TSTP Solution File: ALG382-1 by CSE---1.6
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%------------------------------------------------------------------------------
% File : CSE---1.6
% Problem : ALG382-1 : 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 : n024.cluster.edu
% Model : x86_64 x86_64
% CPU : Intel(R) Xeon(R) CPU E5-2620 v4 2.10GHz
% Memory : 8042.1875MB
% OS : Linux 3.10.0-693.el7.x86_64
% CPULimit : 300s
% WCLimit : 300s
% DateTime : Wed Aug 30 15:59:46 EDT 2023
% Result : Unsatisfiable 14.25s 14.38s
% Output : CNFRefutation 14.48s
% Verified :
% SZS Type : -
% Comments :
%------------------------------------------------------------------------------
%----WARNING: Could not form TPTP format derivation
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% 0.00/0.12 % Problem : ALG382-1 : TPTP v8.1.2. Released v4.1.0.
% 0.00/0.12 % Command : java -jar /export/starexec/sandbox2/solver/bin/mcs_scs.jar %s %d
% 0.13/0.33 % Computer : n024.cluster.edu
% 0.13/0.33 % Model : x86_64 x86_64
% 0.13/0.33 % CPU : Intel(R) Xeon(R) CPU E5-2620 v4 @ 2.10GHz
% 0.13/0.33 % Memory : 8042.1875MB
% 0.13/0.33 % OS : Linux 3.10.0-693.el7.x86_64
% 0.13/0.33 % CPULimit : 300
% 0.13/0.33 % WCLimit : 300
% 0.13/0.33 % DateTime : Mon Aug 28 05:36:08 EDT 2023
% 0.13/0.33 % CPUTime :
% 0.20/0.55 start to proof:theBenchmark
% 14.09/14.32 %-------------------------------------------
% 14.09/14.32 % File :CSE---1.6
% 14.09/14.32 % Problem :theBenchmark
% 14.09/14.32 % Transform :cnf
% 14.09/14.32 % Format :tptp:raw
% 14.09/14.32 % Command :java -jar mcs_scs.jar %d %s
% 14.09/14.32
% 14.09/14.33 % Result :Theorem 13.400000s
% 14.09/14.33 % Output :CNFRefutation 13.400000s
% 14.09/14.33 %-------------------------------------------
% 14.09/14.33 %------------------------------------------------------------------------------
% 14.09/14.33 % File : ALG382-1 : TPTP v8.1.2. Released v4.1.0.
% 14.09/14.33 % Domain : General Algebra
% 14.09/14.33 % Problem : Fundamental theorem of algebra 0501_62
% 14.09/14.33 % Version : Especial.
% 14.09/14.33 % English :
% 14.09/14.33
% 14.09/14.33 % Refs : [Nip10] Nipkow (2010), Email to Geoff Sutcliffe
% 14.09/14.33 % : [BN10] Boehme & Nipkow (2010), Sledgehammer: Judgement Day
% 14.09/14.33 % Source : [Nip10]
% 14.09/14.33 % Names : Fundamental_Theorem_Algebra-0501_62 [Nip10]
% 14.09/14.33
% 14.09/14.33 % Status : Unsatisfiable
% 14.09/14.33 % Rating : 0.10 v8.1.0, 0.05 v7.5.0, 0.11 v7.4.0, 0.18 v7.3.0, 0.08 v7.1.0, 0.00 v7.0.0, 0.20 v6.4.0, 0.13 v6.3.0, 0.00 v6.1.0, 0.14 v6.0.0, 0.00 v5.5.0, 0.20 v5.4.0, 0.10 v5.3.0, 0.17 v5.2.0, 0.12 v5.1.0, 0.18 v5.0.0, 0.21 v4.1.0
% 14.09/14.33 % Syntax : Number of clauses : 992 ( 127 unt; 151 nHn; 680 RR)
% 14.09/14.33 % Number of literals : 2854 ( 499 equ;1716 neg)
% 14.09/14.33 % Maximal clause size : 6 ( 2 avg)
% 14.09/14.33 % Maximal term depth : 6 ( 1 avg)
% 14.09/14.33 % Number of predicates : 71 ( 70 usr; 0 prp; 1-3 aty)
% 14.09/14.33 % Number of functors : 37 ( 37 usr; 8 con; 0-3 aty)
% 14.09/14.33 % Number of variables : 2493 ( 87 sgn)
% 14.09/14.33 % SPC : CNF_UNS_RFO_SEQ_NHN
% 14.09/14.33
% 14.09/14.33 % Comments :
% 14.09/14.33 %------------------------------------------------------------------------------
% 14.09/14.33 cnf(cls_divide__nonneg__neg_0,axiom,
% 14.09/14.33 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.33 | c_lessequals(c_HOL_Oinverse__class_Odivide(V_x,V_y,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.33 | ~ c_HOL_Oord__class_Oless(V_y,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.33 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_x,T_a) ) ).
% 14.09/14.33
% 14.09/14.33 cnf(cls_zero__less__divide__iff_3,axiom,
% 14.09/14.33 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.33 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.33 | c_HOL_Oord__class_Oless(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.33 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 14.09/14.33 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a),T_a) ) ).
% 14.09/14.33
% 14.09/14.33 cnf(cls_zero__less__divide__iff_2,axiom,
% 14.09/14.33 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.33 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.33 | c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.33 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 14.09/14.33 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a),T_a) ) ).
% 14.09/14.33
% 14.09/14.33 cnf(cls_zero__less__divide__iff_1,axiom,
% 14.09/14.33 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.33 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.33 | c_HOL_Oord__class_Oless(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.33 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 14.09/14.33 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a),T_a) ) ).
% 14.09/14.33
% 14.09/14.33 cnf(cls_zero__less__divide__iff_0,axiom,
% 14.09/14.33 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.33 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.33 | c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.33 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 14.09/14.33 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a),T_a) ) ).
% 14.09/14.33
% 14.09/14.33 cnf(cls_mult__imp__less__div__pos_0,axiom,
% 14.09/14.33 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.33 | c_HOL_Oord__class_Oless(V_z,c_HOL_Oinverse__class_Odivide(V_x,V_y,T_a),T_a)
% 14.09/14.33 | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_z,V_y,T_a),V_x,T_a)
% 14.09/14.33 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_y,T_a) ) ).
% 14.09/14.33
% 14.09/14.33 cnf(cls_mult__imp__div__pos__less_0,axiom,
% 14.09/14.33 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.33 | c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_x,V_y,T_a),V_z,T_a)
% 14.09/14.33 | ~ c_HOL_Oord__class_Oless(V_x,c_HOL_Otimes__class_Otimes(V_z,V_y,T_a),T_a)
% 14.09/14.33 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_y,T_a) ) ).
% 14.09/14.33
% 14.09/14.33 cnf(cls_less__divide__eq_6,axiom,
% 14.09/14.33 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.33 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.33 | c_HOL_Oord__class_Oless(V_a,c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a)
% 14.09/14.33 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 14.09/14.33 | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),V_b,T_a) ) ).
% 14.09/14.33
% 14.09/14.33 cnf(cls_less__divide__eq_0,axiom,
% 14.09/14.33 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.33 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.33 | c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),V_b,T_a)
% 14.09/14.33 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 14.09/14.33 | ~ c_HOL_Oord__class_Oless(V_a,c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a) ) ).
% 14.09/14.33
% 14.09/14.33 cnf(cls_divide__less__eq_6,axiom,
% 14.09/14.33 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.33 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.33 | c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),V_a,T_a)
% 14.09/14.33 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 14.09/14.33 | ~ c_HOL_Oord__class_Oless(V_b,c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),T_a) ) ).
% 14.09/14.33
% 14.09/14.33 cnf(cls_divide__less__eq_0,axiom,
% 14.09/14.33 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.33 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.33 | c_HOL_Oord__class_Oless(V_b,c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),T_a)
% 14.09/14.33 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 14.09/14.33 | ~ c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),V_a,T_a) ) ).
% 14.09/14.33
% 14.09/14.33 cnf(cls_inverse__divide_0,axiom,
% 14.09/14.33 ( ~ class_Ring__and__Field_Ofield(T_a)
% 14.09/14.33 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.33 | c_HOL_Oinverse__class_Oinverse(c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a),T_a) = c_HOL_Oinverse__class_Odivide(V_b,V_a,T_a) ) ).
% 14.09/14.33
% 14.09/14.33 cnf(cls_inverse__negative__imp__negative_0,axiom,
% 14.09/14.33 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.33 | c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.33 | V_a = c_HOL_Ozero__class_Ozero(T_a)
% 14.09/14.33 | ~ c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Oinverse(V_a,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.09/14.33
% 14.09/14.34 cnf(cls_DERIV__inverse__lemma_0,axiom,
% 14.09/14.34 ( ~ class_RealVector_Oreal__normed__field(T_a)
% 14.09/14.34 | c_HOL_Oinverse__class_Odivide(c_HOL_Ominus__class_Ominus(c_HOL_Oinverse__class_Oinverse(V_a,T_a),c_HOL_Oinverse__class_Oinverse(V_b,T_a),T_a),V_h,T_a) = c_HOL_Ouminus__class_Ouminus(c_HOL_Otimes__class_Otimes(c_HOL_Otimes__class_Otimes(c_HOL_Oinverse__class_Oinverse(V_a,T_a),c_HOL_Oinverse__class_Odivide(c_HOL_Ominus__class_Ominus(V_a,V_b,T_a),V_h,T_a),T_a),c_HOL_Oinverse__class_Oinverse(V_b,T_a),T_a),T_a)
% 14.09/14.34 | V_b = c_HOL_Ozero__class_Ozero(T_a)
% 14.09/14.34 | V_a = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.09/14.34
% 14.09/14.34 cnf(cls_real__sqrt__eq__iff_0,axiom,
% 14.09/14.34 ( c_NthRoot_Osqrt(V_x) != c_NthRoot_Osqrt(V_y)
% 14.09/14.34 | V_x = V_y ) ).
% 14.09/14.34
% 14.09/14.34 cnf(cls_real__sqrt__ge__zero_0,axiom,
% 14.09/14.34 ( c_lessequals(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),c_NthRoot_Osqrt(V_x),tc_RealDef_Oreal)
% 14.09/14.34 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),V_x,tc_RealDef_Oreal) ) ).
% 14.09/14.34
% 14.09/14.34 cnf(cls_real__sqrt__ge__0__iff_0,axiom,
% 14.09/14.34 ( c_lessequals(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),V_y,tc_RealDef_Oreal)
% 14.09/14.34 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),c_NthRoot_Osqrt(V_y),tc_RealDef_Oreal) ) ).
% 14.09/14.34
% 14.09/14.34 cnf(cls_real__sqrt__ge__0__iff_1,axiom,
% 14.09/14.34 ( c_lessequals(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),c_NthRoot_Osqrt(V_y),tc_RealDef_Oreal)
% 14.09/14.34 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),V_y,tc_RealDef_Oreal) ) ).
% 14.09/14.34
% 14.09/14.34 cnf(cls_abs__le__D2_0,axiom,
% 14.09/14.34 ( ~ class_OrderedGroup_Opordered__ab__group__add__abs(T_a)
% 14.09/14.34 | c_lessequals(c_HOL_Ouminus__class_Ouminus(V_a,T_a),V_b,T_a)
% 14.09/14.34 | ~ c_lessequals(c_HOL_Oabs__class_Oabs(V_a,T_a),V_b,T_a) ) ).
% 14.09/14.34
% 14.09/14.34 cnf(cls_abs__less__iff_2,axiom,
% 14.09/14.34 ( ~ class_Ring__and__Field_Oordered__idom(T_a)
% 14.09/14.34 | c_HOL_Oord__class_Oless(c_HOL_Oabs__class_Oabs(V_a,T_a),V_b,T_a)
% 14.09/14.34 | ~ c_HOL_Oord__class_Oless(c_HOL_Ouminus__class_Ouminus(V_a,T_a),V_b,T_a)
% 14.09/14.34 | ~ c_HOL_Oord__class_Oless(V_a,V_b,T_a) ) ).
% 14.09/14.34
% 14.09/14.34 cnf(cls_zero__less__norm__iff_1,axiom,
% 14.09/14.34 ( ~ class_RealVector_Oreal__normed__vector(T_a)
% 14.09/14.34 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),c_RealVector_Onorm__class_Onorm(V_x,T_a),tc_RealDef_Oreal)
% 14.09/14.34 | V_x = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.09/14.34
% 14.09/14.34 cnf(cls_div__mult__div__if__dvd_0,axiom,
% 14.09/14.34 ( ~ class_Divides_Osemiring__div(T_a)
% 14.09/14.34 | c_HOL_Otimes__class_Otimes(c_Divides_Odiv__class_Odiv(V_x,V_y,T_a),c_Divides_Odiv__class_Odiv(V_w,V_z,T_a),T_a) = c_Divides_Odiv__class_Odiv(c_HOL_Otimes__class_Otimes(V_x,V_w,T_a),c_HOL_Otimes__class_Otimes(V_y,V_z,T_a),T_a)
% 14.09/14.34 | ~ c_Ring__and__Field_Odvd__class_Odvd(V_z,V_w,T_a)
% 14.09/14.34 | ~ c_Ring__and__Field_Odvd__class_Odvd(V_y,V_x,T_a) ) ).
% 14.09/14.34
% 14.09/14.34 cnf(cls_one__less__inverse__iff_0,axiom,
% 14.09/14.34 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.34 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.34 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_x,T_a)
% 14.09/14.34 | ~ c_HOL_Oord__class_Oless(c_HOL_Oone__class_Oone(T_a),c_HOL_Oinverse__class_Oinverse(V_x,T_a),T_a) ) ).
% 14.09/14.34
% 14.09/14.34 cnf(cls_sgn__minus_0,axiom,
% 14.09/14.34 ( ~ class_RealVector_Oreal__normed__vector(T_a)
% 14.09/14.34 | c_HOL_Osgn__class_Osgn(c_HOL_Ouminus__class_Ouminus(V_x,T_a),T_a) = c_HOL_Ouminus__class_Ouminus(c_HOL_Osgn__class_Osgn(V_x,T_a),T_a) ) ).
% 14.09/14.34
% 14.09/14.34 cnf(cls_dvd__trans_0,axiom,
% 14.09/14.34 ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 14.09/14.34 | c_Ring__and__Field_Odvd__class_Odvd(V_a,V_c,T_a)
% 14.09/14.34 | ~ c_Ring__and__Field_Odvd__class_Odvd(V_b,V_c,T_a)
% 14.09/14.34 | ~ c_Ring__and__Field_Odvd__class_Odvd(V_a,V_b,T_a) ) ).
% 14.09/14.34
% 14.09/14.34 cnf(cls_dvd__refl_0,axiom,
% 14.09/14.34 ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 14.09/14.34 | c_Ring__and__Field_Odvd__class_Odvd(V_a,V_a,T_a) ) ).
% 14.09/14.34
% 14.09/14.34 cnf(cls_linorder__neqE__ordered__idom_0,axiom,
% 14.09/14.34 ( ~ class_Ring__and__Field_Oordered__idom(T_a)
% 14.09/14.34 | c_HOL_Oord__class_Oless(V_y,V_x,T_a)
% 14.09/14.34 | c_HOL_Oord__class_Oless(V_x,V_y,T_a)
% 14.09/14.34 | V_x = V_y ) ).
% 14.09/14.34
% 14.09/14.34 cnf(cls_not__less__iff__gr__or__eq_0,axiom,
% 14.09/14.34 ( ~ class_Orderings_Olinorder(T_a)
% 14.09/14.34 | V_x = V_y
% 14.09/14.34 | c_HOL_Oord__class_Oless(V_y,V_x,T_a)
% 14.09/14.34 | c_HOL_Oord__class_Oless(V_x,V_y,T_a) ) ).
% 14.09/14.34
% 14.09/14.34 cnf(cls_linorder__antisym__conv3_0,axiom,
% 14.09/14.34 ( ~ class_Orderings_Olinorder(T_a)
% 14.09/14.34 | V_x = V_y
% 14.09/14.34 | c_HOL_Oord__class_Oless(V_x,V_y,T_a)
% 14.09/14.34 | c_HOL_Oord__class_Oless(V_y,V_x,T_a) ) ).
% 14.09/14.34
% 14.09/14.34 cnf(cls_linorder__less__linear_0,axiom,
% 14.09/14.34 ( ~ class_Orderings_Olinorder(T_a)
% 14.09/14.34 | c_HOL_Oord__class_Oless(V_y,V_x,T_a)
% 14.09/14.34 | V_x = V_y
% 14.09/14.34 | c_HOL_Oord__class_Oless(V_x,V_y,T_a) ) ).
% 14.09/14.34
% 14.09/14.34 cnf(cls_linorder__neqE_0,axiom,
% 14.09/14.34 ( ~ class_Orderings_Olinorder(T_a)
% 14.09/14.34 | c_HOL_Oord__class_Oless(V_y,V_x,T_a)
% 14.09/14.34 | c_HOL_Oord__class_Oless(V_x,V_y,T_a)
% 14.09/14.34 | V_x = V_y ) ).
% 14.09/14.34
% 14.09/14.34 cnf(cls_compl__eq__compl__iff_0,axiom,
% 14.09/14.34 ( ~ class_Lattices_Oboolean__algebra(T_a)
% 14.09/14.34 | c_HOL_Ouminus__class_Ouminus(V_x,T_a) != c_HOL_Ouminus__class_Ouminus(V_y,T_a)
% 14.09/14.34 | V_x = V_y ) ).
% 14.09/14.34
% 14.09/14.34 cnf(cls_neg__equal__iff__equal_0,axiom,
% 14.09/14.34 ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 14.09/14.34 | c_HOL_Ouminus__class_Ouminus(V_a,T_a) != c_HOL_Ouminus__class_Ouminus(V_b,T_a)
% 14.09/14.34 | V_a = V_b ) ).
% 14.09/14.34
% 14.09/14.34 cnf(cls_real__sqrt__not__eq__zero_0,axiom,
% 14.09/14.34 ( c_NthRoot_Osqrt(V_x) != c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal)
% 14.09/14.34 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),V_x,tc_RealDef_Oreal) ) ).
% 14.09/14.34
% 14.09/14.34 cnf(cls_inverse__less__1__iff_1,axiom,
% 14.09/14.34 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.34 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.34 | c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Oinverse(V_x,T_a),c_HOL_Oone__class_Oone(T_a),T_a)
% 14.09/14.34 | ~ c_lessequals(V_x,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.09/14.34
% 14.09/14.34 cnf(cls_zero__less__norm__iff_0,axiom,
% 14.09/14.34 ( ~ class_RealVector_Oreal__normed__vector(T_a)
% 14.09/14.34 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),c_RealVector_Onorm__class_Onorm(c_HOL_Ozero__class_Ozero(T_a),T_a),tc_RealDef_Oreal) ) ).
% 14.09/14.34
% 14.09/14.34 cnf(cls_neg__equal__0__iff__equal_0,axiom,
% 14.09/14.34 ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 14.09/14.34 | c_HOL_Ouminus__class_Ouminus(V_a,T_a) != c_HOL_Ozero__class_Ozero(T_a)
% 14.09/14.34 | V_a = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.09/14.34
% 14.09/14.34 cnf(cls_neg__less__iff__less_1,axiom,
% 14.09/14.34 ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 14.09/14.34 | 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)
% 14.09/14.34 | ~ c_HOL_Oord__class_Oless(V_a,V_b,T_a) ) ).
% 14.09/14.34
% 14.09/14.34 cnf(cls_neg__less__iff__less_0,axiom,
% 14.09/14.34 ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 14.09/14.34 | c_HOL_Oord__class_Oless(V_a,V_b,T_a)
% 14.09/14.34 | ~ 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) ) ).
% 14.09/14.34
% 14.09/14.34 cnf(cls_abs__div__pos_0,axiom,
% 14.09/14.34 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.34 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.34 | c_HOL_Oinverse__class_Odivide(c_HOL_Oabs__class_Oabs(V_x,T_a),V_y,T_a) = c_HOL_Oabs__class_Oabs(c_HOL_Oinverse__class_Odivide(V_x,V_y,T_a),T_a)
% 14.09/14.34 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_y,T_a) ) ).
% 14.09/14.34
% 14.09/14.34 cnf(cls_divide__nonpos__pos_0,axiom,
% 14.09/14.34 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.34 | c_lessequals(c_HOL_Oinverse__class_Odivide(V_x,V_y,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.34 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_y,T_a)
% 14.09/14.34 | ~ c_lessequals(V_x,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.09/14.34
% 14.09/14.34 cnf(cls_inverse__eq__iff__eq_0,axiom,
% 14.09/14.34 ( ~ class_Ring__and__Field_Odivision__ring(T_a)
% 14.09/14.34 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.34 | c_HOL_Oinverse__class_Oinverse(V_a,T_a) != c_HOL_Oinverse__class_Oinverse(V_b,T_a)
% 14.09/14.34 | V_a = V_b ) ).
% 14.09/14.34
% 14.09/14.34 cnf(cls_nonzero__inverse__eq__imp__eq_0,axiom,
% 14.09/14.34 ( ~ class_Ring__and__Field_Odivision__ring(T_a)
% 14.09/14.34 | c_HOL_Oinverse__class_Oinverse(V_a,T_a) != c_HOL_Oinverse__class_Oinverse(V_b,T_a)
% 14.09/14.34 | V_a = V_b
% 14.09/14.34 | V_b = c_HOL_Ozero__class_Ozero(T_a)
% 14.09/14.34 | V_a = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.09/14.34
% 14.09/14.34 cnf(cls_inverse__nonzero__iff__nonzero_1,axiom,
% 14.09/14.34 ( ~ class_Ring__and__Field_Odivision__ring(T_a)
% 14.09/14.34 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.34 | c_HOL_Oinverse__class_Oinverse(c_HOL_Ozero__class_Ozero(T_a),T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.09/14.34
% 14.09/14.34 cnf(cls_inverse__zero_0,axiom,
% 14.09/14.34 ( ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.34 | c_HOL_Oinverse__class_Oinverse(c_HOL_Ozero__class_Ozero(T_a),T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.09/14.34
% 14.09/14.34 cnf(cls_less__eqI_1,axiom,
% 14.09/14.34 ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 14.09/14.34 | c_HOL_Ominus__class_Ominus(V_x,V_y,T_a) != c_HOL_Ominus__class_Ominus(V_x_H,V_y_H,T_a)
% 14.09/14.34 | c_HOL_Oord__class_Oless(V_x,V_y,T_a)
% 14.09/14.34 | ~ c_HOL_Oord__class_Oless(V_x_H,V_y_H,T_a) ) ).
