27043),f29(f43(x27041,a2)),x27041),f43(x27041,a2)),x27044,f43(x27041,a2))),
% 14.42/14.47 inference(scs_inference,[],[179,185,291,186,247,271,183,188,197,220,343,170,182,286,1019,177,172,350,168,175,169,206,181,173,2544,2679,2691,1305,2227,2629,2631,2633,2635,2637,2639,2641,2643,2645,2647,2649,2651,2653,2211,2671,2112,2357,2554,2405,1324,1839,1298,1023,2676,1046,2657,1370,1318,2538,144,142,141,139,138,137,134,130,126,125,121,116,109,920,613,532,531,530,529,960,639,957,793,625,867,988,621,626,921])).
% 14.42/14.47 cnf(2706,plain,
% 14.42/14.47 (P10(f41(f41(f32(f43(x27061,a2)),x27062),x27063),x27063,f43(x27061,a2))),
% 14.42/14.47 inference(rename_variables,[],[271])).
% 14.42/14.47 cnf(2710,plain,
% 14.42/14.47 (P12(x27101,f41(f41(f31(a1),x27102),f28(x27101)),a1)),
% 14.42/14.47 inference(scs_inference,[],[179,185,291,186,247,271,183,188,197,227,220,343,170,201,182,286,1019,177,172,350,168,175,169,206,181,167,173,2544,2679,2691,1305,2227,2629,2631,2633,2635,2637,2639,2641,2643,2645,2647,2649,2651,2653,2211,2671,2112,2357,2554,2405,1324,1839,1298,1023,2676,1046,2657,1370,1318,2538,144,142,141,139,138,137,134,130,126,125,121,116,109,920,613,532,531,530,529,960,639,957,793,625,867,988,621,626,921,652,641])).
% 14.42/14.47 cnf(2712,plain,
% 14.42/14.47 (~P12(f41(f36(a1),f28(f41(x27121,x27122))),x27121,f43(x27123,a1))),
% 14.42/14.47 inference(scs_inference,[],[179,185,291,186,247,271,183,188,197,227,220,343,170,201,182,286,1019,177,172,350,168,175,169,206,181,167,173,2544,2679,2691,1305,2227,2629,2631,2633,2635,2637,2639,2641,2643,2645,2647,2649,2651,2653,2211,2671,2112,2357,2701,2554,2405,1324,1839,1298,1023,2676,1046,2657,1370,1318,2538,144,142,141,139,138,137,134,130,126,125,121,116,109,920,613,532,531,530,529,960,639,957,793,625,867,988,621,626,921,652,641,601])).
% 14.42/14.47 cnf(2720,plain,
% 14.42/14.47 (P10(f41(f19(f32(a2),a2),f38(x27201,f34(f43(x27202,a2)),x27202,a2)),f41(x27201,x27203),a2)),
% 14.42/14.47 inference(scs_inference,[],[179,185,291,186,247,271,183,188,197,227,220,343,170,201,182,286,2683,1019,177,172,350,168,175,169,206,181,174,167,173,2544,2679,2691,1305,2339,2227,2629,2631,2633,2635,2637,2639,2641,2643,2645,2647,2649,2651,2653,2211,2671,2112,2357,2701,2554,2405,1324,1839,1298,1023,2676,2684,1046,2657,1370,1318,2538,144,142,141,139,138,137,134,130,126,125,121,116,109,920,613,532,531,530,529,960,639,957,793,625,867,988,621,626,921,652,641,601,781,757,754,687])).
% 14.42/14.47 cnf(2721,plain,
% 14.42/14.47 (P16(f41(x27211,x27212),f38(x27211,f34(f43(x27213,a2)),x27213,x27214),x27214)),
% 14.42/14.47 inference(rename_variables,[],[286])).
% 14.42/14.47 cnf(2722,plain,
% 14.42/14.47 (P9(x27221,a2)),
% 14.42/14.47 inference(rename_variables,[],[1023])).
% 14.42/14.47 cnf(2727,plain,
% 14.42/14.47 (~E(f41(f41(f31(a1),f28(f28(x27271))),x27271),x27271)),
% 14.42/14.47 inference(rename_variables,[],[2183])).
% 14.42/14.47 cnf(2734,plain,
% 14.42/14.47 (~P12(x27341,x27341,f43(x27342,a2))),
% 14.42/14.47 inference(rename_variables,[],[342])).
% 14.42/14.47 cnf(2736,plain,
% 14.42/14.47 (~P12(f28(f4(f28(f26(a1)),f26(a1),a1)),f4(f28(f26(a1)),f28(f26(a1)),a1),a1)),
% 14.42/14.47 inference(scs_inference,[],[179,185,291,186,247,271,183,188,197,342,227,220,343,170,201,182,286,2683,1019,177,172,350,168,175,171,169,206,181,174,167,173,2544,2679,2691,1305,2339,2183,2227,2629,2631,2633,2635,2637,2639,2641,2643,2645,2647,2649,2651,2653,2211,2671,2675,2112,2357,2701,2554,1613,2405,1324,2148,1839,1298,1023,2676,2684,1046,2657,1370,1318,2538,144,142,141,139,138,137,134,130,126,125,121,116,109,920,613,532,531,530,529,960,639,957,793,625,867,988,621,626,921,652,641,601,781,757,754,687,714,514,478,738,623])).
% 14.42/14.47 cnf(2737,plain,
% 14.42/14.47 (P12(x27371,f28(x27371),a1)),
% 14.42/14.47 inference(rename_variables,[],[201])).
% 14.42/14.47 cnf(2740,plain,
% 14.42/14.47 (P10(f26(a1),x27401,a1)),
% 14.42/14.47 inference(rename_variables,[],[197])).
% 14.42/14.47 cnf(2741,plain,
% 14.42/14.47 (P10(x27411,x27411,a1)),
% 14.42/14.47 inference(rename_variables,[],[194])).
% 14.42/14.47 cnf(2743,plain,
% 14.42/14.47 (P16(x27431,f34(f43(x27432,a2)),x27433)),
% 14.42/14.47 inference(scs_inference,[],[179,185,291,186,247,222,271,183,188,197,342,227,220,343,170,201,182,286,2683,1019,194,177,172,350,168,175,171,169,206,181,174,167,173,2544,2679,2691,1305,2339,2183,2227,2629,2631,2633,2635,2637,2639,2641,2643,2645,2647,2649,2651,2653,2211,2671,2675,2112,2357,2701,2554,1613,2405,1324,2148,1839,1298,1023,2676,2684,1046,2657,1370,1318,2538,144,142,141,139,138,137,134,130,126,125,121,116,109,920,613,532,531,530,529,960,639,957,793,625,867,988,621,626,921,652,641,601,781,757,754,687,714,514,478,738,623,874,425])).
% 14.42/14.47 cnf(2745,plain,
% 14.42/14.47 (P12(f41(f41(f35(a1),x27451),x27452),f28(x27451),a1)),
% 14.42/14.47 inference(scs_inference,[],[179,185,291,186,247,222,271,183,188,197,342,227,220,343,170,201,2737,182,286,2683,1019,194,177,172,350,168,175,171,169,206,181,174,167,173,2544,2679,2691,1305,2339,2183,2227,2629,2631,2633,2635,2637,2639,2641,2643,2645,2647,2649,2651,2653,2211,2671,2675,2112,2357,2701,2554,1613,2405,1324,2148,1839,1298,1023,2676,2684,1046,2657,1370,1318,2538,144,142,141,139,138,137,134,130,126,125,121,116,109,920,613,532,531,530,529,960,639,957,793,625,867,988,621,626,921,652,641,601,781,757,754,687,714,514,478,738,623,874,425,656])).
% 14.42/14.47 cnf(2751,plain,
% 14.42/14.47 (~P16(f41(x27511,x27512),f37(f28(f41(x27511,x27512)),f29(f43(x27513,a2)),x27513),x27513)),
% 14.42/14.47 inference(rename_variables,[],[2235])).
% 14.42/14.47 cnf(2752,plain,
% 14.42/14.47 (~P16(x27521,f29(f43(x27522,a2)),x27522)),
% 14.42/14.47 inference(rename_variables,[],[347])).
% 14.42/14.47 cnf(2756,plain,
% 14.42/14.47 (P16(f41(x27561,x27562),f38(x27561,f34(f43(x27563,a2)),x27563,x27564),x27564)),
% 14.42/14.47 inference(rename_variables,[],[286])).
% 14.42/14.47 cnf(2757,plain,
% 14.42/14.47 (P9(x27571,a2)),
% 14.42/14.47 inference(rename_variables,[],[1023])).
% 14.42/14.47 cnf(2762,plain,
% 14.42/14.47 (P10(x27621,f41(f41(f31(f43(x27622,a2)),f41(f41(f31(f43(x27622,a2)),x27621),x27623)),x27624),f43(x27622,a2))),
% 14.42/14.47 inference(scs_inference,[],[179,185,291,186,247,222,271,183,188,197,342,227,347,220,343,344,270,170,201,2737,182,286,2683,2721,1019,194,177,172,350,168,175,171,169,206,181,174,167,173,2544,2679,2691,1305,2235,2339,2183,2227,2629,2631,2633,2635,2637,2639,2641,2643,2645,2647,2649,2651,2653,2211,2671,2675,2112,2357,2701,2554,1613,2405,2273,1324,2148,1839,1298,1023,2676,2684,2722,1046,2657,1370,1318,2538,144,142,141,139,138,137,134,130,126,125,121,116,109,920,613,532,531,530,529,960,639,957,793,625,867,988,621,626,921,652,641,601,781,757,754,687,714,514,478,738,623,874,425,656,654,690,1004,630,881])).
% 14.42/14.47 cnf(2763,plain,
% 14.42/14.47 (P10(x27631,f41(f41(f31(f43(x27632,a2)),x27631),x27633),f43(x27632,a2))),
% 14.42/14.47 inference(rename_variables,[],[270])).
% 14.42/14.47 cnf(2766,plain,
% 14.42/14.47 (P10(x27661,f41(f41(f31(f43(x27662,a2)),x27663),x27661),f43(x27662,a2))),
% 14.42/14.47 inference(rename_variables,[],[269])).
% 14.42/14.47 cnf(2768,plain,
% 14.42/14.47 (~P10(f41(f41(f31(f43(x27681,a1)),f41(f36(a1),f28(f41(x27682,x27683)))),x27684),x27682,f43(x27681,a1))),
% 14.42/14.47 inference(scs_inference,[],[179,185,291,186,269,247,222,271,183,188,197,342,227,347,220,343,344,270,170,201,2737,182,286,2683,2721,1019,194,177,172,350,168,175,171,169,206,181,174,167,173,2544,2679,2691,1305,2235,2339,2183,2227,2629,2631,2633,2635,2637,2639,2641,2643,2645,2647,2649,2651,2653,2211,2671,2675,2112,2357,2701,2554,1613,2405,2273,1324,2148,1839,1298,1023,2676,2684,2722,1046,2657,1370,1318,1372,2538,144,142,141,139,138,137,134,130,126,125,121,116,109,920,613,532,531,530,529,960,639,957,793,625,867,988,621,626,921,652,641,601,781,757,754,687,714,514,478,738,623,874,425,656,654,690,1004,630,881,880,718])).
% 14.42/14.47 cnf(2769,plain,
% 14.42/14.47 (~P10(f41(f36(a1),f28(f41(x27691,x27692))),x27691,f43(x27693,a1))),
% 14.42/14.47 inference(rename_variables,[],[2357])).
% 14.42/14.47 cnf(2771,plain,
% 14.42/14.47 (P12(f4(x27711,x27712,a1),f41(f41(f36(a1),f28(x27711)),x27713),a1)),
% 14.42/14.47 inference(scs_inference,[],[179,185,291,186,269,247,222,271,183,188,197,342,227,347,220,343,344,270,170,201,2737,182,286,2683,2721,1019,231,194,177,172,350,168,175,171,169,206,181,174,167,173,2544,2679,2691,1305,2235,2339,2183,2227,2629,2631,2633,2635,2637,2639,2641,2643,2645,2647,2649,2651,2653,2211,2671,2675,2112,2357,2701,2554,1613,2405,2273,1324,2148,1839,1298,1023,2676,2684,2722,1046,2657,1370,1318,1372,2538,144,142,141,139,138,137,134,130,126,125,121,116,109,920,613,532,531,530,529,960,639,957,793,625,867,988,621,626,921,652,641,601,781,757,754,687,714,514,478,738,623,874,425,656,654,690,1004,630,881,880,718,646])).
% 14.42/14.47 cnf(2776,plain,
% 14.42/14.47 (P10(f26(a1),x27761,a1)),
% 14.42/14.47 inference(rename_variables,[],[197])).
% 14.42/14.47 cnf(2782,plain,
% 14.42/14.47 (P16(x27821,f34(f43(x27822,a2)),x27822)),
% 14.42/14.47 inference(rename_variables,[],[212])).
% 14.42/14.47 cnf(2784,plain,
% 14.42/14.47 (~P10(f41(f41(f31(a1),f28(f28(f26(a1)))),f26(a1)),f26(a1),a1)),
% 14.42/14.47 inference(scs_inference,[],[179,185,291,186,269,247,222,271,183,188,197,2740,342,227,212,347,220,343,344,270,170,201,2737,182,286,2683,2721,1019,231,194,177,172,350,168,175,171,169,206,181,174,167,173,2544,2679,2691,1305,2235,2339,2183,2727,2227,2629,2631,2633,2635,2637,2639,2641,2643,2645,2647,2649,2651,2653,2211,2671,2675,2112,2357,2701,2554,1613,2405,2275,2273,1324,2148,1839,1298,1023,2676,2684,2722,1046,2657,1370,1318,1372,2538,144,142,141,139,138,137,134,130,126,125,121,116,109,920,613,532,531,530,529,960,639,957,793,625,867,988,621,626,921,652,641,601,781,757,754,687,714,514,478,738,623,874,425,656,654,690,1004,630,881,880,718,646,644,627,500,890,415])).
% 14.42/14.47 cnf(2785,plain,
% 14.42/14.47 (~E(f41(f41(f31(a1),f28(f28(x27851))),x27851),x27851)),
% 14.42/14.47 inference(rename_variables,[],[2183])).
% 14.42/14.47 cnf(2790,plain,
% 14.42/14.47 (~P12(f28(f28(f41(f41(f36(a1),x27901),x27902))),f28(x27901),a1)),
% 14.42/14.47 inference(rename_variables,[],[2070])).
% 14.42/14.47 cnf(2792,plain,
% 14.42/14.47 (~P9(f34(f43(a1,a2)),a1)),
% 14.42/14.47 inference(scs_inference,[],[179,185,291,186,269,247,222,271,183,188,197,2740,342,227,212,2782,347,220,343,344,270,170,201,2737,182,286,2683,2721,1019,231,194,177,340,172,350,168,175,171,169,206,181,174,167,173,2544,2679,2691,1305,2235,2339,2183,2727,2227,2629,2631,2633,2635,2637,2639,2641,2643,2645,2647,2649,2651,2653,2211,2671,2675,2112,2357,2701,2554,1613,2070,2405,2275,2273,1324,2148,1839,1298,1023,2676,2684,2722,1046,2657,1370,1318,1372,2538,144,142,141,139,138,137,134,130,126,125,121,116,109,920,613,532,531,530,529,960,639,957,793,625,867,988,621,626,921,652,641,601,781,757,754,687,714,514,478,738,623,874,425,656,654,690,1004,630,881,880,718,646,644,627,500,890,415,657,624,591])).
% 14.42/14.47 cnf(2793,plain,
% 14.42/14.47 (P16(x27931,f34(f43(x27932,a2)),x27932)),
% 14.42/14.47 inference(rename_variables,[],[212])).
% 14.42/14.47 cnf(2794,plain,
% 14.42/14.47 (~P10(f28(x27941),x27941,a1)),
% 14.42/14.47 inference(rename_variables,[],[340])).
% 14.42/14.47 cnf(2798,plain,
% 14.42/14.47 (P10(x27981,f28(f41(f41(f36(a1),x27982),x27981)),a1)),
% 14.42/14.47 inference(rename_variables,[],[2469])).
% 14.42/14.47 cnf(2800,plain,
% 14.42/14.47 (P12(f37(x28001,f39(x28002,f29(f43(x28003,a2)),f38(a48,a45,a3,a42),x28003),f38(a48,a45,a3,a42)),f34(f43(f38(a48,a45,a3,a42),a2)),f43(f38(a48,a45,a3,a42),a2))),
% 14.42/14.47 inference(scs_inference,[],[179,185,291,186,269,247,222,271,183,188,197,2740,2776,342,227,212,2782,347,219,220,343,344,270,170,201,2737,182,286,2683,2721,1019,231,194,177,340,172,184,350,168,175,171,169,206,181,174,167,173,2450,2544,2679,2691,1305,2235,2339,2183,2727,2227,2629,2631,2633,2635,2637,2639,2641,2643,2645,2647,2649,2651,2653,2211,2671,2675,2112,2357,2701,2554,1613,2070,2405,2275,2309,2469,2273,1324,2148,1839,1298,1023,2676,2684,2722,1046,2657,1370,1318,1372,2538,144,142,141,139,138,137,134,130,126,125,121,116,109,920,613,532,531,530,529,960,639,957,793,625,867,988,621,626,921,652,641,601,781,757,754,687,714,514,478,738,623,874,425,656,654,690,1004,630,881,880,718,646,644,627,500,890,415,657,624,591,875,694])).
% 14.42/14.47 cnf(2803,plain,
% 14.42/14.47 (P12(x28031,f28(x28031),a1)),
% 14.42/14.47 inference(rename_variables,[],[201])).
% 14.42/14.47 cnf(2808,plain,
% 14.42/14.47 (~P12(f28(f28(f41(f41(f36(a1),x28081),x28082))),f28(x28081),a1)),
% 14.42/14.47 inference(rename_variables,[],[2070])).
% 14.42/14.47 cnf(2812,plain,
% 14.42/14.47 (~E(f41(f41(f32(a1),f28(f28(x28121))),x28121),f28(f28(x28121)))),
% 14.42/14.47 inference(rename_variables,[],[2181])).
% 14.42/14.47 cnf(2813,plain,
% 14.42/14.47 (P10(f41(f41(f32(a1),x28131),x28132),x28131,a1)),
% 14.42/14.47 inference(rename_variables,[],[1178])).
% 14.42/14.47 cnf(2815,plain,
% 14.42/14.47 (P10(f28(f28(x28151)),f28(f28(f28(f41(f41(f36(a1),x28151),x28152)))),a1)),
% 14.42/14.47 inference(scs_inference,[],[179,185,291,186,269,247,222,271,183,188,197,2740,2776,342,227,212,2782,347,219,220,343,344,270,170,201,2737,182,286,2683,2721,1019,231,194,177,340,172,184,350,168,175,171,169,206,181,174,167,173,2450,2544,2679,2691,1305,2235,2339,2181,2183,2727,2227,2629,2631,2633,2635,2637,2639,2641,2643,2645,2647,2649,2651,2653,2211,2671,2675,2112,2357,2701,2554,1613,2070,2790,2435,2405,2275,2309,2469,2273,1324,2148,2082,1571,1839,1298,1023,2676,2684,2722,1046,2657,1370,1178,1318,1372,2538,144,142,141,139,138,137,134,130,126,125,121,116,109,920,613,532,531,530,529,960,639,957,793,625,867,988,621,626,921,652,641,601,781,757,754,687,714,514,478,738,623,874,425,656,654,690,1004,630,881,880,718,646,644,627,500,890,415,657,624,591,875,694,622,555,498,509,501])).
% 14.42/14.47 cnf(2821,plain,
% 14.42/14.47 (P10(f26(a1),x28211,a1)),
% 14.42/14.47 inference(rename_variables,[],[197])).
% 14.42/14.47 cnf(2831,plain,
% 14.42/14.47 (~P12(x28311,f41(f41(f32(f43(x28312,a1)),x28311),x28313),f43(x28312,a1))),
% 14.42/14.47 inference(scs_inference,[],[179,185,291,186,269,247,222,271,183,188,197,2740,2776,342,227,212,2782,347,219,220,343,344,270,170,201,2737,182,286,2683,2721,1019,231,194,177,340,172,184,350,168,175,171,169,206,181,174,167,173,2450,2544,2679,2691,1305,2235,2339,2181,2183,2727,2227,2629,2631,2633,2635,2637,2639,2641,2643,2645,2647,2649,2651,2653,2211,2671,2675,2112,2702,2357,2701,2554,1613,2070,2790,2435,2405,2275,2309,2469,2798,2266,2273,1324,2148,2082,1571,1537,1839,1298,1314,1023,2676,2684,2722,1046,2657,1370,1178,1318,1372,2538,144,142,141,139,138,137,134,130,126,125,121,116,109,920,613,532,531,530,529,960,639,957,793,625,867,988,621,626,921,652,641,601,781,757,754,687,714,514,478,738,623,874,425,656,654,690,1004,630,881,880,718,646,644,627,500,890,415,657,624,591,875,694,622,555,498,509,501,439,585,540,469,430,544])).
% 14.42/14.47 cnf(2835,plain,
% 14.42/14.47 (P12(f37(x28351,f39(x28352,f29(f43(x28353,a2)),f38(a48,a45,a3,a42),x28353),f38(a48,a45,a3,a42)),f37(f28(x28351),f37(x28351,f39(x28352,f29(f43(x28353,a2)),f38(a48,a45,a3,a42),x28353),f38(a48,a45,a3,a42)),f38(a48,a45,a3,a42)),f43(f38(a48,a45,a3,a42),a2))),
% 14.42/14.47 inference(rename_variables,[],[2564])).
% 14.42/14.47 cnf(2837,plain,
% 14.42/14.47 (~P30(f27(f27(a1,f43(x28371,a2)),f43(x28371,a2)))),
% 14.42/14.47 inference(scs_inference,[],[179,185,291,186,269,247,222,271,183,188,197,2740,2776,342,227,212,2782,347,219,220,343,344,270,170,201,2737,182,286,2683,2721,1019,231,194,177,340,172,184,350,168,175,171,169,206,181,174,167,173,2450,2564,2544,2679,2691,1305,2235,2339,2181,2183,2727,2227,2629,2631,2633,2635,2637,2639,2641,2643,2645,2647,2649,2651,2653,2211,2671,2675,2332,2112,2702,2357,2701,2554,1613,2070,2790,2435,2405,2275,2309,2469,2798,2266,2273,1324,2148,2082,1571,1537,1839,1298,1314,1023,2676,2684,2722,1046,2657,1370,1178,1318,1115,1372,2538,144,142,141,139,138,137,134,130,126,125,121,116,109,920,613,532,531,530,529,960,639,957,793,625,867,988,621,626,921,652,641,601,781,757,754,687,714,514,478,738,623,874,425,656,654,690,1004,630,881,880,718,646,644,627,500,890,415,657,624,591,875,694,622,555,498,509,501,439,585,540,469,430,544,676,399])).
% 14.42/14.47 cnf(2842,plain,
% 14.42/14.47 (~P5(f41(f41(f31(f43(x28421,a2)),a1),f29(f43(x28421,a2))))),
% 14.42/14.47 inference(scs_inference,[],[179,185,235,291,186,269,247,222,271,183,188,197,2740,2776,342,227,212,2782,347,219,220,343,344,270,170,201,2737,182,286,2683,2721,1019,231,194,177,340,172,184,350,168,175,171,169,206,181,174,167,173,2450,2564,2544,2679,2691,1305,2235,2339,2181,2183,2727,2227,2629,2631,2633,2635,2637,2639,2641,2643,2645,2647,2649,2651,2653,2211,2671,2675,2332,2112,2702,2170,2357,2701,2554,1613,2070,2790,2435,2405,2275,2309,2469,2798,2266,2273,1324,2148,2082,2283,1571,1537,1839,1298,1314,1023,2676,2684,2722,1046,2657,1370,1178,1318,1115,1372,2538,144,142,141,139,138,137,134,130,126,125,121,116,109,920,613,532,531,530,529,960,639,957,793,625,867,988,621,626,921,652,641,601,781,757,754,687,714,514,478,738,623,874,425,656,654,690,1004,630,881,880,718,646,644,627,500,890,415,657,624,591,875,694,622,555,498,509,501,439,585,540,469,430,544,676,399,569,136])).
% 14.42/14.47 cnf(2844,plain,
% 14.42/14.47 (~E(f37(x28441,x28442,x28443),f29(f43(x28443,a2)))),
% 14.42/14.47 inference(rename_variables,[],[343])).
% 14.42/14.47 cnf(2859,plain,
% 14.42/14.47 (~P12(x28591,x28591,f43(x28592,a2))),
% 14.42/14.47 inference(rename_variables,[],[342])).