% 14.09/14.34
% 14.09/14.34 cnf(cls_less__eqI_0,axiom,
% 14.09/14.34 ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 14.09/14.34 | c_HOL_Ominus__class_Ominus(V_x,V_y,T_a) != c_HOL_Ominus__class_Ominus(V_x_H,V_y_H,T_a)
% 14.09/14.34 | c_HOL_Oord__class_Oless(V_x_H,V_y_H,T_a)
% 14.09/14.34 | ~ c_HOL_Oord__class_Oless(V_x,V_y,T_a) ) ).
% 14.09/14.34
% 14.09/14.34 cnf(cls_inverse__minus__eq_0,axiom,
% 14.09/14.34 ( ~ class_Ring__and__Field_Odivision__ring(T_a)
% 14.09/14.34 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.34 | c_HOL_Oinverse__class_Oinverse(c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a) = c_HOL_Ouminus__class_Ouminus(c_HOL_Oinverse__class_Oinverse(V_a,T_a),T_a) ) ).
% 14.09/14.34
% 14.09/14.34 cnf(cls_dvd__div__neg_0,axiom,
% 14.09/14.34 ( ~ class_Divides_Oring__div(T_a)
% 14.09/14.34 | c_Divides_Odiv__class_Odiv(V_x,c_HOL_Ouminus__class_Ouminus(V_y,T_a),T_a) = c_HOL_Ouminus__class_Ouminus(c_Divides_Odiv__class_Odiv(V_x,V_y,T_a),T_a)
% 14.09/14.34 | ~ c_Ring__and__Field_Odvd__class_Odvd(V_y,V_x,T_a) ) ).
% 14.09/14.34
% 14.09/14.34 cnf(cls_dvd__neg__div_0,axiom,
% 14.09/14.34 ( ~ class_Divides_Oring__div(T_a)
% 14.09/14.34 | c_Divides_Odiv__class_Odiv(c_HOL_Ouminus__class_Ouminus(V_x,T_a),V_y,T_a) = c_HOL_Ouminus__class_Ouminus(c_Divides_Odiv__class_Odiv(V_x,V_y,T_a),T_a)
% 14.09/14.34 | ~ c_Ring__and__Field_Odvd__class_Odvd(V_y,V_x,T_a) ) ).
% 14.09/14.34
% 14.09/14.34 cnf(cls_frac__less_0,axiom,
% 14.09/14.34 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.34 | c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_x,V_z,T_a),c_HOL_Oinverse__class_Odivide(V_y,V_w,T_a),T_a)
% 14.09/14.34 | ~ c_lessequals(V_w,V_z,T_a)
% 14.09/14.34 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_w,T_a)
% 14.09/14.34 | ~ c_HOL_Oord__class_Oless(V_x,V_y,T_a)
% 14.09/14.34 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_x,T_a) ) ).
% 14.09/14.34
% 14.09/14.34 cnf(cls_abs__minus__commute_0,axiom,
% 14.09/14.34 ( ~ class_OrderedGroup_Opordered__ab__group__add__abs(T_a)
% 14.09/14.34 | c_HOL_Oabs__class_Oabs(c_HOL_Ominus__class_Ominus(V_a,V_b,T_a),T_a) = c_HOL_Oabs__class_Oabs(c_HOL_Ominus__class_Ominus(V_b,V_a,T_a),T_a) ) ).
% 14.09/14.34
% 14.09/14.34 cnf(cls_minus__divide__right_0,axiom,
% 14.09/14.34 ( ~ class_Ring__and__Field_Ofield(T_a)
% 14.09/14.34 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.34 | c_HOL_Ouminus__class_Ouminus(c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a),T_a) = c_HOL_Oinverse__class_Odivide(V_a,c_HOL_Ouminus__class_Ouminus(V_b,T_a),T_a) ) ).
% 14.09/14.34
% 14.09/14.34 cnf(cls_minus__divide__left_0,axiom,
% 14.09/14.34 ( ~ class_Ring__and__Field_Ofield(T_a)
% 14.09/14.34 | c_HOL_Ouminus__class_Ouminus(c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a),T_a) = c_HOL_Oinverse__class_Odivide(c_HOL_Ouminus__class_Ouminus(V_a,T_a),V_b,T_a) ) ).
% 14.09/14.34
% 14.09/14.34 cnf(cls_one__le__inverse__iff_2,axiom,
% 14.09/14.34 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.34 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.34 | c_lessequals(c_HOL_Oone__class_Oone(T_a),c_HOL_Oinverse__class_Oinverse(V_x,T_a),T_a)
% 14.09/14.34 | ~ c_lessequals(V_x,c_HOL_Oone__class_Oone(T_a),T_a)
% 14.09/14.34 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_x,T_a) ) ).
% 14.09/14.34
% 14.09/14.34 cnf(cls_neg__equal__zero_0,axiom,
% 14.09/14.34 ( ~ class_OrderedGroup_Oordered__ab__group__add(T_a)
% 14.09/14.34 | c_HOL_Ouminus__class_Ouminus(V_a,T_a) != V_a
% 14.09/14.34 | V_a = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.09/14.34
% 14.09/14.34 cnf(cls_nonzero__inverse__eq__divide_0,axiom,
% 14.09/14.34 ( ~ class_Ring__and__Field_Ofield(T_a)
% 14.09/14.34 | c_HOL_Oinverse__class_Oinverse(V_a,T_a) = c_HOL_Oinverse__class_Odivide(c_HOL_Oone__class_Oone(T_a),V_a,T_a)
% 14.09/14.34 | V_a = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.09/14.34
% 14.09/14.34 cnf(cls_sgn__sgn_0,axiom,
% 14.09/14.34 ( ~ class_Ring__and__Field_Oordered__idom(T_a)
% 14.09/14.34 | c_HOL_Osgn__class_Osgn(c_HOL_Osgn__class_Osgn(V_a,T_a),T_a) = c_HOL_Osgn__class_Osgn(V_a,T_a) ) ).
% 14.09/14.34
% 14.09/14.34 cnf(cls_divide__less__eq_2,axiom,
% 14.09/14.34 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.34 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.34 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 14.09/14.34 | c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.34 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 14.09/14.34 | ~ c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),V_a,T_a) ) ).
% 14.09/14.34
% 14.09/14.34 cnf(cls_divide__less__eq_3,axiom,
% 14.09/14.34 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.34 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.34 | c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),V_a,T_a)
% 14.09/14.34 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 14.09/14.34 | c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.34 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a) ) ).
% 14.09/14.34
% 14.09/14.34 cnf(cls_divide__less__eq_8,axiom,
% 14.09/14.34 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.34 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.34 | c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),V_a,T_a)
% 14.09/14.34 | ~ c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.34 | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),V_b,T_a)
% 14.09/14.34 | ~ c_HOL_Oord__class_Oless(V_b,c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),T_a) ) ).
% 14.09/14.34
% 14.09/14.34 cnf(cls_divide__less__eq_9,axiom,
% 14.09/14.34 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.34 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.34 | c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),V_a,T_a)
% 14.09/14.34 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 14.09/14.34 | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),V_b,T_a)
% 14.09/14.34 | ~ c_HOL_Oord__class_Oless(V_b,c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),T_a) ) ).
% 14.09/14.34
% 14.09/14.34 cnf(cls_less__divide__eq_2,axiom,
% 14.09/14.34 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.34 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.34 | c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.34 | c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.34 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 14.09/14.34 | ~ c_HOL_Oord__class_Oless(V_a,c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a) ) ).
% 14.09/14.34
% 14.09/14.34 cnf(cls_less__divide__eq_3,axiom,
% 14.09/14.34 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.34 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.34 | c_HOL_Oord__class_Oless(V_a,c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a)
% 14.09/14.34 | ~ c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.34 | c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.34 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a) ) ).
% 14.09/14.34
% 14.09/14.34 cnf(cls_less__divide__eq_8,axiom,
% 14.09/14.34 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.34 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.34 | c_HOL_Oord__class_Oless(V_a,c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a)
% 14.09/14.34 | ~ c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.34 | ~ c_HOL_Oord__class_Oless(V_b,c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),T_a)
% 14.09/14.34 | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),V_b,T_a) ) ).
% 14.09/14.34
% 14.09/14.34 cnf(cls_less__divide__eq_9,axiom,
% 14.09/14.34 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.34 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.34 | c_HOL_Oord__class_Oless(V_a,c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a)
% 14.09/14.34 | ~ c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.34 | ~ c_HOL_Oord__class_Oless(V_b,c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),T_a)
% 14.09/14.34 | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),V_b,T_a) ) ).
% 14.09/14.34
% 14.09/14.34 cnf(cls_divide__neg__neg_0,axiom,
% 14.09/14.34 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.34 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oinverse__class_Odivide(V_x,V_y,T_a),T_a)
% 14.09/14.34 | ~ c_HOL_Oord__class_Oless(V_y,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.34 | ~ c_HOL_Oord__class_Oless(V_x,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.09/14.34
% 14.09/14.34 cnf(cls_divide__pos__pos_0,axiom,
% 14.09/14.34 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.34 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oinverse__class_Odivide(V_x,V_y,T_a),T_a)
% 14.09/14.34 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_y,T_a)
% 14.09/14.34 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_x,T_a) ) ).
% 14.09/14.34
% 14.09/14.34 cnf(cls_zero__less__divide__iff_4,axiom,
% 14.09/14.34 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.34 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.34 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a),T_a)
% 14.09/14.34 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 14.09/14.34 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 14.09/14.34
% 14.09/14.34 cnf(cls_zero__less__divide__iff_5,axiom,
% 14.09/14.34 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.34 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.34 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a),T_a)
% 14.09/14.34 | ~ c_HOL_Oord__class_Oless(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.34 | ~ c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.09/14.34
% 14.09/14.34 cnf(cls_real__sqrt__zero_0,axiom,
% 14.09/14.34 c_NthRoot_Osqrt(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal)) = c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal) ).
% 14.09/14.34
% 14.09/14.34 cnf(cls_one__less__inverse__iff_1,axiom,
% 14.09/14.34 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.34 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.34 | c_HOL_Oord__class_Oless(V_x,c_HOL_Oone__class_Oone(T_a),T_a)
% 14.09/14.34 | ~ c_HOL_Oord__class_Oless(c_HOL_Oone__class_Oone(T_a),c_HOL_Oinverse__class_Oinverse(V_x,T_a),T_a) ) ).
% 14.09/14.34
% 14.09/14.34 cnf(cls_abs__sgn_0,axiom,
% 14.09/14.34 ( ~ class_Ring__and__Field_Oordered__idom(T_a)
% 14.09/14.34 | c_HOL_Oabs__class_Oabs(V_k,T_a) = c_HOL_Otimes__class_Otimes(V_k,c_HOL_Osgn__class_Osgn(V_k,T_a),T_a) ) ).
% 14.09/14.34
% 14.09/14.34 cnf(cls_nonzero__minus__divide__divide_0,axiom,
% 14.09/14.34 ( ~ class_Ring__and__Field_Ofield(T_a)
% 14.09/14.34 | c_HOL_Oinverse__class_Odivide(c_HOL_Ouminus__class_Ouminus(V_a,T_a),c_HOL_Ouminus__class_Ouminus(V_b,T_a),T_a) = c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a)
% 14.09/14.34 | V_b = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.09/14.34
% 14.09/14.34 cnf(cls_div__dvd__div_0,axiom,
% 14.09/14.34 ( ~ class_Divides_Osemiring__div(T_a)
% 14.09/14.34 | c_Ring__and__Field_Odvd__class_Odvd(V_b,V_c,T_a)
% 14.09/14.34 | ~ c_Ring__and__Field_Odvd__class_Odvd(c_Divides_Odiv__class_Odiv(V_b,V_a,T_a),c_Divides_Odiv__class_Odiv(V_c,V_a,T_a),T_a)
% 14.09/14.34 | ~ c_Ring__and__Field_Odvd__class_Odvd(V_a,V_c,T_a)
% 14.09/14.34 | ~ c_Ring__and__Field_Odvd__class_Odvd(V_a,V_b,T_a) ) ).
% 14.09/14.34
% 14.09/14.34 cnf(cls_div__dvd__div_1,axiom,
% 14.09/14.34 ( ~ class_Divides_Osemiring__div(T_a)
% 14.09/14.34 | c_Ring__and__Field_Odvd__class_Odvd(c_Divides_Odiv__class_Odiv(V_b,V_a,T_a),c_Divides_Odiv__class_Odiv(V_c,V_a,T_a),T_a)
% 14.09/14.34 | ~ c_Ring__and__Field_Odvd__class_Odvd(V_b,V_c,T_a)
% 14.09/14.34 | ~ c_Ring__and__Field_Odvd__class_Odvd(V_a,V_c,T_a)
% 14.09/14.35 | ~ c_Ring__and__Field_Odvd__class_Odvd(V_a,V_b,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_dvd__minus__iff_0,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Ocomm__ring__1(T_a)
% 14.09/14.35 | c_Ring__and__Field_Odvd__class_Odvd(V_x,V_y,T_a)
% 14.09/14.35 | ~ c_Ring__and__Field_Odvd__class_Odvd(V_x,c_HOL_Ouminus__class_Ouminus(V_y,T_a),T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_dvd__minus__iff_1,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Ocomm__ring__1(T_a)
% 14.09/14.35 | c_Ring__and__Field_Odvd__class_Odvd(V_x,c_HOL_Ouminus__class_Ouminus(V_y,T_a),T_a)
% 14.09/14.35 | ~ c_Ring__and__Field_Odvd__class_Odvd(V_x,V_y,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_minus__dvd__iff_0,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Ocomm__ring__1(T_a)
% 14.09/14.35 | c_Ring__and__Field_Odvd__class_Odvd(V_x,V_y,T_a)
% 14.09/14.35 | ~ c_Ring__and__Field_Odvd__class_Odvd(c_HOL_Ouminus__class_Ouminus(V_x,T_a),V_y,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_minus__dvd__iff_1,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Ocomm__ring__1(T_a)
% 14.09/14.35 | c_Ring__and__Field_Odvd__class_Odvd(c_HOL_Ouminus__class_Ouminus(V_x,T_a),V_y,T_a)
% 14.09/14.35 | ~ c_Ring__and__Field_Odvd__class_Odvd(V_x,V_y,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_Rational_Oordered__idom__class_Osgn__less_0,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__idom(T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_HOL_Osgn__class_Osgn(V_a,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_Rational_Oordered__idom__class_Osgn__less_1,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__idom(T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(c_HOL_Osgn__class_Osgn(V_a,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_divide__strict__right__mono_0,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_a,V_c,T_a),c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(V_a,V_b,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_divide__strict__right__mono__neg_0,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_a,V_c,T_a),c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(V_b,V_a,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_divide__nonneg__pos_0,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.35 | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oinverse__class_Odivide(V_x,V_y,T_a),T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_y,T_a)
% 14.09/14.35 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_x,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_divide__nonpos__neg_0,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.35 | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oinverse__class_Odivide(V_x,V_y,T_a),T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(V_y,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.35 | ~ c_lessequals(V_x,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_divide__self__if_0,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Ofield(T_a)
% 14.09/14.35 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.35 | c_HOL_Oinverse__class_Odivide(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_abs__leI_0,axiom,
% 14.09/14.35 ( ~ class_OrderedGroup_Opordered__ab__group__add__abs(T_a)
% 14.09/14.35 | c_lessequals(c_HOL_Oabs__class_Oabs(V_a,T_a),V_b,T_a)
% 14.09/14.35 | ~ c_lessequals(c_HOL_Ouminus__class_Ouminus(V_a,T_a),V_b,T_a)
% 14.09/14.35 | ~ c_lessequals(V_a,V_b,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_abs__le__iff_2,axiom,
% 14.09/14.35 ( ~ class_OrderedGroup_Opordered__ab__group__add__abs(T_a)
% 14.09/14.35 | c_lessequals(c_HOL_Oabs__class_Oabs(V_a,T_a),V_b,T_a)
% 14.09/14.35 | ~ c_lessequals(c_HOL_Ouminus__class_Ouminus(V_a,T_a),V_b,T_a)
% 14.09/14.35 | ~ c_lessequals(V_a,V_b,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_abs__minus__cancel_0,axiom,
% 14.09/14.35 ( ~ class_OrderedGroup_Opordered__ab__group__add__abs(T_a)
% 14.09/14.35 | c_HOL_Oabs__class_Oabs(c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a) = c_HOL_Oabs__class_Oabs(V_a,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_poly__bound__exists_0,axiom,
% 14.09/14.35 c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),v_sko__Fundamental__Theorem__Algebra__Mirabelle__Xpoly__bound__exists__1(V_p,V_r),tc_RealDef_Oreal) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_dvd__0__left_0,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 14.09/14.35 | V_a = c_HOL_Ozero__class_Ozero(T_a)
% 14.09/14.35 | ~ c_Ring__and__Field_Odvd__class_Odvd(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_nonzero__inverse__inverse__eq_0,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Odivision__ring(T_a)
% 14.09/14.35 | c_HOL_Oinverse__class_Oinverse(c_HOL_Oinverse__class_Oinverse(V_a,T_a),T_a) = V_a
% 14.09/14.35 | V_a = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_divide__le__eq_5,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.35 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.35 | c_lessequals(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),V_a,T_a)
% 14.09/14.35 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 14.09/14.35 | ~ c_lessequals(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),V_b,T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_divide__le__eq_7,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.35 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.35 | c_lessequals(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),V_a,T_a)
% 14.09/14.35 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.35 | ~ c_lessequals(V_b,c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_le__divide__eq_5,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.35 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.35 | c_lessequals(V_a,c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a)
% 14.09/14.35 | ~ c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.35 | ~ c_lessequals(V_b,c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_le__divide__eq_7,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.35 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.35 | c_lessequals(V_a,c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a)
% 14.09/14.35 | ~ c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.35 | ~ c_lessequals(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),V_b,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_real__sqrt__gt__0__iff_1,axiom,
% 14.09/14.35 ( c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),c_NthRoot_Osqrt(V_y),tc_RealDef_Oreal)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),V_y,tc_RealDef_Oreal) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_real__sqrt__gt__0__iff_0,axiom,
% 14.09/14.35 ( c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),V_y,tc_RealDef_Oreal)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),c_NthRoot_Osqrt(V_y),tc_RealDef_Oreal) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_real__sqrt__gt__zero_0,axiom,
% 14.09/14.35 ( c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),c_NthRoot_Osqrt(V_x),tc_RealDef_Oreal)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),V_x,tc_RealDef_Oreal) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_nonzero__abs__inverse_0,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.35 | c_HOL_Oabs__class_Oabs(c_HOL_Oinverse__class_Oinverse(V_a,T_a),T_a) = c_HOL_Oinverse__class_Oinverse(c_HOL_Oabs__class_Oabs(V_a,T_a),T_a)
% 14.09/14.35 | V_a = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_nonzero__abs__divide_0,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.35 | c_HOL_Oabs__class_Oabs(c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a),T_a) = c_HOL_Oinverse__class_Odivide(c_HOL_Oabs__class_Oabs(V_a,T_a),c_HOL_Oabs__class_Oabs(V_b,T_a),T_a)
% 14.09/14.35 | V_b = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_inverse__positive__imp__positive_0,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 14.09/14.35 | V_a = c_HOL_Ozero__class_Ozero(T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oinverse__class_Oinverse(V_a,T_a),T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_sgn__if_2,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Osgn__if(T_a)
% 14.09/14.35 | c_HOL_Osgn__class_Osgn(V_x,T_a) = c_HOL_Ouminus__class_Ouminus(c_HOL_Oone__class_Oone(T_a),T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_x,T_a)
% 14.09/14.35 | V_x = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_real__sqrt__eq__zero__cancel_0,axiom,
% 14.09/14.35 ( c_NthRoot_Osqrt(V_x) != c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal)
% 14.09/14.35 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),V_x,tc_RealDef_Oreal)
% 14.09/14.35 | V_x = c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_inverse__less__imp__less_0,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(V_b,V_a,T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Oinverse(V_a,T_a),c_HOL_Oinverse__class_Oinverse(V_b,T_a),T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_less__imp__inverse__less_0,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Oinverse(V_b,T_a),c_HOL_Oinverse__class_Oinverse(V_a,T_a),T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(V_a,V_b,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_inverse__less__imp__less__neg_0,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(V_b,V_a,T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Oinverse(V_a,T_a),c_HOL_Oinverse__class_Oinverse(V_b,T_a),T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_less__imp__inverse__less__neg_0,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Oinverse(V_b,T_a),c_HOL_Oinverse__class_Oinverse(V_a,T_a),T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(V_a,V_b,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_divide__less__0__1__iff_0,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.35 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(c_HOL_Oone__class_Oone(T_a),V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_divide__less__0__1__iff_1,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.35 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(c_HOL_Oone__class_Oone(T_a),V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_abs__add__one__gt__zero_0,axiom,
% 14.09/14.35 c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),c_HOL_Oplus__class_Oplus(c_HOL_Oone__class_Oone(tc_RealDef_Oreal),c_HOL_Oabs__class_Oabs(V_x,tc_RealDef_Oreal),tc_RealDef_Oreal),tc_RealDef_Oreal) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_real__sqrt__eq__0__iff_0,axiom,
% 14.09/14.35 ( c_NthRoot_Osqrt(V_x) != c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal)
% 14.09/14.35 | V_x = c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_abs__idempotent_0,axiom,
% 14.09/14.35 ( ~ class_OrderedGroup_Opordered__ab__group__add__abs(T_a)
% 14.09/14.35 | c_HOL_Oabs__class_Oabs(c_HOL_Oabs__class_Oabs(V_a,T_a),T_a) = c_HOL_Oabs__class_Oabs(V_a,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_zero__less__abs__iff_1,axiom,
% 14.09/14.35 ( ~ class_OrderedGroup_Opordered__ab__group__add__abs(T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oabs__class_Oabs(V_a,T_a),T_a)
% 14.09/14.35 | V_a = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_not__real__square__gt__zero_1,axiom,
% 14.09/14.35 ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),c_HOL_Otimes__class_Otimes(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),tc_RealDef_Oreal),tc_RealDef_Oreal) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_inverse__le__imp__le_0,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.35 | c_lessequals(V_b,V_a,T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 14.09/14.35 | ~ c_lessequals(c_HOL_Oinverse__class_Oinverse(V_a,T_a),c_HOL_Oinverse__class_Oinverse(V_b,T_a),T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_le__imp__inverse__le_0,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.35 | c_lessequals(c_HOL_Oinverse__class_Oinverse(V_b,T_a),c_HOL_Oinverse__class_Oinverse(V_a,T_a),T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 14.09/14.35 | ~ c_lessequals(V_a,V_b,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_inverse__le__imp__le__neg_0,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.35 | c_lessequals(V_b,V_a,T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.35 | ~ c_lessequals(c_HOL_Oinverse__class_Oinverse(V_a,T_a),c_HOL_Oinverse__class_Oinverse(V_b,T_a),T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_le__imp__inverse__le__neg_0,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.35 | c_lessequals(c_HOL_Oinverse__class_Oinverse(V_b,T_a),c_HOL_Oinverse__class_Oinverse(V_a,T_a),T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.35 | ~ c_lessequals(V_a,V_b,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_divide__less__eq_1,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.35 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),V_b,T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),V_a,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_divide__less__eq_4,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.35 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),V_a,T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),V_b,T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_divide__less__eq_5,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.35 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),V_a,T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),V_b,T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_divide__less__eq_7,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.35 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),V_a,T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(V_b,c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_less__divide__eq_1,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.35 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(V_b,c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(V_a,c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_less__divide__eq_4,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.35 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(V_a,c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(V_b,c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_less__divide__eq_5,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.35 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(V_a,c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(V_b,c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_less__divide__eq_7,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.35 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(V_a,c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),V_b,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_abs__ge__minus__self_0,axiom,