% 14.42/14.47 cnf(2862,plain,
% 14.42/14.47 (~P10(f34(f43(f38(a48,a45,a3,a42),a2)),f37(x28621,f39(x28622,f29(f43(x28623,a2)),f38(a48,a45,a3,a42),x28623),f38(a48,a45,a3,a42)),f43(f38(a48,a45,a3,a42),a2))),
% 14.42/14.47 inference(rename_variables,[],[2450])).
% 14.42/14.47 cnf(2863,plain,
% 14.42/14.47 (P16(x28631,f34(f43(x28632,a2)),x28632)),
% 14.42/14.47 inference(rename_variables,[],[212])).
% 14.42/14.47 cnf(2868,plain,
% 14.42/14.47 (P10(x28681,f41(f41(f31(f43(x28682,a2)),x28683),x28681),f43(x28682,a2))),
% 14.42/14.47 inference(rename_variables,[],[269])).
% 14.42/14.47 cnf(2872,plain,
% 14.42/14.47 (P10(x28721,f41(f41(f36(f41(f41(f36(a1),a1),a1)),f41(f41(f36(f41(f41(f36(a1),a1),a1)),x28721),x28722)),x28723),f41(f41(f36(a1),a1),a1))),
% 14.42/14.47 inference(scs_inference,[],[192,179,185,323,324,235,291,186,269,2766,247,222,271,2706,183,188,197,2740,2776,342,2734,227,212,2782,2793,347,219,220,348,343,2692,344,270,170,201,2737,182,255,286,2683,2721,1019,231,194,177,340,2794,172,184,350,168,175,171,169,206,181,174,167,173,2450,2564,2544,2679,2691,1305,2235,2339,2181,2183,2727,2227,2629,2631,2633,2635,2637,2639,2641,2643,2645,2647,2649,2651,2653,2211,2671,2675,2332,2112,2702,2170,2357,2701,2554,1613,2070,2790,2435,2405,2275,2309,2469,2798,2266,2273,1324,2146,2148,2082,2283,1571,1537,1839,1298,1314,1023,2676,2684,2722,1046,2657,1370,1178,1318,1115,1372,2538,144,142,141,139,138,137,134,130,126,125,121,116,109,920,613,532,531,530,529,960,639,957,793,625,867,988,621,626,921,652,641,601,781,757,754,687,714,514,478,738,623,874,425,656,654,690,1004,630,881,880,718,646,644,627,500,890,415,657,624,591,875,694,622,555,498,509,501,439,585,540,469,430,544,676,399,569,136,583,710,650,912,631,489,740,949,879,783,896,722])).
% 14.42/14.47 cnf(2874,plain,
% 14.42/14.47 (P10(x28741,f41(f41(f36(f41(f41(f36(a1),a1),a1)),f41(f41(f36(f41(f41(f36(a1),a1),a1)),x28742),x28741)),x28743),f41(f41(f36(a1),a1),a1))),
% 14.42/14.47 inference(scs_inference,[],[192,179,185,323,324,235,291,186,269,2766,247,222,271,2706,183,188,197,2740,2776,342,2734,227,212,2782,2793,347,219,220,348,343,2692,344,270,170,201,2737,182,255,286,2683,2721,1019,231,194,177,340,2794,172,184,350,168,175,171,169,206,181,174,167,173,2450,2564,2544,2679,2691,1305,2235,2339,2181,2183,2727,2227,2629,2631,2633,2635,2637,2639,2641,2643,2645,2647,2649,2651,2653,2211,2671,2675,2332,2112,2702,2170,2357,2701,2554,1613,2070,2790,2435,2405,2275,2309,2469,2798,2266,2273,1324,2146,2148,2082,2283,1571,1537,1839,1298,1314,1023,2676,2684,2722,1046,2657,1370,1178,1318,1115,1372,2538,144,142,141,139,138,137,134,130,126,125,121,116,109,920,613,532,531,530,529,960,639,957,793,625,867,988,621,626,921,652,641,601,781,757,754,687,714,514,478,738,623,874,425,656,654,690,1004,630,881,880,718,646,644,627,500,890,415,657,624,591,875,694,622,555,498,509,501,439,585,540,469,430,544,676,399,569,136,583,710,650,912,631,489,740,949,879,783,896,722,720])).
% 14.42/14.47 cnf(2882,plain,
% 14.42/14.47 (~P10(f41(f41(f31(f43(f38(a48,a45,a3,a42),a2)),x28821),f34(f43(f38(a48,a45,a3,a42),a2))),f37(x28822,f39(x28823,f29(f43(x28824,a2)),f38(a48,a45,a3,a42),x28824),f38(a48,a45,a3,a42)),f43(f38(a48,a45,a3,a42),a2))),
% 14.42/14.47 inference(scs_inference,[],[192,179,185,323,324,235,291,186,269,2766,2868,247,222,271,2706,183,188,197,2740,2776,342,2734,227,212,2782,2793,347,219,220,348,343,2692,344,270,170,201,2737,182,255,286,2683,2721,1019,231,194,177,340,2794,172,184,350,168,175,171,169,206,181,174,167,173,2450,2862,2564,2544,2679,2691,1305,2235,2339,2181,2183,2727,2227,2629,2631,2633,2635,2637,2639,2641,2643,2645,2647,2649,2651,2653,2211,2671,2675,2332,2112,2702,2170,2357,2701,2554,1613,2070,2790,2435,2405,2275,2309,2469,2798,2266,2273,1324,2146,2148,2082,2283,1571,1537,1839,1298,1314,1023,2676,2684,2722,1046,2657,1370,1178,1318,1115,1372,2538,144,142,141,139,138,137,134,130,126,125,121,116,109,920,613,532,531,530,529,960,639,957,793,625,867,988,621,626,921,652,641,601,781,757,754,687,714,514,478,738,623,874,425,656,654,690,1004,630,881,880,718,646,644,627,500,890,415,657,624,591,875,694,622,555,498,509,501,439,585,540,469,430,544,676,399,569,136,583,710,650,912,631,489,740,949,879,783,896,722,720,648,647,485,741])).
% 14.42/14.47 cnf(2883,plain,
% 14.42/14.47 (P10(x28831,f41(f41(f31(f43(x28832,a2)),x28833),x28831),f43(x28832,a2))),
% 14.42/14.47 inference(rename_variables,[],[269])).
% 14.42/14.47 cnf(2887,plain,
% 14.42/14.47 (~E(f4(f28(f26(a1)),f26(a1),a1),f4(f26(a1),f26(a1),a1))),
% 14.42/14.47 inference(scs_inference,[],[192,179,185,323,324,235,291,186,269,2766,2868,247,222,271,2706,183,188,197,2740,2776,2821,342,2734,227,212,2782,2793,347,219,220,348,343,2692,344,270,170,201,2737,182,330,255,349,286,2683,2721,1019,231,194,2741,177,340,2794,172,184,350,168,175,171,169,206,181,174,167,173,2450,2862,2564,2544,2679,2691,1305,2235,2339,2181,2183,2727,2227,2629,2631,2633,2635,2637,2639,2641,2643,2645,2647,2649,2651,2653,2211,2671,2675,2332,2142,2112,2702,2170,2357,2701,2554,1613,2070,2790,2435,2405,2275,2309,2469,2798,2266,2273,1324,2146,2148,2082,2283,1571,1537,1839,1298,1314,1023,2676,2684,2722,1046,2657,1370,1178,1318,1115,1372,2538,144,142,141,139,138,137,134,130,126,125,121,116,109,920,613,532,531,530,529,960,639,957,793,625,867,988,621,626,921,652,641,601,781,757,754,687,714,514,478,738,623,874,425,656,654,690,1004,630,881,880,718,646,644,627,500,890,415,657,624,591,875,694,622,555,498,509,501,439,585,540,469,430,544,676,399,569,136,583,710,650,912,631,489,740,949,879,783,896,722,720,648,647,485,741,798,750])).
% 14.42/14.47 cnf(2889,plain,
% 14.42/14.47 (P10(f26(a1),x28891,a1)),
% 14.42/14.47 inference(rename_variables,[],[197])).
% 14.42/14.47 cnf(2890,plain,
% 14.42/14.47 (P10(x28901,x28901,a1)),
% 14.42/14.47 inference(rename_variables,[],[194])).
% 14.42/14.47 cnf(2895,plain,
% 14.42/14.47 (~E(f41(f41(f36(a1),f28(f28(x28951))),x28951),x28951)),
% 14.42/14.47 inference(rename_variables,[],[2179])).
% 14.42/14.47 cnf(2906,plain,
% 14.42/14.47 (P12(x29061,f28(x29061),a1)),
% 14.42/14.47 inference(rename_variables,[],[201])).
% 14.42/14.47 cnf(2914,plain,
% 14.42/14.47 (~P10(f41(f41(f31(f43(x29141,a1)),x29142),f41(f36(a1),f28(f41(x29143,x29144)))),x29143,f43(x29141,a1))),
% 14.42/14.47 inference(scs_inference,[],[192,179,185,323,324,235,291,186,269,2766,2868,2883,247,222,271,2706,272,183,188,197,2740,2776,2821,342,2734,2859,227,212,2782,2793,2863,347,2752,219,220,348,343,2692,2844,344,270,170,201,2737,2803,182,330,255,349,286,2683,2721,2756,1019,231,194,2741,177,340,2794,172,184,350,168,175,171,169,206,181,174,167,173,2450,2862,2564,2544,2679,2691,1305,2235,2339,2179,2181,2183,2727,2227,2629,2631,2633,2635,2637,2639,2641,2643,2645,2647,2649,2651,2653,2211,2671,2675,2332,2142,2112,2702,2170,2558,2357,2701,2769,2554,1613,2336,2411,2070,2790,2435,2405,2275,2309,2469,2798,2266,2273,1324,2146,2148,2082,2283,1571,1537,1839,1837,1239,1298,1314,1023,2676,2684,2722,1046,2657,1370,1178,1318,1115,1372,2538,144,142,141,139,138,137,134,130,126,125,121,116,109,920,613,532,531,530,529,960,639,957,793,625,867,988,621,626,921,652,641,601,781,757,754,687,714,514,478,738,623,874,425,656,654,690,1004,630,881,880,718,646,644,627,500,890,415,657,624,591,875,694,622,555,498,509,501,439,585,540,469,430,544,676,399,569,136,583,710,650,912,631,489,740,949,879,783,896,722,720,648,647,485,741,798,750,800,619,494,708,706,792,620,924,353,878,716])).
% 14.42/14.47 cnf(2917,plain,
% 14.42/14.47 (~P16(x29171,f27(f34(f43(x29172,a2)),f43(x29172,a2)),x29172)),
% 14.42/14.47 inference(scs_inference,[],[192,179,185,323,324,243,235,291,186,269,2766,2868,2883,247,222,271,2706,272,183,188,197,2740,2776,2821,342,2734,2859,227,212,2782,2793,2863,347,2752,219,220,348,343,2692,2844,344,270,170,201,2737,2803,182,330,255,349,286,2683,2721,2756,1019,231,194,2741,177,340,2794,172,184,350,168,175,171,169,206,181,174,167,173,2450,2862,2564,2544,2679,2691,1305,2235,2339,2179,2181,2183,2727,2227,2629,2631,2633,2635,2637,2639,2641,2643,2645,2647,2649,2651,2653,2211,2671,2675,2332,2142,2112,2702,2170,2558,2357,2701,2769,2554,1613,2336,2411,2070,2790,2435,2405,2275,2309,2469,2798,2266,2273,1324,2146,2148,2082,2283,1571,1537,1839,1837,1239,1298,1314,1023,2676,2684,2722,1046,2657,1370,1178,1318,1115,1372,2538,144,142,141,139,138,137,134,130,126,125,121,116,109,920,613,532,531,530,529,960,639,957,793,625,867,988,621,626,921,652,641,601,781,757,754,687,714,514,478,738,623,874,425,656,654,690,1004,630,881,880,718,646,644,627,500,890,415,657,624,591,875,694,622,555,498,509,501,439,585,540,469,430,544,676,399,569,136,583,710,650,912,631,489,740,949,879,783,896,722,720,648,647,485,741,798,750,800,619,494,708,706,792,620,924,353,878,716,819])).
% 14.42/14.47 cnf(2919,plain,
% 14.42/14.47 (~P12(f28(x29191),f41(f41(f36(a1),f26(a1)),f28(x29191)),a1)),
% 14.42/14.47 inference(scs_inference,[],[192,179,185,323,324,243,235,291,186,269,2766,2868,2883,247,222,271,2706,272,336,183,188,197,2740,2776,2821,342,2734,2859,227,212,2782,2793,2863,347,2752,219,220,348,343,2692,2844,344,270,170,201,2737,2803,182,330,255,349,286,2683,2721,2756,1019,231,194,2741,177,340,2794,172,184,350,168,175,171,169,206,181,174,167,173,2450,2862,2564,2544,2679,2691,1305,2235,2339,2179,2181,2183,2727,2227,2629,2631,2633,2635,2637,2639,2641,2643,2645,2647,2649,2651,2653,2211,2671,2675,2332,2142,2112,2702,2170,2558,2357,2701,2769,2554,1613,2336,2411,2070,2790,2435,2405,2275,2309,2469,2798,2266,2273,1324,2146,2148,2082,2166,2283,1571,1537,1839,1837,1239,1298,1314,1023,2676,2684,2722,1046,2657,1370,1178,1318,1115,1372,2538,144,142,141,139,138,137,134,130,126,125,121,116,109,920,613,532,531,530,529,960,639,957,793,625,867,988,621,626,921,652,641,601,781,757,754,687,714,514,478,738,623,874,425,656,654,690,1004,630,881,880,718,646,644,627,500,890,415,657,624,591,875,694,622,555,498,509,501,439,585,540,469,430,544,676,399,569,136,583,710,650,912,631,489,740,949,879,783,896,722,720,648,647,485,741,798,750,800,619,494,708,706,792,620,924,353,878,716,819,758])).
% 14.42/14.47 cnf(2921,plain,
% 14.42/14.47 (~P12(x29211,x29211,a1)),
% 14.42/14.47 inference(rename_variables,[],[336])).
% 14.42/14.47 cnf(2923,plain,
% 14.42/14.47 (P10(x29231,f41(f41(f35(a1),x29231),f28(x29231)),a1)),
% 14.42/14.47 inference(scs_inference,[],[192,179,185,323,324,243,235,291,186,269,2766,2868,2883,247,222,271,2706,272,336,183,188,197,2740,2776,2821,342,2734,2859,227,212,2782,2793,2863,347,2752,219,220,348,343,2692,2844,344,270,170,201,2737,2803,182,330,255,349,286,2683,2721,2756,1019,231,194,2741,2890,177,340,2794,172,184,350,168,175,171,169,206,181,174,167,173,2450,2862,2564,2544,2679,2691,1305,2235,2339,2179,2181,2183,2727,2227,2629,2631,2633,2635,2637,2639,2641,2643,2645,2647,2649,2651,2653,2211,2671,2675,2332,2142,2112,2702,2170,2558,2357,2701,2769,2554,1613,2336,2411,2070,2790,2435,2405,2275,2309,2469,2798,2266,2273,1324,2146,2148,2150,2082,2166,2283,1571,1537,1839,1837,1239,1298,1314,1023,2676,2684,2722,1046,2657,1370,1178,1318,1115,1372,2538,144,142,141,139,138,137,134,130,126,125,121,116,109,920,613,532,531,530,529,960,639,957,793,625,867,988,621,626,921,652,641,601,781,757,754,687,714,514,478,738,623,874,425,656,654,690,1004,630,881,880,718,646,644,627,500,890,415,657,624,591,875,694,622,555,498,509,501,439,585,540,469,430,544,676,399,569,136,583,710,650,912,631,489,740,949,879,783,896,722,720,648,647,485,741,798,750,800,619,494,708,706,792,620,924,353,878,716,819,758,782])).
% 14.42/14.47 cnf(2925,plain,
% 14.42/14.47 (P10(x29251,x29251,a1)),
% 14.42/14.47 inference(rename_variables,[],[194])).
% 14.42/14.47 cnf(2933,plain,
% 14.42/14.47 (~E(f41(f41(f31(a1),f28(f28(x29331))),x29331),x29331)),
% 14.42/14.47 inference(rename_variables,[],[2183])).
% 14.42/14.47 cnf(2936,plain,
% 14.42/14.47 (P12(x29361,f41(f41(f31(a1),f28(f28(x29361))),x29361),a1)),
% 14.42/14.47 inference(scs_inference,[],[192,179,185,323,324,243,235,291,186,269,2766,2868,2883,247,222,271,2706,272,336,2921,183,188,197,2740,2776,2821,342,2734,2859,227,212,2782,2793,2863,347,2752,219,220,2672,348,343,2692,2844,344,270,170,201,2737,2803,182,330,255,349,286,2683,2721,2756,1019,231,194,2741,2890,177,340,2794,172,184,350,168,175,171,169,206,181,174,167,173,2450,2862,2564,2544,2679,2691,1305,2235,2339,2179,2181,2183,2727,2785,2933,2227,2629,2631,2633,2635,2637,2639,2641,2643,2645,2647,2649,2651,2653,2211,2671,2675,2332,2142,2112,2702,2170,2558,2357,2701,2769,2554,1613,2336,2411,2070,2790,2435,2405,2275,2309,2469,2798,2266,2273,2312,1324,2146,2148,2150,2082,2166,2283,1571,1223,1537,1839,1837,1239,1298,1314,1023,2676,2684,2722,1046,2657,1370,1178,1318,1115,1372,2538,144,142,141,139,138,137,134,130,126,125,121,116,109,920,613,532,531,530,529,960,639,957,793,625,867,988,621,626,921,652,641,601,781,757,754,687,714,514,478,738,623,874,425,656,654,690,1004,630,881,880,718,646,644,627,500,890,415,657,624,591,875,694,622,555,498,509,501,439,585,540,469,430,544,676,399,569,136,583,710,650,912,631,489,740,949,879,783,896,722,720,648,647,485,741,798,750,800,619,494,708,706,792,620,924,353,878,716,819,758,782,751,577,636,454])).
% 14.42/14.47 cnf(2947,plain,
% 14.42/14.47 (P12(f41(f41(f36(a1),f28(f28(f34(a2)))),f34(a2)),f34(a2),a2)),
% 14.42/14.47 inference(scs_inference,[],[192,179,185,323,324,243,235,291,186,269,2766,2868,2883,247,222,271,2706,272,336,2921,183,188,197,2740,2776,2821,342,2734,2859,227,212,2782,2793,2863,347,2752,219,220,2672,348,343,2692,2844,344,270,170,201,2737,2803,182,330,255,349,286,2683,2721,2756,1019,231,194,2741,2890,177,340,2794,172,184,350,168,175,171,169,206,181,174,167,173,2450,2862,2564,2544,2679,2691,1305,2235,2339,2179,2895,2181,2183,2727,2785,2933,2227,2629,2631,2633,2635,2637,2639,2641,2643,2645,2647,2649,2651,2653,2211,2671,2675,2332,2142,2112,2702,2170,2558,2357,2701,2769,2554,1613,2336,2411,2471,2070,2790,2435,2405,2275,2309,2469,2798,2266,2273,2312,1324,2146,2148,2150,2082,2132,2166,2283,1571,1223,1537,1839,1837,1239,1298,1314,1023,2676,2684,2722,1046,2657,1370,1178,1318,1115,1372,2538,144,142,141,139,138,137,134,130,126,125,121,116,109,920,613,532,531,530,529,960,639,957,793,625,867,988,621,626,921,652,641,601,781,757,754,687,714,514,478,738,623,874,425,656,654,690,1004,630,881,880,718,646,644,627,500,890,415,657,624,591,875,694,622,555,498,509,501,439,585,540,469,430,544,676,399,569,136,583,710,650,912,631,489,740,949,879,783,896,722,720,648,647,485,741,798,750,800,619,494,708,706,792,620,924,353,878,716,819,758,782,751,577,636,454,991,458,426,483,507])).
% 14.42/14.47 cnf(2951,plain,
% 14.42/14.47 (P10(f28(f41(f41(f32(a1),f26(a1)),x29511)),f28(x29512),a1)),
% 14.42/14.47 inference(scs_inference,[],[192,179,185,323,324,243,235,291,186,269,2766,2868,2883,247,222,271,2706,272,336,2921,183,188,197,2740,2776,2821,342,2734,2859,227,212,2782,2793,2863,347,2752,219,220,2672,348,343,2692,2844,344,270,170,201,2737,2803,182,330,255,349,286,2683,2721,2756,1019,231,194,2741,2890,177,340,2794,172,184,350,168,175,171,169,206,181,174,167,173,2450,2862,2564,2544,2679,2691,1305,2235,2339,2179,2895,2181,2183,2727,2785,2933,2227,2629,2631,2633,2635,2637,2639,2641,2643,2645,2647,2649,2651,2653,2211,2671,2675,2332,2142,2112,2702,2170,2558,2357,2701,2769,2554,1613,2336,2411,2475,2471,2070,2790,2435,2405,2275,2309,2469,2798,2266,2273,2312,1324,2146,2148,2150,2082,2132,2166,2283,1571,1223,1537,1839,1837,1239,1298,1314,1023,2676,2684,2722,1046,2657,1370,1178,1318,1115,1372,2538,144,142,141,139,138,137,134,130,126,125,121,116,109,920,613,532,531,530,529,960,639,957,793,625,867,988,621,626,921,652,641,601,781,757,754,687,714,514,478,738,623,874,425,656,654,690,1004,630,881,880,718,646,644,627,500,890,415,657,624,591,875,694,622,555,498,509,501,439,585,540,469,430,544,676,399,569,136,583,710,650,912,631,489,740,949,879,783,896,722,720,648,647,485,741,798,750,800,619,494,708,706,792,620,924,353,878,716,819,758,782,751,577,636,454,991,458,426,483,507,473])).
% 14.42/14.47 cnf(2984,plain,
% 14.42/14.47 (P14(x29841,x29842,f29(f43(x29843,a2)),x29842,x29843,x29844)),
% 14.42/14.47 inference(rename_variables,[],[326])).
% 14.42/14.47 cnf(2985,plain,
% 14.42/14.47 (P14(x29851,x29852,f41(f41(f36(a1),f29(f43(x29853,a2))),f29(f43(x29853,a2))),x29852,x29853,x29854)),
% 14.42/14.47 inference(scs_inference,[],[192,179,185,323,324,261,243,235,291,186,269,2766,2868,2883,247,222,271,2706,272,336,2921,183,188,197,2740,2776,2821,342,2734,2859,227,234,212,2782,2793,2863,347,2752,219,220,2672,348,343,2692,2844,344,270,170,201,2737,2803,2906,182,330,255,349,286,2683,2721,2756,1019,231,194,2741,2890,177,340,2794,326,2984,172,184,350,168,175,171,169,206,181,174,167,173,2334,2450,2862,2564,2544,2679,2691,1305,2235,2339,2179,2895,2181,2183,2727,2785,2933,2227,2629,2631,2633,2635,2637,2639,2641,2643,2645,2647,2649,2651,2653,2655,2365,2211,2671,2675,2332,2142,2112,2702,2170,2558,2357,2701,2769,2554,1613,2336,2411,2475,2471,2070,2790,2435,2405,2275,2309,2469,2798,2266,2273,2312,1324,2146,2148,2150,2082,2132,2166,2283,1571,1223,1537,1839,1837,1239,1298,1184,1314,1023,2676,2684,2722,1046,2657,1370,1178,1318,1115,1372,2538,144,142,141,139,138,137,134,130,126,125,121,116,109,920,613,532,531,530,529,960,639,957,793,625,867,988,621,626,921,652,641,601,781,757,754,687,714,514,478,738,623,874,425,656,654,690,1004,630,881,880,718,646,644,627,500,890,415,657,624,591,875,694,622,555,498,509,501,439,585,540,469,430,544,676,399,569,136,583,710,650,912,631,489,740,949,879,783,896,722,720,648,647,485,741,798,750,800,619,494,708,706,792,620,924,353,878,716,819,758,782,751,577,636,454,991,458,426,483,507,473,517,541,545,462,387,480,702,118,713,712,642,923,764,761,162,161])).
% 14.42/14.47 cnf(2987,plain,
% 14.42/14.47 (P14(x29871,x29872,f29(f43(x29873,a2)),x29872,x29873,x29874)),
% 14.42/14.47 inference(rename_variables,[],[326])).
% 14.42/14.47 cnf(2988,plain,
% 14.42/14.47 (P11(f37(x29881,f37(x29882,x29883,x29884),x29884),f37(x29882,f37(x29881,x29883,x29884),x29884),x29885)),
% 14.42/14.47 inference(scs_inference,[],[192,179,185,323,324,261,217,243,235,291,186,269,2766,2868,2883,247,222,271,2706,272,336,2921,195,183,188,197,2740,2776,2821,342,2734,2859,227,234,212,2782,2793,2863,347,2752,219,220,2672,348,343,2692,2844,344,270,170,201,2737,2803,2906,182,330,255,349,286,2683,2721,2756,1019,231,194,2741,2890,177,340,2794,326,2984,172,184,350,168,175,171,169,206,181,174,167,173,2334,2450,2862,2564,2544,2679,2691,1305,2235,2339,2179,2895,2181,2183,2727,2785,2933,2227,2629,2631,2633,2635,2637,2639,2641,2643,2645,2647,2649,2651,2653,2655,2365,2211,2671,2675,2332,2142,2112,2702,2170,2558,2357,2701,2769,2554,1613,2336,2411,2475,2471,2070,2790,2435,2405,2275,2309,2469,2798,2266,2273,2312,1324,2146,2148,2150,2082,2132,2166,2283,1571,1223,1537,1839,1837,1239,1298,1184,1314,1023,2676,2684,2722,1046,2657,1370,1178,1318,1115,1372,2538,144,142,141,139,138,137,134,130,126,125,121,116,109,920,613,532,531,530,529,960,639,957,793,625,867,988,621,626,921,652,641,601,781,757,754,687,714,514,478,738,623,874,425,656,654,690,1004,630,881,880,718,646,644,627,500,890,415,657,624,591,875,694,622,555,498,509,501,439,585,540,469,430,544,676,399,569,136,583,710,650,912,631,489,740,949,879,783,896,722,720,648,647,485,741,798,750,800,619,494,708,706,792,620,924,353,878,716,819,758,782,751,577,636,454,991,458,426,483,507,473,517,541,545,462,387,480,702,118,713,712,642,923,764,761,162,161,160,152])).
% 14.42/14.47 cnf(2991,plain,
% 14.42/14.47 (P10(x29911,f41(f41(f31(f43(x29912,a2)),x29911),x29913),f43(x29912,a2))),
% 14.42/14.47 inference(rename_variables,[],[270])).
% 14.42/14.47 cnf(2996,plain,
% 14.42/14.47 (~P16(f28(x29961),f37(x29961,f39(x29962,f29(f43(x29963,a2)),x29964,x29963),x29964),x29965)),
% 14.42/14.47 inference(scs_inference,[],[192,179,185,323,324,261,217,243,235,291,186,269,2766,2868,2883,247,222,271,2706,272,336,2921,195,183,188,197,2740,2776,2821,342,2734,2859,227,234,212,2782,2793,2863,347,2752,219,220,2672,348,343,2692,2844,344,270,2763,170,201,2737,2803,2906,182,330,255,349,286,2683,2721,2756,1019,231,194,2741,2890,177,340,2794,326,2984,172,184,350,168,175,171,169,206,181,174,167,173,2334,2134,2450,2862,2564,2544,2679,2691,1305,2235,2339,2179,2895,2181,2183,2727,2785,2933,2227,2629,2631,2633,2635,2637,2639,2641,2643,2645,2647,2649,2651,2653,2655,2365,2211,2671,2675,2332,2142,2112,2702,2170,2124,2558,2357,2701,2769,2554,1613,2336,2411,2475,2471,2070,2790,2435,2405,2275,2309,2469,2798,2266,2273,2312,1324,2146,2148,2150,2082,2132,2166,2283,1571,1223,1537,1839,1837,1239,1298,1184,1314,1023,2676,2684,2722,1046,2657,1370,1178,1318,1115,1372,2538,144,142,141,139,138,137,134,130,126,125,121,116,109,920,613,532,531,530,529,960,639,957,793,625,867,988,621,626,921,652,641,601,781,757,754,687,714,514,478,738,623,874,425,656,654,690,1004,630,881,880,718,646,644,627,500,890,415,657,624,591,875,694,622,555,498,509,501,439,585,540,469,430,544,676,399,569,136,583,710,650,912,631,489,740,949,879,783,896,722,720,648,647,485,741,798,750,800,619,494,708,706,792,620,924,353,878,716,819,758,782,751,577,636,454,991,458,426,483,507,473,517,541,545,462,387,480,702,118,713,712,642,923,764,761,162,161,160,152,122,119,791,442])).
% 14.42/14.47 cnf(3000,plain,
% 14.42/14.47 (P16(x30001,f41(f41(f32(f43(x30002,a2)),f41(f41(f31(f43(x30002,a2)),x30003),f37(x30001,x30004,x30002))),f41(f41(f31(f43(x30002,a2)),x30003),f37(x30001,x30004,x30002))),x30002)),
% 14.42/14.47 inference(scs_inference,[],[192,179,185,323,324,261,217,243,235,291,186,269,2766,2868,2883,247,222,271,2706,272,336,2921,195,183,188,197,2740,2776,2821,342,2734,2859,227,234,212,2782,2793,2863,347,2752,219,220,2672,348,343,2692,2844,344,270,2763,170,201,2737,2803,2906,182,330,255,349,286,2683,2721,2756,1019,231,194,2741,2890,177,340,2794,326,2984,172,184,350,168,175,171,169,206,181,174,167,173,2334,2134,2450,2862,2564,2544,2679,2691,1305,2235,2339,2389,2179,2895,2181,2183,2727,2785,2933,2227,2629,2631,2633,2635,2637,2639,2641,2643,2645,2647,2649,2651,2653,2655,2365,2211,2671,2675,2332,2142,2112,2702,2170,2124,2558,2357,2701,2769,2554,1613,2336,2411,2475,2471,2070,2790,2435,2405,2275,2309,2469,2798,2266,2273,2312,1324,2146,2148,2150,2082,2132,2166,2283,1571,1223,1537,1839,1837,1239,1298,1184,1314,1023,2676,2684,2722,1046,2657,1370,1178,1318,1115,1372,2538,144,142,141,139,138,137,134,130,126,125,121,116,109,920,613,532,531,530,529,960,639,957,793,625,867,988,621,626,921,652,641,601,781,757,754,687,714,514,478,738,623,874,425,656,654,690,1004,630,881,880,718,646,644,627,500,890,415,657,624,591,875,694,622,555,498,509,501,439,585,540,469,430,544,676,399,569,136,583,710,650,912,631,489,740,949,879,783,896,722,720,648,647,485,741,798,750,800,619,494,708,706,792,620,924,353,878,716,819,758,782,751,577,636,454,991,458,426,483,507,473,517,541,545,462,387,480,702,118,713,712,642,923,764,761,162,161,160,152,122,119,791,442,827,770])).
% 14.42/14.47 cnf(3008,plain,
% 14.42/14.47 (~P9(f39(x30081,f34(f43(x30082,a2)),a1,x30082),a1)),
% 14.42/14.47 inference(scs_inference,[],[192,179,185,323,324,261,217,265,243,235,291,186,269,2766,2868,2883,247,222,271,2706,272,336,2921,195,183,188,197,2740,2776,2821,342,2734,2859,227,234,212,2782,2793,2863,347,2752,219,220,2672,348,343,2692,2844,344,270,2763,170,201,2737,2803,2906,182,330,255,349,286,2683,2721,2756,1019,231,194,2741,2890,177,340,2794,326,2984,2987,172,184,350,168,175,171,169,206,181,174,167,173,2334,2134,2450,2862,2564,2544,2679,2691,1305,2235,2339,2389,2179,2895,2181,2183,2727,2785,2933,2227,2629,2631,2633,2635,2637,2639,2641,2643,2645,2647,2649,2651,2653,2655,2365,2211,2671,2675,2332,2142,2112,2702,2170,2124,2558,2357,2701,2769,2554,1613,2336,2411,2475,2471,2070,2790,2435,2405,2275,2309,2469,2798,2266,2273,2312,1324,2146,2148,2150,2082,2132,2166,2283,1571,1223,1537,1839,1837,1239,1298,1184,1314,1023,2676,2684,2722,1046,2657,1370,1178,1318,1115,1372,2538,144,142,141,139,138,137,134,130,126,125,121,116,109,920,613,532,531,530,529,960,639,957,793,625,867,988,621,626,921,652,641,601,781,757,754,687,714,514,478,738,623,874,425,656,654,690,1004,630,881,880,718,646,644,627,500,890,415,657,624,591,875,694,622,555,498,509,501,439,585,540,469,430,544,676,399,569,136,583,710,650,912,631,489,740,949,879,783,896,722,720,648,647,485,741,798,750,800,619,494,708,706,792,620,924,353,878,716,819,758,782,751,577,636,454,991,458,426,483,507,473,517,541,545,462,387,480,702,118,713,712,642,923,764,761,162,161,160,152,122,119,791,442,827,770,801,163,148])).
% 14.42/14.47 cnf(3011,plain,
% 14.42/14.47 (P16(x30111,f41(f41(f31(f43(a2,a2)),f34(f43(a2,a2))),x30112),a2)),
% 14.42/14.47 inference(scs_inference,[],[192,179,185,323,324,261,217,265,243,235,291,186,269,2766,2868,2883,247,222,271,2706,272,336,2921,195,183,188,197,2740,2776,2821,342,2734,2859,227,234,212,2782,2793,2863,347,2752,240,219,220,2672,348,343,2692,2844,344,270,2763,2991,170,201,2737,2803,2906,182,330,255,349,286,2683,2721,2756,1019,231,194,2741,2890,177,340,2794,326,2984,2987,172,184,350,168,175,171,169,206,181,174,167,173,2334,2134,2450,2862,2564,2544,2679,2691,1305,2235,2339,2389,2179,2895,2181,2183,2727,2785,2933,2227,2629,2631,2633,2635,2637,2639,2641,2643,2645,2647,2649,2651,2653,2655,2365,2211,2671,2675,2332,2142,2112,2702,2170,2124,2558,2357,2701,2769,2554,1613,2336,2411,2475,2471,2070,2790,2435,2405,2275,2309,2469,2798,2266,2273,2312,1324,2146,2148,2150,2082,2132,2166,2283,1571,1223,1537,1839,1501,1837,1239,1298,1184,1314,1023,2676,2684,2722,1046,2657,1370,1178,1318,1115,1372,2538,144,142,141,139,138,137,134,130,126,125,121,116,109,920,613,532,531,530,529,960,639,957,793,625,867,988,621,626,921,652,641,601,781,757,754,687,714,514,478,738,623,874,425,656,654,690,1004,630,881,880,718,646,644,627,500,890,415,657,624,591,875,694,622,555,498,509,501,439,585,540,469,430,544,676,399,569,136,583,710,650,912,631,489,740,949,879,783,896,722,720,648,647,485,741,798,750,800,619,494,708,706,792,620,924,353,878,716,819,758,782,751,577,636,454,991,458,426,483,507,473,517,541,545,462,387,480,702,118,713,712,642,923,764,761,162,161,160,152,122,119,791,442,827,770,801,163,148,811,680])).
% 14.42/14.47 cnf(3015,plain,
% 14.42/14.47 (~P12(f41(f41(f31(f43(a2,a2)),f34(f43(a2,a2))),x30151),f37(f26(a1),f34(f43(a2,a2)),a2),f43(a2,a2))),
% 14.42/14.47 inference(scs_inference,[],[192,179,185,323,324,261,217,265,243,235,291,186,269,2766,2868,2883,247,222,271,2706,272,336,2921,195,183,188,197,2740,2776,2821,342,2734,2859,227,234,212,2782,2793,2863,347,2752,240,219,220,2672,348,343,2692,2844,344,270,2763,2991,170,201,2737,2803,2906,182,330,255,349,286,2683,2721,2756,1019,231,194,2741,2890,177,340,2794,326,2984,2987,172,184,350,168,175,171,169,206,181,174,167,173,2334,2134,2450,2862,2564,2544,2679,2691,1305,2235,2339,2389,2179,2895,2181,2183,2727,2785,2933,2227,2629,2631,2633,2635,2637,2639,2641,2643,2645,2647,2649,2651,2653,2655,2365,2211,2671,2675,2332,2142,2112,2702,2170,2124,2102,2558,2357,2701,2769,2554,1613,2336,2411,2475,2471,2070,2790,2435,2405,2275,2309,2469,2798,2266,2273,2312,1324,2146,2148,2150,2082,2132,2166,2283,1571,1223,1537,1839,1501,1837,1239,1298,1184,1314,1023,2676,2684,2722,1046,2657,1370,1178,1318,1115,1372,2538,144,142,141,139,138,137,134,130,126,125,121,116,109,920,613,532,531,530,529,960,639,957,793,625,867,988,621,626,921,652,641,601,781,757,754,687,714,514,478,738,623,874,425,656,654,690,1004,630,881,880,718,646,644,627,500,890,415,657,624,591,875,694,622,555,498,509,501,439,585,540,469,430,544,676,399,569,136,583,710,650,912,631,489,740,949,879,783,896,722,720,648,647,485,741,798,750,800,619,494,708,706,792,620,924,353,878,716,819,758,782,751,577,636,454,991,458,426,483,507,473,517,541,545,462,387,480,702,118,713,712,642,923,764,761,162,161,160,152,122,119,791,442,827,770,801,163,148,811,680,581,739])).
% 14.42/14.47 cnf(3016,plain,
% 14.42/14.47 (P10(x30161,f41(f41(f31(f43(x30162,a2)),x30161),x30163),f43(x30162,a2))),
% 14.42/14.47 inference(rename_variables,[],[270])).
% 14.42/14.47 cnf(3018,plain,
% 14.42/14.47 (P10(f41(f41(f36(a1),f28(f28(x30181))),x30181),f28(f28(x30181)),a1)),
% 14.42/14.47 inference(scs_inference,[],[192,179,185,323,324,261,217,265,243,235,291,186,269,2766,2868,2883,247,222,271,2706,272,336,2921,195,183,188,197,2740,2776,2821,342,2734,2859,227,234,212,2782,2793,2863,347,2752,240,219,220,2672,348,343,2692,2844,344,270,2763,2991,170,201,2737,2803,2906,182,330,255,349,286,2683,2721,2756,1019,231,194,2741,2890,2925,177,340,2794,326,2984,2987,172,184,350,168,175,171,169,206,181,174,167,173,2334,2134,2450,2862,2564,2544,2679,2691,1305,2235,2339,2389,2179,2895,2181,2183,2727,2785,2933,2227,2629,2631,2633,2635,2637,2639,2641,2643,2645,2647,2649,2651,2653,2655,2365,2211,2671,2675,2332,2142,2112,2702,2170,2124,2102,2558,2357,2701,2769,2554,1613,2336,2411,2475,2471,2070,2790,2435,2405,2275,2309,2469,2798,2266,2273,2312,1324,2146,2148,2150,2566,2082,2132,2166,2283,1571,1223,1537,1839,1501,1837,1239,1298,1184,1314,1023,2676,2684,2722,1046,2657,1370,1178,1318,1115,1372,2538,144,142,141,139,138,137,134,130,126,125,121,116,109,920,613,532,531,530,529,960,639,957,793,625,867,988,621,626,921,652,641,601,781,757,754,687,714,514,478,738,623,874,425,656,654,690,1004,630,881,880,718,646,644,627,500,890,415,657,624,591,875,694,622,555,498,509,501,439,585,540,469,430,544,676,399,569,136,583,710,650,912,631,489,740,949,879,783,896,722,720,648,647,485,741,798,750,800,619,494,708,706,792,620,924,353,878,716,819,758,782,751,577,636,454,991,458,426,483,507,473,517,541,545,462,387,480,702,118,713,712,642,923,764,761,162,161,160,152,122,119,791,442,827,770,801,163,148,811,680,581,739,780])).
% 14.42/14.47 cnf(3022,plain,
% 14.42/14.47 (P10(x30221,f28(f28(f41(f41(f36(a1),x30221),x30222))),a1)),
% 14.42/14.47 inference(scs_inference,[],[192,179,185,323,324,261,217,265,243,235,291,186,269,2766,2868,2883,247,222,271,2706,272,336,2921,195,183,188,197,2740,2776,2821,342,2734,2859,227,234,212,2782,2793,2863,347,2752,240,219,220,2672,348,343,2692,2844,344,270,2763,2991,170,201,2737,2803,2906,182,330,255,349,286,2683,2721,2756,1019,231,194,2741,2890,2925,177,340,2794,326,2984,2987,172,184,350,168,175,171,169,206,181,174,167,173,2334,2134,2450,2862,2564,2544,2679,2691,1305,2235,2339,2389,2179,2895,2181,2183,2727,2785,2933,2227,2629,2631,2633,2635,2637,2639,2641,2643,2645,2647,2649,2651,2653,2655,2365,2211,2671,2675,2332,2142,2112,2702,2170,2124,2102,2558,2357,2701,2769,2554,1613,2336,2411,2475,2471,2070,2790,2435,2405,2275,2309,2469,2798,2266,2273,2312,1324,2146,2148,2150,2566,2082,2132,2166,2283,1571,1223,1537,1839,1501,1837,1239,1298,1184,1314,1023,2676,2684,2722,1046,2657,1370,1178,1318,1115,1372,2538,144,142,141,139,138,137,134,130,126,125,121,116,109,920,613,532,531,530,529,960,639,957,793,625,867,988,621,626,921,652,641,601,781,757,754,687,714,514,478,738,623,874,425,656,654,690,1004,630,881,880,718,646,644,627,500,890,415,657,624,591,875,694,622,555,498,509,501,439,585,540,469,430,544,676,399,569,136,583,710,650,912,631,489,740,949,879,783,896,722,720,648,647,485,741,798,750,800,619,494,708,706,792,620,924,353,878,716,819,758,782,751,577,636,454,991,458,426,483,507,473,517,541,545,462,387,480,702,118,713,712,642,923,764,761,162,161,160,152,122,119,791,442,827,770,801,163,148,811,680,581,739,780,484])).
% 14.42/14.47 cnf(3028,plain,
% 14.42/14.47 (P12(x30281,f28(f28(f28(f28(f28(x30281))))),a1)),
% 14.42/14.47 inference(scs_inference,[],[192,179,185,323,324,261,217,265,243,235,291,186,269,2766,2868,2883,247,222,271,2706,272,336,2921,195,183,188,197,2740,2776,2821,342,2734,2859,227,234,212,2782,2793,2863,347,2752,240,219,220,2672,348,343,2692,2844,344,270,2763,2991,170,201,2737,2803,2906,182,330,255,349,286,2683,2721,2756,1019,231,194,2741,2890,2925,177,340,2794,326,2984,2987,172,184,350,168,175,171,169,206,181,174,167,173,2334,2134,2450,2862,2564,2544,2679,2691,1305,2235,2339,2389,2179,2895,2181,2183,2727,2785,2933,2227,2629,2631,2633,2635,2637,2639,2641,2643,2645,2647,2649,2651,2653,2655,2365,2211,2671,2675,2332,2142,2112,2702,2170,2124,2102,2558,2357,2701,2769,2554,1613,2336,2411,2475,2471,2070,2790,2435,2405,2275,2309,2469,2798,2266,2273,2312,1324,2146,2148,2150,2566,2082,2132,2166,2283,1571,1223,1537,1839,1501,1837,1239,1298,1184,1314,1023,2676,2684,2722,1046,2657,1370,1178,1318,1115,1372,2538,144,142,141,139,138,137,134,130,126,125,121,116,109,920,613,532,531,530,529,960,639,957,793,625,867,988,621,626,921,652,641,601,781,757,754,687,714,514,478,738,623,874,425,656,654,690,1004,630,881,880,718,646,644,627,500,890,415,657,624,591,875,694,622,555,498,509,501,439,585,540,469,430,544,676,399,569,136,583,710,650,912,631,489,740,949,879,783,896,722,720,648,647,485,741,798,750,800,619,494,708,706,792,620,924,353,878,716,819,758,782,751,577,636,454,991,458,426,483,507,473,517,541,545,462,387,480,702,118,713,712,642,923,764,761,162,161,160,152,122,119,791,442,827,770,801,163,148,811,680,581,739,780,484,658,980,481])).
% 14.42/14.47 cnf(3032,plain,
% 14.42/14.47 (P10(f38(x30321,f39(x30321,x30322,x30323,x30324),x30323,x30324),x30322,f43(x30324,a2))),
% 14.42/14.47 inference(rename_variables,[],[314])).
% 14.42/14.47 cnf(3034,plain,
% 14.42/14.47 (~P12(f28(f28(x30341)),f28(f41(f41(f32(a1),f28(f28(x30341))),x30341)),a1)),
% 14.42/14.47 inference(scs_inference,[],[192,179,185,323,324,261,217,265,243,235,291,186,269,2766,2868,2883,247,222,271,2706,272,336,2921,195,183,188,197,2740,2776,2821,342,2734,2859,227,234,212,2782,2793,2863,347,2752,240,314,219,220,2672,348,343,2692,2844,344,270,2763,2991,170,201,2737,2803,2906,182,330,255,349,286,2683,2721,2756,1019,231,194,2741,2890,2925,177,340,2794,326,2984,2987,172,184,350,168,175,171,169,206,181,174,167,173,2334,2134,2450,2862,2564,2544,2679,2691,1305,2235,2339,2389,2179,2895,2181,2812,2183,2727,2785,2933,2227,2629,2631,2633,2635,2637,2639,2641,2643,2645,2647,2649,2651,2653,2655,2365,2211,2671,2675,2332,2142,2112,2702,2170,2124,2102,2558,2357,2701,2769,2554,1613,2336,2411,2475,2471,2070,2790,2435,2405,2275,2309,2469,2798,2266,2273,2312,1324,2146,2148,2150,2566,2082,2132,2166,2283,1571,1223,1537,1839,1501,1837,1239,1298,1184,1190,1314,1023,2676,2684,2722,1046,2657,1370,1178,1318,1115,1372,2538,144,142,141,139,138,137,134,130,126,125,121,116,109,920,613,532,531,530,529,960,639,957,793,625,867,988,621,626,921,652,641,601,781,757,754,687,714,514,478,738,623,874,425,656,654,690,1004,630,881,880,718,646,644,627,500,890,415,657,624,591,875,694,622,555,498,509,501,439,585,540,469,430,544,676,399,569,136,583,710,650,912,631,489,740,949,879,783,896,722,720,648,647,485,741,798,750,800,619,494,708,706,792,620,924,353,878,716,819,758,782,751,577,636,454,991,458,426,483,507,473,517,541,545,462,387,480,702,118,713,712,642,923,764,761,162,161,160,152,122,119,791,442,827,770,801,163,148,811,680,581,739,780,484,658,980,481,795,496])).
% 14.42/14.47 cnf(3037,plain,
% 14.42/14.47 (~P12(f28(f28(f41(f41(f36(a1),x30371),x30372))),x30371,a1)),
% 14.42/14.47 inference(scs_inference,[],[192,179,185,323,324,261,217,265,243,235,291,186,269,2766,2868,2883,247,222,271,2706,272,336,2921,195,183,188,197,2740,2776,2821,342,2734,2859,227,234,212,2782,2793,2863,347,2752,240,314,219,220,2672,348,343,2692,2844,344,270,2763,2991,170,201,2737,2803,2906,182,330,255,349,286,2683,2721,2756,1019,231,194,2741,2890,2925,177,340,2794,326,2984,2987,172,184,350,168,175,171,169,206,181,174,167,173,2334,2134,2450,2862,2564,2544,2679,2691,1305,2235,2339,2389,2179,2895,2181,2812,2183,2727,2785,2933,2227,2629,2631,2633,2635,2637,2639,2641,2643,2645,2647,2649,2651,2653,2655,2365,2211,2671,2675,2332,2142,2112,2702,2170,2124,2102,2558,2357,2701,2769,2554,1613,2336,2411,2475,2471,2070,2790,2808,2435,2405,2275,2309,2469,2798,2266,2273,2312,1324,2146,2148,2150,2566,2082,2132,2166,2283,1571,1223,1537,1839,1501,1837,1239,1298,1184,1190,1314,1023,2676,2684,2722,1046,2657,1370,1178,1318,1115,1372,2538,144,142,141,139,138,137,134,130,126,125,121,116,109,920,613,532,531,530,529,960,639,957,793,625,867,988,621,626,921,652,641,601,781,757,754,687,714,514,478,738,623,874,425,656,654,690,1004,630,881,880,718,646,644,627,500,890,415,657,624,591,875,694,622,555,498,509,501,439,585,540,469,430,544,676,399,569,136,583,710,650,912,631,489,740,949,879,783,896,722,720,648,647,485,741,798,750,800,619,494,708,706,792,620,924,353,878,716,819,758,782,751,577,636,454,991,458,426,483,507,473,517,541,545,462,387,480,702,118,713,712,642,923,764,761,162,161,160,152,122,119,791,442,827,770,801,163,148,811,680,581,739,780,484,658,980,481,795,496,468])).