% 14.09/14.35 ( ~ class_OrderedGroup_Opordered__ab__group__add__abs(T_a)
% 14.09/14.35 | c_lessequals(c_HOL_Ouminus__class_Ouminus(V_a,T_a),c_HOL_Oabs__class_Oabs(V_a,T_a),T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_abs__less__iff_0,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__idom(T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(V_a,V_b,T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_HOL_Oabs__class_Oabs(V_a,T_a),V_b,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_mult__left_Opos__bounded_0,axiom,
% 14.09/14.35 ( ~ class_RealVector_Oreal__normed__algebra(T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),c_RealVector_Osko__RealVector__Xmult__left__Xpos__bounded__1__1(V_y,T_a),tc_RealDef_Oreal) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_nonzero__inverse__minus__eq_0,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Odivision__ring(T_a)
% 14.09/14.35 | c_HOL_Oinverse__class_Oinverse(c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a) = c_HOL_Ouminus__class_Ouminus(c_HOL_Oinverse__class_Oinverse(V_a,T_a),T_a)
% 14.09/14.35 | V_a = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_dvd__0__right_0,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 14.09/14.35 | c_Ring__and__Field_Odvd__class_Odvd(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_real__sqrt__lt__1__iff_1,axiom,
% 14.09/14.35 ( c_HOL_Oord__class_Oless(c_NthRoot_Osqrt(V_x),c_HOL_Oone__class_Oone(tc_RealDef_Oreal),tc_RealDef_Oreal)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(V_x,c_HOL_Oone__class_Oone(tc_RealDef_Oreal),tc_RealDef_Oreal) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_real__sqrt__lt__1__iff_0,axiom,
% 14.09/14.35 ( c_HOL_Oord__class_Oless(V_x,c_HOL_Oone__class_Oone(tc_RealDef_Oreal),tc_RealDef_Oreal)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_NthRoot_Osqrt(V_x),c_HOL_Oone__class_Oone(tc_RealDef_Oreal),tc_RealDef_Oreal) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_abs__dvd__iff_0,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__idom(T_a)
% 14.09/14.35 | c_Ring__and__Field_Odvd__class_Odvd(V_m,V_k,T_a)
% 14.09/14.35 | ~ c_Ring__and__Field_Odvd__class_Odvd(c_HOL_Oabs__class_Oabs(V_m,T_a),V_k,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_abs__dvd__iff_1,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__idom(T_a)
% 14.09/14.35 | c_Ring__and__Field_Odvd__class_Odvd(c_HOL_Oabs__class_Oabs(V_m,T_a),V_k,T_a)
% 14.09/14.35 | ~ c_Ring__and__Field_Odvd__class_Odvd(V_m,V_k,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_dvd__abs__iff_0,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__idom(T_a)
% 14.09/14.35 | c_Ring__and__Field_Odvd__class_Odvd(V_m,V_k,T_a)
% 14.09/14.35 | ~ c_Ring__and__Field_Odvd__class_Odvd(V_m,c_HOL_Oabs__class_Oabs(V_k,T_a),T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_dvd__abs__iff_1,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__idom(T_a)
% 14.09/14.35 | c_Ring__and__Field_Odvd__class_Odvd(V_m,c_HOL_Oabs__class_Oabs(V_k,T_a),T_a)
% 14.09/14.35 | ~ c_Ring__and__Field_Odvd__class_Odvd(V_m,V_k,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_linorder__neq__iff_1,axiom,
% 14.09/14.35 ( ~ class_Orderings_Olinorder(T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(V_x,V_x,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_le__divide__eq_8,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.35 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.35 | c_lessequals(V_a,c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.35 | ~ c_lessequals(V_b,c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),T_a)
% 14.09/14.35 | ~ c_lessequals(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),V_b,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_divide__le__eq_8,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.35 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.35 | c_lessequals(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),V_a,T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.35 | ~ c_lessequals(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),V_b,T_a)
% 14.09/14.35 | ~ c_lessequals(V_b,c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_sgn__if_1,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Osgn__if(T_a)
% 14.09/14.35 | c_HOL_Osgn__class_Osgn(V_x,T_a) = c_HOL_Oone__class_Oone(T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_x,T_a)
% 14.09/14.35 | V_x = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_abs__less__iff_1,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__idom(T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(c_HOL_Ouminus__class_Ouminus(V_a,T_a),V_b,T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_HOL_Oabs__class_Oabs(V_a,T_a),V_b,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_real__mult__order_0,axiom,
% 14.09/14.35 ( c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),c_HOL_Otimes__class_Otimes(V_x,V_y,tc_RealDef_Oreal),tc_RealDef_Oreal)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),V_y,tc_RealDef_Oreal)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),V_x,tc_RealDef_Oreal) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_diff__divide__distrib_0,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Ofield(T_a)
% 14.09/14.35 | c_HOL_Oinverse__class_Odivide(c_HOL_Ominus__class_Ominus(V_a,V_b,T_a),V_c,T_a) = c_HOL_Ominus__class_Ominus(c_HOL_Oinverse__class_Odivide(V_a,V_c,T_a),c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_divide_Odiff_0,axiom,
% 14.09/14.35 ( ~ class_RealVector_Oreal__normed__field(T_a)
% 14.09/14.35 | c_HOL_Oinverse__class_Odivide(c_HOL_Ominus__class_Ominus(V_x,V_y,T_a),V_ya,T_a) = c_HOL_Ominus__class_Ominus(c_HOL_Oinverse__class_Odivide(V_x,V_ya,T_a),c_HOL_Oinverse__class_Odivide(V_y,V_ya,T_a),T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_div__by__0_0,axiom,
% 14.09/14.35 ( ~ class_Divides_Osemiring__div(T_a)
% 14.09/14.35 | c_Divides_Odiv__class_Odiv(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_div__0_0,axiom,
% 14.09/14.35 ( ~ class_Divides_Osemiring__div(T_a)
% 14.09/14.35 | c_Divides_Odiv__class_Odiv(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_Rational_Oordered__idom__class_Osgn__greater_1,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__idom(T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Osgn__class_Osgn(V_a,T_a),T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_Rational_Oordered__idom__class_Osgn__greater_0,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__idom(T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Osgn__class_Osgn(V_a,T_a),T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_dvd__diff_0,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Ocomm__ring__1(T_a)
% 14.09/14.35 | c_Ring__and__Field_Odvd__class_Odvd(V_x,c_HOL_Ominus__class_Ominus(V_y,V_z,T_a),T_a)
% 14.09/14.35 | ~ c_Ring__and__Field_Odvd__class_Odvd(V_x,V_z,T_a)
% 14.09/14.35 | ~ c_Ring__and__Field_Odvd__class_Odvd(V_x,V_y,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_abs__of__neg_0,axiom,
% 14.09/14.35 ( ~ class_OrderedGroup_Opordered__ab__group__add__abs(T_a)
% 14.09/14.35 | c_HOL_Oabs__class_Oabs(V_a,T_a) = c_HOL_Ouminus__class_Ouminus(V_a,T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_abs__if_0,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oabs__if(T_a)
% 14.09/14.35 | c_HOL_Oabs__class_Oabs(V_a,T_a) = c_HOL_Ouminus__class_Ouminus(V_a,T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_abs__if__lattice_0,axiom,
% 14.09/14.35 ( ~ class_Orderings_Olinorder(T_a)
% 14.09/14.35 | ~ class_OrderedGroup_Olordered__ab__group__add__abs(T_a)
% 14.09/14.35 | c_HOL_Oabs__class_Oabs(V_a,T_a) = c_HOL_Ouminus__class_Ouminus(V_a,T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_mult__imp__le__div__pos_0,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.35 | c_lessequals(V_z,c_HOL_Oinverse__class_Odivide(V_x,V_y,T_a),T_a)
% 14.09/14.35 | ~ c_lessequals(c_HOL_Otimes__class_Otimes(V_z,V_y,T_a),V_x,T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_y,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_mult__imp__div__pos__le_0,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.35 | c_lessequals(c_HOL_Oinverse__class_Odivide(V_x,V_y,T_a),V_z,T_a)
% 14.09/14.35 | ~ c_lessequals(V_x,c_HOL_Otimes__class_Otimes(V_z,V_y,T_a),T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_y,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_le__divide__eq_6,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.35 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.35 | c_lessequals(V_a,c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 14.09/14.35 | ~ c_lessequals(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),V_b,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_le__divide__eq_0,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.35 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.35 | c_lessequals(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),V_b,T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 14.09/14.35 | ~ c_lessequals(V_a,c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_divide__le__eq_6,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.35 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.35 | c_lessequals(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),V_a,T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 14.09/14.35 | ~ c_lessequals(V_b,c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_divide__le__eq_0,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.35 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.35 | c_lessequals(V_b,c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 14.09/14.35 | ~ c_lessequals(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),V_a,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_mult__sgn__abs_0,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__idom(T_a)
% 14.09/14.35 | c_HOL_Otimes__class_Otimes(c_HOL_Osgn__class_Osgn(V_x,T_a),c_HOL_Oabs__class_Oabs(V_x,T_a),T_a) = V_x ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_abs__minus__le__zero_0,axiom,
% 14.09/14.35 ( ~ class_OrderedGroup_Opordered__ab__group__add__abs(T_a)
% 14.09/14.35 | c_lessequals(c_HOL_Ouminus__class_Ouminus(c_HOL_Oabs__class_Oabs(V_a,T_a),T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_div__add_0,axiom,
% 14.09/14.35 ( ~ class_Divides_Osemiring__div(T_a)
% 14.09/14.35 | c_Divides_Odiv__class_Odiv(c_HOL_Oplus__class_Oplus(V_x,V_y,T_a),V_z,T_a) = c_HOL_Oplus__class_Oplus(c_Divides_Odiv__class_Odiv(V_x,V_z,T_a),c_Divides_Odiv__class_Odiv(V_y,V_z,T_a),T_a)
% 14.09/14.35 | ~ c_Ring__and__Field_Odvd__class_Odvd(V_z,V_y,T_a)
% 14.09/14.35 | ~ c_Ring__and__Field_Odvd__class_Odvd(V_z,V_x,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_inverse__eq__divide_0,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Ofield(T_a)
% 14.09/14.35 | c_HOL_Oinverse__class_Oinverse(V_a,T_a) = c_HOL_Oinverse__class_Odivide(c_HOL_Oone__class_Oone(T_a),V_a,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_class__fieldgb_Oinverse__divide_0,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Ofield(T_a)
% 14.09/14.35 | ~ class_Int_Onumber__ring(T_a)
% 14.09/14.35 | c_HOL_Oinverse__class_Oinverse(V_x,T_a) = c_HOL_Oinverse__class_Odivide(c_HOL_Oone__class_Oone(T_a),V_x,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_divide__left__mono__neg_0,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.35 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.35 | c_lessequals(c_HOL_Oinverse__class_Odivide(V_c,V_a,T_a),c_HOL_Oinverse__class_Odivide(V_c,V_b,T_a),T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),T_a)
% 14.09/14.35 | ~ c_lessequals(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.35 | ~ c_lessequals(V_a,V_b,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_divide__left__mono_0,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.35 | c_lessequals(c_HOL_Oinverse__class_Odivide(V_c,V_a,T_a),c_HOL_Oinverse__class_Odivide(V_c,V_b,T_a),T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),T_a)
% 14.09/14.35 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 14.09/14.35 | ~ c_lessequals(V_b,V_a,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_norm__not__less__zero_0,axiom,
% 14.09/14.35 ( ~ class_RealVector_Oreal__normed__vector(T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_RealVector_Onorm__class_Onorm(V_x,T_a),c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),tc_RealDef_Oreal) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_frac__less2_0,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_x,V_z,T_a),c_HOL_Oinverse__class_Odivide(V_y,V_w,T_a),T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(V_w,V_z,T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_w,T_a)
% 14.09/14.35 | ~ c_lessequals(V_x,V_y,T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_x,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_nonzero__minus__divide__right_0,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Ofield(T_a)
% 14.09/14.35 | c_HOL_Ouminus__class_Ouminus(c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a),T_a) = c_HOL_Oinverse__class_Odivide(V_a,c_HOL_Ouminus__class_Ouminus(V_b,T_a),T_a)
% 14.09/14.35 | V_b = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_neg__less__0__iff__less_1,axiom,
% 14.09/14.35 ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(c_HOL_Ouminus__class_Ouminus(V_a,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_neg__less__0__iff__less_0,axiom,
% 14.09/14.35 ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_HOL_Ouminus__class_Ouminus(V_a,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_abs__mult__less_0,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__idom(T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(c_HOL_Oabs__class_Oabs(V_a,T_a),c_HOL_Oabs__class_Oabs(V_b,T_a),T_a),c_HOL_Otimes__class_Otimes(V_c,V_d,T_a),T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_HOL_Oabs__class_Oabs(V_b,T_a),V_d,T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_HOL_Oabs__class_Oabs(V_a,T_a),V_c,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_inverse__inverse__eq_0,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Odivision__ring(T_a)
% 14.09/14.35 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.35 | c_HOL_Oinverse__class_Oinverse(c_HOL_Oinverse__class_Oinverse(V_a,T_a),T_a) = V_a ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_real__sqrt__lt__0__iff_0,axiom,
% 14.09/14.35 ( c_HOL_Oord__class_Oless(V_x,c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),tc_RealDef_Oreal)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_NthRoot_Osqrt(V_x),c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),tc_RealDef_Oreal) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_real__sqrt__lt__0__iff_1,axiom,
% 14.09/14.35 ( c_HOL_Oord__class_Oless(c_NthRoot_Osqrt(V_x),c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),tc_RealDef_Oreal)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(V_x,c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),tc_RealDef_Oreal) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_xt1_I10_J_0,axiom,
% 14.09/14.35 ( ~ class_Orderings_Oorder(T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(V_z,V_x,T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(V_z,V_y,T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(V_y,V_x,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_order__less__trans_0,axiom,
% 14.09/14.35 ( ~ class_Orderings_Opreorder(T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(V_x,V_z,T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(V_y,V_z,T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(V_x,V_y,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_abs__eq__0_1,axiom,
% 14.09/14.35 ( ~ class_OrderedGroup_Opordered__ab__group__add__abs(T_a)
% 14.09/14.35 | c_HOL_Oabs__class_Oabs(c_HOL_Ozero__class_Ozero(T_a),T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_neg__0__equal__iff__equal_0,axiom,
% 14.09/14.35 ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 14.09/14.35 | c_HOL_Ozero__class_Ozero(T_a) != c_HOL_Ouminus__class_Ouminus(V_a,T_a)
% 14.09/14.35 | c_HOL_Ozero__class_Ozero(T_a) = V_a ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_minus__divide__divide_0,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Ofield(T_a)
% 14.09/14.35 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.35 | c_HOL_Oinverse__class_Odivide(c_HOL_Ouminus__class_Ouminus(V_a,T_a),c_HOL_Ouminus__class_Ouminus(V_b,T_a),T_a) = c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_divide_Ominus_0,axiom,
% 14.09/14.35 ( ~ class_RealVector_Oreal__normed__field(T_a)
% 14.09/14.35 | c_HOL_Oinverse__class_Odivide(c_HOL_Ouminus__class_Ouminus(V_x,T_a),V_y,T_a) = c_HOL_Ouminus__class_Ouminus(c_HOL_Oinverse__class_Odivide(V_x,V_y,T_a),T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_real__sqrt__gt__1__iff_0,axiom,
% 14.09/14.35 ( c_HOL_Oord__class_Oless(c_HOL_Oone__class_Oone(tc_RealDef_Oreal),V_y,tc_RealDef_Oreal)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_HOL_Oone__class_Oone(tc_RealDef_Oreal),c_NthRoot_Osqrt(V_y),tc_RealDef_Oreal) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_real__sqrt__gt__1__iff_1,axiom,
% 14.09/14.35 ( c_HOL_Oord__class_Oless(c_HOL_Oone__class_Oone(tc_RealDef_Oreal),c_NthRoot_Osqrt(V_y),tc_RealDef_Oreal)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_HOL_Oone__class_Oone(tc_RealDef_Oreal),V_y,tc_RealDef_Oreal) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_one__le__inverse__iff_0,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.35 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_x,T_a)
% 14.09/14.35 | ~ c_lessequals(c_HOL_Oone__class_Oone(T_a),c_HOL_Oinverse__class_Oinverse(V_x,T_a),T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_divide__zero__left_0,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Ofield(T_a)
% 14.09/14.35 | c_HOL_Oinverse__class_Odivide(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_divide__eq__eq_1,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Ofield(T_a)
% 14.09/14.35 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.35 | c_HOL_Oinverse__class_Odivide(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_divide__zero_0,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Ofield(T_a)
% 14.09/14.35 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.35 | c_HOL_Oinverse__class_Odivide(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_divide_Ozero_0,axiom,
% 14.09/14.35 ( ~ class_RealVector_Oreal__normed__field(T_a)
% 14.09/14.35 | c_HOL_Oinverse__class_Odivide(c_HOL_Ozero__class_Ozero(T_a),V_y,T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_dvd__div__mult_0,axiom,
% 14.09/14.35 ( ~ class_Divides_Osemiring__div(T_a)
% 14.09/14.35 | c_HOL_Otimes__class_Otimes(c_Divides_Odiv__class_Odiv(V_b,V_a,T_a),V_c,T_a) = c_Divides_Odiv__class_Odiv(c_HOL_Otimes__class_Otimes(V_b,V_c,T_a),V_a,T_a)
% 14.09/14.35 | ~ c_Ring__and__Field_Odvd__class_Odvd(V_a,V_b,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_real__sqrt__le__0__iff_0,axiom,
% 14.09/14.35 ( c_lessequals(V_x,c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),tc_RealDef_Oreal)
% 14.09/14.35 | ~ c_lessequals(c_NthRoot_Osqrt(V_x),c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),tc_RealDef_Oreal) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_real__sqrt__le__0__iff_1,axiom,
% 14.09/14.35 ( c_lessequals(c_NthRoot_Osqrt(V_x),c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),tc_RealDef_Oreal)
% 14.09/14.35 | ~ c_lessequals(V_x,c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),tc_RealDef_Oreal) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_inverse__less__1__iff_0,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.35 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(c_HOL_Oone__class_Oone(T_a),V_x,T_a)
% 14.09/14.35 | c_lessequals(V_x,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Oinverse(V_x,T_a),c_HOL_Oone__class_Oone(T_a),T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_abs__diff__less__iff_0,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__idom(T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(c_HOL_Ominus__class_Ominus(V_a,V_r,T_a),V_x,T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_HOL_Oabs__class_Oabs(c_HOL_Ominus__class_Ominus(V_x,V_a,T_a),T_a),V_r,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_abs__inverse_0,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.35 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.35 | c_HOL_Oabs__class_Oabs(c_HOL_Oinverse__class_Oinverse(V_a,T_a),T_a) = c_HOL_Oinverse__class_Oinverse(c_HOL_Oabs__class_Oabs(V_a,T_a),T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_abs__divide_0,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.35 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.35 | c_HOL_Oabs__class_Oabs(c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a),T_a) = c_HOL_Oinverse__class_Odivide(c_HOL_Oabs__class_Oabs(V_a,T_a),c_HOL_Oabs__class_Oabs(V_b,T_a),T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_abs__of__pos_0,axiom,
% 14.09/14.35 ( ~ class_OrderedGroup_Opordered__ab__group__add__abs(T_a)
% 14.09/14.35 | c_HOL_Oabs__class_Oabs(V_a,T_a) = V_a
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_positive__imp__inverse__positive_0,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oinverse__class_Oinverse(V_a,T_a),T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_inverse__positive__iff__positive_1,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.35 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oinverse__class_Oinverse(V_a,T_a),T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_inverse__positive__iff__positive_0,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.35 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oinverse__class_Oinverse(V_a,T_a),T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_mult_Opos__bounded_0,axiom,
% 14.09/14.35 ( ~ class_RealVector_Oreal__normed__algebra(T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),c_RealVector_Osko__RealVector__Xmult__Xpos__bounded__1__1(V_vskULn,T_a),tc_RealDef_Oreal) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_divide__less__0__iff_3,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.35 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_divide__less__0__iff_2,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.35 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_divide__less__0__iff_1,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.35 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_divide__less__0__iff_0,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.35 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_sgn__0__0_0,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__idom(T_a)
% 14.09/14.35 | c_HOL_Osgn__class_Osgn(V_a,T_a) != c_HOL_Ozero__class_Ozero(T_a)
% 14.09/14.35 | V_a = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_sgn__zero__iff_0,axiom,
% 14.09/14.35 ( ~ class_RealVector_Oreal__normed__vector(T_a)
% 14.09/14.35 | c_HOL_Osgn__class_Osgn(V_x,T_a) != c_HOL_Ozero__class_Ozero(T_a)
% 14.09/14.35 | V_x = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_real__sqrt__less__iff_0,axiom,
% 14.09/14.35 ( c_HOL_Oord__class_Oless(V_x,V_y,tc_RealDef_Oreal)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_NthRoot_Osqrt(V_x),c_NthRoot_Osqrt(V_y),tc_RealDef_Oreal) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_real__sqrt__less__iff_1,axiom,
% 14.09/14.35 ( c_HOL_Oord__class_Oless(c_NthRoot_Osqrt(V_x),c_NthRoot_Osqrt(V_y),tc_RealDef_Oreal)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(V_x,V_y,tc_RealDef_Oreal) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_dvd__mult__div__cancel_0,axiom,
% 14.09/14.35 ( ~ class_Divides_Osemiring__div(T_a)
% 14.09/14.35 | c_HOL_Otimes__class_Otimes(V_a,c_Divides_Odiv__class_Odiv(V_b,V_a,T_a),T_a) = V_b
% 14.09/14.35 | ~ c_Ring__and__Field_Odvd__class_Odvd(V_a,V_b,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_dvd__div__mult__self_0,axiom,
% 14.09/14.35 ( ~ class_Divides_Osemiring__div(T_a)
% 14.09/14.35 | c_HOL_Otimes__class_Otimes(c_Divides_Odiv__class_Odiv(V_b,V_a,T_a),V_a,T_a) = V_b
% 14.09/14.35 | ~ c_Ring__and__Field_Odvd__class_Odvd(V_a,V_b,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_abs__of__nonpos_0,axiom,
% 14.09/14.35 ( ~ class_OrderedGroup_Opordered__ab__group__add__abs(T_a)
% 14.09/14.35 | c_HOL_Oabs__class_Oabs(V_a,T_a) = c_HOL_Ouminus__class_Ouminus(V_a,T_a)
% 14.09/14.35 | ~ c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_real__mult__less__mono2_0,axiom,
% 14.09/14.35 ( c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_z,V_x,tc_RealDef_Oreal),c_HOL_Otimes__class_Otimes(V_z,V_y,tc_RealDef_Oreal),tc_RealDef_Oreal)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(V_x,V_y,tc_RealDef_Oreal)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),V_z,tc_RealDef_Oreal) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_real__mult__less__iff1_1,axiom,
% 14.09/14.35 ( c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_x,V_z,tc_RealDef_Oreal),c_HOL_Otimes__class_Otimes(V_y,V_z,tc_RealDef_Oreal),tc_RealDef_Oreal)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(V_x,V_y,tc_RealDef_Oreal)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),V_z,tc_RealDef_Oreal) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_real__mult__less__iff1_0,axiom,
% 14.09/14.35 ( c_HOL_Oord__class_Oless(V_x,V_y,tc_RealDef_Oreal)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_x,V_z,tc_RealDef_Oreal),c_HOL_Otimes__class_Otimes(V_y,V_z,tc_RealDef_Oreal),tc_RealDef_Oreal)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),V_z,tc_RealDef_Oreal) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_le__divide__eq_3,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.35 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.35 | c_lessequals(V_a,c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a)