% 14.42/14.47 cnf(3039,plain,
% 14.42/14.47 (~P10(f28(f28(f28(f28(f28(x30391))))),x30391,a1)),
% 14.42/14.47 inference(scs_inference,[],[192,179,185,323,324,261,217,265,243,235,291,186,269,2766,2868,2883,247,222,271,2706,272,336,2921,195,183,188,197,2740,2776,2821,342,2734,2859,227,234,212,2782,2793,2863,347,2752,240,314,219,220,2672,348,343,2692,2844,344,270,2763,2991,170,201,2737,2803,2906,182,330,255,349,286,2683,2721,2756,1019,231,194,2741,2890,2925,177,340,2794,326,2984,2987,172,184,350,168,175,171,169,206,181,174,167,173,2334,2134,2450,2862,2564,2544,2679,2691,1305,2235,2339,2389,2179,2895,2181,2812,2183,2727,2785,2933,2227,2629,2631,2633,2635,2637,2639,2641,2643,2645,2647,2649,2651,2653,2655,2365,2211,2671,2675,2332,2142,2112,2702,2170,2124,2102,2558,2357,2701,2769,2554,1613,2336,2411,2475,2471,2070,2790,2808,2435,2405,2275,2309,2469,2798,2266,2273,2312,1324,2146,2148,2150,2566,2082,2132,2166,2283,1571,1223,1537,1839,1501,1837,1239,1298,1184,1190,1314,1023,2676,2684,2722,1046,2657,1370,1178,1318,1115,1372,2538,144,142,141,139,138,137,134,130,126,125,121,116,109,920,613,532,531,530,529,960,639,957,793,625,867,988,621,626,921,652,641,601,781,757,754,687,714,514,478,738,623,874,425,656,654,690,1004,630,881,880,718,646,644,627,500,890,415,657,624,591,875,694,622,555,498,509,501,439,585,540,469,430,544,676,399,569,136,583,710,650,912,631,489,740,949,879,783,896,722,720,648,647,485,741,798,750,800,619,494,708,706,792,620,924,353,878,716,819,758,782,751,577,636,454,991,458,426,483,507,473,517,541,545,462,387,480,702,118,713,712,642,923,764,761,162,161,160,152,122,119,791,442,827,770,801,163,148,811,680,581,739,780,484,658,980,481,795,496,468,471])).
% 14.42/14.47 cnf(3046,plain,
% 14.42/14.47 (~P12(f28(x30461),f28(f41(f41(f32(a1),f26(a1)),x30462)),a1)),
% 14.42/14.47 inference(scs_inference,[],[192,179,185,323,324,261,217,265,243,235,291,186,269,2766,2868,2883,247,222,271,2706,272,336,2921,195,183,188,197,2740,2776,2821,342,2734,2859,227,234,212,2782,2793,2863,347,2752,240,314,219,220,2672,348,343,2692,2844,344,270,2763,2991,170,201,2737,2803,2906,182,330,255,349,286,2683,2721,2756,1019,231,194,2741,2890,2925,177,340,2794,326,2984,2987,172,184,350,168,175,171,169,206,181,174,167,173,2334,2134,2450,2862,2564,2544,2679,2691,1305,2235,2339,2389,2179,2895,2181,2812,2183,2727,2785,2933,2227,2629,2631,2633,2635,2637,2639,2641,2643,2645,2647,2649,2651,2653,2655,2365,2211,2671,2675,2332,2142,2112,2702,2170,2124,2102,2558,2357,2701,2769,2554,1613,2336,2411,2475,2471,2070,2790,2808,2435,2405,2275,2309,2469,2798,2266,2273,2312,1324,2146,2148,2150,2566,2082,2132,2166,2283,1571,1223,1537,1839,1501,1837,1239,1298,1184,1190,1314,1023,2676,2684,2722,1046,2657,1370,1178,2813,1318,1115,1372,2538,144,142,141,139,138,137,134,130,126,125,121,116,109,920,613,532,531,530,529,960,639,957,793,625,867,988,621,626,921,652,641,601,781,757,754,687,714,514,478,738,623,874,425,656,654,690,1004,630,881,880,718,646,644,627,500,890,415,657,624,591,875,694,622,555,498,509,501,439,585,540,469,430,544,676,399,569,136,583,710,650,912,631,489,740,949,879,783,896,722,720,648,647,485,741,798,750,800,619,494,708,706,792,620,924,353,878,716,819,758,782,751,577,636,454,991,458,426,483,507,473,517,541,545,462,387,480,702,118,713,712,642,923,764,761,162,161,160,152,122,119,791,442,827,770,801,163,148,811,680,581,739,780,484,658,980,481,795,496,468,471,537,539])).
% 14.42/14.47 cnf(3053,plain,
% 14.42/14.47 (E(x30531,f41(f41(f32(a2),x30531),x30531))),
% 14.42/14.47 inference(rename_variables,[],[2596])).
% 14.42/14.47 cnf(3054,plain,
% 14.42/14.47 (P12(f37(x30541,f37(x30542,x30543,x30544),x30544),f28(f37(x30542,f37(x30541,x30543,x30544),x30544)),a1)),
% 14.42/14.47 inference(scs_inference,[],[192,179,185,323,324,261,217,265,243,235,291,186,269,2766,2868,2883,247,222,271,2706,272,336,2921,195,183,188,197,2740,2776,2821,342,2734,2859,227,234,212,2782,2793,2863,347,2752,240,314,219,220,2672,348,343,2692,2844,344,270,2763,2991,170,201,2737,2803,2906,182,330,255,349,286,2683,2721,2756,1019,231,194,2741,2890,2925,177,340,2794,326,2984,2987,172,184,350,168,175,171,169,206,181,174,167,173,2334,2134,2450,2862,2564,2544,2679,2691,1305,2235,2339,2389,2179,2895,2181,2812,2183,2727,2785,2933,2227,2629,2631,2633,2635,2637,2639,2641,2643,2645,2647,2649,2651,2653,2655,2365,2596,2211,2671,2675,2332,2142,2112,2702,2170,2124,2102,2558,2357,2701,2769,2554,1613,2336,2411,2475,2471,2070,2790,2808,2435,2405,2275,2309,2469,2798,2266,2273,2312,1324,2146,2148,2150,2566,2082,2132,2166,2283,1571,1223,1537,1839,1501,1837,1239,1298,1184,1190,1314,1023,2676,2684,2722,1046,2657,1370,1178,2813,1318,1115,1372,2538,144,142,141,139,138,137,134,130,126,125,121,116,109,920,613,532,531,530,529,960,639,957,793,625,867,988,621,626,921,652,641,601,781,757,754,687,714,514,478,738,623,874,425,656,654,690,1004,630,881,880,718,646,644,627,500,890,415,657,624,591,875,694,622,555,498,509,501,439,585,540,469,430,544,676,399,569,136,583,710,650,912,631,489,740,949,879,783,896,722,720,648,647,485,741,798,750,800,619,494,708,706,792,620,924,353,878,716,819,758,782,751,577,636,454,991,458,426,483,507,473,517,541,545,462,387,480,702,118,713,712,642,923,764,761,162,161,160,152,122,119,791,442,827,770,801,163,148,811,680,581,739,780,484,658,980,481,795,496,468,471,537,539,437,548,133,131])).
% 14.42/14.47 cnf(3057,plain,
% 14.42/14.47 (E(x30571,f41(f41(f32(a2),x30571),x30571))),
% 14.42/14.47 inference(rename_variables,[],[2596])).
% 14.42/14.47 cnf(3058,plain,
% 14.42/14.47 (P16(f41(x30581,x30582),f38(x30581,f34(f43(x30583,a2)),x30583,f37(x30584,f37(x30585,x30586,x30587),x30587)),f37(x30585,f37(x30584,x30586,x30587),x30587))),
% 14.42/14.47 inference(scs_inference,[],[192,179,185,323,324,261,217,265,243,235,291,186,269,2766,2868,2883,247,222,271,2706,272,336,2921,195,183,188,197,2740,2776,2821,342,2734,2859,227,234,212,2782,2793,2863,347,2752,240,314,219,220,2672,348,343,2692,2844,344,270,2763,2991,170,201,2737,2803,2906,182,330,255,349,286,2683,2721,2756,1019,231,194,2741,2890,2925,177,340,2794,326,2984,2987,172,184,350,168,175,171,169,206,181,174,167,173,2334,2134,2450,2862,2564,2544,2679,2691,1305,2235,2339,2389,2179,2895,2181,2812,2183,2727,2785,2933,2227,2629,2631,2633,2635,2637,2639,2641,2643,2645,2647,2649,2651,2653,2655,2365,2596,3053,2211,2671,2675,2332,2142,2112,2702,2170,2124,2102,2558,2357,2701,2769,2554,1613,2336,2411,2475,2471,2070,2790,2808,2435,2405,2275,2309,2469,2798,2266,2273,2312,1324,2146,2148,2150,2566,2082,2132,2166,2283,1571,1223,1537,1839,1501,1837,1239,1298,1184,1190,1314,1023,2676,2684,2722,1046,2657,1370,1178,2813,1318,1115,1372,2538,144,142,141,139,138,137,134,130,126,125,121,116,109,920,613,532,531,530,529,960,639,957,793,625,867,988,621,626,921,652,641,601,781,757,754,687,714,514,478,738,623,874,425,656,654,690,1004,630,881,880,718,646,644,627,500,890,415,657,624,591,875,694,622,555,498,509,501,439,585,540,469,430,544,676,399,569,136,583,710,650,912,631,489,740,949,879,783,896,722,720,648,647,485,741,798,750,800,619,494,708,706,792,620,924,353,878,716,819,758,782,751,577,636,454,991,458,426,483,507,473,517,541,545,462,387,480,702,118,713,712,642,923,764,761,162,161,160,152,122,119,791,442,827,770,801,163,148,811,680,581,739,780,484,658,980,481,795,496,468,471,537,539,437,548,133,131,124,129])).
% 14.42/14.47 cnf(3065,plain,
% 14.42/14.47 (E(f4(f28(x30651),f28(x30652),a1),f4(x30651,x30652,a1))),
% 14.42/14.47 inference(rename_variables,[],[217])).
% 14.42/14.47 cnf(3072,plain,
% 14.42/14.47 (~P34(f41(f41(f32(f43(x30721,a2)),f41(f29(f43(x30722,a2)),f41(x30723,f26(a1)))),f34(f43(x30721,a2))))),
% 14.42/14.47 inference(scs_inference,[],[192,179,185,323,324,261,217,3065,258,265,257,243,252,235,236,291,186,269,2766,2868,2883,247,222,271,2706,272,336,2921,195,183,188,197,2740,2776,2821,342,2734,2859,227,234,212,2782,2793,2863,347,2752,240,314,219,220,2672,348,343,2692,2844,344,270,2763,2991,170,201,2737,2803,2906,182,330,255,349,286,2683,2721,2756,1019,231,194,2741,2890,2925,177,340,2794,326,2984,2987,172,184,350,168,175,171,169,206,181,174,167,173,2334,2134,2450,2862,2564,2544,2679,2691,1305,2235,2339,2389,2179,2895,2181,2812,2183,2727,2785,2933,2227,2629,2631,2633,2635,2637,2639,2641,2643,2645,2647,2649,2651,2653,2655,2365,2596,3053,3057,2211,2671,2675,2332,2142,2112,2702,2445,2170,2124,2102,2558,2357,2701,2769,2554,1613,2336,2411,2475,2471,2070,2790,2808,2435,2405,2275,2309,2469,2798,2266,2273,2312,1324,2146,2148,2150,2566,2082,2536,2132,2166,1040,2283,1571,1223,1537,1839,1501,1837,1239,1298,1184,1190,1314,1023,2676,2684,2722,1046,2657,1370,1178,2813,1318,1115,1372,2538,144,142,141,139,138,137,134,130,126,125,121,116,109,920,613,532,531,530,529,960,639,957,793,625,867,988,621,626,921,652,641,601,781,757,754,687,714,514,478,738,623,874,425,656,654,690,1004,630,881,880,718,646,644,627,500,890,415,657,624,591,875,694,622,555,498,509,501,439,585,540,469,430,544,676,399,569,136,583,710,650,912,631,489,740,949,879,783,896,722,720,648,647,485,741,798,750,800,619,494,708,706,792,620,924,353,878,716,819,758,782,751,577,636,454,991,458,426,483,507,473,517,541,545,462,387,480,702,118,713,712,642,923,764,761,162,161,160,152,122,119,791,442,827,770,801,163,148,811,680,581,739,780,484,658,980,481,795,496,468,471,537,539,437,548,133,131,124,129,128,123,3,2,39,13,22,117,143,135])).
% 14.42/14.47 cnf(3073,plain,
% 14.42/14.47 (P12(f37(x30731,f39(x30732,f29(f43(x30733,a2)),f38(a48,a45,a3,a42),x30733),f38(a48,a45,a3,a42)),f37(x30731,f37(f28(x30731),f39(x30732,f29(f43(x30733,a2)),f38(a48,a45,a3,a42),x30733),f38(a48,a45,a3,a42)),f38(a48,a45,a3,a42)),f43(f38(a48,a45,a3,a42),a2))),
% 14.42/14.47 inference(scs_inference,[],[192,179,185,323,324,261,217,3065,258,265,257,243,252,235,236,291,186,269,2766,2868,2883,247,222,271,2706,272,336,2921,195,183,188,197,2740,2776,2821,342,2734,2859,227,234,212,2782,2793,2863,347,2752,240,314,219,220,2672,348,343,2692,2844,344,270,2763,2991,170,201,2737,2803,2906,182,330,255,349,286,2683,2721,2756,1019,231,194,2741,2890,2925,177,340,2794,326,2984,2987,172,184,350,168,175,171,169,206,181,174,167,173,2334,2134,2450,2862,2564,2835,2544,2679,2691,1305,2235,2339,2389,2179,2895,2181,2812,2183,2727,2785,2933,2227,2629,2631,2633,2635,2637,2639,2641,2643,2645,2647,2649,2651,2653,2655,2365,2596,3053,3057,2211,2671,2675,2332,2142,2112,2702,2445,2170,2124,2102,2558,2357,2701,2769,2554,1613,2336,2411,2475,2471,2070,2790,2808,2435,2405,2275,2309,2469,2798,2266,2273,2312,1324,2146,2148,2150,2566,2082,2536,2132,2166,1040,2283,1571,1223,1537,1839,1501,1837,1239,1298,1184,1190,1314,1023,2676,2684,2722,1046,2657,1370,1178,2813,1318,1115,1372,2538,144,142,141,139,138,137,134,130,126,125,121,116,109,920,613,532,531,530,529,960,639,957,793,625,867,988,621,626,921,652,641,601,781,757,754,687,714,514,478,738,623,874,425,656,654,690,1004,630,881,880,718,646,644,627,500,890,415,657,624,591,875,694,622,555,498,509,501,439,585,540,469,430,544,676,399,569,136,583,710,650,912,631,489,740,949,879,783,896,722,720,648,647,485,741,798,750,800,619,494,708,706,792,620,924,353,878,716,819,758,782,751,577,636,454,991,458,426,483,507,473,517,541,545,462,387,480,702,118,713,712,642,923,764,761,162,161,160,152,122,119,791,442,827,770,801,163,148,811,680,581,739,780,484,658,980,481,795,496,468,471,537,539,437,548,133,131,124,129,128,123,3,2,39,13,22,117,143,135,132])).
% 14.42/14.47 cnf(3087,plain,
% 14.42/14.47 (~P12(x30871,x30871,f41(f41(f36(a1),a1),a1))),
% 14.42/14.47 inference(scs_inference,[],[192,179,185,323,324,261,217,3065,258,265,257,243,252,235,236,291,186,269,2766,2868,2883,247,222,271,2706,272,336,2921,195,183,188,197,2740,2776,2821,2889,342,2734,2859,227,234,212,2782,2793,2863,347,2752,240,314,219,220,2672,348,343,2692,2844,344,270,2763,2991,3016,170,201,2737,2803,2906,182,330,255,349,286,2683,2721,2756,1019,231,194,2741,2890,2925,177,340,2794,326,2984,2987,172,184,350,244,168,175,171,169,206,181,174,167,173,2334,2134,2450,2862,2564,2835,2544,2679,2691,1305,2235,2339,2389,2179,2895,2181,2812,2183,2727,2785,2933,2227,2629,2631,2633,2635,2637,2639,2641,2643,2645,2647,2649,2651,2653,2655,2365,2596,3053,3057,2211,2671,2675,2332,2142,2112,2702,2445,2170,2124,2102,2558,2357,2701,2769,2554,1613,2336,2411,2475,2471,2070,2790,2808,2435,2405,2275,2309,2469,2798,2266,2273,2312,1324,2146,2148,2150,2566,2082,2536,2132,2166,1040,2283,1571,1223,1537,1839,1501,1837,1239,1298,1184,1190,1314,1023,2676,2684,2722,2757,1046,2657,1370,1178,2813,1318,1115,1372,2538,144,142,141,139,138,137,134,130,126,125,121,116,109,920,613,532,531,530,529,960,639,957,793,625,867,988,621,626,921,652,641,601,781,757,754,687,714,514,478,738,623,874,425,656,654,690,1004,630,881,880,718,646,644,627,500,890,415,657,624,591,875,694,622,555,498,509,501,439,585,540,469,430,544,676,399,569,136,583,710,650,912,631,489,740,949,879,783,896,722,720,648,647,485,741,798,750,800,619,494,708,706,792,620,924,353,878,716,819,758,782,751,577,636,454,991,458,426,483,507,473,517,541,545,462,387,480,702,118,713,712,642,923,764,761,162,161,160,152,122,119,791,442,827,770,801,163,148,811,680,581,739,780,484,658,980,481,795,496,468,471,537,539,437,548,133,131,124,129,128,123,3,2,39,13,22,117,143,135,132,357,474,562,873,902,981,418])).
% 14.42/14.47 cnf(3091,plain,
% 14.42/14.47 (~P10(f34(f43(f38(a48,a45,a3,a42),a2)),f41(f41(f31(f43(f38(a48,a45,a3,a42),a2)),f37(x30911,f29(f43(f38(a48,a45,a3,a42),a2)),f38(a48,a45,a3,a42))),f39(x30912,f29(f43(x30913,a2)),f38(a48,a45,a3,a42),x30913)),f43(f38(a48,a45,a3,a42),a2))),
% 14.42/14.47 inference(scs_inference,[],[192,179,185,323,324,261,217,3065,258,265,257,243,252,235,236,291,186,269,2766,2868,2883,247,222,271,2706,272,336,2921,195,183,188,197,2740,2776,2821,2889,342,2734,2859,227,234,212,2782,2793,2863,347,2752,240,314,219,220,2672,348,343,2692,2844,344,270,2763,2991,3016,170,201,2737,2803,2906,182,330,255,349,286,2683,2721,2756,1019,231,194,2741,2890,2925,177,340,2794,326,2984,2987,172,184,350,244,168,175,171,169,206,181,174,167,173,2334,2134,2450,2862,2564,2835,2544,2679,2691,1305,2235,2339,2389,2179,2895,2181,2812,2183,2727,2785,2933,2227,2629,2631,2633,2635,2637,2639,2641,2643,2645,2647,2649,2651,2653,2655,2365,2596,3053,3057,2211,2671,2675,2332,2142,2112,2702,2445,2170,2124,2102,2558,2357,2701,2769,2554,1613,2336,2411,2475,2471,2070,2790,2808,2435,2405,2275,2309,2469,2798,2266,2273,2312,1324,2146,2148,2150,2566,2082,2536,2132,2166,1040,2283,1571,1223,1537,1839,1501,1837,1239,1298,1184,1190,1314,1023,2676,2684,2722,2757,1046,2657,1370,1178,2813,1318,1115,1372,2538,144,142,141,139,138,137,134,130,126,125,121,116,109,920,613,532,531,530,529,960,639,957,793,625,867,988,621,626,921,652,641,601,781,757,754,687,714,514,478,738,623,874,425,656,654,690,1004,630,881,880,718,646,644,627,500,890,415,657,624,591,875,694,622,555,498,509,501,439,585,540,469,430,544,676,399,569,136,583,710,650,912,631,489,740,949,879,783,896,722,720,648,647,485,741,798,750,800,619,494,708,706,792,620,924,353,878,716,819,758,782,751,577,636,454,991,458,426,483,507,473,517,541,545,462,387,480,702,118,713,712,642,923,764,761,162,161,160,152,122,119,791,442,827,770,801,163,148,811,680,581,739,780,484,658,980,481,795,496,468,471,537,539,437,548,133,131,124,129,128,123,3,2,39,13,22,117,143,135,132,357,474,562,873,902,981,418,853,900])).
% 14.42/14.47 cnf(3109,plain,
% 14.42/14.47 (~P8(a1)),
% 14.42/14.47 inference(scs_inference,[],[192,179,185,323,324,261,217,3065,258,265,257,243,252,235,236,291,186,269,2766,2868,2883,247,222,271,2706,272,336,2921,195,183,188,197,2740,2776,2821,2889,342,2734,2859,227,234,212,2782,2793,2863,347,2752,240,314,3032,219,220,2672,348,343,2692,2844,344,270,2763,2991,3016,170,201,2737,2803,2906,182,330,255,349,286,2683,2721,2756,1019,231,194,2741,2890,2925,177,340,2794,326,2984,2987,172,184,350,244,168,175,171,169,206,181,174,167,173,2334,2134,2546,2450,2862,2564,2835,1079,2544,2679,2691,1305,2235,2339,2389,2179,2895,2181,2812,2183,2727,2785,2933,2227,2629,2631,2633,2635,2637,2639,2641,2643,2645,2647,2649,2651,2653,2655,2365,2596,3053,3057,2211,2671,2675,2332,2142,2112,2702,2445,2170,2124,2102,2558,2357,2701,2769,2554,1613,2336,2411,2475,2471,2070,2790,2808,2435,2405,2275,2309,2469,2798,2266,2273,2312,1324,2146,2148,2150,2566,2082,2536,2132,2166,1040,2283,1571,1223,1537,1839,1501,1837,1239,1298,1184,1190,1314,1023,2676,2684,2722,2757,1046,2657,2693,1370,1178,2813,1318,1115,1372,2538,144,142,141,139,138,137,134,130,126,125,121,116,109,920,613,532,531,530,529,960,639,957,793,625,867,988,621,626,921,652,641,601,781,757,754,687,714,514,478,738,623,874,425,656,654,690,1004,630,881,880,718,646,644,627,500,890,415,657,624,591,875,694,622,555,498,509,501,439,585,540,469,430,544,676,399,569,136,583,710,650,912,631,489,740,949,879,783,896,722,720,648,647,485,741,798,750,800,619,494,708,706,792,620,924,353,878,716,819,758,782,751,577,636,454,991,458,426,483,507,473,517,541,545,462,387,480,702,118,713,712,642,923,764,761,162,161,160,152,122,119,791,442,827,770,801,163,148,811,680,581,739,780,484,658,980,481,795,496,468,471,537,539,437,548,133,131,124,129,128,123,3,2,39,13,22,117,143,135,132,357,474,562,873,902,981,418,853,900,704,662,660,491,488,825,954,520,354])).
% 14.42/14.47 cnf(3113,plain,
% 14.42/14.47 (~P14(x31131,x31132,f34(f43(a1,a2)),x31133,a1,x31134)),
% 14.42/14.47 inference(scs_inference,[],[192,179,185,323,324,261,217,3065,258,265,257,243,252,235,236,291,186,269,2766,2868,2883,247,222,271,2706,272,336,2921,195,183,188,197,2740,2776,2821,2889,342,2734,2859,227,234,212,2782,2793,2863,347,2752,240,314,3032,219,220,2672,348,343,2692,2844,344,270,2763,2991,3016,170,201,2737,2803,2906,182,330,255,349,286,2683,2721,2756,1019,231,194,2741,2890,2925,177,340,2794,326,2984,2987,172,184,350,244,168,175,171,169,206,181,174,167,173,2334,2134,2546,2450,2862,2564,2835,1079,2544,2679,2691,1305,2235,2339,2389,2179,2895,2181,2812,2183,2727,2785,2933,2227,2629,2631,2633,2635,2637,2639,2641,2643,2645,2647,2649,2651,2653,2655,2365,2596,3053,3057,2211,2671,2675,2332,2142,2112,2702,2445,2170,2124,2102,2558,2357,2701,2769,2554,1613,2336,2411,2475,2471,2070,2790,2808,2435,2405,2275,2309,2469,2798,2266,2273,2312,1324,2146,2148,2150,2566,2082,2536,2132,2166,1040,2283,1571,1223,1537,1839,1501,1837,1239,1298,1184,1190,1314,1023,2676,2684,2722,2757,1046,2657,2693,1370,1178,2813,1318,1115,1372,2538,144,142,141,139,138,137,134,130,126,125,121,116,109,920,613,532,531,530,529,960,639,957,793,625,867,988,621,626,921,652,641,601,781,757,754,687,714,514,478,738,623,874,425,656,654,690,1004,630,881,880,718,646,644,627,500,890,415,657,624,591,875,694,622,555,498,509,501,439,585,540,469,430,544,676,399,569,136,583,710,650,912,631,489,740,949,879,783,896,722,720,648,647,485,741,798,750,800,619,494,708,706,792,620,924,353,878,716,819,758,782,751,577,636,454,991,458,426,483,507,473,517,541,545,462,387,480,702,118,713,712,642,923,764,761,162,161,160,152,122,119,791,442,827,770,801,163,148,811,680,581,739,780,484,658,980,481,795,496,468,471,537,539,437,548,133,131,124,129,128,123,3,2,39,13,22,117,143,135,132,357,474,562,873,902,981,418,853,900,704,662,660,491,488,825,954,520,354,686,1009])).
% 14.42/14.47 cnf(3121,plain,
% 14.42/14.47 (~P10(f37(f37(f41(f19(x31211,x31212),f29(f43(x31212,a2))),f29(f43(x31212,a2)),x31212),f29(f43(x31213,a2)),x31213),f39(x31214,f37(f28(f41(x31214,f41(f25(f37(f37(f41(f19(x31211,x31212),f29(f43(x31212,a2))),f29(f43(x31212,a2)),x31212),f29(f43(x31213,a2)),x31213),f19(x31211,x31212),x31213,x31215),f41(f19(x31211,x31212),f37(f41(f19(x31211,x31212),f29(f43(x31212,a2))),f29(f43(x31212,a2)),x31212))))),f29(f43(x31216,a2)),x31216),x31213,x31216),f43(x31213,a2))),
% 14.42/14.47 inference(scs_inference,[],[192,179,185,323,324,261,217,3065,258,265,257,243,252,235,236,291,186,269,2766,2868,2883,247,222,271,2706,272,336,2921,195,183,188,197,2740,2776,2821,2889,342,2734,2859,227,234,212,2782,2793,2863,347,2752,240,314,3032,219,220,2672,348,343,2692,2844,344,270,2763,2991,3016,170,201,2737,2803,2906,182,330,255,349,286,2683,2721,2756,1019,231,194,2741,2890,2925,177,340,2794,326,2984,2987,172,184,350,244,168,175,171,169,206,2680,181,174,167,173,1263,2334,2134,2038,2546,2450,2862,2564,2835,1079,2544,2679,2691,1305,2235,2339,2389,2179,2895,2181,2812,2183,2727,2785,2933,2227,2629,2631,2633,2635,2637,2639,2641,2643,2645,2647,2649,2651,2653,2655,2365,2596,3053,3057,2211,2671,2675,2332,2142,2112,2702,2445,2170,2124,2102,2558,2357,2701,2769,2554,1613,2336,2411,2475,2471,2070,2790,2808,2435,2405,2275,2309,2469,2798,2266,2273,2312,1324,2146,2148,2150,2566,2082,2536,2132,2166,1040,2283,1571,1223,1537,1839,1501,1837,1239,1298,1184,1190,1314,1023,2676,2684,2722,2757,1046,2657,2693,1370,1178,2813,1318,1115,1372,2538,144,142,141,139,138,137,134,130,126,125,121,116,109,920,613,532,531,530,529,960,639,957,793,625,867,988,621,626,921,652,641,601,781,757,754,687,714,514,478,738,623,874,425,656,654,690,1004,630,881,880,718,646,644,627,500,890,415,657,624,591,875,694,622,555,498,509,501,439,585,540,469,430,544,676,399,569,136,583,710,650,912,631,489,740,949,879,783,896,722,720,648,647,485,741,798,750,800,619,494,708,706,792,620,924,353,878,716,819,758,782,751,577,636,454,991,458,426,483,507,473,517,541,545,462,387,480,702,118,713,712,642,923,764,761,162,161,160,152,122,119,791,442,827,770,801,163,148,811,680,581,739,780,484,658,980,481,795,496,468,471,537,539,437,548,133,131,124,129,128,123,3,2,39,13,22,117,143,135,132,357,474,562,873,902,981,418,853,900,704,662,660,491,488,825,954,520,354,686,1009,703,614,984,987])).
% 14.42/14.47 cnf(3123,plain,
% 14.42/14.47 (~P9(f4(f34(f43(a1,a2)),f29(f43(a1,a2)),f43(a1,a2)),a1)),
% 14.42/14.47 inference(scs_inference,[],[192,179,185,323,324,261,217,3065,258,265,257,243,252,235,236,291,186,269,2766,2868,2883,247,222,271,2706,272,336,2921,195,183,188,197,2740,2776,2821,2889,342,2734,2859,227,234,212,2782,2793,2863,347,2752,240,314,3032,219,220,2672,348,343,2692,2844,344,270,2763,2991,3016,170,201,2737,2803,2906,182,330,255,349,286,2683,2721,2756,1019,231,194,2741,2890,2925,177,340,2794,326,2984,2987,172,184,350,244,168,175,171,169,206,2680,181,174,167,173,1263,2334,2134,2038,2546,2450,2862,2564,2835,1079,2544,2679,2691,1305,2235,2339,2389,2179,2895,2181,2812,2183,2727,2785,2933,2227,2629,2631,2633,2635,2637,2639,2641,2643,2645,2647,2649,2651,2653,2655,2365,2596,3053,3057,2211,2671,2675,2332,2142,2112,2702,2445,2170,2124,2102,2558,2357,2701,2769,2554,1613,2336,2411,2475,2471,2070,2790,2808,2435,2405,2275,2309,2469,2798,2266,2273,2312,1324,2146,2148,2150,2566,2082,2536,2132,2166,1040,2283,1571,1223,1537,1839,1501,1837,1239,1298,1184,1190,1314,1023,2676,2684,2722,2757,1046,2657,2693,1370,1178,2813,1318,1115,1372,2538,144,142,141,139,138,137,134,130,126,125,121,116,109,920,613,532,531,530,529,960,639,957,793,625,867,988,621,626,921,652,641,601,781,757,754,687,714,514,478,738,623,874,425,656,654,690,1004,630,881,880,718,646,644,627,500,890,415,657,624,591,875,694,622,555,498,509,501,439,585,540,469,430,544,676,399,569,136,583,710,650,912,631,489,740,949,879,783,896,722,720,648,647,485,741,798,750,800,619,494,708,706,792,620,924,353,878,716,819,758,782,751,577,636,454,991,458,426,483,507,473,517,541,545,462,387,480,702,118,713,712,642,923,764,761,162,161,160,152,122,119,791,442,827,770,801,163,148,811,680,581,739,780,484,658,980,481,795,496,468,471,537,539,437,548,133,131,124,129,128,123,3,2,39,13,22,117,143,135,132,357,474,562,873,902,981,418,853,900,704,662,660,491,488,825,954,520,354,686,1009,703,614,984,987,699])).
% 14.42/14.47 cnf(3130,plain,
% 14.42/14.47 (P10(f41(f41(f32(a1),f26(a1)),x31301),x31302,a1)),
% 14.42/14.47 inference(scs_inference,[],[192,179,185,323,324,261,217,3065,258,265,257,243,252,235,236,291,186,269,2766,2868,2883,247,222,271,2706,272,336,2921,195,183,188,197,2740,2776,2821,2889,342,2734,2859,227,234,212,2782,2793,2863,347,2752,240,314,3032,219,220,2672,348,343,2692,2844,344,270,2763,2991,3016,170,201,2737,2803,2906,182,330,255,349,286,2683,2721,2756,1019,231,194,2741,2890,2925,177,340,2794,326,2984,2987,172,184,350,244,168,175,171,169,206,2680,181,174,167,173,1263,2334,2134,2038,2546,2450,2862,2564,2835,1079,2544,2679,2691,1305,2235,2751,2574,2339,2389,2179,2895,2181,2812,2183,2727,2785,2933,2227,2629,2631,2633,2635,2637,2639,2641,2643,2645,2647,2649,2651,2653,2655,2365,2596,3053,3057,2211,2671,2675,2332,2142,2112,2702,2445,2170,2124,2102,2558,2357,2701,2769,2554,1613,2336,2411,2475,2471,2070,2790,2808,2435,2405,2275,2309,2469,2798,2266,2273,2312,1324,2146,2148,2150,2566,2082,2536,2132,2166,1040,2283,1571,1223,1537,1839,1501,1837,1239,1298,1184,1190,1314,1023,2676,2684,2722,2757,1046,2657,2693,1370,1178,2813,1318,1115,1372,2538,144,142,141,139,138,137,134,130,126,125,121,116,109,920,613,532,531,530,529,960,639,957,793,625,867,988,621,626,921,652,641,601,781,757,754,687,714,514,478,738,623,874,425,656,654,690,1004,630,881,880,718,646,644,627,500,890,415,657,624,591,875,694,622,555,498,509,501,439,585,540,469,430,544,676,399,569,136,583,710,650,912,631,489,740,949,879,783,896,722,720,648,647,485,741,798,750,800,619,494,708,706,792,620,924,353,878,716,819,758,782,751,577,636,454,991,458,426,483,507,473,517,541,545,462,387,480,702,118,713,712,642,923,764,761,162,161,160,152,122,119,791,442,827,770,801,163,148,811,680,581,739,780,484,658,980,481,795,496,468,471,537,539,437,548,133,131,124,129,128,123,3,2,39,13,22,117,143,135,132,357,474,562,873,902,981,418,853,900,704,662,660,491,488,825,954,520,354,686,1009,703,614,984,987,699,831,518])).
% 14.42/14.47 cnf(3136,plain,
% 14.42/14.47 (P12(f37(x31361,f39(x31362,f29(f43(x31363,a2)),f38(a48,a45,a3,a42),x31363),f38(a48,a45,a3,a42)),f37(f27(f27(f28(x31361),f43(x31364,a2)),f43(x31364,a2)),f34(f43(f38(a48,a45,a3,a42),a2)),f38(a48,a45,a3,a42)),f43(f38(a48,a45,a3,a42),a2))),
% 14.42/14.47 inference(scs_inference,[],[192,179,185,323,324,261,217,3065,258,265,257,243,252,235,236,291,186,269,2766,2868,2883,247,222,271,2706,272,336,2921,195,183,188,197,2740,2776,2821,2889,342,2734,2859,227,234,212,2782,2793,2863,347,2752,240,314,3032,219,220,2672,348,343,2692,2844,344,270,2763,2991,3016,170,201,2737,2803,2906,182,330,255,349,286,2683,2721,2756,1019,231,194,2741,2890,2925,177,340,2794,326,2984,2987,172,184,350,244,168,175,171,169,206,2680,181,174,167,173,1263,2334,2134,2038,2215,2546,2450,2862,2564,2835,1079,2544,2679,2691,1305,2235,2751,2574,2339,2389,2179,2895,2181,2812,2183,2727,2785,2933,2227,2629,2631,2633,2635,2637,2639,2641,2643,2645,2647,2649,2651,2653,2655,2365,2596,3053,3057,2590,2211,2671,2675,2531,2332,2142,2112,2702,2445,2170,2124,2102,2558,2357,2701,2769,2554,1613,2336,2411,2475,2471,2070,2790,2808,2435,2405,2275,2309,2469,2798,2266,2273,2312,1324,2146,2148,2150,2566,2082,2536,2132,2166,1040,2283,1571,1223,1537,1839,1501,1837,1239,1298,1184,1190,1314,1023,2676,2684,2722,2757,1046,2657,2693,1370,1178,2813,1318,1115,1372,2538,144,142,141,139,138,137,134,130,126,125,121,116,109,920,613,532,531,530,529,960,639,957,793,625,867,988,621,626,921,652,641,601,781,757,754,687,714,514,478,738,623,874,425,656,654,690,1004,630,881,880,718,646,644,627,500,890,415,657,624,591,875,694,622,555,498,509,501,439,585,540,469,430,544,676,399,569,136,583,710,650,912,631,489,740,949,879,783,896,722,720,648,647,485,741,798,750,800,619,494,708,706,792,620,924,353,878,716,819,758,782,751,577,636,454,991,458,426,483,507,473,517,541,545,462,387,480,702,118,713,712,642,923,764,761,162,161,160,152,122,119,791,442,827,770,801,163,148,811,680,581,739,780,484,658,980,481,795,496,468,471,537,539,437,548,133,131,124,129,128,123,3,2,39,13,22,117,143,135,132,357,474,562,873,902,981,418,853,900,704,662,660,491,488,825,954,520,354,686,1009,703,614,984,987,699,831,518,877,973,833])).
% 14.42/14.47 cnf(3138,plain,
% 14.42/14.47 (~P9(f34(f43(a1,a2)),f41(f41(f31(f43(x31381,a2)),a1),f29(f43(x31381,a2))))),
% 14.42/14.47 inference(scs_inference,[],[192,179,185,323,324,261,217,3065,258,265,257,243,252,235,236,291,186,269,2766,2868,2883,247,222,271,2706,272,336,2921,195,183,188,197,2740,2776,2821,2889,342,2734,2859,227,234,212,2782,2793,2863,347,2752,240,314,3032,219,220,2672,348,343,2692,2844,344,270,2763,2991,3016,170,201,2737,2803,2906,182,330,255,349,286,2683,2721,2756,1019,231,194,2741,2890,2925,177,340,2794,326,2984,2987,172,184,350,244,168,175,171,169,206,2680,181,174,167,173,1263,2334,2134,2038,2215,2546,2450,2862,2564,2835,1079,2544,2679,2691,1305,2235,2751,2574,2339,2389,2179,2895,2181,2812,2183,2727,2785,2933,2227,2629,2631,2633,2635,2637,2639,2641,2643,2645,2647,2649,2651,2653,2655,2365,2596,3053,3057,2590,2211,2671,2675,2531,2332,2142,2112,2702,2445,2170,2124,2102,2558,2357,2701,2769,2554,1613,2336,2411,2475,2471,2070,2790,2808,2435,2405,2275,2309,2469,2798,2266,2273,2312,1324,2146,2148,2150,2566,2082,2536,2132,2166,1040,2283,1571,1223,1537,1839,1501,1837,1239,1298,1184,1190,1314,1023,2676,2684,2722,2757,1046,2657,2693,1370,1178,2813,1318,1115,1372,2538,144,142,141,139,138,137,134,130,126,125,121,116,109,920,613,532,531,530,529,960,639,957,793,625,867,988,621,626,921,652,641,601,781,757,754,687,714,514,478,738,623,874,425,656,654,690,1004,630,881,880,718,646,644,627,500,890,415,657,624,591,875,694,622,555,498,509,501,439,585,540,469,430,544,676,399,569,136,583,710,650,912,631,489,740,949,879,783,896,722,720,648,647,485,741,798,750,800,619,494,708,706,792,620,924,353,878,716,819,758,782,751,577,636,454,991,458,426,483,507,473,517,541,545,462,387,480,702,118,713,712,642,923,764,761,162,161,160,152,122,119,791,442,827,770,801,163,148,811,680,581,739,780,484,658,980,481,795,496,468,471,537,539,437,548,133,131,124,129,128,123,3,2,39,13,22,117,143,135,132,357,474,562,873,902,981,418,853,900,704,662,660,491,488,825,954,520,354,686,1009,703,614,984,987,699,831,518,877,973,833,149])).
% 14.42/14.47 cnf(3159,plain,
% 14.42/14.47 (E(x31591,f41(f41(f36(a1),x31591),x31591))),
% 14.42/14.47 inference(rename_variables,[],[2227])).
% 14.42/14.47 cnf(3162,plain,
% 14.42/14.47 (P16(x31621,f34(f43(x31622,a2)),x31623)),
% 14.42/14.47 inference(rename_variables,[],[2743])).
% 14.42/14.47 cnf(3164,plain,
% 14.42/14.47 (~P9(f41(f41(f31(f43(f41(f41(f31(f43(x31641,a2)),a1),f29(f43(x31641,a2))),a2)),f34(f43(a1,a2))),x31642),f41(f41(f31(f43(x31641,a2)),a1),f29(f43(x31641,a2))))),
% 14.42/14.47 inference(scs_inference,[],[2743,3138,3113,2227,1794,1012,835])).
% 14.42/14.47 cnf(3173,plain,
% 14.42/14.47 (~P34(f41(f37(f29(f43(x31731,a2)),f29(f43(x31732,a2)),x31733),f34(f43(x31731,a2))))),
% 14.42/14.47 inference(rename_variables,[],[2189])).
% 14.42/14.47 cnf(3174,plain,
% 14.42/14.47 (P10(x31741,f41(f41(f31(f43(x31742,a2)),x31743),x31741),f43(x31742,a2))),
% 14.42/14.47 inference(rename_variables,[],[269])).
% 14.42/14.47 cnf(3175,plain,
% 14.42/14.47 (P9(x31751,a2)),
% 14.42/14.47 inference(rename_variables,[],[1023])).
% 14.42/14.47 cnf(3176,plain,
% 14.42/14.47 (P34(f41(f37(x31761,x31762,x31763),x31761))),
% 14.42/14.47 inference(rename_variables,[],[244])).
% 14.42/14.47 cnf(3179,plain,
% 14.42/14.47 (P9(x31791,a2)),
% 14.42/14.47 inference(rename_variables,[],[1023])).
% 14.42/14.47 cnf(3183,plain,
% 14.42/14.47 (E(x31831,f41(f41(f32(a2),x31831),x31831))),
% 14.42/14.47 inference(rename_variables,[],[2596])).
% 14.42/14.47 cnf(3185,plain,
% 14.42/14.47 (E(x31851,f41(f41(f32(a2),x31851),x31851))),
% 14.42/14.47 inference(rename_variables,[],[2596])).
% 14.42/14.47 cnf(3187,plain,
% 14.42/14.47 (E(x31871,f41(f41(f32(a2),x31871),x31871))),
% 14.42/14.47 inference(rename_variables,[],[2596])).
% 14.42/14.47 cnf(3189,plain,
% 14.42/14.47 (E(x31891,f41(f41(f32(a2),x31891),x31891))),
% 14.42/14.47 inference(rename_variables,[],[2596])).
% 14.42/14.47 cnf(3191,plain,
% 14.42/14.47 (P9(x31911,a2)),
% 14.42/14.47 inference(rename_variables,[],[1023])).
% 14.42/14.47 cnf(3195,plain,
% 14.42/14.47 (P10(f41(f41(f32(f43(x31951,a2)),x31952),x31953),x31953,f43(x31951,a2))),
% 14.42/14.47 inference(rename_variables,[],[271])).
% 14.42/14.47 cnf(3197,plain,
% 14.42/14.47 (P16(f41(f4(f19(x31971,x31972),f26(a1),a1),f29(f43(x31972,a2))),f38(f4(f19(x31971,x31972),f26(a1),a1),f4(f37(f37(f41(f19(x31971,x31972),f29(f43(x31972,a2))),f29(f43(x31972,a2)),x31972),f29(f43(x31973,a2)),x31973),f37(f29(f43(x31972,a2)),f29(f43(x31973,a2)),x31973),f43(x31973,a2)),x31973,x31974),x31974)),
% 14.42/14.47 inference(scs_inference,[],[1023,3175,3179,269,271,177,178,172,168,244,175,2743,3138,1798,3113,3123,3008,2189,2227,3159,2596,3183,3185,3187,2544,1794,1012,835,834,590,897,902,943,134,130,126,121,109,917,900,988])).
% 14.42/14.47 cnf(3202,plain,
% 14.42/14.47 (P9(x32021,a2)),
% 14.42/14.47 inference(rename_variables,[],[1023])).
% 14.42/14.47 cnf(3203,plain,
% 14.42/14.47 (E(f41(f41(f31(f43(x32031,a2)),f29(f43(x32031,a2))),x32032),x32032)),
% 14.42/14.47 inference(rename_variables,[],[245])).
% 14.42/14.47 cnf(3204,plain,
% 14.42/14.47 (P16(x32041,f41(f41(f32(f43(x32042,a2)),f41(f41(f31(f43(x32042,a2)),x32043),f37(x32041,x32044,x32042))),f41(f41(f31(f43(x32042,a2)),x32043),f37(x32041,x32044,x32042))),x32042)),
% 14.42/14.47 inference(rename_variables,[],[3000])).
% 14.42/14.47 cnf(3207,plain,
% 14.42/14.47 (~P34(f41(f37(f29(f43(x32071,a2)),f29(f43(x32072,a2)),x32073),f34(f43(x32071,a2))))),
% 14.42/14.47 inference(rename_variables,[],[2189])).
% 14.42/14.47 cnf(3208,plain,
% 14.42/14.47 (P10(x32081,f41(f41(f31(f43(x32082,a2)),x32083),x32081),f43(x32082,a2))),
% 14.42/14.47 inference(rename_variables,[],[269])).
% 14.42/14.47 cnf(3209,plain,
% 14.42/14.47 (P9(x32091,a2)),
% 14.42/14.47 inference(rename_variables,[],[1023])).
% 14.42/14.47 cnf(3210,plain,
% 14.42/14.47 (P34(f41(f37(x32101,x32102,x32103),x32101))),
% 14.42/14.47 inference(rename_variables,[],[244])).
% 14.42/14.47 cnf(3216,plain,
% 14.42/14.47 (E(f41(f41(f31(f43(x32161,a2)),f29(f43(x32161,a2))),x32162),x32162)),
% 14.42/14.47 inference(rename_variables,[],[245])).
% 14.42/14.47 cnf(3217,plain,
% 14.42/14.47 (~P12(f41(f41(f31(f43(x32171,a1)),f41(f36(a1),f28(f41(x32172,x32173)))),x32174),x32172,f43(x32171,a1))),
% 14.42/14.47 inference(scs_inference,[],[245,3203,1023,3175,3179,3191,3202,269,3174,271,186,197,177,178,172,168,244,3176,175,169,3000,2743,3138,2768,1798,3113,2936,3123,3008,2189,3173,2227,3159,2596,3183,3185,3187,2544,1370,1794,1012,835,834,590,897,902,943,134,130,126,121,109,917,900,988,793,853,621,120,493])).
% 14.42/14.47 cnf(3219,plain,
% 14.42/14.47 (P10(f41(f41(f32(f43(x32191,a1)),x32192),x32193),f41(f41(f31(f43(x32191,a1)),x32193),x32194),f43(x32191,a1))),
% 14.42/14.47 inference(scs_inference,[],[245,3203,1023,3175,3179,3191,3202,269,3174,271,186,197,177,178,172,168,244,3176,175,169,3000,2743,3138,2114,2116,2768,1798,3113,2936,3123,3008,2189,3173,2227,3159,2596,3183,3185,3187,2544,1370,1794,1012,835,834,590,897,902,943,134,130,126,121,109,917,900,988,793,853,621,120,493,626])).
% 14.42/14.47 cnf(3223,plain,
% 14.42/14.47 (~P12(x32231,f41(f41(f36(f41(f41(f36(a1),a1),a1)),x32231),x32231),f41(f41(f36(a1),a1),a1))),
% 14.42/14.47 inference(scs_inference,[],[245,3203,1023,3175,3179,3191,3202,269,3174,271,186,197,177,178,172,168,244,3176,175,169,3087,3000,2648,2743,3138,2114,2116,2768,1798,3113,2936,3123,3008,2189,3173,2227,3159,2596,3183,3185,3187,2544,1370,1794,1012,835,834,590,897,902,943,134,130,126,121,109,917,900,988,793,853,621,120,493,626,779])).
% 14.42/14.47 cnf(3235,plain,
% 14.42/14.47 (P12(f41(f41(f36(a1),f28(f28(f34(a2)))),f34(a2)),f41(f41(f31(a2),f34(a2)),x32351),a2)),
% 14.42/14.47 inference(scs_inference,[],[245,3203,1023,3175,3179,3191,3202,269,3174,271,186,342,170,197,177,178,183,184,172,168,244,3176,175,169,3087,2144,3000,3073,2985,2648,2743,3138,2114,2116,2768,1798,3113,2936,1326,3123,2947,3008,3109,2189,3173,2227,3159,2596,3183,3185,3187,3189,2544,1370,1794,1012,835,834,590,897,902,943,134,130,126,121,109,917,900,988,793,853,621,120,493,626,779,144,139,116,1009,738,674,625])).
% 14.42/14.47 cnf(3236,plain,
% 14.42/14.47 (P10(x32361,f41(f41(f31(a2),x32361),x32362),a2)),
% 14.42/14.47 inference(rename_variables,[],[1326])).
% 14.42/14.47 cnf(3239,plain,
% 14.42/14.47 (P10(x32391,f41(f41(f31(f43(x32392,a2)),x32393),x32391),f43(x32392,a2))),
% 14.42/14.47 inference(rename_variables,[],[269])).
% 14.42/14.47 cnf(3242,plain,
% 14.42/14.47 (P10(x32421,f28(x32421),a1)),
% 14.42/14.47 inference(rename_variables,[],[1017])).
% 14.42/14.47 cnf(3245,plain,
% 14.42/14.47 (~P10(f28(x32451),f41(f41(f35(a1),x32452),x32451),a1)),
% 14.42/14.47 inference(rename_variables,[],[2152])).