% 14.09/14.35 | ~ c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_le__divide__eq_2,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.35 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.35 | c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 14.09/14.35 | ~ c_lessequals(V_a,c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_divide__le__eq_3,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.35 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.35 | c_lessequals(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),V_a,T_a)
% 14.09/14.35 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_divide__le__eq_2,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.35 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.35 | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 14.09/14.35 | ~ c_lessequals(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),V_a,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_abs__diff__less__iff_2,axiom,
% 14.09/14.35 ( ~ class_Ring__and__Field_Oordered__idom(T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(c_HOL_Oabs__class_Oabs(c_HOL_Ominus__class_Ominus(V_x,V_a,T_a),T_a),V_r,T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(V_x,c_HOL_Oplus__class_Oplus(V_a,V_r,T_a),T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_HOL_Ominus__class_Ominus(V_a,V_r,T_a),V_x,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_minus__equation__iff_1,axiom,
% 14.09/14.35 ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 14.09/14.35 | c_HOL_Ouminus__class_Ouminus(c_HOL_Ouminus__class_Ouminus(V_b,T_a),T_a) = V_b ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_equation__minus__iff_1,axiom,
% 14.09/14.35 ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 14.09/14.35 | V_a = c_HOL_Ouminus__class_Ouminus(c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_equation__minus__iff_0,axiom,
% 14.09/14.35 ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 14.09/14.35 | V_b = c_HOL_Ouminus__class_Ouminus(c_HOL_Ouminus__class_Ouminus(V_b,T_a),T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_double__compl_0,axiom,
% 14.09/14.35 ( ~ class_Lattices_Oboolean__algebra(T_a)
% 14.09/14.35 | c_HOL_Ouminus__class_Ouminus(c_HOL_Ouminus__class_Ouminus(V_x,T_a),T_a) = V_x ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_minus__minus_0,axiom,
% 14.09/14.35 ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 14.09/14.35 | c_HOL_Ouminus__class_Ouminus(c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a) = V_a ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_minus__diff__eq_0,axiom,
% 14.09/14.35 ( ~ class_OrderedGroup_Oab__group__add(T_a)
% 14.09/14.35 | 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) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_minus__less__iff_1,axiom,
% 14.09/14.35 ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(c_HOL_Ouminus__class_Ouminus(V_a,T_a),V_b,T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_HOL_Ouminus__class_Ouminus(V_b,T_a),V_a,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_minus__less__iff_0,axiom,
% 14.09/14.35 ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(c_HOL_Ouminus__class_Ouminus(V_b,T_a),V_a,T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(c_HOL_Ouminus__class_Ouminus(V_a,T_a),V_b,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_less__minus__iff_1,axiom,
% 14.09/14.35 ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(V_a,c_HOL_Ouminus__class_Ouminus(V_b,T_a),T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(V_b,c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_less__minus__iff_0,axiom,
% 14.09/14.35 ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(V_b,c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(V_a,c_HOL_Ouminus__class_Ouminus(V_b,T_a),T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_xt1_I7_J_0,axiom,
% 14.09/14.35 ( ~ class_Orderings_Oorder(T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(V_z,V_x,T_a)
% 14.09/14.35 | ~ c_lessequals(V_z,V_y,T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(V_y,V_x,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_xt1_I8_J_0,axiom,
% 14.09/14.35 ( ~ class_Orderings_Oorder(T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(V_z,V_x,T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(V_z,V_y,T_a)
% 14.09/14.35 | ~ c_lessequals(V_y,V_x,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_order__less__le__trans_0,axiom,
% 14.09/14.35 ( ~ class_Orderings_Opreorder(T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(V_x,V_z,T_a)
% 14.09/14.35 | ~ c_lessequals(V_y,V_z,T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(V_x,V_y,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_order__le__less__trans_0,axiom,
% 14.09/14.35 ( ~ class_Orderings_Opreorder(T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(V_x,V_z,T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(V_y,V_z,T_a)
% 14.09/14.35 | ~ c_lessequals(V_x,V_y,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_order__less__imp__le_0,axiom,
% 14.09/14.35 ( ~ class_Orderings_Opreorder(T_a)
% 14.09/14.35 | c_lessequals(V_x,V_y,T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(V_x,V_y,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_order__le__less_1,axiom,
% 14.09/14.35 ( ~ class_Orderings_Oorder(T_a)
% 14.09/14.35 | c_lessequals(V_x,V_y,T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(V_x,V_y,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_less__le__not__le_2,axiom,
% 14.09/14.35 ( ~ class_Orderings_Opreorder(T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(V_x,V_y,T_a)
% 14.09/14.35 | c_lessequals(V_y,V_x,T_a)
% 14.09/14.35 | ~ c_lessequals(V_x,V_y,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_abs__ge__self_0,axiom,
% 14.09/14.35 ( ~ class_OrderedGroup_Opordered__ab__group__add__abs(T_a)
% 14.09/14.35 | c_lessequals(V_a,c_HOL_Oabs__class_Oabs(V_a,T_a),T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_xt1_I11_J_0,axiom,
% 14.09/14.35 ( ~ class_Orderings_Oorder(T_a)
% 14.09/14.35 | c_HOL_Oord__class_Oless(V_b,V_a,T_a)
% 14.09/14.35 | V_a = V_b
% 14.09/14.35 | ~ c_lessequals(V_b,V_a,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_order__less__le_1,axiom,
% 14.09/14.35 ( ~ class_Orderings_Oorder(T_a)
% 14.09/14.35 | ~ c_HOL_Oord__class_Oless(V_x,V_x,T_a) ) ).
% 14.09/14.35
% 14.09/14.35 cnf(cls_real__less__def_1,axiom,
% 14.09/14.36 ~ c_HOL_Oord__class_Oless(V_x,V_x,tc_RealDef_Oreal) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_order__less__irrefl_0,axiom,
% 14.09/14.36 ( ~ class_Orderings_Opreorder(T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_x,V_x,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_mult__right_Opos__bounded_0,axiom,
% 14.09/14.36 ( ~ class_RealVector_Oreal__normed__algebra(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),c_RealVector_Osko__RealVector__Xmult__right__Xpos__bounded__1__1(V_x,T_a),tc_RealDef_Oreal) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_inverse__negative__iff__negative_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.36 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Oinverse(V_a,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_inverse__negative__iff__negative_1,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.36 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Oinverse(V_a,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_negative__imp__inverse__negative_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Oinverse(V_a,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_real__le__eq__diff_1,axiom,
% 14.09/14.36 ( c_lessequals(V_x,V_y,tc_RealDef_Oreal)
% 14.09/14.36 | ~ c_lessequals(c_HOL_Ominus__class_Ominus(V_x,V_y,tc_RealDef_Oreal),c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),tc_RealDef_Oreal) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_real__le__eq__diff_0,axiom,
% 14.09/14.36 ( c_lessequals(c_HOL_Ominus__class_Ominus(V_x,V_y,tc_RealDef_Oreal),c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),tc_RealDef_Oreal)
% 14.09/14.36 | ~ c_lessequals(V_x,V_y,tc_RealDef_Oreal) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_one__less__inverse__iff_2,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.36 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(c_HOL_Oone__class_Oone(T_a),c_HOL_Oinverse__class_Oinverse(V_x,T_a),T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_x,c_HOL_Oone__class_Oone(T_a),T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_x,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_frac__le_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.36 | c_lessequals(c_HOL_Oinverse__class_Odivide(V_x,V_z,T_a),c_HOL_Oinverse__class_Odivide(V_y,V_w,T_a),T_a)
% 14.09/14.36 | ~ c_lessequals(V_w,V_z,T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_w,T_a)
% 14.09/14.36 | ~ c_lessequals(V_x,V_y,T_a)
% 14.09/14.36 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_x,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_abs__not__less__zero_0,axiom,
% 14.09/14.36 ( ~ class_OrderedGroup_Opordered__ab__group__add__abs(T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(c_HOL_Oabs__class_Oabs(V_a,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_divide__strict__left__mono_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_c,V_a,T_a),c_HOL_Oinverse__class_Odivide(V_c,V_b,T_a),T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_b,V_a,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_divide__strict__left__mono__neg_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_c,V_a,T_a),c_HOL_Oinverse__class_Odivide(V_c,V_b,T_a),T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_a,V_b,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_sgn__zero_0,axiom,
% 14.09/14.36 ( ~ class_RealVector_Oreal__normed__vector(T_a)
% 14.09/14.36 | c_HOL_Osgn__class_Osgn(c_HOL_Ozero__class_Ozero(T_a),T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_sgn0_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Osgn__if(T_a)
% 14.09/14.36 | c_HOL_Osgn__class_Osgn(c_HOL_Ozero__class_Ozero(T_a),T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_sgn__0__0_1,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__idom(T_a)
% 14.09/14.36 | c_HOL_Osgn__class_Osgn(c_HOL_Ozero__class_Ozero(T_a),T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_neg__0__equal__iff__equal_1,axiom,
% 14.09/14.36 ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 14.09/14.36 | c_HOL_Ozero__class_Ozero(T_a) = c_HOL_Ouminus__class_Ouminus(c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_inverse__nonzero__iff__nonzero_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Odivision__ring(T_a)
% 14.09/14.36 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.36 | c_HOL_Oinverse__class_Oinverse(V_a,T_a) != c_HOL_Ozero__class_Ozero(T_a)
% 14.09/14.36 | V_a = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_inverse__zero__imp__zero_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Odivision__ring(T_a)
% 14.09/14.36 | c_HOL_Oinverse__class_Oinverse(V_a,T_a) != c_HOL_Ozero__class_Ozero(T_a)
% 14.09/14.36 | V_a = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_sgn__neg_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__idom(T_a)
% 14.09/14.36 | c_HOL_Osgn__class_Osgn(V_a,T_a) = c_HOL_Ouminus__class_Ouminus(c_HOL_Oone__class_Oone(T_a),T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_sgn__1__neg_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__idom(T_a)
% 14.09/14.36 | c_HOL_Osgn__class_Osgn(V_a,T_a) != c_HOL_Ouminus__class_Ouminus(c_HOL_Oone__class_Oone(T_a),T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_minus__zero_0,axiom,
% 14.09/14.36 ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 14.09/14.36 | c_HOL_Ouminus__class_Ouminus(c_HOL_Ozero__class_Ozero(T_a),T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_neg__equal__zero_1,axiom,
% 14.09/14.36 ( ~ class_OrderedGroup_Oordered__ab__group__add(T_a)
% 14.09/14.36 | c_HOL_Ouminus__class_Ouminus(c_HOL_Ozero__class_Ozero(T_a),T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_divide__inverse_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Ofield(T_a)
% 14.09/14.36 | c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a) = c_HOL_Otimes__class_Otimes(V_a,c_HOL_Oinverse__class_Oinverse(V_b,T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_class__fieldgb_Odivide__inverse_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Ofield(T_a)
% 14.09/14.36 | ~ class_Int_Onumber__ring(T_a)
% 14.09/14.36 | c_HOL_Oinverse__class_Odivide(V_x,V_y,T_a) = c_HOL_Otimes__class_Otimes(V_x,c_HOL_Oinverse__class_Oinverse(V_y,T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_zero__less__divide__1__iff_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.36 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oinverse__class_Odivide(c_HOL_Oone__class_Oone(T_a),V_b,T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_zero__less__divide__1__iff_1,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.36 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oinverse__class_Odivide(c_HOL_Oone__class_Oone(T_a),V_b,T_a),T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_real__sqrt__abs2_0,axiom,
% 14.09/14.36 c_NthRoot_Osqrt(c_HOL_Otimes__class_Otimes(V_x,V_x,tc_RealDef_Oreal)) = c_HOL_Oabs__class_Oabs(V_x,tc_RealDef_Oreal) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_real__abs__def_1,axiom,
% 14.09/14.36 ( c_HOL_Oabs__class_Oabs(V_r,tc_RealDef_Oreal) = V_r
% 14.09/14.36 | c_HOL_Oord__class_Oless(V_r,c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),tc_RealDef_Oreal) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_abs__if__lattice_1,axiom,
% 14.09/14.36 ( ~ class_Orderings_Olinorder(T_a)
% 14.09/14.36 | ~ class_OrderedGroup_Olordered__ab__group__add__abs(T_a)
% 14.09/14.36 | c_HOL_Oabs__class_Oabs(V_a,T_a) = V_a
% 14.09/14.36 | c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_abs__if_1,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oabs__if(T_a)
% 14.09/14.36 | c_HOL_Oabs__class_Oabs(V_a,T_a) = V_a
% 14.09/14.36 | c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_Lim_Ominus__diff__minus_0,axiom,
% 14.09/14.36 ( ~ class_OrderedGroup_Oab__group__add(T_a)
% 14.09/14.36 | c_HOL_Ominus__class_Ominus(c_HOL_Ouminus__class_Ouminus(V_a,T_a),c_HOL_Ouminus__class_Ouminus(V_b,T_a),T_a) = c_HOL_Ouminus__class_Ouminus(c_HOL_Ominus__class_Ominus(V_a,V_b,T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_divide__le__eq_1,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.36 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.36 | c_lessequals(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),V_b,T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 14.09/14.36 | ~ c_lessequals(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),V_a,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_divide__le__eq_4,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.36 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.36 | c_lessequals(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),V_a,T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.36 | ~ c_lessequals(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),V_b,T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_le__divide__eq_1,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.36 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.36 | c_lessequals(V_b,c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 14.09/14.36 | ~ c_lessequals(V_a,c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_le__divide__eq_4,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.36 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.36 | c_lessequals(V_a,c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.36 | ~ c_lessequals(V_b,c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_abs__eq__0_0,axiom,
% 14.09/14.36 ( ~ class_OrderedGroup_Opordered__ab__group__add__abs(T_a)
% 14.09/14.36 | c_HOL_Oabs__class_Oabs(V_a,T_a) != c_HOL_Ozero__class_Ozero(T_a)
% 14.09/14.36 | V_a = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_zero__less__abs__iff_0,axiom,
% 14.09/14.36 ( ~ class_OrderedGroup_Opordered__ab__group__add__abs(T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oabs__class_Oabs(c_HOL_Ozero__class_Ozero(T_a),T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_divide__neg__pos_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_x,V_y,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_y,T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_x,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_divide__pos__neg_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_x,V_y,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_y,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_x,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_divide__less__0__iff_4,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.36 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_divide__less__0__iff_5,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.36 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_inverse__less__1__iff_2,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.36 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Oinverse(V_x,T_a),c_HOL_Oone__class_Oone(T_a),T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(c_HOL_Oone__class_Oone(T_a),V_x,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_abs__diff__less__iff_1,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__idom(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(V_x,c_HOL_Oplus__class_Oplus(V_a,V_r,T_a),T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(c_HOL_Oabs__class_Oabs(c_HOL_Ominus__class_Ominus(V_x,V_a,T_a),T_a),V_r,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_eq__divide__eq_2,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Ofield(T_a)
% 14.09/14.36 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.36 | c_HOL_Ozero__class_Ozero(T_a) = c_HOL_Oinverse__class_Odivide(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_not__real__square__gt__zero_0,axiom,
% 14.09/14.36 ( V_x = c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal)
% 14.09/14.36 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),c_HOL_Otimes__class_Otimes(V_x,V_x,tc_RealDef_Oreal),tc_RealDef_Oreal) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_neg__0__less__iff__less_0,axiom,
% 14.09/14.36 ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_neg__0__less__iff__less_1,axiom,
% 14.09/14.36 ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_norm__sgn_0,axiom,
% 14.09/14.36 ( ~ class_RealVector_Oreal__normed__vector(T_a)
% 14.09/14.36 | c_RealVector_Onorm__class_Onorm(c_HOL_Osgn__class_Osgn(c_HOL_Ozero__class_Ozero(T_a),T_a),T_a) = c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_less__minus__self__iff_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__idom(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_a,c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_less__minus__self__iff_1,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__idom(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(V_a,c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_sgn__pos_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__idom(T_a)
% 14.09/14.36 | c_HOL_Osgn__class_Osgn(V_a,T_a) = c_HOL_Oone__class_Oone(T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_sgn__1__pos_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__idom(T_a)
% 14.09/14.36 | c_HOL_Osgn__class_Osgn(V_a,T_a) != c_HOL_Oone__class_Oone(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_dvd__if__abs__eq_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__idom(T_a)
% 14.09/14.36 | c_HOL_Oabs__class_Oabs(V_l,T_a) != c_HOL_Oabs__class_Oabs(V_k,T_a)
% 14.09/14.36 | c_Ring__and__Field_Odvd__class_Odvd(V_l,V_k,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_order__less__asym_H_0,axiom,
% 14.09/14.36 ( ~ class_Orderings_Opreorder(T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_b,V_a,T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_a,V_b,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_order__less__asym_0,axiom,
% 14.09/14.36 ( ~ class_Orderings_Opreorder(T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_y,V_x,T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_x,V_y,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_not__less__iff__gr__or__eq_1,axiom,
% 14.09/14.36 ( ~ class_Orderings_Olinorder(T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_x,V_y,T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_y,V_x,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_xt1_I9_J_0,axiom,
% 14.09/14.36 ( ~ class_Orderings_Oorder(T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_a,V_b,T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_b,V_a,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_Deriv_Oinverse__diff__inverse_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Odivision__ring(T_a)
% 14.09/14.36 | c_HOL_Ominus__class_Ominus(c_HOL_Oinverse__class_Oinverse(V_a,T_a),c_HOL_Oinverse__class_Oinverse(V_b,T_a),T_a) = c_HOL_Ouminus__class_Ouminus(c_HOL_Otimes__class_Otimes(c_HOL_Otimes__class_Otimes(c_HOL_Oinverse__class_Oinverse(V_a,T_a),c_HOL_Ominus__class_Ominus(V_a,V_b,T_a),T_a),c_HOL_Oinverse__class_Oinverse(V_b,T_a),T_a),T_a)
% 14.09/14.36 | V_b = c_HOL_Ozero__class_Ozero(T_a)
% 14.09/14.36 | V_a = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_norm__triangle__ineq3_0,axiom,
% 14.09/14.36 ( ~ class_RealVector_Oreal__normed__vector(T_a)
% 14.09/14.36 | c_lessequals(c_HOL_Oabs__class_Oabs(c_HOL_Ominus__class_Ominus(c_RealVector_Onorm__class_Onorm(V_a,T_a),c_RealVector_Onorm__class_Onorm(V_b,T_a),tc_RealDef_Oreal),tc_RealDef_Oreal),c_RealVector_Onorm__class_Onorm(c_HOL_Ominus__class_Ominus(V_a,V_b,T_a),T_a),tc_RealDef_Oreal) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_real__sqrt__mult__self__sum__ge__zero_0,axiom,
% 14.09/14.36 c_lessequals(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),c_NthRoot_Osqrt(c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_x,V_x,tc_RealDef_Oreal),c_HOL_Otimes__class_Otimes(V_y,V_y,tc_RealDef_Oreal),tc_RealDef_Oreal)),tc_RealDef_Oreal) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_inverse__nonpositive__iff__nonpositive_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.36 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.36 | c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.36 | ~ c_lessequals(c_HOL_Oinverse__class_Oinverse(V_a,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_inverse__nonpositive__iff__nonpositive_1,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.36 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.36 | c_lessequals(c_HOL_Oinverse__class_Oinverse(V_a,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.36 | ~ c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_zero__le__divide__iff_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.36 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.36 | c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.36 | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 14.09/14.36 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_zero__le__divide__iff_1,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.36 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.36 | c_lessequals(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.36 | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 14.09/14.36 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_zero__le__divide__iff_2,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.36 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.36 | c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.36 | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 14.09/14.36 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_zero__le__divide__iff_3,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.36 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.36 | c_lessequals(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.36 | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 14.09/14.36 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_divide__le__0__iff_4,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.36 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.36 | c_lessequals(c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.36 | ~ c_lessequals(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.36 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_divide__le__0__iff_5,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.36 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.36 | c_lessequals(c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.36 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 14.09/14.36 | ~ c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_abs__le__zero__iff_0,axiom,
% 14.09/14.36 ( ~ class_OrderedGroup_Opordered__ab__group__add__abs(T_a)
% 14.09/14.36 | V_a = c_HOL_Ozero__class_Ozero(T_a)
% 14.09/14.36 | ~ c_lessequals(c_HOL_Oabs__class_Oabs(V_a,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_abs__of__nonneg_0,axiom,
% 14.09/14.36 ( ~ class_OrderedGroup_Opordered__ab__group__add__abs(T_a)
% 14.09/14.36 | c_HOL_Oabs__class_Oabs(V_a,T_a) = V_a
% 14.09/14.36 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_neg__le__0__iff__le_0,axiom,
% 14.09/14.36 ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 14.09/14.36 | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 14.09/14.36 | ~ c_lessequals(c_HOL_Ouminus__class_Ouminus(V_a,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_neg__le__0__iff__le_1,axiom,
% 14.09/14.36 ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 14.09/14.36 | c_lessequals(c_HOL_Ouminus__class_Ouminus(V_a,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.36 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_divide__right__mono_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.36 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.36 | c_lessequals(c_HOL_Oinverse__class_Odivide(V_a,V_c,T_a),c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a)