% 14.42/14.47 cnf(3246,plain,
% 14.42/14.47 (P10(f28(f41(f41(f32(a1),f26(a1)),x32461)),f28(x32462),a1)),
% 14.42/14.47 inference(rename_variables,[],[2951])).
% 14.42/14.47 cnf(3248,plain,
% 14.42/14.47 (P12(x32481,f28(f28(f28(f28(f28(f41(f41(f36(a1),x32481),x32482)))))),a1)),
% 14.42/14.47 inference(scs_inference,[],[245,3203,1023,3175,3179,3191,3202,269,3174,3208,271,186,342,170,197,177,178,183,1017,184,172,168,244,3176,175,169,167,173,3087,2144,3000,3073,2985,2648,2743,3138,2114,2116,2768,2792,1798,3113,3028,2951,2936,1326,2152,3123,2947,3008,3109,2189,3173,2227,3159,2596,3183,3185,3187,3189,2544,1370,1794,1012,835,834,590,897,902,943,134,130,126,121,109,917,900,988,793,853,621,120,493,626,779,144,139,116,1009,738,674,625,520,718,514,714])).
% 14.42/14.47 cnf(3249,plain,
% 14.42/14.47 (P12(x32491,f28(f28(f28(f28(f28(x32491))))),a1)),
% 14.42/14.47 inference(rename_variables,[],[3028])).
% 14.42/14.47 cnf(3251,plain,
% 14.42/14.47 (~P9(f38(f41(f36(a1),x32511),f34(f43(x32512,a2)),x32512,a1),a1)),
% 14.42/14.47 inference(scs_inference,[],[245,3203,1023,3175,3179,3191,3202,269,3174,3208,271,186,342,170,197,286,177,178,183,1017,184,172,168,244,3176,175,169,167,173,3087,2144,3000,3073,2985,2648,2743,3138,2114,2116,2768,2792,1798,3113,3028,2951,2936,1326,2061,2152,3123,2947,3008,3109,2189,3173,2227,3159,2596,3183,3185,3187,3189,2544,1370,1794,1012,835,834,590,897,902,943,134,130,126,121,109,917,900,988,793,853,621,120,493,626,779,144,139,116,1009,738,674,625,520,718,514,714,591])).
% 14.42/14.47 cnf(3253,plain,
% 14.42/14.47 (P16(f41(x32531,x32532),f38(x32531,f34(f43(x32533,a2)),x32533,x32534),x32534)),
% 14.42/14.47 inference(rename_variables,[],[286])).
% 14.42/14.47 cnf(3258,plain,
% 14.42/14.47 (P10(x32581,f34(f43(x32582,a2)),f43(x32582,a2))),
% 14.42/14.47 inference(rename_variables,[],[219])).
% 14.42/14.47 cnf(3264,plain,
% 14.42/14.47 (P19(f43(x32641,a1))),
% 14.42/14.47 inference(rename_variables,[],[1368])).
% 14.42/14.47 cnf(3272,plain,
% 14.42/14.47 (~P10(f41(f41(f31(f43(x32721,a1)),f41(f36(a1),f28(f41(x32722,x32723)))),x32724),x32722,f43(x32721,a1))),
% 14.42/14.47 inference(rename_variables,[],[2768])).
% 14.42/14.47 cnf(3277,plain,
% 14.42/14.47 (~P10(f28(f37(x32771,f37(x32772,x32773,x32774),x32774)),f37(x32772,f37(x32771,x32773,x32774),x32774),a1)),
% 14.42/14.47 inference(scs_inference,[],[245,3203,1023,3175,3179,3191,3202,269,3174,3208,271,186,342,170,197,219,286,231,177,178,183,1017,184,172,168,244,3176,175,171,169,167,173,3087,2144,3091,3000,3073,2985,2648,2743,3138,2114,2116,2118,2768,2792,1798,3113,3054,3028,2951,2936,1326,2061,2152,2710,3123,2947,3008,3109,2189,3173,1368,1342,2227,3159,2596,3183,3185,3187,3189,2544,1366,1370,1794,1012,835,834,590,897,902,943,134,130,126,121,109,917,900,988,793,853,621,120,493,626,779,144,139,116,1009,738,674,625,520,718,514,714,591,881,694,445,627,415,500,478,624,544])).
% 14.42/14.47 cnf(3288,plain,
% 14.42/14.47 (P10(f4(f41(f41(f32(a1),x32881),x32882),x32883,a1),x32882,a1)),
% 14.42/14.47 inference(scs_inference,[],[245,3203,1023,3175,3179,3191,3202,269,3174,3208,271,186,342,348,170,197,219,286,231,177,178,183,1017,184,227,172,168,244,3176,175,171,169,167,174,173,3087,2144,3091,3000,3073,2985,2704,2648,2743,3138,2114,2116,2118,2768,2792,1798,3113,3054,3028,2951,2919,2936,1326,2061,2152,2710,3123,2947,3008,3109,2189,3173,1368,1217,1342,2227,3159,2596,3183,3185,3187,3189,2544,1366,1370,1794,1012,835,834,590,897,902,943,134,130,126,121,109,917,900,988,793,853,621,120,493,626,779,144,139,116,1009,738,674,625,520,718,514,714,591,881,694,445,627,415,500,478,624,544,430,354,583,710])).
% 14.42/14.47 cnf(3289,plain,
% 14.42/14.47 (P10(f4(x32891,x32892,a1),x32891,a1)),
% 14.42/14.47 inference(rename_variables,[],[227])).
% 14.42/14.47 cnf(3292,plain,
% 14.42/14.47 (~P12(f28(x32921),x32921,a1)),
% 14.42/14.47 inference(rename_variables,[],[1015])).
% 14.42/14.47 cnf(3294,plain,
% 14.42/14.47 (P10(f41(x32941,x32942),f41(f41(f41(f31(f43(x32943,a2)),x32944),x32941),x32942),a2)),
% 14.42/14.47 inference(scs_inference,[],[245,3203,1015,1023,3175,3179,3191,3202,269,3174,3208,3239,271,186,342,348,170,197,219,286,231,177,178,183,1017,184,227,172,168,244,3176,175,171,169,167,174,173,3087,2144,3091,3000,3073,2985,2704,2648,2743,3138,2114,2116,2118,2768,2792,1798,3113,3054,3028,2951,2919,2936,1326,2061,2152,2710,3123,2947,3008,3109,2189,3173,1368,1217,1342,2227,3159,2596,3183,3185,3187,3189,2544,1366,1370,1794,1012,835,834,590,897,902,943,134,130,126,121,109,917,900,988,793,853,621,120,493,626,779,144,139,116,1009,738,674,625,520,718,514,714,591,881,694,445,627,415,500,478,624,544,430,354,583,710,641,631])).
% 14.42/14.47 cnf(3297,plain,
% 14.42/14.47 (P10(x32971,f41(f41(f31(f43(x32972,a2)),x32973),x32971),f43(x32972,a2))),
% 14.42/14.47 inference(rename_variables,[],[269])).
% 14.42/14.47 cnf(3302,plain,
% 14.42/14.47 (P10(x33021,f41(f41(f31(f43(x33022,a2)),x33023),x33021),f43(x33022,a2))),
% 14.42/14.47 inference(rename_variables,[],[269])).
% 14.42/14.47 cnf(3308,plain,
% 14.42/14.47 (P10(x33081,f41(f41(f36(f41(f41(f36(a1),a1),a1)),f41(f41(f36(f41(f41(f36(a1),a1),a1)),x33082),f41(f41(f36(f41(f41(f36(a1),a1),a1)),x33081),x33083))),x33084),f41(f41(f36(a1),a1),a1))),
% 14.42/14.47 inference(scs_inference,[],[245,3203,1015,1023,3175,3179,3191,3202,269,3174,3208,3239,3297,271,186,342,348,170,197,219,286,3253,231,177,178,183,1017,184,227,172,168,244,3176,175,171,169,167,174,173,3087,2144,2874,3091,3000,2800,3073,2985,2704,2917,2648,2743,3138,2114,2116,2118,2768,2792,1798,3113,3054,3028,2951,2919,2936,1326,2061,2152,2710,3123,2947,3008,3109,2189,3173,1368,1217,1342,2227,3159,2596,3183,3185,3187,3189,2544,1366,1370,1794,1012,835,834,590,897,902,943,134,130,126,121,109,917,900,988,793,853,621,120,493,626,779,144,139,116,1009,738,674,625,520,718,514,714,591,881,694,445,627,415,500,478,624,544,430,354,583,710,641,631,740,601,949,783,425,722])).
% 14.42/14.47 cnf(3309,plain,
% 14.42/14.47 (P10(x33091,f41(f41(f36(f41(f41(f36(a1),a1),a1)),f41(f41(f36(f41(f41(f36(a1),a1),a1)),x33092),x33091)),x33093),f41(f41(f36(a1),a1),a1))),
% 14.42/14.47 inference(rename_variables,[],[2874])).
% 14.42/14.47 cnf(3312,plain,
% 14.42/14.47 (~P12(x33121,f4(x33121,x33122,a1),a1)),
% 14.42/14.47 inference(rename_variables,[],[1025])).
% 14.42/14.47 cnf(3315,plain,
% 14.42/14.47 (~P12(x33151,f4(x33151,x33152,a1),a1)),
% 14.42/14.47 inference(rename_variables,[],[1025])).
% 14.42/14.47 cnf(3318,plain,
% 14.42/14.47 (~P10(f28(f28(f28(f28(f28(x33181))))),x33181,a1)),
% 14.42/14.47 inference(rename_variables,[],[3039])).
% 14.42/14.47 cnf(3321,plain,
% 14.42/14.47 (P10(f41(f41(f32(f43(x33211,a2)),x33212),x33213),x33213,f43(x33211,a2))),
% 14.42/14.47 inference(rename_variables,[],[271])).
% 14.42/14.47 cnf(3325,plain,
% 14.42/14.47 (~P10(f34(f43(f38(a48,a45,a3,a42),a2)),f41(f41(f32(f43(f38(a48,a45,a3,a42),a2)),x33251),f41(f41(f31(f43(f38(a48,a45,a3,a42),a2)),f37(x33252,f29(f43(f38(a48,a45,a3,a42),a2)),f38(a48,a45,a3,a42))),f39(x33253,f29(f43(x33254,a2)),f38(a48,a45,a3,a42),x33254))),f43(f38(a48,a45,a3,a42),a2))),
% 14.42/14.47 inference(scs_inference,[],[1025,3312,245,3203,1015,1023,3175,3179,3191,3202,269,3174,3208,3239,3297,3302,271,3195,186,342,348,170,197,219,286,3253,231,177,178,183,1017,184,227,172,168,244,3176,175,171,169,167,174,173,3087,2144,2874,3091,3000,2800,3073,2985,2704,2917,2648,2743,3138,2114,2116,2118,2768,2792,1798,3113,3054,3028,3039,2951,2919,2936,1326,2061,2152,2710,3123,2947,3008,3109,2189,3173,1368,1217,1342,2227,3159,2596,3183,3185,3187,3189,2544,1366,1370,1794,1012,835,834,590,897,902,943,134,130,126,121,109,917,900,988,793,853,621,120,493,626,779,144,139,116,1009,738,674,625,520,718,514,714,591,881,694,445,627,415,500,478,624,544,430,354,583,710,641,631,740,601,949,783,425,722,656,654,652,741,880,878])).
% 14.42/14.47 cnf(3328,plain,
% 14.42/14.47 (P10(f4(x33281,x33282,a1),x33281,a1)),
% 14.42/14.47 inference(rename_variables,[],[227])).
% 14.42/14.47 cnf(3331,plain,
% 14.42/14.47 (~P10(f41(f41(f31(f43(x33311,a1)),f41(f36(a1),f28(f41(x33312,x33313)))),x33314),x33312,f43(x33311,a1))),
% 14.42/14.47 inference(rename_variables,[],[2768])).
% 14.42/14.47 cnf(3333,plain,
% 14.42/14.47 (~P12(f41(f41(f36(f41(f41(f36(a1),a1),a1)),x33331),x33332),x33332,f41(f41(f36(a1),a1),a1))),
% 14.42/14.47 inference(scs_inference,[],[1025,3312,245,3203,1015,1023,3175,3179,3191,3202,269,3174,3208,3239,3297,3302,271,3195,186,342,348,170,197,219,286,3253,231,177,178,183,1017,184,227,3289,172,168,244,3176,175,171,169,167,174,173,3087,2144,2874,3091,3000,2800,3073,2985,2704,2917,2648,2743,3138,2114,2116,2118,2768,3272,2792,1798,3113,3054,3028,3039,2951,2919,2936,1326,2061,2152,2710,3123,2947,3008,3109,2189,3173,1368,1217,1342,2227,3159,2596,3183,3185,3187,3189,2544,1366,1370,1372,1794,1012,835,834,590,897,902,943,134,130,126,121,109,917,900,988,793,853,621,120,493,626,779,144,139,116,1009,738,674,625,520,718,514,714,591,881,694,445,627,415,500,478,624,544,430,354,583,710,641,631,740,601,949,783,425,722,656,654,652,741,880,878,708,647,644])).
% 14.42/14.47 cnf(3334,plain,
% 14.42/14.47 (~P12(x33341,x33341,f41(f41(f36(a1),a1),a1))),
% 14.42/14.47 inference(rename_variables,[],[3087])).
% 14.42/14.47 cnf(3350,plain,
% 14.42/14.47 (~P12(x33501,f4(x33501,x33502,a1),a1)),
% 14.42/14.47 inference(rename_variables,[],[1025])).
% 14.42/14.47 cnf(3359,plain,
% 14.42/14.47 (~P12(x33591,x33591,a1)),
% 14.42/14.47 inference(rename_variables,[],[336])).
% 14.42/14.47 cnf(3363,plain,
% 14.42/14.47 (P10(x33631,f41(f41(f31(f43(x33632,a2)),x33633),x33631),f43(x33632,a2))),
% 14.42/14.47 inference(rename_variables,[],[269])).
% 14.42/14.47 cnf(3367,plain,
% 14.42/14.47 (P10(x33671,f41(f41(f35(a1),x33671),f28(x33671)),a1)),
% 14.42/14.47 inference(rename_variables,[],[2923])).
% 14.42/14.47 cnf(3368,plain,
% 14.42/14.47 (P10(f41(f41(f35(a1),x33681),x33682),x33681,a1)),
% 14.42/14.47 inference(rename_variables,[],[1184])).
% 14.42/14.47 cnf(3376,plain,
% 14.42/14.47 (~P10(f28(f28(f4(f28(f26(a1)),f26(a1),a1))),f4(f28(f26(a1)),f28(f26(a1)),a1),a1)),
% 14.42/14.47 inference(scs_inference,[],[192,1025,3312,3315,245,3203,1015,237,1023,3175,3179,3191,3202,269,3174,3208,3239,3297,3302,271,3195,336,186,342,348,170,197,219,3258,286,3253,231,177,178,240,183,1017,3242,184,227,3289,172,168,244,3176,175,171,169,167,174,173,2988,3087,3334,2144,2887,2874,3091,3000,2800,3073,2985,2704,2917,2648,2743,3138,2114,2116,2118,2768,3272,2914,2792,1798,2736,3113,3054,3028,3039,2951,2919,2923,2936,1326,3236,2061,2152,2710,2745,2078,3123,2947,3008,3109,2189,3173,1368,3264,1217,1917,1266,1342,2227,3159,2596,3183,3185,3187,3189,2544,1184,1366,1370,1372,1794,1012,835,834,590,897,902,943,134,130,126,121,109,917,900,988,793,853,621,120,493,626,779,144,139,116,1009,738,674,625,520,718,514,714,591,881,694,445,627,415,500,478,624,544,430,354,583,710,641,631,740,601,949,783,425,722,656,654,652,741,880,878,708,647,644,489,353,619,788,630,153,657,646,494,751,636,555,622,498,483])).
% 14.42/14.47 cnf(3382,plain,
% 14.42/14.47 (P10(f41(f41(f36(a1),x33821),f28(x33821)),f28(x33821),a1)),
% 14.42/14.47 inference(scs_inference,[],[192,1025,3312,3315,245,3203,1015,237,1023,3175,3179,3191,3202,269,3174,3208,3239,3297,3302,271,3195,336,186,342,348,170,197,219,3258,286,3253,194,231,177,178,240,183,1017,3242,184,227,3289,172,168,244,3176,175,171,169,167,174,173,2988,3087,3334,2144,2887,2874,3091,3000,2800,3073,2985,2704,2917,2648,2743,3138,2114,2116,2118,2768,3272,2914,2792,1798,2736,3113,3054,3028,3039,2951,2919,2464,2923,2936,1326,3236,2061,2152,3245,2710,2745,2078,3123,2947,3008,3109,2189,3173,1368,3264,1217,1917,1266,1342,2227,3159,2596,3183,3185,3187,3189,2544,1184,1366,1370,1372,1794,1012,835,834,590,897,902,943,134,130,126,121,109,917,900,988,793,853,621,120,493,626,779,144,139,116,1009,738,674,625,520,718,514,714,591,881,694,445,627,415,500,478,624,544,430,354,583,710,641,631,740,601,949,783,425,722,656,654,652,741,880,878,708,647,644,489,353,619,788,630,153,657,646,494,751,636,555,622,498,483,782,439])).
% 14.42/14.47 cnf(3394,plain,
% 14.42/14.47 (~P12(x33941,f4(x33941,x33942,a1),a1)),
% 14.42/14.47 inference(rename_variables,[],[1025])).
% 14.42/14.47 cnf(3408,plain,
% 14.42/14.47 (P10(f41(f41(f32(f43(x34081,a2)),x34082),x34083),x34083,f43(x34081,a2))),
% 14.42/14.47 inference(rename_variables,[],[271])).
% 14.42/14.47 cnf(3411,plain,
% 14.42/14.47 (P10(f41(f41(f32(f43(x34111,a2)),x34112),x34113),x34113,f43(x34111,a2))),
% 14.42/14.47 inference(rename_variables,[],[271])).
% 14.42/14.47 cnf(3413,plain,
% 14.42/14.47 (~P10(f34(f43(f38(a48,a45,a3,a42),a2)),f41(f41(f32(f43(f38(a48,a45,a3,a42),a2)),f41(f41(f31(f43(f38(a48,a45,a3,a42),a2)),f37(x34131,f29(f43(f38(a48,a45,a3,a42),a2)),f38(a48,a45,a3,a42))),f39(x34132,f29(f43(x34133,a2)),f38(a48,a45,a3,a42),x34133))),x34134),f43(f38(a48,a45,a3,a42),a2))),
% 14.42/14.47 inference(scs_inference,[],[192,1025,3312,3315,3350,245,3203,1015,237,1023,3175,3179,3191,3202,269,3174,3208,3239,3297,3302,271,3195,3321,3408,336,3359,186,342,347,348,170,197,219,3258,286,3253,194,231,177,178,240,183,1017,3242,184,227,3289,172,168,244,3176,175,171,169,167,174,173,2988,3087,3334,2144,2887,2874,3091,3000,2800,3073,2985,2704,2917,2648,2743,3138,2114,2116,2118,2768,3272,2914,2792,1798,2736,2712,3113,2784,3054,3028,3039,2951,3246,3046,3130,2919,2464,2923,2936,1326,3236,2061,2152,3245,2710,2745,2771,2078,3123,2947,3008,3109,2189,3173,1368,3264,1217,1917,1266,1342,2227,3159,2596,3183,3185,3187,3189,2544,1184,1366,1370,1372,1794,1012,835,834,590,897,902,943,134,130,126,121,109,917,900,988,793,853,621,120,493,626,779,144,139,116,1009,738,674,625,520,718,514,714,591,881,694,445,627,415,500,478,624,544,430,354,583,710,641,631,740,601,949,783,425,722,656,654,652,741,880,878,708,647,644,489,353,619,788,630,153,657,646,494,751,636,555,622,498,483,782,439,501,480,540,469,462,758,518,877,642,912,569,879])).
% 14.42/14.47 cnf(3415,plain,
% 14.42/14.47 (~P13(f19(x34151,x34152),f41(f41(f31(f43(x34153,a2)),x34154),f41(f41(f31(f43(x34153,a2)),f37(f29(f43(x34152,a2)),f37(f37(f41(f19(x34151,x34152),f29(f43(x34152,a2))),f29(f43(x34152,a2)),x34152),x34155,x34153),x34153)),x34156)),x34153,x34157)),
% 14.42/14.47 inference(scs_inference,[],[192,1025,3312,3315,3350,245,3203,1015,237,1023,3175,3179,3191,3202,269,3174,3208,3239,3297,3302,3363,271,3195,3321,3408,336,3359,186,342,347,348,170,197,219,3258,286,3253,194,231,177,178,240,183,1017,3242,184,227,3289,172,168,244,3176,175,171,169,167,174,173,2988,3087,3334,2144,2887,2874,1483,3091,3000,2800,3073,2985,2704,2917,2648,2743,3138,2114,2116,2118,2768,3272,2914,2792,1798,2736,2712,3113,2784,3054,3028,3039,2951,3246,3046,3130,2919,2464,2923,2936,1326,3236,2061,2152,3245,2710,2745,2771,2078,3123,2947,3008,3109,2189,3173,1368,3264,1217,1917,1266,1342,2227,3159,2596,3183,3185,3187,3189,2544,1184,1366,1370,1372,1794,1012,835,834,590,897,902,943,134,130,126,121,109,917,900,988,793,853,621,120,493,626,779,144,139,116,1009,738,674,625,520,718,514,714,591,881,694,445,627,415,500,478,624,544,430,354,583,710,641,631,740,601,949,783,425,722,656,654,652,741,880,878,708,647,644,489,353,619,788,630,153,657,646,494,751,636,555,622,498,483,782,439,501,480,540,469,462,758,518,877,642,912,569,879,896])).
% 14.42/14.47 cnf(3416,plain,
% 14.42/14.47 (P10(x34161,f41(f41(f31(f43(x34162,a2)),x34163),x34161),f43(x34162,a2))),
% 14.42/14.47 inference(rename_variables,[],[269])).
% 14.42/14.47 cnf(3418,plain,
% 14.42/14.47 (P16(f41(x34181,f41(x34182,x34183)),f41(f41(f31(f43(x34184,a2)),x34185),f38(x34181,f38(x34182,f34(f43(x34186,a2)),x34186,x34187),x34187,x34184)),x34184)),
% 14.42/14.47 inference(scs_inference,[],[192,1025,3312,3315,3350,245,3203,1015,237,1023,3175,3179,3191,3202,269,3174,3208,3239,3297,3302,3363,3416,271,3195,3321,3408,336,3359,186,342,347,348,170,197,219,3258,286,3253,194,231,177,178,240,183,1017,3242,184,227,3289,172,168,244,3176,175,171,169,167,174,173,2988,3087,3334,2144,2887,2874,1483,3091,3000,2800,3073,2985,2704,2917,2648,2743,3138,2114,2116,2118,2768,3272,2914,2792,1798,2736,2712,3113,2784,3054,3028,3039,2951,3246,3046,3130,2919,2464,2923,2936,1326,3236,2061,2152,3245,2710,2745,2771,2078,3123,2947,3008,3109,2189,3173,1368,3264,1217,1917,1266,1342,2227,3159,2596,3183,3185,3187,3189,2544,1184,1366,1370,1372,1794,1012,835,834,590,897,902,943,134,130,126,121,109,917,900,988,793,853,621,120,493,626,779,144,139,116,1009,738,674,625,520,718,514,714,591,881,694,445,627,415,500,478,624,544,430,354,583,710,641,631,740,601,949,783,425,722,656,654,652,741,880,878,708,647,644,489,353,619,788,630,153,657,646,494,751,636,555,622,498,483,782,439,501,480,540,469,462,758,518,877,642,912,569,879,896,923])).
% 14.42/14.47 cnf(3419,plain,
% 14.42/14.47 (P10(x34191,f41(f41(f31(f43(x34192,a2)),x34193),x34191),f43(x34192,a2))),
% 14.42/14.47 inference(rename_variables,[],[269])).
% 14.42/14.47 cnf(3421,plain,
% 14.42/14.47 (~E(f41(f41(f32(f43(x34211,a2)),f37(x34212,f28(f29(f43(x34211,a2))),x34211)),f28(f29(f43(x34211,a2)))),f29(f43(x34211,a2)))),
% 14.42/14.47 inference(scs_inference,[],[192,1025,3312,3315,3350,245,3203,1015,237,1023,3175,3179,3191,3202,269,3174,3208,3239,3297,3302,3363,3416,271,3195,3321,3408,336,3359,186,342,347,348,170,197,219,3258,286,3253,194,231,177,178,240,183,1017,3242,184,227,3289,172,168,244,3176,175,171,169,167,174,173,2988,3087,3334,2144,2887,2874,1483,3091,3000,2800,3073,2985,2704,2917,2648,2417,2743,3138,2114,2116,2118,2768,3272,2914,2792,1798,2736,2712,3113,2784,3054,3028,3039,2951,3246,3046,3130,2919,2464,2923,2936,1326,3236,2061,2152,3245,2710,2745,2771,2078,3123,2947,3008,3109,2189,3173,1368,3264,1217,1917,1266,1342,2227,3159,2596,3183,3185,3187,3189,2544,1184,1366,1370,1372,1794,1012,835,834,590,897,902,943,134,130,126,121,109,917,900,988,793,853,621,120,493,626,779,144,139,116,1009,738,674,625,520,718,514,714,591,881,694,445,627,415,500,478,624,544,430,354,583,710,641,631,740,601,949,783,425,722,656,654,652,741,880,878,708,647,644,489,353,619,788,630,153,657,646,494,751,636,555,622,498,483,782,439,501,480,540,469,462,758,518,877,642,912,569,879,896,923,801])).
% 14.42/14.47 cnf(3427,plain,
% 14.42/14.47 (~P10(f28(f28(f28(f28(f28(x34271))))),x34271,a1)),
% 14.42/14.47 inference(rename_variables,[],[3039])).
% 14.42/14.47 cnf(3430,plain,
% 14.42/14.47 (P10(f4(x34301,x34302,a1),x34301,a1)),
% 14.42/14.47 inference(rename_variables,[],[227])).
% 14.42/14.47 cnf(3436,plain,
% 14.42/14.47 (P10(x34361,f41(f41(f31(f43(x34362,a2)),x34363),x34361),f43(x34362,a2))),
% 14.42/14.47 inference(rename_variables,[],[269])).
% 14.42/14.47 cnf(3438,plain,
% 14.42/14.47 (~P16(x34381,f41(f41(f32(f43(x34382,a2)),x34383),f29(f43(x34382,a2))),x34382)),
% 14.42/14.47 inference(scs_inference,[],[192,1025,3312,3315,3350,245,3203,1015,237,1023,3175,3179,3191,3202,269,3174,3208,3239,3297,3302,3363,3416,3419,271,3195,3321,3408,3411,336,3359,186,342,347,348,170,197,219,3258,286,3253,194,231,177,178,240,183,1017,3242,184,227,3289,3328,172,168,244,3176,175,171,169,167,174,173,2988,3087,3334,2144,2887,2874,3309,1483,3091,3000,2800,3073,2985,2704,2917,2648,2417,2743,3138,2114,2116,2118,2768,3272,3331,2914,2792,1798,2736,2712,3113,2784,3054,3028,3039,3318,2951,3246,3046,3130,2919,3011,2464,2923,2936,1326,3236,2061,2152,3245,2710,2745,2771,2078,3123,2947,3008,3109,2189,3173,1368,3264,1217,1917,1266,1342,2227,3159,2596,3183,3185,3187,3189,2544,1184,1366,1370,1372,1794,1012,835,834,590,897,902,943,134,130,126,121,109,917,900,988,793,853,621,120,493,626,779,144,139,116,1009,738,674,625,520,718,514,714,591,881,694,445,627,415,500,478,624,544,430,354,583,710,641,631,740,601,949,783,425,722,656,654,652,741,880,878,708,647,644,489,353,619,788,630,153,657,646,494,751,636,555,622,498,483,782,439,501,480,540,469,462,758,518,877,642,912,569,879,896,923,801,720,650,706,648,792,680])).
% 14.42/14.47 cnf(3439,plain,
% 14.42/14.47 (P10(f41(f41(f32(f43(x34391,a2)),x34392),x34393),x34393,f43(x34391,a2))),
% 14.42/14.47 inference(rename_variables,[],[271])).
% 14.42/14.47 cnf(3457,plain,
% 14.42/14.47 (~P12(x34571,f4(x34571,x34572,a1),a1)),
% 14.42/14.47 inference(rename_variables,[],[1025])).
% 14.42/14.47 cnf(3461,plain,
% 14.42/14.47 (P10(f37(x34611,f37(x34612,x34613,x34614),x34614),f28(f37(x34612,f37(x34611,x34613,x34614),x34614)),a1)),
% 14.42/14.47 inference(scs_inference,[],[192,1025,3312,3315,3350,3394,260,245,3203,1015,237,1023,3175,3179,3191,3202,269,3174,3208,3239,3297,3302,3363,3416,3419,271,3195,3321,3408,3411,336,3359,186,342,347,348,343,170,197,219,3258,286,3253,194,231,177,178,240,183,1017,3242,349,184,227,3289,3328,172,168,244,3176,175,171,169,167,174,173,2988,3087,3334,2144,2887,2874,3309,2996,1483,3091,3000,2800,3073,3136,2985,2704,2917,2648,2417,2743,3138,2114,2116,2118,2768,3272,3331,2914,2792,1798,2736,2712,3113,2784,3054,3028,3249,3039,3318,2951,3246,3046,3130,2919,3011,2464,2923,2936,1326,3236,2061,2152,3245,2710,2745,2771,2078,3123,2947,3008,3109,2189,3173,1368,3264,1217,1917,1266,1342,2227,3159,2596,3183,3185,3187,3189,2544,1184,1366,1370,1372,1794,1012,835,834,590,897,902,943,134,130,126,121,109,917,900,988,793,853,621,120,493,626,779,144,139,116,1009,738,674,625,520,718,514,714,591,881,694,445,627,415,500,478,624,544,430,354,583,710,641,631,740,601,949,783,425,722,656,654,652,741,880,878,708,647,644,489,353,619,788,630,153,657,646,494,751,636,555,622,498,483,782,439,501,480,540,469,462,758,518,877,642,912,569,879,896,923,801,720,650,706,648,792,680,716,713,485,819,798,577,658,770,458])).
% 14.42/14.47 cnf(3463,plain,
% 14.42/14.47 (~P10(f28(f28(f28(f28(f28(f28(x34631)))))),x34631,a1)),
% 14.42/14.47 inference(scs_inference,[],[192,1025,3312,3315,3350,3394,260,245,3203,1015,237,1023,3175,3179,3191,3202,269,3174,3208,3239,3297,3302,3363,3416,3419,271,3195,3321,3408,3411,336,3359,186,342,347,348,343,170,197,219,3258,286,3253,194,231,177,178,240,183,1017,3242,349,184,227,3289,3328,172,168,244,3176,175,171,169,167,174,173,2988,3087,3334,2144,2887,2874,3309,2996,1483,3091,3000,2800,3073,3136,2985,2704,2917,2648,2417,2743,3138,2114,2116,2118,2768,3272,3331,2914,2792,1798,2736,2712,3113,2784,3054,3028,3249,3039,3318,3427,2951,3246,3046,3130,2919,3011,2464,2923,2936,1326,3236,2061,2152,3245,2710,2745,2771,2078,3123,2947,3008,3109,2189,3173,1368,3264,1217,1917,1266,1342,2227,3159,2596,3183,3185,3187,3189,2544,1184,1366,1370,1372,1794,1012,835,834,590,897,902,943,134,130,126,121,109,917,900,988,793,853,621,120,493,626,779,144,139,116,1009,738,674,625,520,718,514,714,591,881,694,445,627,415,500,478,624,544,430,354,583,710,641,631,740,601,949,783,425,722,656,654,652,741,880,878,708,647,644,489,353,619,788,630,153,657,646,494,751,636,555,622,498,483,782,439,501,480,540,469,462,758,518,877,642,912,569,879,896,923,801,720,650,706,648,792,680,716,713,485,819,798,577,658,770,458,484])).
% 14.42/14.47 cnf(3465,plain,
% 14.42/14.47 (P10(x34651,f28(f28(f28(f28(f28(x34651))))),a1)),
% 14.42/14.47 inference(scs_inference,[],[192,1025,3312,3315,3350,3394,260,245,3203,1015,237,1023,3175,3179,3191,3202,269,3174,3208,3239,3297,3302,3363,3416,3419,271,3195,3321,3408,3411,336,3359,186,342,347,348,343,170,197,219,3258,286,3253,194,231,177,178,240,183,1017,3242,349,184,227,3289,3328,172,168,244,3176,175,171,169,167,174,173,2988,3087,3334,2144,2887,2874,3309,2996,1483,3091,3000,2800,3073,3136,2985,2704,2917,2648,2417,2743,3138,2114,2116,2118,2768,3272,3331,2914,2792,1798,2736,2712,3113,2784,3054,3028,3249,3039,3318,3427,2951,3246,3046,3130,2919,3011,2464,2923,2936,1326,3236,2061,2152,3245,2710,2745,2771,2078,3123,2947,3008,3109,2189,3173,1368,3264,1217,1917,1266,1342,2227,3159,2596,3183,3185,3187,3189,2544,1184,1366,1370,1372,1794,1012,835,834,590,897,902,943,134,130,126,121,109,917,900,988,793,853,621,120,493,626,779,144,139,116,1009,738,674,625,520,718,514,714,591,881,694,445,627,415,500,478,624,544,430,354,583,710,641,631,740,601,949,783,425,722,656,654,652,741,880,878,708,647,644,489,353,619,788,630,153,657,646,494,751,636,555,622,498,483,782,439,501,480,540,469,462,758,518,877,642,912,569,879,896,923,801,720,650,706,648,792,680,716,713,485,819,798,577,658,770,458,484,426])).
% 14.42/14.47 cnf(3467,plain,
% 14.42/14.47 (~P12(f28(f37(x34671,f37(x34672,x34673,x34674),x34674)),f37(x34672,f37(x34671,x34673,x34674),x34674),a1)),
% 14.42/14.47 inference(scs_inference,[],[192,1025,3312,3315,3350,3394,260,245,3203,1015,237,1023,3175,3179,3191,3202,269,3174,3208,3239,3297,3302,3363,3416,3419,271,3195,3321,3408,3411,336,3359,186,342,347,348,343,170,197,219,3258,286,3253,194,231,177,178,240,183,1017,3242,349,184,227,3289,3328,172,168,244,3176,175,171,169,167,174,173,2988,3087,3334,2144,2887,2874,3309,2996,1483,3091,3000,2800,3073,3136,2985,2704,2917,2648,2417,2743,3138,2114,2116,2118,2768,3272,3331,2914,2792,1798,2736,2712,3113,2784,3054,3028,3249,3039,3318,3427,2951,3246,3046,3130,2919,3011,2464,2923,2936,1326,3236,2061,2152,3245,2710,2745,2771,2078,3123,2947,3008,3109,2189,3173,1368,3264,1217,1917,1266,1342,2227,3159,2596,3183,3185,3187,3189,2544,1184,1366,1370,1372,1794,1012,835,834,590,897,902,943,134,130,126,121,109,917,900,988,793,853,621,120,493,626,779,144,139,116,1009,738,674,625,520,718,514,714,591,881,694,445,627,415,500,478,624,544,430,354,583,710,641,631,740,601,949,783,425,722,656,654,652,741,880,878,708,647,644,489,353,619,788,630,153,657,646,494,751,636,555,622,498,483,782,439,501,480,540,469,462,758,518,877,642,912,569,879,896,923,801,720,650,706,648,792,680,716,713,485,819,798,577,658,770,458,484,426,545])).
% 14.42/14.47 cnf(3469,plain,
% 14.42/14.47 (E(x34691,f41(f41(f35(a1),x34691),f28(x34691)))),
% 14.42/14.47 inference(scs_inference,[],[192,1025,3312,3315,3350,3394,260,245,3203,1015,237,1023,3175,3179,3191,3202,269,3174,3208,3239,3297,3302,3363,3416,3419,271,3195,3321,3408,3411,336,3359,186,342,347,348,343,170,197,219,3258,286,3253,194,231,177,178,240,183,1017,3242,349,184,227,3289,3328,172,168,244,3176,175,171,169,167,174,173,2988,3087,3334,2144,2887,2874,3309,2996,1483,3091,3000,2800,3073,3136,2985,2704,2917,2648,2417,2743,3138,2114,2116,2118,2768,3272,3331,2914,2792,1798,2736,2712,3113,2784,3054,3028,3249,3039,3318,3427,2951,3246,3046,3130,2919,3011,2464,2923,3367,2936,1326,3236,2061,2152,3245,2710,2745,2771,2078,3123,2947,3008,3109,2189,3173,1368,3264,1217,1917,1266,1342,2227,3159,2596,3183,3185,3187,3189,2544,1184,3368,1366,1370,1372,1794,1012,835,834,590,897,902,943,134,130,126,121,109,917,900,988,793,853,621,120,493,626,779,144,139,116,1009,738,674,625,520,718,514,714,591,881,694,445,627,415,500,478,624,544,430,354,583,710,641,631,740,601,949,783,425,722,656,654,652,741,880,878,708,647,644,489,353,619,788,630,153,657,646,494,751,636,555,622,498,483,782,439,501,480,540,469,462,758,518,877,642,912,569,879,896,923,801,720,650,706,648,792,680,716,713,485,819,798,577,658,770,458,484,426,545,537])).
% 14.42/14.47 cnf(3476,plain,
% 14.42/14.47 (~P12(f28(x34761),f41(f41(f36(a1),x34761),f28(x34761)),a1)),
% 14.42/14.47 inference(scs_inference,[],[192,1025,3312,3315,3350,3394,260,245,3203,1015,237,1023,3175,3179,3191,3202,269,3174,3208,3239,3297,3302,3363,3416,3419,271,3195,3321,3408,3411,336,3359,186,342,347,348,343,170,197,219,3258,286,3253,194,231,177,178,240,183,1017,3242,349,184,227,3289,3328,172,168,244,3176,175,171,169,167,174,173,2988,3087,3334,2144,2887,2874,3309,2996,1483,3091,3000,2800,3073,3136,2985,2704,2917,2648,2417,2743,3138,2114,2116,2118,2768,3272,3331,2914,2792,1798,2736,2712,3113,2784,3054,3028,3249,3039,3318,3427,2951,3246,3046,3130,2919,3011,2464,2923,3367,2936,1326,3236,2061,2152,3245,2710,2745,2771,2078,3123,2947,3008,3109,2189,3173,1368,3264,1217,2486,1917,1266,1342,2227,3159,2596,3183,3185,3187,3189,2544,1184,3368,1366,1370,1372,1794,1012,835,834,590,897,902,943,134,130,126,121,109,917,900,988,793,853,621,120,493,626,779,144,139,116,1009,738,674,625,520,718,514,714,591,881,694,445,627,415,500,478,624,544,430,354,583,710,641,631,740,601,949,783,425,722,656,654,652,741,880,878,708,647,644,489,353,619,788,630,153,657,646,494,751,636,555,622,498,483,782,439,501,480,540,469,462,758,518,877,642,912,569,879,896,923,801,720,650,706,648,792,680,716,713,485,819,798,577,658,770,458,484,426,545,537,517,473])).
% 14.42/14.47 cnf(3490,plain,
% 14.42/14.47 (P12(f37(x34901,f39(x34902,f29(f43(x34903,a2)),f38(a48,a45,a3,a42),x34903),f38(a48,a45,a3,a42)),f37(x34904,f34(f43(f38(a48,a45,a3,a42),a2)),f38(a48,a45,a3,a42)),f43(f38(a48,a45,a3,a42),a2))),
% 14.42/14.47 inference(scs_inference,[],[192,1025,3312,3315,3350,3394,207,215,251,260,245,3203,1015,237,1023,3175,3179,3191,3202,269,3174,3208,3239,3297,3302,3363,3416,3419,271,3195,3321,3408,3411,336,3359,186,342,347,348,343,170,197,219,3258,286,3253,194,231,177,178,240,183,1017,3242,255,349,184,227,3289,3328,172,168,244,3176,175,171,169,167,174,173,2988,3087,3334,2144,2887,2874,3309,2996,1483,3091,3000,2882,2800,3073,3136,2985,2704,2917,2648,2417,2743,3162,3138,2114,2116,2118,2768,3272,3331,2914,2369,2792,1798,2842,2736,2712,3113,2784,3054,3028,3249,3039,3318,3427,2951,3246,3046,3130,2919,3011,2464,2923,3367,2936,3018,1326,3236,2061,2152,3245,2710,2745,2771,2078,3123,2947,3008,3109,2189,3173,1368,3264,1217,2043,2486,1917,1266,1342,2227,3159,2596,3183,3185,3187,3189,1172,2544,1184,3368,1366,1370,1372,1794,1012,835,834,590,897,902,943,134,130,126,121,109,917,900,988,793,853,621,120,493,626,779,144,139,116,1009,738,674,625,520,718,514,714,591,881,694,445,627,415,500,478,624,544,430,354,583,710,641,631,740,601,949,783,425,722,656,654,652,741,880,878,708,647,644,489,353,619,788,630,153,657,646,494,751,636,555,622,498,483,782,439,501,480,540,469,462,758,518,877,642,912,569,879,896,923,801,720,650,706,648,792,680,716,713,485,819,798,577,658,770,458,484,426,545,537,517,473,387,541,702,136,119,118,791])).
% 14.42/14.47 cnf(3498,plain,
% 14.42/14.47 (~E(x34981,f27(f27(f28(x34981),f43(x34982,a2)),f43(x34982,a2)))),
% 14.42/14.47 inference(scs_inference,[],[192,1025,3312,3315,3350,3394,207,264,215,251,260,245,3203,1015,237,1023,3175,3179,3191,3202,269,3174,3208,3239,3297,3302,3363,3416,3419,271,3195,3321,3408,3411,336,3359,186,342,347,348,343,170,197,219,3258,286,3253,194,231,177,178,240,183,1017,3242,326,255,349,184,227,3289,3328,3430,172,168,244,3176,175,171,169,167,174,173,2988,3087,3334,2144,2887,2874,3309,2996,1483,3091,3000,2882,2800,3073,3136,2985,2704,2917,2648,2417,2318,2743,3162,3138,2114,2116,2118,2768,3272,3331,2914,2369,2792,1798,2842,2736,2712,3113,2784,3054,3028,3249,3039,3318,3427,2951,3246,3046,3130,2919,3011,2464,2923,3367,2936,3018,1326,3236,2061,2152,3245,2710,2745,2771,2078,3123,2947,3008,3109,2189,3173,1368,3264,1217,2043,2486,1917,1266,1342,2227,3159,2596,3183,3185,3187,3189,1172,2544,1184,3368,1366,1370,1372,1794,1012,835,834,590,897,902,943,134,130,126,121,109,917,900,988,793,853,621,120,493,626,779,144,139,116,1009,738,674,625,520,718,514,714,591,881,694,445,627,415,500,478,624,544,430,354,583,710,641,631,740,601,949,783,425,722,656,654,652,741,880,878,708,647,644,489,353,619,788,630,153,657,646,494,751,636,555,622,498,483,782,439,501,480,540,469,462,758,518,877,642,912,569,879,896,923,801,720,650,706,648,792,680,716,713,485,819,798,577,658,770,458,484,426,545,537,517,473,387,541,702,136,119,118,791,161,712,163,162])).
% 14.42/14.47 cnf(3502,plain,
% 14.42/14.47 (P12(f41(f41(f32(f43(f38(a48,a45,a3,a42),a2)),x35021),f37(x35022,f39(x35023,f29(f43(x35024,a2)),f38(a48,a45,a3,a42),x35024),f38(a48,a45,a3,a42))),f34(f43(f38(a48,a45,a3,a42),a2)),f43(f38(a48,a45,a3,a42),a2))),
% 14.42/14.47 inference(scs_inference,[],[192,1025,3312,3315,3350,3394,207,264,215,251,260,245,3203,1015,237,1023,3175,3179,3191,3202,269,3174,3208,3239,3297,3302,3363,3416,3419,3436,271,3195,3321,3408,3411,3439,336,3359,186,342,347,348,343,222,170,197,219,3258,286,3253,194,231,177,178,240,183,1017,3242,326,255,349,184,227,3289,3328,3430,172,168,244,3176,175,171,169,167,174,173,2988,3087,3334,2144,2887,2874,3309,2996,1483,3091,3000,2882,2800,3073,3136,2985,2704,2917,2648,2417,2318,2743,3162,3138,2114,2116,2118,2768,3272,3331,2914,2369,2792,1798,2842,2736,2712,3113,2784,2321,3054,3028,3249,3039,3318,3427,2951,3246,3046,3130,2919,3011,2464,2923,3367,2936,3018,1326,3236,2061,2152,3245,2710,2745,2771,2078,3123,2947,3008,3109,2189,3173,1368,3264,1217,2043,2486,1917,1266,1342,2227,3159,2596,3183,3185,3187,3189,1172,2544,1184,3368,1366,1370,1372,1794,1012,835,834,590,897,902,943,134,130,126,121,109,917,900,988,793,853,621,120,493,626,779,144,139,116,1009,738,674,625,520,718,514,714,591,881,694,445,627,415,500,478,624,544,430,354,583,710,641,631,740,601,949,783,425,722,656,654,652,741,880,878,708,647,644,489,353,619,788,630,153,657,646,494,751,636,555,622,498,483,782,439,501,480,540,469,462,758,518,877,642,912,569,879,896,923,801,720,650,706,648,792,680,716,713,485,819,798,577,658,770,458,484,426,545,537,517,473,387,541,702,136,119,118,791,161,712,163,162,581,160,739])).
% 14.42/14.47 cnf(3503,plain,
% 14.42/14.47 (P10(f41(f41(f32(f43(x35031,a2)),x35032),x35033),x35033,f43(x35031,a2))),
% 14.42/14.47 inference(rename_variables,[],[271])).
% 14.42/14.47 cnf(3505,plain,
% 14.42/14.47 (P34(f41(f38(x35051,f38(x35052,f34(f43(x35053,a2)),x35053,x35054),x35054,x35055),f41(x35051,f41(x35052,x35056))))),
% 14.42/14.47 inference(scs_inference,[],[192,1025,3312,3315,3350,3394,207,264,215,251,260,245,3203,1015,237,1023,3175,3179,3191,3202,269,3174,3208,3239,3297,3302,3363,3416,3419,3436,271,3195,3321,3408,3411,3439,336,3359,186,342,347,348,343,222,170,197,219,3258,286,3253,194,231,177,178,240,183,1017,3242,326,255,349,184,227,3289,3328,3430,172,168,244,3176,175,171,169,167,174,173,2988,3087,3334,2144,2887,2874,3309,1579,2996,1483,3091,3000,2882,2800,3073,3136,2985,2704,2917,2648,2417,2318,2743,3162,3138,2114,2116,2118,2768,3272,3331,2914,2369,2792,1798,2842,2736,2712,3113,2784,2321,3054,3028,3249,3039,3318,3427,2951,3246,3046,3130,2919,3011,2464,2923,3367,2936,3018,1326,3236,2061,2152,3245,2710,2745,2771,2078,3123,2947,3008,3109,2189,3173,1368,3264,1217,2043,2486,1917,1266,1342,2227,3159,2596,3183,3185,3187,3189,1172,2544,1184,3368,1366,1370,1372,1794,1012,835,834,590,897,902,943,134,130,126,121,109,917,900,988,793,853,621,120,493,626,779,144,139,116,1009,738,674,625,520,718,514,714,591,881,694,445,627,415,500,478,624,544,430,354,583,710,641,631,740,601,949,783,425,722,656,654,652,741,880,878,708,647,644,489,353,619,788,630,153,657,646,494,751,636,555,622,498,483,782,439,501,480,540,469,462,758,518,877,642,912,569,879,896,923,801,720,650,706,648,792,680,716,713,485,819,798,577,658,770,458,484,426,545,537,517,473,387,541,702,136,119,118,791,161,712,163,162,581,160,739,442])).
% 14.42/14.47 cnf(3509,plain,
% 14.42/14.47 (P10(f28(f28(x35091)),f28(f28(f28(f28(f41(f41(f36(a1),x35091),x35092))))),a1)),
% 14.42/14.47 inference(scs_inference,[],[192,1025,3312,3315,3350,3394,207,264,215,251,260,245,3203,1015,237,1023,3175,3179,3191,3202,269,3174,3208,3239,3297,3302,3363,3416,3419,3436,271,3195,3321,3408,3411,3439,336,3359,186,342,347,348,343,222,170,197,219,3258,286,3253,194,231,177,178,240,183,1017,3242,326,255,349,184,227,3289,3328,3430,172,168,244,3176,175,171,169,167,174,173,2988,3087,3334,2144,2887,2874,3309,1579,2996,1483,3091,3000,2882,2800,3073,3136,2985,2704,2917,2648,2417,2318,2743,3162,3138,2114,2116,2118,2768,3272,3331,2914,2369,2792,1798,2842,2736,2712,3113,2784,2321,3054,3028,3249,3039,3318,3427,2951,3246,3046,3130,2919,2815,3011,2464,2923,3367,2936,3018,1326,3236,2061,2152,3245,2710,2745,2771,2078,3123,2947,3008,3109,2189,3173,1368,3264,1217,2043,2486,1917,1266,1342,2227,3159,2596,3183,3185,3187,3189,1172,2544,1184,3368,1366,1370,1372,1794,1012,835,834,590,897,902,943,134,130,126,121,109,917,900,988,793,853,621,120,493,626,779,144,139,116,1009,738,674,625,520,718,514,714,591,881,694,445,627,415,500,478,624,544,430,354,583,710,641,631,740,601,949,783,425,722,656,654,652,741,880,878,708,647,644,489,353,619,788,630,153,657,646,494,751,636,555,622,498,483,782,439,501,480,540,469,462,758,518,877,642,912,569,879,896,923,801,720,650,706,648,792,680,716,713,485,819,798,577,658,770,458,484,426,545,537,517,473,387,541,702,136,119,118,791,161,712,163,162,581,160,739,442,481,471])).