% 14.09/14.36 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 14.09/14.36 | ~ c_lessequals(V_a,V_b,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_divide__right__mono__neg_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.36 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.36 | c_lessequals(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),c_HOL_Oinverse__class_Odivide(V_a,V_c,T_a),T_a)
% 14.09/14.36 | ~ c_lessequals(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.36 | ~ c_lessequals(V_a,V_b,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_abs__le__zero__iff_1,axiom,
% 14.09/14.36 ( ~ class_OrderedGroup_Opordered__ab__group__add__abs(T_a)
% 14.09/14.36 | c_lessequals(c_HOL_Oabs__class_Oabs(c_HOL_Ozero__class_Ozero(T_a),T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_neg__0__le__iff__le_0,axiom,
% 14.09/14.36 ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 14.09/14.36 | c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.36 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_neg__0__le__iff__le_1,axiom,
% 14.09/14.36 ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 14.09/14.36 | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a)
% 14.09/14.36 | ~ c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_inverse__nonnegative__iff__nonnegative_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.36 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.36 | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 14.09/14.36 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oinverse__class_Oinverse(V_a,T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_inverse__nonnegative__iff__nonnegative_1,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.36 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.36 | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oinverse__class_Oinverse(V_a,T_a),T_a)
% 14.09/14.36 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_le__minus__self__iff_0,axiom,
% 14.09/14.36 ( ~ class_OrderedGroup_Olordered__ab__group__add(T_a)
% 14.09/14.36 | c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.36 | ~ c_lessequals(V_a,c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_le__minus__self__iff_1,axiom,
% 14.09/14.36 ( ~ class_OrderedGroup_Olordered__ab__group__add(T_a)
% 14.09/14.36 | c_lessequals(V_a,c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a)
% 14.09/14.36 | ~ c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_minus__le__self__iff_0,axiom,
% 14.09/14.36 ( ~ class_OrderedGroup_Olordered__ab__group__add(T_a)
% 14.09/14.36 | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 14.09/14.36 | ~ c_lessequals(c_HOL_Ouminus__class_Ouminus(V_a,T_a),V_a,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_minus__le__self__iff_1,axiom,
% 14.09/14.36 ( ~ class_OrderedGroup_Olordered__ab__group__add(T_a)
% 14.09/14.36 | c_lessequals(c_HOL_Ouminus__class_Ouminus(V_a,T_a),V_a,T_a)
% 14.09/14.36 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_less__eq__neg__nonpos_0,axiom,
% 14.09/14.36 ( ~ class_OrderedGroup_Oordered__ab__group__add(T_a)
% 14.09/14.36 | c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.36 | ~ c_lessequals(V_a,c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_less__eq__neg__nonpos_1,axiom,
% 14.09/14.36 ( ~ class_OrderedGroup_Oordered__ab__group__add(T_a)
% 14.09/14.36 | c_lessequals(V_a,c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a)
% 14.09/14.36 | ~ c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_neg__less__eq__nonneg_0,axiom,
% 14.09/14.36 ( ~ class_OrderedGroup_Oordered__ab__group__add(T_a)
% 14.09/14.36 | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 14.09/14.36 | ~ c_lessequals(c_HOL_Ouminus__class_Ouminus(V_a,T_a),V_a,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_neg__less__eq__nonneg_1,axiom,
% 14.09/14.36 ( ~ class_OrderedGroup_Oordered__ab__group__add(T_a)
% 14.09/14.36 | c_lessequals(c_HOL_Ouminus__class_Ouminus(V_a,T_a),V_a,T_a)
% 14.09/14.36 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_divide__le__0__iff_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.36 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.36 | c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.36 | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 14.09/14.36 | ~ c_lessequals(c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_divide__le__0__iff_1,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.36 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.36 | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 14.09/14.36 | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 14.09/14.36 | ~ c_lessequals(c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_divide__le__0__iff_2,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.36 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.36 | c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.36 | c_lessequals(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.36 | ~ c_lessequals(c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_divide__le__0__iff_3,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.36 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.36 | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 14.09/14.36 | c_lessequals(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.36 | ~ c_lessequals(c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_zero__le__divide__iff_4,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.36 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.36 | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a),T_a)
% 14.09/14.36 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 14.09/14.36 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_zero__le__divide__iff_5,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.36 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.36 | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a),T_a)
% 14.09/14.36 | ~ c_lessequals(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.36 | ~ c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_abs__ge__zero_0,axiom,
% 14.09/14.36 ( ~ class_OrderedGroup_Opordered__ab__group__add__abs(T_a)
% 14.09/14.36 | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oabs__class_Oabs(V_a,T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_dvd__mult__cancel__left_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oidom(T_a)
% 14.09/14.36 | c_Ring__and__Field_Odvd__class_Odvd(V_a,V_b,T_a)
% 14.09/14.36 | V_c = c_HOL_Ozero__class_Ozero(T_a)
% 14.09/14.36 | ~ c_Ring__and__Field_Odvd__class_Odvd(c_HOL_Otimes__class_Otimes(V_c,V_a,T_a),c_HOL_Otimes__class_Otimes(V_c,V_b,T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_dvd__mult__cancel__right_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oidom(T_a)
% 14.09/14.36 | c_Ring__and__Field_Odvd__class_Odvd(V_a,V_b,T_a)
% 14.09/14.36 | V_c = c_HOL_Ozero__class_Ozero(T_a)
% 14.09/14.36 | ~ c_Ring__and__Field_Odvd__class_Odvd(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),c_HOL_Otimes__class_Otimes(V_b,V_c,T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_mult__less__cancel__left__neg_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(V_b,V_a,T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_c,V_a,T_a),c_HOL_Otimes__class_Otimes(V_c,V_b,T_a),T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_mult__less__cancel__left__neg_1,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_c,V_a,T_a),c_HOL_Otimes__class_Otimes(V_c,V_b,T_a),T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_b,V_a,T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_xt1_I12_J_0,axiom,
% 14.09/14.36 ( ~ class_Orderings_Oorder(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(V_b,V_a,T_a)
% 14.09/14.36 | ~ c_lessequals(V_b,V_a,T_a)
% 14.09/14.36 | V_a = V_b ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_linorder__antisym__conv2_0,axiom,
% 14.09/14.36 ( ~ class_Orderings_Olinorder(T_a)
% 14.09/14.36 | V_x = V_y
% 14.09/14.36 | c_HOL_Oord__class_Oless(V_x,V_y,T_a)
% 14.09/14.36 | ~ c_lessequals(V_x,V_y,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_linorder__antisym__conv1_0,axiom,
% 14.09/14.36 ( ~ class_Orderings_Olinorder(T_a)
% 14.09/14.36 | V_x = V_y
% 14.09/14.36 | ~ c_lessequals(V_x,V_y,T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(V_x,V_y,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_order__neq__le__trans_0,axiom,
% 14.09/14.36 ( ~ class_Orderings_Oorder(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(V_a,V_b,T_a)
% 14.09/14.36 | ~ c_lessequals(V_a,V_b,T_a)
% 14.09/14.36 | V_a = V_b ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_order__le__neq__trans_0,axiom,
% 14.09/14.36 ( ~ class_Orderings_Oorder(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(V_a,V_b,T_a)
% 14.09/14.36 | V_a = V_b
% 14.09/14.36 | ~ c_lessequals(V_a,V_b,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_order__le__less_0,axiom,
% 14.09/14.36 ( ~ class_Orderings_Oorder(T_a)
% 14.09/14.36 | V_x = V_y
% 14.09/14.36 | c_HOL_Oord__class_Oless(V_x,V_y,T_a)
% 14.09/14.36 | ~ c_lessequals(V_x,V_y,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_order__less__le_2,axiom,
% 14.09/14.36 ( ~ class_Orderings_Oorder(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(V_x,V_y,T_a)
% 14.09/14.36 | V_x = V_y
% 14.09/14.36 | ~ c_lessequals(V_x,V_y,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_neg__le__iff__le_0,axiom,
% 14.09/14.36 ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 14.09/14.36 | c_lessequals(V_a,V_b,T_a)
% 14.09/14.36 | ~ c_lessequals(c_HOL_Ouminus__class_Ouminus(V_b,T_a),c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_le__imp__neg__le_0,axiom,
% 14.09/14.36 ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 14.09/14.36 | c_lessequals(c_HOL_Ouminus__class_Ouminus(V_b,T_a),c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a)
% 14.09/14.36 | ~ c_lessequals(V_a,V_b,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_abs__le__D1_0,axiom,
% 14.09/14.36 ( ~ class_OrderedGroup_Opordered__ab__group__add__abs(T_a)
% 14.09/14.36 | c_lessequals(V_a,V_b,T_a)
% 14.09/14.36 | ~ c_lessequals(c_HOL_Oabs__class_Oabs(V_a,T_a),V_b,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_less__le__not__le_1,axiom,
% 14.09/14.36 ( ~ class_Orderings_Opreorder(T_a)
% 14.09/14.36 | ~ c_lessequals(V_y,V_x,T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_x,V_y,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_not__leE_0,axiom,
% 14.09/14.36 ( ~ class_Orderings_Olinorder(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(V_x,V_y,T_a)
% 14.09/14.36 | c_lessequals(V_y,V_x,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_linorder__antisym__conv2_1,axiom,
% 14.09/14.36 ( ~ class_Orderings_Olinorder(T_a)
% 14.09/14.36 | ~ c_lessequals(V_x,V_x,T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_x,V_x,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_linorder__antisym__conv1_1,axiom,
% 14.09/14.36 ( ~ class_Orderings_Olinorder(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(V_x,V_x,T_a)
% 14.09/14.36 | c_lessequals(V_x,V_x,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_linorder__not__less_1,axiom,
% 14.09/14.36 ( ~ class_Orderings_Olinorder(T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_x,V_y,T_a)
% 14.09/14.36 | ~ c_lessequals(V_y,V_x,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_linorder__not__less_0,axiom,
% 14.09/14.36 ( ~ class_Orderings_Olinorder(T_a)
% 14.09/14.36 | c_lessequals(V_y,V_x,T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(V_x,V_y,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_linorder__not__le_0,axiom,
% 14.09/14.36 ( ~ class_Orderings_Olinorder(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(V_y,V_x,T_a)
% 14.09/14.36 | c_lessequals(V_x,V_y,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_linorder__not__le_1,axiom,
% 14.09/14.36 ( ~ class_Orderings_Olinorder(T_a)
% 14.09/14.36 | ~ c_lessequals(V_x,V_y,T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_y,V_x,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_minus__le__iff_1,axiom,
% 14.09/14.36 ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 14.09/14.36 | c_lessequals(c_HOL_Ouminus__class_Ouminus(V_a,T_a),V_b,T_a)
% 14.09/14.36 | ~ c_lessequals(c_HOL_Ouminus__class_Ouminus(V_b,T_a),V_a,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_minus__le__iff_0,axiom,
% 14.09/14.36 ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 14.09/14.36 | c_lessequals(c_HOL_Ouminus__class_Ouminus(V_b,T_a),V_a,T_a)
% 14.09/14.36 | ~ c_lessequals(c_HOL_Ouminus__class_Ouminus(V_a,T_a),V_b,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_le__minus__iff_1,axiom,
% 14.09/14.36 ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 14.09/14.36 | c_lessequals(V_a,c_HOL_Ouminus__class_Ouminus(V_b,T_a),T_a)
% 14.09/14.36 | ~ c_lessequals(V_b,c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_le__minus__iff_0,axiom,
% 14.09/14.36 ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 14.09/14.36 | c_lessequals(V_b,c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a)
% 14.09/14.36 | ~ c_lessequals(V_a,c_HOL_Ouminus__class_Ouminus(V_b,T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_sgn__times_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__idom(T_a)
% 14.09/14.36 | c_HOL_Osgn__class_Osgn(c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),T_a) = c_HOL_Otimes__class_Otimes(c_HOL_Osgn__class_Osgn(V_a,T_a),c_HOL_Osgn__class_Osgn(V_b,T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_sgn__mult_0,axiom,
% 14.09/14.36 ( ~ class_RealVector_Oreal__normed__div__algebra(T_a)
% 14.09/14.36 | c_HOL_Osgn__class_Osgn(c_HOL_Otimes__class_Otimes(V_x,V_y,T_a),T_a) = c_HOL_Otimes__class_Otimes(c_HOL_Osgn__class_Osgn(V_x,T_a),c_HOL_Osgn__class_Osgn(V_y,T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_mult__dvd__mono_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 14.09/14.36 | c_Ring__and__Field_Odvd__class_Odvd(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),c_HOL_Otimes__class_Otimes(V_b,V_d,T_a),T_a)
% 14.09/14.36 | ~ c_Ring__and__Field_Odvd__class_Odvd(V_c,V_d,T_a)
% 14.09/14.36 | ~ c_Ring__and__Field_Odvd__class_Odvd(V_a,V_b,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_minus__mult__commute_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oring(T_a)
% 14.09/14.36 | c_HOL_Otimes__class_Otimes(c_HOL_Ouminus__class_Ouminus(V_a,T_a),V_b,T_a) = c_HOL_Otimes__class_Otimes(V_a,c_HOL_Ouminus__class_Ouminus(V_b,T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_abs__mult__self_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__idom(T_a)
% 14.09/14.36 | c_HOL_Otimes__class_Otimes(c_HOL_Oabs__class_Oabs(V_a,T_a),c_HOL_Oabs__class_Oabs(V_a,T_a),T_a) = c_HOL_Otimes__class_Otimes(V_a,V_a,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_dvd__mult__cancel__right_2,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oidom(T_a)
% 14.09/14.36 | c_Ring__and__Field_Odvd__class_Odvd(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),c_HOL_Otimes__class_Otimes(V_b,V_c,T_a),T_a)
% 14.09/14.36 | ~ c_Ring__and__Field_Odvd__class_Odvd(V_a,V_b,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_dvd__mult__cancel__left_2,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oidom(T_a)
% 14.09/14.36 | c_Ring__and__Field_Odvd__class_Odvd(c_HOL_Otimes__class_Otimes(V_c,V_a,T_a),c_HOL_Otimes__class_Otimes(V_c,V_b,T_a),T_a)
% 14.09/14.36 | ~ c_Ring__and__Field_Odvd__class_Odvd(V_a,V_b,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_inverse__mult__distrib_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Ofield(T_a)
% 14.09/14.36 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.36 | c_HOL_Oinverse__class_Oinverse(c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),T_a) = c_HOL_Otimes__class_Otimes(c_HOL_Oinverse__class_Oinverse(V_a,T_a),c_HOL_Oinverse__class_Oinverse(V_b,T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_mult__less__cancel__right__disj_3,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(V_b,V_a,T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(V_a,V_b,T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),c_HOL_Otimes__class_Otimes(V_b,V_c,T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_mult__less__cancel__left__disj_3,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(V_b,V_a,T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(V_a,V_b,T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_c,V_a,T_a),c_HOL_Otimes__class_Otimes(V_c,V_b,T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_minus__mult__minus_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oring(T_a)
% 14.09/14.36 | c_HOL_Otimes__class_Otimes(c_HOL_Ouminus__class_Ouminus(V_a,T_a),c_HOL_Ouminus__class_Ouminus(V_b,T_a),T_a) = c_HOL_Otimes__class_Otimes(V_a,V_b,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_square__eq__iff_1,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oidom(T_a)
% 14.09/14.36 | c_HOL_Otimes__class_Otimes(c_HOL_Ouminus__class_Ouminus(V_b,T_a),c_HOL_Ouminus__class_Ouminus(V_b,T_a),T_a) = c_HOL_Otimes__class_Otimes(V_b,V_b,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_mult__right_Ominus_0,axiom,
% 14.09/14.36 ( ~ class_RealVector_Oreal__normed__algebra(T_a)
% 14.09/14.36 | c_HOL_Otimes__class_Otimes(V_xa,c_HOL_Ouminus__class_Ouminus(V_x,T_a),T_a) = c_HOL_Ouminus__class_Ouminus(c_HOL_Otimes__class_Otimes(V_xa,V_x,T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_mult_Ominus__right_0,axiom,
% 14.09/14.36 ( ~ class_RealVector_Oreal__normed__algebra(T_a)
% 14.09/14.36 | c_HOL_Otimes__class_Otimes(V_a,c_HOL_Ouminus__class_Ouminus(V_b,T_a),T_a) = c_HOL_Ouminus__class_Ouminus(c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_mult__left_Ominus_0,axiom,
% 14.09/14.36 ( ~ class_RealVector_Oreal__normed__algebra(T_a)
% 14.09/14.36 | c_HOL_Otimes__class_Otimes(c_HOL_Ouminus__class_Ouminus(V_x,T_a),V_y,T_a) = c_HOL_Ouminus__class_Ouminus(c_HOL_Otimes__class_Otimes(V_x,V_y,T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_mult_Ominus__left_0,axiom,
% 14.09/14.36 ( ~ class_RealVector_Oreal__normed__algebra(T_a)
% 14.09/14.36 | c_HOL_Otimes__class_Otimes(c_HOL_Ouminus__class_Ouminus(V_a,T_a),V_b,T_a) = c_HOL_Ouminus__class_Ouminus(c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_dvd__mult__right_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 14.09/14.36 | c_Ring__and__Field_Odvd__class_Odvd(V_b,V_c,T_a)
% 14.09/14.36 | ~ c_Ring__and__Field_Odvd__class_Odvd(c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),V_c,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_dvd__mult__left_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 14.09/14.36 | c_Ring__and__Field_Odvd__class_Odvd(V_a,V_c,T_a)
% 14.09/14.36 | ~ c_Ring__and__Field_Odvd__class_Odvd(c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),V_c,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_dvd__mult2_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 14.09/14.36 | c_Ring__and__Field_Odvd__class_Odvd(V_a,c_HOL_Otimes__class_Otimes(V_b,V_c,T_a),T_a)
% 14.09/14.36 | ~ c_Ring__and__Field_Odvd__class_Odvd(V_a,V_b,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_dvd__mult_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 14.09/14.36 | c_Ring__and__Field_Odvd__class_Odvd(V_a,c_HOL_Otimes__class_Otimes(V_b,V_c,T_a),T_a)
% 14.09/14.36 | ~ c_Ring__and__Field_Odvd__class_Odvd(V_a,V_c,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_minus__mult__right_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oring(T_a)
% 14.09/14.36 | c_HOL_Ouminus__class_Ouminus(c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),T_a) = c_HOL_Otimes__class_Otimes(V_a,c_HOL_Ouminus__class_Ouminus(V_b,T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_minus__mult__left_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oring(T_a)
% 14.09/14.36 | c_HOL_Ouminus__class_Ouminus(c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),T_a) = c_HOL_Otimes__class_Otimes(c_HOL_Ouminus__class_Ouminus(V_a,T_a),V_b,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_mult__frac__frac_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Ofield(T_a)
% 14.09/14.36 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.36 | c_HOL_Otimes__class_Otimes(c_HOL_Oinverse__class_Odivide(V_x,V_y,T_a),c_HOL_Oinverse__class_Odivide(V_z,V_w,T_a),T_a) = c_HOL_Oinverse__class_Odivide(c_HOL_Otimes__class_Otimes(V_x,V_z,T_a),c_HOL_Otimes__class_Otimes(V_y,V_w,T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_abs__mult_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__idom(T_a)
% 14.09/14.36 | c_HOL_Oabs__class_Oabs(c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),T_a) = c_HOL_Otimes__class_Otimes(c_HOL_Oabs__class_Oabs(V_a,T_a),c_HOL_Oabs__class_Oabs(V_b,T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_square__eq__iff_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oidom(T_a)
% 14.09/14.36 | c_HOL_Otimes__class_Otimes(V_a,V_a,T_a) != c_HOL_Otimes__class_Otimes(V_b,V_b,T_a)
% 14.09/14.36 | V_a = c_HOL_Ouminus__class_Ouminus(V_b,T_a)
% 14.09/14.36 | V_a = V_b ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_dvd__triv__right_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 14.09/14.36 | c_Ring__and__Field_Odvd__class_Odvd(V_a,c_HOL_Otimes__class_Otimes(V_b,V_a,T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_dvd__triv__left_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 14.09/14.36 | c_Ring__and__Field_Odvd__class_Odvd(V_a,c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_dvdI_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Odvd(T_a)
% 14.09/14.36 | c_Ring__and__Field_Odvd__class_Odvd(V_b,c_HOL_Otimes__class_Otimes(V_b,V_k,T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_mult__frac__num_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Ofield(T_a)
% 14.09/14.36 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.36 | c_HOL_Otimes__class_Otimes(c_HOL_Oinverse__class_Odivide(V_x,V_y,T_a),V_z,T_a) = c_HOL_Oinverse__class_Odivide(c_HOL_Otimes__class_Otimes(V_x,V_z,T_a),V_y,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_minus__add__distrib_0,axiom,
% 14.09/14.36 ( ~ class_OrderedGroup_Oab__group__add(T_a)
% 14.09/14.36 | c_HOL_Ouminus__class_Ouminus(c_HOL_Oplus__class_Oplus(V_a,V_b,T_a),T_a) = c_HOL_Oplus__class_Oplus(c_HOL_Ouminus__class_Ouminus(V_a,T_a),c_HOL_Ouminus__class_Ouminus(V_b,T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_minus__add_0,axiom,
% 14.09/14.36 ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 14.09/14.36 | c_HOL_Ouminus__class_Ouminus(c_HOL_Oplus__class_Oplus(V_a,V_b,T_a),T_a) = c_HOL_Oplus__class_Oplus(c_HOL_Ouminus__class_Ouminus(V_b,T_a),c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_add__strict__right__mono_0,axiom,
% 14.09/14.36 ( ~ class_OrderedGroup_Opordered__cancel__ab__semigroup__add(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(c_HOL_Oplus__class_Oplus(V_a,V_c,T_a),c_HOL_Oplus__class_Oplus(V_b,V_c,T_a),T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_a,V_b,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_add__less__cancel__right_1,axiom,
% 14.09/14.36 ( ~ class_OrderedGroup_Opordered__ab__semigroup__add__imp__le(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(c_HOL_Oplus__class_Oplus(V_a,V_c,T_a),c_HOL_Oplus__class_Oplus(V_b,V_c,T_a),T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_a,V_b,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_add__less__cancel__right_0,axiom,
% 14.09/14.36 ( ~ class_OrderedGroup_Opordered__ab__semigroup__add__imp__le(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(V_a,V_b,T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(c_HOL_Oplus__class_Oplus(V_a,V_c,T_a),c_HOL_Oplus__class_Oplus(V_b,V_c,T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_add__strict__left__mono_0,axiom,
% 14.09/14.36 ( ~ class_OrderedGroup_Opordered__cancel__ab__semigroup__add(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(c_HOL_Oplus__class_Oplus(V_c,V_a,T_a),c_HOL_Oplus__class_Oplus(V_c,V_b,T_a),T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_a,V_b,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_add__less__cancel__left_1,axiom,
% 14.09/14.36 ( ~ class_OrderedGroup_Opordered__ab__semigroup__add__imp__le(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(c_HOL_Oplus__class_Oplus(V_c,V_a,T_a),c_HOL_Oplus__class_Oplus(V_c,V_b,T_a),T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_a,V_b,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_add__less__cancel__left_0,axiom,
% 14.09/14.36 ( ~ class_OrderedGroup_Opordered__ab__semigroup__add__imp__le(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(V_a,V_b,T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(c_HOL_Oplus__class_Oplus(V_c,V_a,T_a),c_HOL_Oplus__class_Oplus(V_c,V_b,T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_abs__add__abs_0,axiom,
% 14.09/14.36 ( ~ class_OrderedGroup_Opordered__ab__group__add__abs(T_a)
% 14.09/14.36 | c_HOL_Oabs__class_Oabs(c_HOL_Oplus__class_Oplus(c_HOL_Oabs__class_Oabs(V_a,T_a),c_HOL_Oabs__class_Oabs(V_b,T_a),T_a),T_a) = c_HOL_Oplus__class_Oplus(c_HOL_Oabs__class_Oabs(V_a,T_a),c_HOL_Oabs__class_Oabs(V_b,T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_minus__add__cancel_0,axiom,
% 14.09/14.36 ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 14.09/14.36 | c_HOL_Oplus__class_Oplus(c_HOL_Ouminus__class_Ouminus(V_a,T_a),c_HOL_Oplus__class_Oplus(V_a,V_b,T_a),T_a) = V_b ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_add__cancel__end_1,axiom,
% 14.09/14.36 ( ~ class_OrderedGroup_Oab__group__add(T_a)
% 14.09/14.36 | c_HOL_Oplus__class_Oplus(c_HOL_Ouminus__class_Ouminus(V_z,T_a),c_HOL_Oplus__class_Oplus(V_y,V_z,T_a),T_a) = V_y ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_add__strict__mono_0,axiom,
% 14.09/14.36 ( ~ class_OrderedGroup_Opordered__cancel__ab__semigroup__add(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(c_HOL_Oplus__class_Oplus(V_a,V_c,T_a),c_HOL_Oplus__class_Oplus(V_b,V_d,T_a),T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_c,V_d,T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_a,V_b,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_dvd__add_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 14.09/14.36 | c_Ring__and__Field_Odvd__class_Odvd(V_a,c_HOL_Oplus__class_Oplus(V_b,V_c,T_a),T_a)