% 14.42/14.47 cnf(3511,plain,
% 14.42/14.47 (P12(f37(x35111,f37(x35112,x35113,x35114),x35114),f28(f28(f37(x35112,f37(x35111,x35113,x35114),x35114))),a1)),
% 14.42/14.47 inference(scs_inference,[],[192,1025,3312,3315,3350,3394,207,264,215,251,260,245,3203,1015,237,1023,3175,3179,3191,3202,269,3174,3208,3239,3297,3302,3363,3416,3419,3436,271,3195,3321,3408,3411,3439,336,3359,186,342,347,348,343,222,170,197,219,3258,286,3253,194,231,177,178,240,183,1017,3242,326,255,349,184,227,3289,3328,3430,172,168,244,3176,175,171,169,167,174,173,2988,3087,3334,2144,2887,2874,3309,1579,2996,1483,3091,3000,2882,2800,3073,3136,2985,2704,2917,2648,2417,2318,2743,3162,3138,2114,2116,2118,2768,3272,3331,2914,2369,2792,1798,2842,2736,2712,3113,2784,2321,3054,3028,3249,3039,3318,3427,2951,3246,3046,3130,2919,2815,3011,2464,2923,3367,2936,3018,1326,3236,2061,2152,3245,2710,2745,2771,2078,3123,2947,3008,3109,2189,3173,1368,3264,1217,2043,2486,1917,1266,1342,2227,3159,2596,3183,3185,3187,3189,1172,2544,1184,3368,1366,1370,1372,1794,1012,835,834,590,897,902,943,134,130,126,121,109,917,900,988,793,853,621,120,493,626,779,144,139,116,1009,738,674,625,520,718,514,714,591,881,694,445,627,415,500,478,624,544,430,354,583,710,641,631,740,601,949,783,425,722,656,654,652,741,880,878,708,647,644,489,353,619,788,630,153,657,646,494,751,636,555,622,498,483,782,439,501,480,540,469,462,758,518,877,642,912,569,879,896,923,801,720,650,706,648,792,680,716,713,485,819,798,577,658,770,458,484,426,545,537,517,473,387,541,702,136,119,118,791,161,712,163,162,581,160,739,442,481,471,468])).
% 14.42/14.47 cnf(3533,plain,
% 14.42/14.47 (P10(f37(x35331,f34(f43(x35332,a2)),x35332),f41(f41(f31(f43(x35333,a2)),x35334),f34(f43(x35332,a2))),f43(x35333,a2))),
% 14.42/14.47 inference(scs_inference,[],[192,1025,3312,3315,3350,3394,207,264,215,251,260,245,3203,1015,237,1023,3175,3179,3191,3202,269,3174,3208,3239,3297,3302,3363,3416,3419,3436,271,3195,3321,3408,3411,3439,3503,336,3359,186,342,347,348,343,222,170,197,219,3258,286,3253,194,231,177,178,240,183,1017,3242,326,255,349,184,227,3289,3328,3430,172,168,244,3176,175,171,169,167,174,173,2988,3087,3334,2144,2887,2874,3309,1579,2996,1483,3091,3000,3204,2882,2800,3073,3136,2985,2704,2917,2648,2417,2318,2743,3162,3138,2114,2116,2118,2768,3272,3331,2914,2369,2792,1798,2842,2736,2712,1957,3113,2784,2321,3054,3028,3249,3039,3318,3427,2951,3246,3046,3130,2919,2467,2815,3011,3037,2464,2923,3367,2936,3018,1326,3236,2061,2152,3245,2710,2745,2771,2078,3123,2947,3008,3109,1491,2189,3173,1368,3264,1217,2043,2225,2486,1917,1266,1144,1342,2227,3159,2596,3183,3185,3187,3189,1172,2544,1184,3368,1366,1370,1372,1794,1012,835,834,590,897,902,943,134,130,126,121,109,917,900,988,793,853,621,120,493,626,779,144,139,116,1009,738,674,625,520,718,514,714,591,881,694,445,627,415,500,478,624,544,430,354,583,710,641,631,740,601,949,783,425,722,656,654,652,741,880,878,708,647,644,489,353,619,788,630,153,657,646,494,751,636,555,622,498,483,782,439,501,480,540,469,462,758,518,877,642,912,569,879,896,923,801,720,650,706,648,792,680,716,713,485,819,798,577,658,770,458,484,426,545,537,517,473,387,541,702,136,119,118,791,161,712,163,162,581,160,739,442,481,471,468,548,539,437,496,811,761,127,122])).
% 14.42/14.47 cnf(3534,plain,
% 14.42/14.47 (P10(x35341,f41(f41(f31(f43(x35342,a2)),x35343),x35341),f43(x35342,a2))),
% 14.42/14.47 inference(rename_variables,[],[269])).
% 14.42/14.47 cnf(3540,plain,
% 14.42/14.47 (E(f20(x35401,x35402,f41(x35401,x35402),x35403,x35404),x35401)),
% 14.42/14.47 inference(rename_variables,[],[309])).
% 14.42/14.47 cnf(3554,plain,
% 14.42/14.47 (P10(x35541,f41(f41(f31(f43(x35542,a2)),x35543),x35541),f43(x35542,a2))),
% 14.42/14.47 inference(rename_variables,[],[269])).
% 14.42/14.47 cnf(3560,plain,
% 14.42/14.47 (P10(x35601,f41(f41(f31(f43(x35602,a2)),x35603),x35601),f43(x35602,a2))),
% 14.42/14.47 inference(rename_variables,[],[269])).
% 14.42/14.47 cnf(3565,plain,
% 14.42/14.47 (P9(x35651,a2)),
% 14.42/14.47 inference(rename_variables,[],[1023])).
% 14.42/14.47 cnf(3567,plain,
% 14.42/14.47 (~P10(f4(f41(f41(f31(f43(f38(a48,a45,a3,a42),a2)),f34(f43(f38(a48,a45,a3,a42),a2))),x35671),f37(x35672,f29(f43(f38(a48,a45,a3,a42),a2)),f38(a48,a45,a3,a42)),f43(f38(a48,a45,a3,a42),a2)),f39(x35673,f29(f43(x35674,a2)),f38(a48,a45,a3,a42),x35674),f43(f38(a48,a45,a3,a42),a2))),
% 14.42/14.47 inference(scs_inference,[],[192,1025,3312,3315,3350,3394,3457,207,264,232,215,251,254,260,245,3203,3216,1015,3292,1021,309,3540,237,1023,3175,3179,3191,3202,3209,3565,269,3174,3208,3239,3297,3302,3363,3416,3419,3436,3534,3554,271,3195,3321,3408,3411,3439,3503,336,3359,186,342,347,348,343,222,170,197,330,219,3258,286,3253,334,194,201,231,177,178,240,183,1017,3242,340,326,255,349,184,227,3289,3328,3430,172,168,244,3176,175,171,169,167,174,173,2988,3087,3334,2144,2887,2874,3309,1579,2996,1483,3091,3000,3204,2882,2800,3073,3136,2985,2704,2917,2648,2417,3072,2318,2743,3162,3138,2114,2116,2118,2768,3272,3331,2914,2369,2792,1798,2842,2837,2736,2712,1957,3113,2784,2321,3054,3028,3249,3039,3318,3427,2951,3246,3046,3130,2919,2467,2815,3011,3037,2464,2923,3367,2936,3018,1326,3236,2061,2152,3245,2710,2745,2720,2771,2078,3123,2947,3008,3109,1491,2189,3173,1368,3264,1217,2043,2225,2486,1917,1266,1144,2420,1342,2227,3159,2596,3183,3185,3187,3189,1172,2544,1184,3368,1366,1370,1372,1794,1012,835,834,590,897,902,943,134,130,126,121,109,917,900,988,793,853,621,120,493,626,779,144,139,116,1009,738,674,625,520,718,514,714,591,881,694,445,627,415,500,478,624,544,430,354,583,710,641,631,740,601,949,783,425,722,656,654,652,741,880,878,708,647,644,489,353,619,788,630,153,657,646,494,751,636,555,622,498,483,782,439,501,480,540,469,462,758,518,877,642,912,569,879,896,923,801,720,650,706,648,792,680,716,713,485,819,798,577,658,770,458,484,426,545,537,517,473,387,541,702,136,119,118,791,161,712,163,162,581,160,739,442,481,471,468,548,539,437,496,811,761,127,122,148,152,2,117,133,131,124,132,149,129,3,13,128,123,143,135,561,822,849,895])).
% 14.42/14.47 cnf(3581,plain,
% 14.42/14.47 (P9(x35811,a2)),
% 14.42/14.47 inference(rename_variables,[],[1023])).
% 14.42/14.47 cnf(3595,plain,
% 14.42/14.47 (E(f4(f4(f26(a1),x35951,a1),x35952,a1),f26(a1))),
% 14.42/14.47 inference(scs_inference,[],[192,1025,3312,3315,3350,3394,3457,207,264,232,215,251,254,260,245,3203,3216,1015,3292,1021,309,3540,237,1023,3175,3179,3191,3202,3209,3565,3581,269,3174,3208,3239,3297,3302,3363,3416,3419,3436,3534,3554,3560,247,271,3195,3321,3408,3411,3439,3503,336,3359,186,342,234,347,348,343,222,170,197,330,219,3258,286,3253,334,194,201,231,177,178,240,183,1017,3242,340,326,255,349,184,227,3289,3328,3430,172,168,244,3176,3210,175,171,169,167,174,173,2988,3087,3334,2144,2887,2874,3309,1579,2996,1483,3091,3000,3204,2882,2800,3073,3136,2985,2704,2917,2648,2417,3072,2318,2743,3162,3138,2114,2116,2118,2768,3272,3331,2914,2369,2792,1798,2842,2488,2837,2736,2712,1957,3113,2784,2321,3054,3028,3249,3039,3318,3427,2951,3246,3046,3130,2919,2467,2815,3011,3037,2464,2923,3367,2936,3018,1326,3236,2061,2152,3245,2710,2745,2720,2771,2078,3123,2947,3008,2535,3109,1491,2189,3173,3207,1368,3264,1217,2043,2225,1499,2486,1917,1266,1144,2420,1342,2227,3159,2596,3183,3185,3187,3189,1172,2544,1184,3368,1366,1370,1372,1794,1012,835,834,590,897,902,943,134,130,126,121,109,917,900,988,793,853,621,120,493,626,779,144,139,116,1009,738,674,625,520,718,514,714,591,881,694,445,627,415,500,478,624,544,430,354,583,710,641,631,740,601,949,783,425,722,656,654,652,741,880,878,708,647,644,489,353,619,788,630,153,657,646,494,751,636,555,622,498,483,782,439,501,480,540,469,462,758,518,877,642,912,569,879,896,923,801,720,650,706,648,792,680,716,713,485,819,798,577,658,770,458,484,426,545,537,517,473,387,541,702,136,119,118,791,161,712,163,162,581,160,739,442,481,471,468,548,539,437,496,811,761,127,122,148,152,2,117,133,131,124,132,149,129,3,13,128,123,143,135,561,822,849,895,873,931,859,938,633,671,957,867,14,398,495,427])).
% 14.42/14.47 cnf(3597,plain,
% 14.42/14.47 (~P12(x35971,f41(f41(f35(a1),x35972),f4(x35971,f26(a1),a1)),a1)),
% 14.42/14.47 inference(scs_inference,[],[192,1025,3312,3315,3350,3394,3457,207,264,232,215,251,254,260,245,3203,3216,1015,3292,1021,309,3540,237,1023,3175,3179,3191,3202,3209,3565,3581,269,3174,3208,3239,3297,3302,3363,3416,3419,3436,3534,3554,3560,247,271,3195,3321,3408,3411,3439,3503,336,3359,186,342,234,347,348,343,222,170,197,330,219,3258,286,3253,334,194,201,231,177,178,240,183,1017,3242,340,326,255,349,184,227,3289,3328,3430,172,168,244,3176,3210,175,171,169,167,174,173,2988,3087,3334,2144,2887,2874,3309,1579,2996,1483,3091,3000,3204,2882,2800,3073,3136,2985,2704,2917,2648,2417,3072,2318,2743,3162,3138,2114,2116,2118,2768,3272,3331,2914,2369,2792,1798,2842,2488,2837,2736,2712,1957,3113,2784,2321,3054,3028,3249,3039,3318,3427,2951,3246,3046,3130,2919,2467,2815,3011,3037,2464,2923,3367,2936,3018,1326,3236,2061,2152,3245,2710,2745,2720,2771,2078,3123,2947,3008,2535,3109,1491,2189,3173,3207,1368,3264,1217,2043,2225,1499,2486,1917,1266,1144,2420,1342,2227,3159,2596,3183,3185,3187,3189,1172,2544,1184,3368,1366,1370,1372,1794,1012,835,834,590,897,902,943,134,130,126,121,109,917,900,988,793,853,621,120,493,626,779,144,139,116,1009,738,674,625,520,718,514,714,591,881,694,445,627,415,500,478,624,544,430,354,583,710,641,631,740,601,949,783,425,722,656,654,652,741,880,878,708,647,644,489,353,619,788,630,153,657,646,494,751,636,555,622,498,483,782,439,501,480,540,469,462,758,518,877,642,912,569,879,896,923,801,720,650,706,648,792,680,716,713,485,819,798,577,658,770,458,484,426,545,537,517,473,387,541,702,136,119,118,791,161,712,163,162,581,160,739,442,481,471,468,548,539,437,496,811,761,127,122,148,152,2,117,133,131,124,132,149,129,3,13,128,123,143,135,561,822,849,895,873,931,859,938,633,671,957,867,14,398,495,427,815])).
% 14.42/14.47 cnf(3653,plain,
% 14.42/14.47 (P16(f41(x36531,x36532),f38(x36531,f34(f43(x36533,a2)),x36533,x36534),x36534)),
% 14.42/14.47 inference(rename_variables,[],[286])).
% 14.42/14.47 cnf(3654,plain,
% 14.42/14.47 (P9(x36541,a2)),
% 14.42/14.47 inference(rename_variables,[],[1023])).
% 14.42/14.47 cnf(3660,plain,
% 14.42/14.47 (E(x36601,f41(f41(f35(a1),x36601),f28(x36601)))),
% 14.42/14.47 inference(rename_variables,[],[3469])).
% 14.42/14.47 cnf(3662,plain,
% 14.42/14.47 (P9(x36621,a2)),
% 14.42/14.47 inference(rename_variables,[],[1023])).
% 14.42/14.47 cnf(3669,plain,
% 14.42/14.47 (P10(x36691,f41(f41(f31(f43(x36692,a2)),x36693),x36691),f43(x36692,a2))),
% 14.42/14.47 inference(rename_variables,[],[269])).
% 14.42/14.47 cnf(3676,plain,
% 14.42/14.47 (P10(x36761,x36761,a1)),
% 14.42/14.47 inference(rename_variables,[],[194])).
% 14.42/14.47 cnf(3677,plain,
% 14.42/14.47 (P10(f26(a1),x36771,a1)),
% 14.42/14.47 inference(rename_variables,[],[197])).
% 14.42/14.47 cnf(3680,plain,
% 14.42/14.47 (P12(f4(x36801,x36802,a1),f28(x36801),a1)),
% 14.42/14.47 inference(rename_variables,[],[231])).
% 14.42/14.47 cnf(3684,plain,
% 14.42/14.47 (~E(x36841,f27(f27(f28(x36841),f43(x36842,a2)),f43(x36842,a2)))),
% 14.42/14.47 inference(rename_variables,[],[3498])).
% 14.42/14.47 cnf(3699,plain,
% 14.42/14.47 (P16(f41(x36991,x36992),f38(x36991,f34(f43(x36993,a2)),x36993,x36994),x36994)),
% 14.42/14.47 inference(rename_variables,[],[286])).
% 14.42/14.47 cnf(3700,plain,
% 14.42/14.47 (P9(x37001,a2)),
% 14.42/14.47 inference(rename_variables,[],[1023])).
% 14.42/14.47 cnf(3704,plain,
% 14.42/14.47 (E(x37041,f41(f41(f36(f41(f41(f36(a1),a1),a1)),x37041),x37041))),
% 14.42/14.47 inference(scs_inference,[],[185,214,1025,218,272,1023,3654,3662,269,186,1019,182,286,3653,194,170,201,347,231,197,184,175,173,3223,2668,2304,3418,3567,3469,3660,3498,3164,3197,1112,3294,3034,3235,3595,3288,3046,1115,2544,1239,2648,959,920,849,822,142,141,125,943,859,464,895,138,633,875,495,24,543,621,921,674,714,793,500,509])).
% 14.42/14.47 cnf(3705,plain,
% 14.42/14.47 (~P12(x37051,f41(f41(f36(f41(f41(f36(a1),a1),a1)),x37051),x37051),f41(f41(f36(a1),a1),a1))),
% 14.42/14.47 inference(rename_variables,[],[3223])).
% 14.42/14.47 cnf(3713,plain,
% 14.42/14.47 (~P12(x37131,f41(f41(f36(f41(f41(f36(a1),a1),a1)),x37131),x37131),f41(f41(f36(a1),a1),a1))),
% 14.42/14.47 inference(rename_variables,[],[3223])).
% 14.42/14.47 cnf(3723,plain,
% 14.42/14.47 (P10(x37231,x37231,a1)),
% 14.42/14.47 inference(rename_variables,[],[194])).
% 14.42/14.47 cnf(3729,plain,
% 14.42/14.47 (~P14(x37291,x37292,f41(f41(f31(f43(f41(f41(f31(f43(x37293,a2)),a1),f29(f43(x37293,a2))),a2)),f34(f43(a1,a2))),x37294),x37295,f41(f41(f31(f43(x37293,a2)),a1),f29(f43(x37293,a2))),x37296)),
% 14.42/14.47 inference(scs_inference,[],[185,214,1025,218,272,1023,3654,3662,269,186,1019,182,286,3653,194,3676,339,170,201,183,347,231,197,184,175,169,173,3223,3705,3333,2668,2304,3418,3567,3469,3660,3498,3684,3164,3197,1112,3511,3294,3034,1328,3235,3595,1257,3288,2578,3046,1115,2544,1239,2648,959,920,849,822,142,141,125,943,859,464,895,138,633,875,495,24,543,621,921,674,714,793,500,509,493,626,454,427,430,815,631,907,1009])).
% 14.42/14.47 cnf(3738,plain,
% 14.42/14.47 (~P12(x37381,x37381,f43(x37382,a2))),
% 14.42/14.47 inference(rename_variables,[],[342])).
% 14.42/14.47 cnf(3743,plain,
% 14.42/14.47 (P10(f41(f41(f32(f43(x37431,a2)),x37432),x37433),x37432,f43(x37431,a2))),
% 14.42/14.47 inference(rename_variables,[],[272])).
% 14.42/14.47 cnf(3749,plain,
% 14.42/14.47 (P10(f41(f41(f32(f43(x37491,a2)),x37492),x37493),x37492,f43(x37491,a2))),
% 14.42/14.47 inference(rename_variables,[],[272])).
% 14.42/14.47 cnf(3752,plain,
% 14.42/14.47 (~P12(x37521,f4(x37521,x37522,a1),a1)),
% 14.42/14.47 inference(rename_variables,[],[1025])).
% 14.42/14.47 cnf(3769,plain,
% 14.42/14.47 (P10(x37691,f34(f43(x37692,a2)),f43(x37692,a2))),
% 14.42/14.47 inference(rename_variables,[],[219])).
% 14.42/14.47 cnf(3781,plain,
% 14.42/14.47 (~P12(x37811,f4(x37811,x37812,a1),a1)),
% 14.42/14.47 inference(rename_variables,[],[1025])).
% 14.42/14.47 cnf(3790,plain,
% 14.42/14.47 (P10(x37901,f28(f28(f28(f28(f28(x37901))))),a1)),
% 14.42/14.47 inference(rename_variables,[],[3465])).
% 14.42/14.47 cnf(3793,plain,
% 14.42/14.47 (P10(f41(f41(f32(f43(x37931,a1)),x37932),x37933),f41(f41(f31(f43(x37931,a1)),x37933),x37934),f43(x37931,a1))),
% 14.42/14.47 inference(rename_variables,[],[3219])).
% 14.42/14.47 cnf(3819,plain,
% 14.42/14.47 (~P12(x38191,x38191,f43(x38192,a2))),
% 14.42/14.47 inference(rename_variables,[],[342])).
% 14.42/14.47 cnf(3822,plain,
% 14.42/14.47 (P10(x38221,f41(f41(f31(f43(x38222,a2)),x38221),x38223),f43(x38222,a2))),
% 14.42/14.47 inference(rename_variables,[],[270])).
% 14.42/14.47 cnf(3826,plain,
% 14.42/14.47 (~P16(x38261,f29(f43(x38262,a2)),x38262)),
% 14.42/14.47 inference(rename_variables,[],[347])).
% 14.42/14.47 cnf(3845,plain,
% 14.42/14.47 (P10(f41(f41(f32(f43(x38451,a1)),x38452),x38453),f41(f41(f31(f43(x38451,a1)),x38453),x38454),f43(x38451,a1))),
% 14.42/14.47 inference(rename_variables,[],[3219])).
% 14.42/14.47 cnf(3848,plain,
% 14.42/14.47 (P10(f41(f41(f32(f43(x38481,a2)),x38482),x38483),x38482,f43(x38481,a2))),
% 14.42/14.47 inference(rename_variables,[],[272])).
% 14.42/14.47 cnf(3852,plain,
% 14.42/14.47 (P10(f29(f43(x38521,a2)),x38522,f43(x38521,a2))),
% 14.42/14.47 inference(rename_variables,[],[220])).
% 14.42/14.47 cnf(3880,plain,
% 14.42/14.47 (P10(f41(f41(f32(f43(x38801,a2)),x38802),x38803),x38802,f43(x38801,a2))),
% 14.42/14.47 inference(rename_variables,[],[272])).
% 14.42/14.47 cnf(3945,plain,
% 14.42/14.47 (P16(x39451,f41(f41(f31(f43(x39452,a2)),x39453),f34(f43(x39452,a2))),x39452)),
% 14.42/14.47 inference(scs_inference,[],[241,297,239,185,214,1025,3752,3781,221,218,1021,272,3743,3749,3848,3880,1023,3654,3662,3700,269,3669,270,3822,220,3852,186,342,3738,3819,1019,1028,344,182,219,3769,286,3653,3699,194,3676,3723,339,170,201,183,347,3826,349,231,3680,255,197,3677,184,172,175,171,169,167,174,173,3223,3705,3713,3333,3308,2872,2668,3413,3505,3325,3502,2304,3415,3418,3490,3058,3438,3567,3469,3660,3498,3684,3219,3793,3845,3164,3121,3197,3421,2831,3217,3533,1112,2382,3015,2041,3277,3461,3467,3511,3463,3465,3790,3376,3248,3294,3509,3034,2073,3382,3476,1328,3235,3595,3597,1257,3288,2762,2399,1303,3022,1275,1543,2552,2578,2262,2743,2061,3109,1368,3046,1163,1115,2544,1239,1370,2648,1372,959,920,849,822,142,141,125,943,859,464,895,138,633,875,495,24,543,621,921,674,714,793,500,509,493,626,454,427,430,815,631,907,1009,654,601,354,738,625,878,722,14,520,630,881,718,708,694,445,751,583,514,622,353,498,619,782,415,483,544,540,624,780,469,518,501,676,641,912,740,783,144,923,949,656,642,880,801,710,652,647,741,792,788,425,657,644,716,646,577,494,863,484,458,636,426,545,517,480,758,439,462,387,541,702,896,569,879,791,720,650,648,739,442,680,713,712,658,819,798,153,706,770])).
% 14.42/14.47 cnf(4075,plain,
% 14.42/14.47 ($false),
% 14.42/14.47 inference(scs_inference,[],[1023,181,3704,3945,3729,3251,1012,137,849]),
% 14.42/14.47 ['proof']).
% 14.42/14.48 % SZS output end Proof
% 14.42/14.48 % Total time :13.560000s
%------------------------------------------------------------------------------