% 14.09/14.36 | ~ c_Ring__and__Field_Odvd__class_Odvd(V_a,V_c,T_a)
% 14.09/14.36 | ~ c_Ring__and__Field_Odvd__class_Odvd(V_a,V_b,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_add__minus__cancel_0,axiom,
% 14.09/14.36 ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 14.09/14.36 | c_HOL_Oplus__class_Oplus(V_a,c_HOL_Oplus__class_Oplus(c_HOL_Ouminus__class_Ouminus(V_a,T_a),V_b,T_a),T_a) = V_b ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_add__cancel__end_0,axiom,
% 14.09/14.36 ( ~ class_OrderedGroup_Oab__group__add(T_a)
% 14.09/14.36 | c_HOL_Oplus__class_Oplus(V_x,c_HOL_Oplus__class_Oplus(V_y,V_z,T_a),T_a) != V_y
% 14.09/14.36 | V_x = c_HOL_Ouminus__class_Ouminus(V_z,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_add__divide__distrib_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Ofield(T_a)
% 14.09/14.36 | c_HOL_Oinverse__class_Odivide(c_HOL_Oplus__class_Oplus(V_a,V_b,T_a),V_c,T_a) = c_HOL_Oplus__class_Oplus(c_HOL_Oinverse__class_Odivide(V_a,V_c,T_a),c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_divide_Oadd_0,axiom,
% 14.09/14.36 ( ~ class_RealVector_Oreal__normed__field(T_a)
% 14.09/14.36 | c_HOL_Oinverse__class_Odivide(c_HOL_Oplus__class_Oplus(V_x,V_y,T_a),V_ya,T_a) = c_HOL_Oplus__class_Oplus(c_HOL_Oinverse__class_Odivide(V_x,V_ya,T_a),c_HOL_Oinverse__class_Odivide(V_y,V_ya,T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_less__half__sum_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(V_a,c_HOL_Oinverse__class_Odivide(c_HOL_Oplus__class_Oplus(V_a,V_b,T_a),c_HOL_Oplus__class_Oplus(c_HOL_Oone__class_Oone(T_a),c_HOL_Oone__class_Oone(T_a),T_a),T_a),T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_a,V_b,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_gt__half__sum_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(c_HOL_Oinverse__class_Odivide(c_HOL_Oplus__class_Oplus(V_a,V_b,T_a),c_HOL_Oplus__class_Oplus(c_HOL_Oone__class_Oone(T_a),c_HOL_Oone__class_Oone(T_a),T_a),T_a),V_b,T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_a,V_b,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_inverse__1_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Odivision__ring(T_a)
% 14.09/14.36 | c_HOL_Oinverse__class_Oinverse(c_HOL_Oone__class_Oone(T_a),T_a) = c_HOL_Oone__class_Oone(T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_inverse__eq__1__iff_1,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Ofield(T_a)
% 14.09/14.36 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.36 | c_HOL_Oinverse__class_Oinverse(c_HOL_Oone__class_Oone(T_a),T_a) = c_HOL_Oone__class_Oone(T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_divide__1_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Ofield(T_a)
% 14.09/14.36 | c_HOL_Oinverse__class_Odivide(V_a,c_HOL_Oone__class_Oone(T_a),T_a) = V_a ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_abs__one_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__idom(T_a)
% 14.09/14.36 | c_HOL_Oabs__class_Oabs(c_HOL_Oone__class_Oone(T_a),T_a) = c_HOL_Oone__class_Oone(T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_one__dvd_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 14.09/14.36 | c_Ring__and__Field_Odvd__class_Odvd(c_HOL_Oone__class_Oone(T_a),V_a,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_sgn__one_0,axiom,
% 14.09/14.36 ( ~ class_RealVector_Oreal__normed__algebra__1(T_a)
% 14.09/14.36 | c_HOL_Osgn__class_Osgn(c_HOL_Oone__class_Oone(T_a),T_a) = c_HOL_Oone__class_Oone(T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_inverse__eq__1__iff_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Ofield(T_a)
% 14.09/14.36 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.36 | c_HOL_Oinverse__class_Oinverse(V_x,T_a) != c_HOL_Oone__class_Oone(T_a)
% 14.09/14.36 | V_x = c_HOL_Oone__class_Oone(T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_div__by__1_0,axiom,
% 14.09/14.36 ( ~ class_Divides_Osemiring__div(T_a)
% 14.09/14.36 | c_Divides_Odiv__class_Odiv(V_a,c_HOL_Oone__class_Oone(T_a),T_a) = V_a ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_real__less__def_0,axiom,
% 14.09/14.36 ( c_lessequals(V_x,V_y,tc_RealDef_Oreal)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_x,V_y,tc_RealDef_Oreal) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_real__sqrt__le__iff_0,axiom,
% 14.09/14.36 ( c_lessequals(V_x,V_y,tc_RealDef_Oreal)
% 14.09/14.36 | ~ c_lessequals(c_NthRoot_Osqrt(V_x),c_NthRoot_Osqrt(V_y),tc_RealDef_Oreal) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_real__sqrt__le__iff_1,axiom,
% 14.09/14.36 ( c_lessequals(c_NthRoot_Osqrt(V_x),c_NthRoot_Osqrt(V_y),tc_RealDef_Oreal)
% 14.09/14.36 | ~ c_lessequals(V_x,V_y,tc_RealDef_Oreal) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_real__less__def_2,axiom,
% 14.09/14.36 ( c_HOL_Oord__class_Oless(V_x,V_y,tc_RealDef_Oreal)
% 14.09/14.36 | V_x = V_y
% 14.09/14.36 | ~ c_lessequals(V_x,V_y,tc_RealDef_Oreal) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_abs__le__interval__iff_1,axiom,
% 14.09/14.36 ( c_lessequals(V_x,V_r,tc_RealDef_Oreal)
% 14.09/14.36 | ~ c_lessequals(c_HOL_Oabs__class_Oabs(V_x,tc_RealDef_Oreal),V_r,tc_RealDef_Oreal) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_rabs__ratiotest__lemma_0,axiom,
% 14.09/14.36 ( V_x = c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal)
% 14.09/14.36 | ~ c_lessequals(c_HOL_Oabs__class_Oabs(V_x,tc_RealDef_Oreal),c_HOL_Otimes__class_Otimes(V_c,c_HOL_Oabs__class_Oabs(V_y,tc_RealDef_Oreal),tc_RealDef_Oreal),tc_RealDef_Oreal)
% 14.09/14.36 | ~ c_lessequals(V_c,c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),tc_RealDef_Oreal) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_real__mult__le__cancel__iff2_1,axiom,
% 14.09/14.36 ( c_lessequals(c_HOL_Otimes__class_Otimes(V_z,V_x,tc_RealDef_Oreal),c_HOL_Otimes__class_Otimes(V_z,V_y,tc_RealDef_Oreal),tc_RealDef_Oreal)
% 14.09/14.36 | ~ c_lessequals(V_x,V_y,tc_RealDef_Oreal)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),V_z,tc_RealDef_Oreal) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_real__mult__le__cancel__iff2_0,axiom,
% 14.09/14.36 ( c_lessequals(V_x,V_y,tc_RealDef_Oreal)
% 14.09/14.36 | ~ c_lessequals(c_HOL_Otimes__class_Otimes(V_z,V_x,tc_RealDef_Oreal),c_HOL_Otimes__class_Otimes(V_z,V_y,tc_RealDef_Oreal),tc_RealDef_Oreal)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),V_z,tc_RealDef_Oreal) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_real__mult__le__cancel__iff1_1,axiom,
% 14.09/14.36 ( c_lessequals(c_HOL_Otimes__class_Otimes(V_x,V_z,tc_RealDef_Oreal),c_HOL_Otimes__class_Otimes(V_y,V_z,tc_RealDef_Oreal),tc_RealDef_Oreal)
% 14.09/14.36 | ~ c_lessequals(V_x,V_y,tc_RealDef_Oreal)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),V_z,tc_RealDef_Oreal) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_real__mult__le__cancel__iff1_0,axiom,
% 14.09/14.36 ( c_lessequals(V_x,V_y,tc_RealDef_Oreal)
% 14.09/14.36 | ~ c_lessequals(c_HOL_Otimes__class_Otimes(V_x,V_z,tc_RealDef_Oreal),c_HOL_Otimes__class_Otimes(V_y,V_z,tc_RealDef_Oreal),tc_RealDef_Oreal)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),V_z,tc_RealDef_Oreal) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_real__mult__right__cancel_0,axiom,
% 14.09/14.36 ( c_HOL_Otimes__class_Otimes(V_a,V_c,tc_RealDef_Oreal) != c_HOL_Otimes__class_Otimes(V_b,V_c,tc_RealDef_Oreal)
% 14.09/14.36 | V_c = c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal)
% 14.09/14.36 | V_a = V_b ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_real__mult__left__cancel_0,axiom,
% 14.09/14.36 ( c_HOL_Otimes__class_Otimes(V_c,V_a,tc_RealDef_Oreal) != c_HOL_Otimes__class_Otimes(V_c,V_b,tc_RealDef_Oreal)
% 14.09/14.36 | V_c = c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal)
% 14.09/14.36 | V_a = V_b ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_real__sqrt__mult_0,axiom,
% 14.09/14.36 c_NthRoot_Osqrt(c_HOL_Otimes__class_Otimes(V_x,V_y,tc_RealDef_Oreal)) = c_HOL_Otimes__class_Otimes(c_NthRoot_Osqrt(V_x),c_NthRoot_Osqrt(V_y),tc_RealDef_Oreal) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_real__sqrt__one_0,axiom,
% 14.09/14.36 c_NthRoot_Osqrt(c_HOL_Oone__class_Oone(tc_RealDef_Oreal)) = c_HOL_Oone__class_Oone(tc_RealDef_Oreal) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_real__zero__not__eq__one_0,axiom,
% 14.09/14.36 c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal) != c_HOL_Oone__class_Oone(tc_RealDef_Oreal) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_real__sqrt__eq__1__iff_0,axiom,
% 14.09/14.36 ( c_NthRoot_Osqrt(V_x) != c_HOL_Oone__class_Oone(tc_RealDef_Oreal)
% 14.09/14.36 | V_x = c_HOL_Oone__class_Oone(tc_RealDef_Oreal) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_real__sum__square__gt__zero2_0,axiom,
% 14.09/14.36 ( c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_x,V_x,tc_RealDef_Oreal),c_HOL_Otimes__class_Otimes(V_y,V_y,tc_RealDef_Oreal),tc_RealDef_Oreal),tc_RealDef_Oreal)
% 14.09/14.36 | V_y = c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_real__sum__square__gt__zero_0,axiom,
% 14.09/14.36 ( c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_x,V_x,tc_RealDef_Oreal),c_HOL_Otimes__class_Otimes(V_y,V_y,tc_RealDef_Oreal),tc_RealDef_Oreal),tc_RealDef_Oreal)
% 14.09/14.36 | V_x = c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_abs__add__one__not__less__self_0,axiom,
% 14.09/14.36 ~ c_HOL_Oord__class_Oless(c_HOL_Oplus__class_Oplus(c_HOL_Oabs__class_Oabs(V_x,tc_RealDef_Oreal),c_HOL_Oone__class_Oone(tc_RealDef_Oreal),tc_RealDef_Oreal),V_x,tc_RealDef_Oreal) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_norm__minus__cancel_0,axiom,
% 14.09/14.36 ( ~ class_RealVector_Oreal__normed__vector(T_a)
% 14.09/14.36 | c_RealVector_Onorm__class_Onorm(c_HOL_Ouminus__class_Ouminus(V_x,T_a),T_a) = c_RealVector_Onorm__class_Onorm(V_x,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_abs__norm__cancel_0,axiom,
% 14.09/14.36 ( ~ class_RealVector_Oreal__normed__vector(T_a)
% 14.09/14.36 | c_HOL_Oabs__class_Oabs(c_RealVector_Onorm__class_Onorm(V_a,T_a),tc_RealDef_Oreal) = c_RealVector_Onorm__class_Onorm(V_a,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_complex__mod__triangle__ineq2_0,axiom,
% 14.09/14.36 c_lessequals(c_HOL_Ominus__class_Ominus(c_RealVector_Onorm__class_Onorm(c_HOL_Oplus__class_Oplus(V_b,V_a,tc_Complex_Ocomplex),tc_Complex_Ocomplex),c_RealVector_Onorm__class_Onorm(V_b,tc_Complex_Ocomplex),tc_RealDef_Oreal),c_RealVector_Onorm__class_Onorm(V_a,tc_Complex_Ocomplex),tc_RealDef_Oreal) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_mult__less__cancel__left__pos_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(V_a,V_b,T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_c,V_a,T_a),c_HOL_Otimes__class_Otimes(V_c,V_b,T_a),T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_mult__less__cancel__left__pos_1,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_c,V_a,T_a),c_HOL_Otimes__class_Otimes(V_c,V_b,T_a),T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_a,V_b,T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_mult__strict__left__mono__neg_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_c,V_a,T_a),c_HOL_Otimes__class_Otimes(V_c,V_b,T_a),T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_b,V_a,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_mult__strict__left__mono_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__semiring__strict(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_c,V_a,T_a),c_HOL_Otimes__class_Otimes(V_c,V_b,T_a),T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_a,V_b,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_mult__less__cancel__left__disj_4,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_c,V_a,T_a),c_HOL_Otimes__class_Otimes(V_c,V_b,T_a),T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_a,V_b,T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_mult__less__cancel__left__disj_5,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_c,V_a,T_a),c_HOL_Otimes__class_Otimes(V_c,V_b,T_a),T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_b,V_a,T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_mult__strict__right__mono__neg_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),c_HOL_Otimes__class_Otimes(V_b,V_c,T_a),T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_b,V_a,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_mult__strict__right__mono_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__semiring__strict(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),c_HOL_Otimes__class_Otimes(V_b,V_c,T_a),T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_a,V_b,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_mult__less__cancel__right__disj_4,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),c_HOL_Otimes__class_Otimes(V_b,V_c,T_a),T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_a,V_b,T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_mult__less__cancel__right__disj_5,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),c_HOL_Otimes__class_Otimes(V_b,V_c,T_a),T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_b,V_a,T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_mult__strict__left__mono__comm_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__comm__semiring__strict(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_c,V_a,T_a),c_HOL_Otimes__class_Otimes(V_c,V_b,T_a),T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_a,V_b,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_mult__divide__mult__cancel__left_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Ofield(T_a)
% 14.09/14.36 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.36 | c_HOL_Oinverse__class_Odivide(c_HOL_Otimes__class_Otimes(V_c,V_a,T_a),c_HOL_Otimes__class_Otimes(V_c,V_b,T_a),T_a) = c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a)
% 14.09/14.36 | V_c = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_mult__divide__mult__cancel__right_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Ofield(T_a)
% 14.09/14.36 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.36 | c_HOL_Oinverse__class_Odivide(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),c_HOL_Otimes__class_Otimes(V_b,V_c,T_a),T_a) = c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a)
% 14.09/14.36 | V_c = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_mult__neg__neg_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_mult__pos__pos_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__semiring__strict(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_zero__less__mult__pos_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__semiring__strict(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_zero__less__mult__pos2_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__semiring__strict(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Otimes__class_Otimes(V_b,V_a,T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_div__mult__self1__is__id_0,axiom,
% 14.09/14.36 ( ~ class_Divides_Osemiring__div(T_a)
% 14.09/14.36 | c_Divides_Odiv__class_Odiv(c_HOL_Otimes__class_Otimes(V_b,V_a,T_a),V_b,T_a) = V_a
% 14.09/14.36 | V_b = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_div__mult__self2__is__id_0,axiom,
% 14.09/14.36 ( ~ class_Divides_Osemiring__div(T_a)
% 14.09/14.36 | c_Divides_Odiv__class_Odiv(c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),V_b,T_a) = V_a
% 14.09/14.36 | V_b = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_divide__eq__eq_3,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Ofield(T_a)
% 14.09/14.36 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.36 | c_HOL_Oinverse__class_Odivide(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),V_c,T_a) = V_a
% 14.09/14.36 | V_c = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_eq__divide__eq_3,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Ofield(T_a)
% 14.09/14.36 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.36 | V_a = c_HOL_Oinverse__class_Odivide(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),V_c,T_a)
% 14.09/14.36 | V_c = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_divide__eq__imp_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Ofield(T_a)
% 14.09/14.36 | V_c = c_HOL_Ozero__class_Ozero(T_a)
% 14.09/14.36 | c_HOL_Oinverse__class_Odivide(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),V_c,T_a) = V_a ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_eq__divide__imp_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Ofield(T_a)
% 14.09/14.36 | V_c = c_HOL_Ozero__class_Ozero(T_a)
% 14.09/14.36 | V_a = c_HOL_Oinverse__class_Odivide(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),V_c,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_dvd__mult__cancel__left_1,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oidom(T_a)
% 14.09/14.36 | c_Ring__and__Field_Odvd__class_Odvd(c_HOL_Otimes__class_Otimes(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a),c_HOL_Otimes__class_Otimes(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_dvd__mult__cancel__right_1,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oidom(T_a)
% 14.09/14.36 | c_Ring__and__Field_Odvd__class_Odvd(c_HOL_Otimes__class_Otimes(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a),c_HOL_Otimes__class_Otimes(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_div__mult__mult1__if_0,axiom,
% 14.09/14.36 ( ~ class_Divides_Osemiring__div(T_a)
% 14.09/14.36 | c_Divides_Odiv__class_Odiv(c_HOL_Otimes__class_Otimes(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a),c_HOL_Otimes__class_Otimes(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a),T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_mult__neg__pos_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__semiring__strict(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_mult__pos__neg_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__semiring__strict(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_mult__pos__neg2_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__semiring__strict(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_b,V_a,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_div__mult__mult1_0,axiom,
% 14.09/14.36 ( ~ class_Divides_Osemiring__div(T_a)
% 14.09/14.36 | c_Divides_Odiv__class_Odiv(c_HOL_Otimes__class_Otimes(V_c,V_a,T_a),c_HOL_Otimes__class_Otimes(V_c,V_b,T_a),T_a) = c_Divides_Odiv__class_Odiv(V_a,V_b,T_a)
% 14.09/14.36 | V_c = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_div__mult__mult2_0,axiom,
% 14.09/14.36 ( ~ class_Divides_Osemiring__div(T_a)
% 14.09/14.36 | c_Divides_Odiv__class_Odiv(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),c_HOL_Otimes__class_Otimes(V_b,V_c,T_a),T_a) = c_Divides_Odiv__class_Odiv(V_a,V_b,T_a)
% 14.09/14.36 | V_c = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_mult__less__cancel__left__disj_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_c,V_a,T_a),c_HOL_Otimes__class_Otimes(V_c,V_b,T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_mult__less__cancel__right__disj_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),c_HOL_Otimes__class_Otimes(V_b,V_c,T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_not__square__less__zero_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,V_a,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_nonzero__inverse__mult__distrib_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Odivision__ring(T_a)
% 14.09/14.36 | c_HOL_Oinverse__class_Oinverse(c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),T_a) = c_HOL_Otimes__class_Otimes(c_HOL_Oinverse__class_Oinverse(V_b,T_a),c_HOL_Oinverse__class_Oinverse(V_a,T_a),T_a)
% 14.09/14.36 | V_b = c_HOL_Ozero__class_Ozero(T_a)
% 14.09/14.36 | V_a = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_eq__divide__eq_4,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Ofield(T_a)
% 14.09/14.36 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.36 | c_HOL_Ozero__class_Ozero(T_a) = c_HOL_Oinverse__class_Odivide(c_HOL_Otimes__class_Otimes(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a),V_c,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_divide__eq__eq_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Ofield(T_a)
% 14.09/14.36 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.36 | V_b = c_HOL_Otimes__class_Otimes(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),V_c,T_a)
% 14.09/14.36 | V_c = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_eq__divide__eq_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Ofield(T_a)
% 14.09/14.36 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.36 | c_HOL_Otimes__class_Otimes(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),V_c,T_a) = V_b
% 14.09/14.36 | V_c = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_mult__less__cancel__left__disj_1,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(V_b,V_a,T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_c,V_a,T_a),c_HOL_Otimes__class_Otimes(V_c,V_b,T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_mult__less__cancel__left__disj_2,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(V_a,V_b,T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_c,V_a,T_a),c_HOL_Otimes__class_Otimes(V_c,V_b,T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_mult__less__cancel__right__disj_1,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(V_b,V_a,T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),c_HOL_Otimes__class_Otimes(V_b,V_c,T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_mult__less__cancel__right__disj_2,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(V_a,V_b,T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),c_HOL_Otimes__class_Otimes(V_b,V_c,T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_frac__eq__eq_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Ofield(T_a)
% 14.09/14.36 | c_HOL_Oinverse__class_Odivide(V_x,V_y,T_a) != c_HOL_Oinverse__class_Odivide(V_w,V_z,T_a)
% 14.09/14.36 | V_z = c_HOL_Ozero__class_Ozero(T_a)
% 14.09/14.36 | V_y = c_HOL_Ozero__class_Ozero(T_a)
% 14.09/14.36 | c_HOL_Otimes__class_Otimes(V_x,V_z,T_a) = c_HOL_Otimes__class_Otimes(V_w,V_y,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_frac__eq__eq_1,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Ofield(T_a)
% 14.09/14.36 | c_HOL_Otimes__class_Otimes(V_x,V_z,T_a) != c_HOL_Otimes__class_Otimes(V_w,V_y,T_a)
% 14.09/14.36 | V_z = c_HOL_Ozero__class_Ozero(T_a)
% 14.09/14.36 | V_y = c_HOL_Ozero__class_Ozero(T_a)
% 14.09/14.36 | c_HOL_Oinverse__class_Odivide(V_x,V_y,T_a) = c_HOL_Oinverse__class_Odivide(V_w,V_z,T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_divide__eq__eq_4,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Ofield(T_a)
% 14.09/14.36 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.09/14.36 | c_HOL_Oinverse__class_Odivide(c_HOL_Otimes__class_Otimes(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a),V_c,T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_add__neg__neg_0,axiom,
% 14.09/14.36 ( ~ class_OrderedGroup_Opordered__comm__monoid__add(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(c_HOL_Oplus__class_Oplus(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_left__minus_0,axiom,
% 14.09/14.36 ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 14.09/14.36 | c_HOL_Oplus__class_Oplus(c_HOL_Ouminus__class_Ouminus(V_a,T_a),V_a,T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_right__minus_0,axiom,
% 14.09/14.36 ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 14.09/14.36 | c_HOL_Oplus__class_Oplus(V_a,c_HOL_Ouminus__class_Ouminus(V_a,T_a),T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_ab__left__minus_0,axiom,
% 14.09/14.36 ( ~ class_OrderedGroup_Oab__group__add(T_a)
% 14.09/14.36 | c_HOL_Oplus__class_Oplus(c_HOL_Ouminus__class_Ouminus(V_a,T_a),V_a,T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_eq__neg__iff__add__eq__0_0,axiom,
% 14.09/14.36 ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 14.09/14.36 | c_HOL_Oplus__class_Oplus(c_HOL_Ouminus__class_Ouminus(V_b,T_a),V_b,T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_even__less__0__iff_1,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__idom(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(c_HOL_Oplus__class_Oplus(V_a,V_a,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_even__less__0__iff_0,axiom,
% 14.09/14.36 ( ~ class_Ring__and__Field_Oordered__idom(T_a)
% 14.09/14.36 | c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.09/14.36 | ~ c_HOL_Oord__class_Oless(c_HOL_Oplus__class_Oplus(V_a,V_a,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.09/14.36
% 14.09/14.36 cnf(cls_double__add__less__zero__iff__single__less__zero_0,axiom,
% 14.25/14.36 ( ~ class_OrderedGroup_Olordered__ab__group__add(T_a)
% 14.25/14.36 | c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.25/14.36 | ~ c_HOL_Oord__class_Oless(c_HOL_Oplus__class_Oplus(V_a,V_a,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.25/14.36
% 14.25/14.36 cnf(cls_double__add__less__zero__iff__single__less__zero_1,axiom,
% 14.25/14.36 ( ~ class_OrderedGroup_Olordered__ab__group__add(T_a)
% 14.25/14.36 | c_HOL_Oord__class_Oless(c_HOL_Oplus__class_Oplus(V_a,V_a,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.25/14.36 | ~ c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.25/14.36
% 14.25/14.36 cnf(cls_pos__add__strict_0,axiom,
% 14.25/14.36 ( ~ class_Ring__and__Field_Oordered__semidom(T_a)
% 14.25/14.36 | c_HOL_Oord__class_Oless(V_b,c_HOL_Oplus__class_Oplus(V_a,V_c,T_a),T_a)
% 14.25/14.36 | ~ c_HOL_Oord__class_Oless(V_b,V_c,T_a)
% 14.25/14.36 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 14.25/14.36
% 14.25/14.36 cnf(cls_zero__less__double__add__iff__zero__less__single__add_0,axiom,
% 14.25/14.36 ( ~ class_OrderedGroup_Olordered__ab__group__add(T_a)
% 14.25/14.36 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 14.25/14.36 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oplus__class_Oplus(V_a,V_a,T_a),T_a) ) ).
% 14.25/14.36
% 14.25/14.36 cnf(cls_zero__less__double__add__iff__zero__less__single__add_1,axiom,
% 14.25/14.36 ( ~ class_OrderedGroup_Olordered__ab__group__add(T_a)
% 14.25/14.36 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oplus__class_Oplus(V_a,V_a,T_a),T_a)
% 14.25/14.36 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 14.25/14.36
% 14.25/14.36 cnf(cls_minus__unique_0,axiom,
% 14.25/14.36 ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 14.25/14.36 | c_HOL_Oplus__class_Oplus(V_a,V_b,T_a) != c_HOL_Ozero__class_Ozero(T_a)
% 14.25/14.36 | c_HOL_Ouminus__class_Ouminus(V_a,T_a) = V_b ) ).
% 14.25/14.36
% 14.25/14.36 cnf(cls_eq__neg__iff__add__eq__0_1,axiom,
% 14.25/14.36 ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 14.25/14.36 | c_HOL_Oplus__class_Oplus(V_a,V_b,T_a) != c_HOL_Ozero__class_Ozero(T_a)
% 14.25/14.36 | V_a = c_HOL_Ouminus__class_Ouminus(V_b,T_a) ) ).
% 14.25/14.36
% 14.25/14.36 cnf(cls_add__pos__pos_0,axiom,
% 14.25/14.36 ( ~ class_OrderedGroup_Opordered__comm__monoid__add(T_a)
% 14.25/14.36 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oplus__class_Oplus(V_a,V_b,T_a),T_a)
% 14.25/14.36 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 14.25/14.36 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 14.25/14.36
% 14.25/14.36 cnf(cls_abs__le__mult_0,axiom,
% 14.25/14.36 ( ~ class_Ring__and__Field_Olordered__ring(T_a)
% 14.25/14.36 | c_lessequals(c_HOL_Oabs__class_Oabs(c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),T_a),c_HOL_Otimes__class_Otimes(c_HOL_Oabs__class_Oabs(V_a,T_a),c_HOL_Oabs__class_Oabs(V_b,T_a),T_a),T_a) ) ).
% 14.25/14.36
% 14.25/14.36 cnf(cls_divide__self__if_1,axiom,
% 14.25/14.36 ( ~ class_Ring__and__Field_Ofield(T_a)
% 14.25/14.36 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.25/14.36 | c_HOL_Oinverse__class_Odivide(V_a,V_a,T_a) = c_HOL_Oone__class_Oone(T_a)
% 14.25/14.36 | V_a = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.36
% 14.25/14.36 cnf(cls_divide__self_0,axiom,
% 14.25/14.36 ( ~ class_Ring__and__Field_Ofield(T_a)
% 14.25/14.36 | c_HOL_Oinverse__class_Odivide(V_a,V_a,T_a) = c_HOL_Oone__class_Oone(T_a)
% 14.25/14.36 | V_a = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.36
% 14.25/14.36 cnf(cls_right__inverse__eq_1,axiom,
% 14.25/14.36 ( ~ class_Ring__and__Field_Ofield(T_a)
% 14.25/14.36 | V_x = c_HOL_Ozero__class_Ozero(T_a)
% 14.25/14.36 | c_HOL_Oinverse__class_Odivide(V_x,V_x,T_a) = c_HOL_Oone__class_Oone(T_a) ) ).
% 14.25/14.36
% 14.25/14.36 cnf(cls_right__inverse__eq_0,axiom,
% 14.25/14.36 ( ~ class_Ring__and__Field_Ofield(T_a)
% 14.25/14.36 | c_HOL_Oinverse__class_Odivide(V_a,V_b,T_a) != c_HOL_Oone__class_Oone(T_a)
% 14.25/14.36 | V_b = c_HOL_Ozero__class_Ozero(T_a)
% 14.25/14.36 | V_a = V_b ) ).
% 14.25/14.36
% 14.25/14.36 cnf(cls_div__self_0,axiom,
% 14.25/14.36 ( ~ class_Divides_Osemiring__div(T_a)
% 14.25/14.36 | c_Divides_Odiv__class_Odiv(V_a,V_a,T_a) = c_HOL_Oone__class_Oone(T_a)
% 14.25/14.36 | V_a = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.36
% 14.25/14.36 cnf(cls_not__one__less__zero_0,axiom,
% 14.25/14.36 ( ~ class_Ring__and__Field_Oordered__semidom(T_a)
% 14.25/14.36 | ~ c_HOL_Oord__class_Oless(c_HOL_Oone__class_Oone(T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.25/14.36
% 14.25/14.36 cnf(cls_zero__less__one_0,axiom,
% 14.25/14.36 ( ~ class_Ring__and__Field_Oordered__semidom(T_a)
% 14.25/14.36 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oone__class_Oone(T_a),T_a) ) ).
% 14.25/14.36
% 14.25/14.36 cnf(cls_add__le__less__mono_0,axiom,
% 14.25/14.36 ( ~ class_OrderedGroup_Opordered__cancel__ab__semigroup__add(T_a)
% 14.25/14.36 | c_HOL_Oord__class_Oless(c_HOL_Oplus__class_Oplus(V_a,V_c,T_a),c_HOL_Oplus__class_Oplus(V_b,V_d,T_a),T_a)
% 14.25/14.36 | ~ c_HOL_Oord__class_Oless(V_c,V_d,T_a)
% 14.25/14.36 | ~ c_lessequals(V_a,V_b,T_a) ) ).
% 14.25/14.36
% 14.25/14.36 cnf(cls_add__less__le__mono_0,axiom,
% 14.25/14.36 ( ~ class_OrderedGroup_Opordered__cancel__ab__semigroup__add(T_a)
% 14.25/14.36 | c_HOL_Oord__class_Oless(c_HOL_Oplus__class_Oplus(V_a,V_c,T_a),c_HOL_Oplus__class_Oplus(V_b,V_d,T_a),T_a)
% 14.25/14.36 | ~ c_lessequals(V_c,V_d,T_a)
% 14.25/14.36 | ~ c_HOL_Oord__class_Oless(V_a,V_b,T_a) ) ).
% 14.25/14.36
% 14.25/14.36 cnf(cls_abs__triangle__ineq_0,axiom,
% 14.25/14.36 ( ~ class_OrderedGroup_Opordered__ab__group__add__abs(T_a)
% 14.25/14.36 | c_lessequals(c_HOL_Oabs__class_Oabs(c_HOL_Oplus__class_Oplus(V_a,V_b,T_a),T_a),c_HOL_Oplus__class_Oplus(c_HOL_Oabs__class_Oabs(V_a,T_a),c_HOL_Oabs__class_Oabs(V_b,T_a),T_a),T_a) ) ).
% 14.25/14.36
% 14.25/14.36 cnf(cls_estimate__by__abs_0,axiom,
% 14.25/14.36 ( ~ class_OrderedGroup_Olordered__ab__group__add__abs(T_a)
% 14.25/14.36 | c_lessequals(V_a,c_HOL_Oplus__class_Oplus(V_c,c_HOL_Oabs__class_Oabs(V_b,T_a),T_a),T_a)
% 14.25/14.36 | ~ c_lessequals(c_HOL_Oplus__class_Oplus(V_a,V_b,T_a),V_c,T_a) ) ).
% 14.25/14.36
% 14.25/14.36 cnf(cls_inverse__le__1__iff_2,axiom,
% 14.25/14.36 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.25/14.36 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.25/14.36 | c_lessequals(c_HOL_Oinverse__class_Oinverse(V_x,T_a),c_HOL_Oone__class_Oone(T_a),T_a)
% 14.25/14.36 | ~ c_lessequals(c_HOL_Oone__class_Oone(T_a),V_x,T_a) ) ).
% 14.25/14.36
% 14.25/14.36 cnf(cls_one__le__inverse__iff_1,axiom,
% 14.25/14.36 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.25/14.36 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.25/14.36 | c_lessequals(V_x,c_HOL_Oone__class_Oone(T_a),T_a)
% 14.25/14.36 | ~ c_lessequals(c_HOL_Oone__class_Oone(T_a),c_HOL_Oinverse__class_Oinverse(V_x,T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_group__add__class_Odiff__0_0,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 14.25/14.37 | 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) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_less__iff__diff__less__0_0,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 14.25/14.37 | 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)
% 14.25/14.37 | ~ c_HOL_Oord__class_Oless(V_a,V_b,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_less__iff__diff__less__0_1,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 14.25/14.37 | c_HOL_Oord__class_Oless(V_a,V_b,T_a)
% 14.25/14.37 | ~ 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) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_less__1__mult_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oordered__semidom(T_a)
% 14.25/14.37 | c_HOL_Oord__class_Oless(c_HOL_Oone__class_Oone(T_a),c_HOL_Otimes__class_Otimes(V_m,V_n,T_a),T_a)
% 14.25/14.37 | ~ c_HOL_Oord__class_Oless(c_HOL_Oone__class_Oone(T_a),V_n,T_a)
% 14.25/14.37 | ~ c_HOL_Oord__class_Oless(c_HOL_Oone__class_Oone(T_a),V_m,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_inverse__unique_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Odivision__ring(T_a)
% 14.25/14.37 | c_HOL_Otimes__class_Otimes(V_a,V_b,T_a) != c_HOL_Oone__class_Oone(T_a)
% 14.25/14.37 | c_HOL_Oinverse__class_Oinverse(V_a,T_a) = V_b ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_class__ring_Oneg__mul_0,axiom,
% 14.25/14.37 ( ~ class_Int_Onumber__ring(T_a)
% 14.25/14.37 | c_HOL_Ouminus__class_Ouminus(V_x,T_a) = c_HOL_Otimes__class_Otimes(c_HOL_Ouminus__class_Ouminus(c_HOL_Oone__class_Oone(T_a),T_a),V_x,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_less__add__one_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oordered__semidom(T_a)
% 14.25/14.37 | c_HOL_Oord__class_Oless(V_a,c_HOL_Oplus__class_Oplus(V_a,c_HOL_Oone__class_Oone(T_a),T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_abs__triangle__ineq3_0,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Opordered__ab__group__add__abs(T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Oabs__class_Oabs(c_HOL_Ominus__class_Ominus(c_HOL_Oabs__class_Oabs(V_a,T_a),c_HOL_Oabs__class_Oabs(V_b,T_a),T_a),T_a),c_HOL_Oabs__class_Oabs(c_HOL_Ominus__class_Ominus(V_a,V_b,T_a),T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_abs__triangle__ineq2_0,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Opordered__ab__group__add__abs(T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Ominus__class_Ominus(c_HOL_Oabs__class_Oabs(V_a,T_a),c_HOL_Oabs__class_Oabs(V_b,T_a),T_a),c_HOL_Oabs__class_Oabs(c_HOL_Ominus__class_Ominus(V_a,V_b,T_a),T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_diff__minus__eq__add_0,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 14.25/14.37 | c_HOL_Ominus__class_Ominus(V_a,c_HOL_Ouminus__class_Ouminus(V_b,T_a),T_a) = c_HOL_Oplus__class_Oplus(V_a,V_b,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_diff__def_0,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Oab__group__add(T_a)
% 14.25/14.37 | c_HOL_Ominus__class_Ominus(V_x,V_y,T_a) = c_HOL_Oplus__class_Oplus(V_x,c_HOL_Ouminus__class_Ouminus(V_y,T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_class__ring_Osub__add_0,axiom,
% 14.25/14.37 ( ~ class_Int_Onumber__ring(T_a)
% 14.25/14.37 | c_HOL_Ominus__class_Ominus(V_x,V_y,T_a) = c_HOL_Oplus__class_Oplus(V_x,c_HOL_Ouminus__class_Ouminus(V_y,T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_diff__minus_0,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 14.25/14.37 | c_HOL_Ominus__class_Ominus(V_a,V_b,T_a) = c_HOL_Oplus__class_Oplus(V_a,c_HOL_Ouminus__class_Ouminus(V_b,T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_ab__diff__minus_0,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Oab__group__add(T_a)
% 14.25/14.37 | c_HOL_Ominus__class_Ominus(V_a,V_b,T_a) = c_HOL_Oplus__class_Oplus(V_a,c_HOL_Ouminus__class_Ouminus(V_b,T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_norm__eq__zero_0,axiom,
% 14.25/14.37 ( ~ class_RealVector_Oreal__normed__vector(T_a)
% 14.25/14.37 | c_RealVector_Onorm__class_Onorm(V_x,T_a) != c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal)
% 14.25/14.37 | V_x = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_norm__zero_0,axiom,
% 14.25/14.37 ( ~ class_RealVector_Oreal__normed__vector(T_a)
% 14.25/14.37 | c_RealVector_Onorm__class_Onorm(c_HOL_Ozero__class_Ozero(T_a),T_a) = c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_real__sqrt__le__1__iff_1,axiom,
% 14.25/14.37 ( c_lessequals(c_NthRoot_Osqrt(V_x),c_HOL_Oone__class_Oone(tc_RealDef_Oreal),tc_RealDef_Oreal)
% 14.25/14.37 | ~ c_lessequals(V_x,c_HOL_Oone__class_Oone(tc_RealDef_Oreal),tc_RealDef_Oreal) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_real__sqrt__le__1__iff_0,axiom,
% 14.25/14.37 ( c_lessequals(V_x,c_HOL_Oone__class_Oone(tc_RealDef_Oreal),tc_RealDef_Oreal)
% 14.25/14.37 | ~ c_lessequals(c_NthRoot_Osqrt(V_x),c_HOL_Oone__class_Oone(tc_RealDef_Oreal),tc_RealDef_Oreal) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_real__sqrt__ge__1__iff_1,axiom,
% 14.25/14.37 ( c_lessequals(c_HOL_Oone__class_Oone(tc_RealDef_Oreal),c_NthRoot_Osqrt(V_y),tc_RealDef_Oreal)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Oone__class_Oone(tc_RealDef_Oreal),V_y,tc_RealDef_Oreal) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_real__sqrt__ge__1__iff_0,axiom,
% 14.25/14.37 ( c_lessequals(c_HOL_Oone__class_Oone(tc_RealDef_Oreal),V_y,tc_RealDef_Oreal)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Oone__class_Oone(tc_RealDef_Oreal),c_NthRoot_Osqrt(V_y),tc_RealDef_Oreal) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_real__sqrt__ge__one_0,axiom,
% 14.25/14.37 ( c_lessequals(c_HOL_Oone__class_Oone(tc_RealDef_Oreal),c_NthRoot_Osqrt(V_x),tc_RealDef_Oreal)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Oone__class_Oone(tc_RealDef_Oreal),V_x,tc_RealDef_Oreal) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_norm__ge__zero_0,axiom,
% 14.25/14.37 ( ~ class_RealVector_Oreal__normed__vector(T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),c_RealVector_Onorm__class_Onorm(V_x,T_a),tc_RealDef_Oreal) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_real__sum__squares__cancel_0,axiom,
% 14.25/14.37 ( c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_x,V_x,tc_RealDef_Oreal),c_HOL_Otimes__class_Otimes(V_y,V_y,tc_RealDef_Oreal),tc_RealDef_Oreal) != c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal)
% 14.25/14.37 | V_x = c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_real__sum__squares__cancel2_0,axiom,
% 14.25/14.37 ( c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_x,V_x,tc_RealDef_Oreal),c_HOL_Otimes__class_Otimes(V_y,V_y,tc_RealDef_Oreal),tc_RealDef_Oreal) != c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal)
% 14.25/14.37 | V_y = c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_real__two__squares__add__zero__iff_2,axiom,
% 14.25/14.37 c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),tc_RealDef_Oreal),c_HOL_Otimes__class_Otimes(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),tc_RealDef_Oreal),tc_RealDef_Oreal) = c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_poly__1_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 14.25/14.37 | c_Polynomial_Opoly(c_HOL_Oone__class_Oone(tc_Polynomial_Opoly(T_a)),V_x,T_a) = c_HOL_Oone__class_Oone(T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult__less__le__imp__less_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oordered__semiring__strict(T_a)
% 14.25/14.37 | c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),c_HOL_Otimes__class_Otimes(V_b,V_d,T_a),T_a)
% 14.25/14.37 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 14.25/14.37 | ~ c_lessequals(V_c,V_d,T_a)
% 14.25/14.37 | ~ c_HOL_Oord__class_Oless(V_a,V_b,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult__le__less__imp__less_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oordered__semiring__strict(T_a)
% 14.25/14.37 | c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),c_HOL_Otimes__class_Otimes(V_b,V_d,T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 14.25/14.37 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 14.25/14.37 | ~ c_HOL_Oord__class_Oless(V_c,V_d,T_a)
% 14.25/14.37 | ~ c_lessequals(V_a,V_b,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_abs__mult__pos_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oordered__idom(T_a)
% 14.25/14.37 | c_HOL_Otimes__class_Otimes(c_HOL_Oabs__class_Oabs(V_y,T_a),V_x,T_a) = c_HOL_Oabs__class_Oabs(c_HOL_Otimes__class_Otimes(V_y,V_x,T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_x,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult__strict__mono_H_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oordered__semiring__strict(T_a)
% 14.25/14.37 | c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),c_HOL_Otimes__class_Otimes(V_b,V_d,T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 14.25/14.37 | ~ c_HOL_Oord__class_Oless(V_c,V_d,T_a)
% 14.25/14.37 | ~ c_HOL_Oord__class_Oless(V_a,V_b,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_abs__eq__mult_3,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Opordered__ring__abs(T_a)
% 14.25/14.37 | c_HOL_Oabs__class_Oabs(c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),T_a) = c_HOL_Otimes__class_Otimes(c_HOL_Oabs__class_Oabs(V_a,T_a),c_HOL_Oabs__class_Oabs(V_b,T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_abs__eq__mult_2,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Opordered__ring__abs(T_a)
% 14.25/14.37 | c_HOL_Oabs__class_Oabs(c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),T_a) = c_HOL_Otimes__class_Otimes(c_HOL_Oabs__class_Oabs(V_a,T_a),c_HOL_Oabs__class_Oabs(V_b,T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 14.25/14.37 | ~ c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_abs__eq__mult_1,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Opordered__ring__abs(T_a)
% 14.25/14.37 | c_HOL_Oabs__class_Oabs(c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),T_a) = c_HOL_Otimes__class_Otimes(c_HOL_Oabs__class_Oabs(V_a,T_a),c_HOL_Oabs__class_Oabs(V_b,T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_abs__eq__mult_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Opordered__ring__abs(T_a)
% 14.25/14.37 | c_HOL_Oabs__class_Oabs(c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),T_a) = c_HOL_Otimes__class_Otimes(c_HOL_Oabs__class_Oabs(V_a,T_a),c_HOL_Oabs__class_Oabs(V_b,T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult__less__imp__less__right_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oordered__semiring__strict(T_a)
% 14.25/14.37 | c_HOL_Oord__class_Oless(V_a,V_b,T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 14.25/14.37 | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),c_HOL_Otimes__class_Otimes(V_b,V_c,T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult__less__imp__less__left_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oordered__semiring__strict(T_a)
% 14.25/14.37 | c_HOL_Oord__class_Oless(V_a,V_b,T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 14.25/14.37 | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_c,V_a,T_a),c_HOL_Otimes__class_Otimes(V_c,V_b,T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult__right__less__imp__less_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oordered__semiring(T_a)
% 14.25/14.37 | c_HOL_Oord__class_Oless(V_a,V_b,T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 14.25/14.37 | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),c_HOL_Otimes__class_Otimes(V_b,V_c,T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult__left__less__imp__less_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oordered__semiring(T_a)
% 14.25/14.37 | c_HOL_Oord__class_Oless(V_a,V_b,T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 14.25/14.37 | ~ c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_c,V_a,T_a),c_HOL_Otimes__class_Otimes(V_c,V_b,T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult__strict__mono_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oordered__semiring__strict(T_a)
% 14.25/14.37 | c_HOL_Oord__class_Oless(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),c_HOL_Otimes__class_Otimes(V_b,V_d,T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 14.25/14.37 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 14.25/14.37 | ~ c_HOL_Oord__class_Oless(V_c,V_d,T_a)
% 14.25/14.37 | ~ c_HOL_Oord__class_Oless(V_a,V_b,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult__right__le__imp__le_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oordered__semiring__strict(T_a)
% 14.25/14.37 | c_lessequals(V_a,V_b,T_a)
% 14.25/14.37 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),c_HOL_Otimes__class_Otimes(V_b,V_c,T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult__left__le__imp__le_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oordered__semiring__strict(T_a)
% 14.25/14.37 | c_lessequals(V_a,V_b,T_a)
% 14.25/14.37 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Otimes__class_Otimes(V_c,V_a,T_a),c_HOL_Otimes__class_Otimes(V_c,V_b,T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult__le__cancel__left__pos_1,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Otimes__class_Otimes(V_c,V_a,T_a),c_HOL_Otimes__class_Otimes(V_c,V_b,T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(V_a,V_b,T_a)
% 14.25/14.37 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult__le__cancel__left__pos_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 14.25/14.37 | c_lessequals(V_a,V_b,T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Otimes__class_Otimes(V_c,V_a,T_a),c_HOL_Otimes__class_Otimes(V_c,V_b,T_a),T_a)
% 14.25/14.37 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult__le__cancel__left__neg_1,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Otimes__class_Otimes(V_c,V_a,T_a),c_HOL_Otimes__class_Otimes(V_c,V_b,T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(V_b,V_a,T_a)
% 14.25/14.37 | ~ c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult__le__cancel__left__neg_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 14.25/14.37 | c_lessequals(V_b,V_a,T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Otimes__class_Otimes(V_c,V_a,T_a),c_HOL_Otimes__class_Otimes(V_c,V_b,T_a),T_a)
% 14.25/14.37 | ~ c_HOL_Oord__class_Oless(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_le__divide__eq_9,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.25/14.37 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.25/14.37 | c_lessequals(V_a,c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(V_b,c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),V_b,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_divide__le__eq_9,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.25/14.37 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Oinverse__class_Odivide(V_b,V_c,T_a),V_a,T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),V_b,T_a)
% 14.25/14.37 | ~ c_lessequals(V_b,c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_add__strict__increasing_0,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Opordered__ab__semigroup__add__imp__le(T_a)
% 14.25/14.37 | ~ class_OrderedGroup_Ocomm__monoid__add(T_a)
% 14.25/14.37 | c_HOL_Oord__class_Oless(V_b,c_HOL_Oplus__class_Oplus(V_a,V_c,T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(V_b,V_c,T_a)
% 14.25/14.37 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_add__pos__nonneg_0,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Opordered__comm__monoid__add(T_a)
% 14.25/14.37 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oplus__class_Oplus(V_a,V_b,T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 14.25/14.37 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_add__nonneg__pos_0,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Opordered__comm__monoid__add(T_a)
% 14.25/14.37 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oplus__class_Oplus(V_a,V_b,T_a),T_a)
% 14.25/14.37 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_le__eq__neg_1,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Olordered__ab__group__add(T_a)
% 14.25/14.37 | c_lessequals(V_a,c_HOL_Ouminus__class_Ouminus(V_b,T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Oplus__class_Oplus(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_le__eq__neg_0,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Olordered__ab__group__add(T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Oplus__class_Oplus(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(V_a,c_HOL_Ouminus__class_Ouminus(V_b,T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_add__nonpos__neg_0,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Opordered__comm__monoid__add(T_a)
% 14.25/14.37 | c_HOL_Oord__class_Oless(c_HOL_Oplus__class_Oplus(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.25/14.37 | ~ c_HOL_Oord__class_Oless(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_add__neg__nonpos_0,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Opordered__comm__monoid__add(T_a)
% 14.25/14.37 | c_HOL_Oord__class_Oless(c_HOL_Oplus__class_Oplus(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.25/14.37 | ~ c_HOL_Oord__class_Oless(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_add__strict__increasing2_0,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Opordered__ab__semigroup__add__imp__le(T_a)
% 14.25/14.37 | ~ class_OrderedGroup_Ocomm__monoid__add(T_a)
% 14.25/14.37 | c_HOL_Oord__class_Oless(V_b,c_HOL_Oplus__class_Oplus(V_a,V_c,T_a),T_a)
% 14.25/14.37 | ~ c_HOL_Oord__class_Oless(V_b,V_c,T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_add__frac__eq_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Ofield(T_a)
% 14.25/14.37 | c_HOL_Oplus__class_Oplus(c_HOL_Oinverse__class_Odivide(V_x,V_y,T_a),c_HOL_Oinverse__class_Odivide(V_w,V_z,T_a),T_a) = c_HOL_Oinverse__class_Odivide(c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_x,V_z,T_a),c_HOL_Otimes__class_Otimes(V_w,V_y,T_a),T_a),c_HOL_Otimes__class_Otimes(V_y,V_z,T_a),T_a)
% 14.25/14.37 | V_z = c_HOL_Ozero__class_Ozero(T_a)
% 14.25/14.37 | V_y = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_div__mult__self2_0,axiom,
% 14.25/14.37 ( ~ class_Divides_Osemiring__div(T_a)
% 14.25/14.37 | c_Divides_Odiv__class_Odiv(c_HOL_Oplus__class_Oplus(V_a,c_HOL_Otimes__class_Otimes(V_b,V_c,T_a),T_a),V_b,T_a) = c_HOL_Oplus__class_Oplus(V_c,c_Divides_Odiv__class_Odiv(V_a,V_b,T_a),T_a)
% 14.25/14.37 | V_b = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_div__mult__self1_0,axiom,
% 14.25/14.37 ( ~ class_Divides_Osemiring__div(T_a)
% 14.25/14.37 | c_Divides_Odiv__class_Odiv(c_HOL_Oplus__class_Oplus(V_a,c_HOL_Otimes__class_Otimes(V_c,V_b,T_a),T_a),V_b,T_a) = c_HOL_Oplus__class_Oplus(V_c,c_Divides_Odiv__class_Odiv(V_a,V_b,T_a),T_a)
% 14.25/14.37 | V_b = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_add__num__frac_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Ofield(T_a)
% 14.25/14.37 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.25/14.37 | c_HOL_Oplus__class_Oplus(V_z,c_HOL_Oinverse__class_Odivide(V_x,V_y,T_a),T_a) = c_HOL_Oinverse__class_Odivide(c_HOL_Oplus__class_Oplus(V_x,c_HOL_Otimes__class_Otimes(V_z,V_y,T_a),T_a),V_y,T_a)
% 14.25/14.37 | V_y = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_add__frac__num_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Ofield(T_a)
% 14.25/14.37 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.25/14.37 | c_HOL_Oplus__class_Oplus(c_HOL_Oinverse__class_Odivide(V_x,V_y,T_a),V_z,T_a) = c_HOL_Oinverse__class_Odivide(c_HOL_Oplus__class_Oplus(V_x,c_HOL_Otimes__class_Otimes(V_z,V_y,T_a),T_a),V_y,T_a)
% 14.25/14.37 | V_y = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_division__ring__inverse__add_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Odivision__ring(T_a)
% 14.25/14.37 | c_HOL_Oplus__class_Oplus(c_HOL_Oinverse__class_Oinverse(V_a,T_a),c_HOL_Oinverse__class_Oinverse(V_b,T_a),T_a) = c_HOL_Otimes__class_Otimes(c_HOL_Otimes__class_Otimes(c_HOL_Oinverse__class_Oinverse(V_a,T_a),c_HOL_Oplus__class_Oplus(V_a,V_b,T_a),T_a),c_HOL_Oinverse__class_Oinverse(V_b,T_a),T_a)
% 14.25/14.37 | V_b = c_HOL_Ozero__class_Ozero(T_a)
% 14.25/14.37 | V_a = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_inverse__add_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Ofield(T_a)
% 14.25/14.37 | c_HOL_Oplus__class_Oplus(c_HOL_Oinverse__class_Oinverse(V_a,T_a),c_HOL_Oinverse__class_Oinverse(V_b,T_a),T_a) = c_HOL_Otimes__class_Otimes(c_HOL_Otimes__class_Otimes(c_HOL_Oplus__class_Oplus(V_a,V_b,T_a),c_HOL_Oinverse__class_Oinverse(V_a,T_a),T_a),c_HOL_Oinverse__class_Oinverse(V_b,T_a),T_a)
% 14.25/14.37 | V_b = c_HOL_Ozero__class_Ozero(T_a)
% 14.25/14.37 | V_a = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_sum__squares__gt__zero__iff_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 14.25/14.37 | ~ c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Ozero__class_Ozero(T_a),T_a),c_HOL_Otimes__class_Otimes(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Ozero__class_Ozero(T_a),T_a),T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_not__sum__squares__lt__zero_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 14.25/14.37 | ~ c_HOL_Oord__class_Oless(c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_x,V_x,T_a),c_HOL_Otimes__class_Otimes(V_y,V_y,T_a),T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_sum__squares__gt__zero__iff_2,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 14.25/14.37 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_x,V_x,T_a),c_HOL_Otimes__class_Otimes(V_y,V_y,T_a),T_a),T_a)
% 14.25/14.37 | V_y = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_sum__squares__gt__zero__iff_1,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 14.25/14.37 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_x,V_x,T_a),c_HOL_Otimes__class_Otimes(V_y,V_y,T_a),T_a),T_a)
% 14.25/14.37 | V_x = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_divide__le__0__1__iff_1,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.25/14.37 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Oinverse__class_Odivide(c_HOL_Oone__class_Oone(T_a),V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_divide__le__0__1__iff_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.25/14.37 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.25/14.37 | c_lessequals(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Oinverse__class_Odivide(c_HOL_Oone__class_Oone(T_a),V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_inverse__le__1__iff_1,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.25/14.37 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Oinverse__class_Oinverse(V_x,T_a),c_HOL_Oone__class_Oone(T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(V_x,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_zero__le__divide__1__iff_1,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.25/14.37 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oinverse__class_Odivide(c_HOL_Oone__class_Oone(T_a),V_b,T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_zero__le__divide__1__iff_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.25/14.37 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oinverse__class_Odivide(c_HOL_Oone__class_Oone(T_a),V_b,T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_inverse__le__1__iff_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oordered__field(T_a)
% 14.25/14.37 | ~ class_Ring__and__Field_Odivision__by__zero(T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Oone__class_Oone(T_a),V_x,T_a)
% 14.25/14.37 | c_lessequals(V_x,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Oinverse__class_Oinverse(V_x,T_a),c_HOL_Oone__class_Oone(T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_right__inverse_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Odivision__ring(T_a)
% 14.25/14.37 | c_HOL_Otimes__class_Otimes(V_a,c_HOL_Oinverse__class_Oinverse(V_a,T_a),T_a) = c_HOL_Oone__class_Oone(T_a)
% 14.25/14.37 | V_a = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_left__inverse_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Odivision__ring(T_a)
% 14.25/14.37 | c_HOL_Otimes__class_Otimes(c_HOL_Oinverse__class_Oinverse(V_a,T_a),V_a,T_a) = c_HOL_Oone__class_Oone(T_a)
% 14.25/14.37 | V_a = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_field__inverse_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Ofield(T_a)
% 14.25/14.37 | c_HOL_Otimes__class_Otimes(c_HOL_Oinverse__class_Oinverse(V_a,T_a),V_a,T_a) = c_HOL_Oone__class_Oone(T_a)
% 14.25/14.37 | V_a = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_zero__less__two_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oordered__semidom(T_a)
% 14.25/14.37 | c_HOL_Oord__class_Oless(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oplus__class_Oplus(c_HOL_Oone__class_Oone(T_a),c_HOL_Oone__class_Oone(T_a),T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_div__add__self2_0,axiom,
% 14.25/14.37 ( ~ class_Divides_Osemiring__div(T_a)
% 14.25/14.37 | c_Divides_Odiv__class_Odiv(c_HOL_Oplus__class_Oplus(V_a,V_b,T_a),V_b,T_a) = c_HOL_Oplus__class_Oplus(c_Divides_Odiv__class_Odiv(V_a,V_b,T_a),c_HOL_Oone__class_Oone(T_a),T_a)
% 14.25/14.37 | V_b = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_div__add__self1_0,axiom,
% 14.25/14.37 ( ~ class_Divides_Osemiring__div(T_a)
% 14.25/14.37 | c_Divides_Odiv__class_Odiv(c_HOL_Oplus__class_Oplus(V_b,V_a,T_a),V_b,T_a) = c_HOL_Oplus__class_Oplus(c_Divides_Odiv__class_Odiv(V_a,V_b,T_a),c_HOL_Oone__class_Oone(T_a),T_a)
% 14.25/14.37 | V_b = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_division__ring__inverse__diff_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Odivision__ring(T_a)
% 14.25/14.37 | c_HOL_Ominus__class_Ominus(c_HOL_Oinverse__class_Oinverse(V_a,T_a),c_HOL_Oinverse__class_Oinverse(V_b,T_a),T_a) = c_HOL_Otimes__class_Otimes(c_HOL_Otimes__class_Otimes(c_HOL_Oinverse__class_Oinverse(V_a,T_a),c_HOL_Ominus__class_Ominus(V_b,V_a,T_a),T_a),c_HOL_Oinverse__class_Oinverse(V_b,T_a),T_a)
% 14.25/14.37 | V_b = c_HOL_Ozero__class_Ozero(T_a)
% 14.25/14.37 | V_a = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_diff__frac__eq_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Ofield(T_a)
% 14.25/14.37 | c_HOL_Ominus__class_Ominus(c_HOL_Oinverse__class_Odivide(V_x,V_y,T_a),c_HOL_Oinverse__class_Odivide(V_w,V_z,T_a),T_a) = c_HOL_Oinverse__class_Odivide(c_HOL_Ominus__class_Ominus(c_HOL_Otimes__class_Otimes(V_x,V_z,T_a),c_HOL_Otimes__class_Otimes(V_w,V_y,T_a),T_a),c_HOL_Otimes__class_Otimes(V_y,V_z,T_a),T_a)
% 14.25/14.37 | V_z = c_HOL_Ozero__class_Ozero(T_a)
% 14.25/14.37 | V_y = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_abs__triangle__ineq4_0,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Opordered__ab__group__add__abs(T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Oabs__class_Oabs(c_HOL_Ominus__class_Ominus(V_a,V_b,T_a),T_a),c_HOL_Oplus__class_Oplus(c_HOL_Oabs__class_Oabs(V_a,T_a),c_HOL_Oabs__class_Oabs(V_b,T_a),T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_abs__diff__triangle__ineq_0,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Opordered__ab__group__add__abs(T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Oabs__class_Oabs(c_HOL_Ominus__class_Ominus(c_HOL_Oplus__class_Oplus(V_a,V_b,T_a),c_HOL_Oplus__class_Oplus(V_c,V_d,T_a),T_a),T_a),c_HOL_Oplus__class_Oplus(c_HOL_Oabs__class_Oabs(c_HOL_Ominus__class_Ominus(V_a,V_c,T_a),T_a),c_HOL_Oabs__class_Oabs(c_HOL_Ominus__class_Ominus(V_b,V_d,T_a),T_a),T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_less__add__iff2_1,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Opordered__ring(T_a)
% 14.25/14.37 | c_HOL_Oord__class_Oless(c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_a,V_e,T_a),V_c,T_a),c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_b,V_e,T_a),V_d,T_a),T_a)
% 14.25/14.37 | ~ c_HOL_Oord__class_Oless(V_c,c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(c_HOL_Ominus__class_Ominus(V_b,V_a,T_a),V_e,T_a),V_d,T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_less__add__iff2_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Opordered__ring(T_a)
% 14.25/14.37 | c_HOL_Oord__class_Oless(V_c,c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(c_HOL_Ominus__class_Ominus(V_b,V_a,T_a),V_e,T_a),V_d,T_a),T_a)
% 14.25/14.37 | ~ c_HOL_Oord__class_Oless(c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_a,V_e,T_a),V_c,T_a),c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_b,V_e,T_a),V_d,T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_less__add__iff1_1,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Opordered__ring(T_a)
% 14.25/14.37 | c_HOL_Oord__class_Oless(c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_a,V_e,T_a),V_c,T_a),c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_b,V_e,T_a),V_d,T_a),T_a)
% 14.25/14.37 | ~ c_HOL_Oord__class_Oless(c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(c_HOL_Ominus__class_Ominus(V_a,V_b,T_a),V_e,T_a),V_c,T_a),V_d,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_less__add__iff1_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Opordered__ring(T_a)
% 14.25/14.37 | c_HOL_Oord__class_Oless(c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(c_HOL_Ominus__class_Ominus(V_a,V_b,T_a),V_e,T_a),V_c,T_a),V_d,T_a)
% 14.25/14.37 | ~ c_HOL_Oord__class_Oless(c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_a,V_e,T_a),V_c,T_a),c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_b,V_e,T_a),V_d,T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_DERIV__mult__lemma_0,axiom,
% 14.25/14.37 ( ~ class_RealVector_Oreal__field(T_a)
% 14.25/14.37 | c_HOL_Oinverse__class_Odivide(c_HOL_Ominus__class_Ominus(c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),c_HOL_Otimes__class_Otimes(V_c,V_d,T_a),T_a),V_h,T_a) = c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_a,c_HOL_Oinverse__class_Odivide(c_HOL_Ominus__class_Ominus(V_b,V_d,T_a),V_h,T_a),T_a),c_HOL_Otimes__class_Otimes(c_HOL_Oinverse__class_Odivide(c_HOL_Ominus__class_Ominus(V_a,V_c,T_a),V_h,T_a),V_d,T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_inf__period_I4_J_1,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Odvd(T_a)
% 14.25/14.37 | ~ class_Ring__and__Field_Ocomm__ring(T_a)
% 14.25/14.37 | c_Ring__and__Field_Odvd__class_Odvd(V_d,c_HOL_Oplus__class_Oplus(V_x,V_t,T_a),T_a)
% 14.25/14.37 | ~ c_Ring__and__Field_Odvd__class_Odvd(V_d,c_HOL_Oplus__class_Oplus(c_HOL_Ominus__class_Ominus(V_x,c_HOL_Otimes__class_Otimes(V_k,V_D,T_a),T_a),V_t,T_a),T_a)
% 14.25/14.37 | ~ c_Ring__and__Field_Odvd__class_Odvd(V_d,V_D,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_inf__period_I4_J_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Odvd(T_a)
% 14.25/14.37 | ~ class_Ring__and__Field_Ocomm__ring(T_a)
% 14.25/14.37 | c_Ring__and__Field_Odvd__class_Odvd(V_d,c_HOL_Oplus__class_Oplus(c_HOL_Ominus__class_Ominus(V_x,c_HOL_Otimes__class_Otimes(V_k,V_D,T_a),T_a),V_t,T_a),T_a)
% 14.25/14.37 | ~ c_Ring__and__Field_Odvd__class_Odvd(V_d,c_HOL_Oplus__class_Oplus(V_x,V_t,T_a),T_a)
% 14.25/14.37 | ~ c_Ring__and__Field_Odvd__class_Odvd(V_d,V_D,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_norm__le__zero__iff_1,axiom,
% 14.25/14.37 ( ~ class_RealVector_Oreal__normed__vector(T_a)
% 14.25/14.37 | c_lessequals(c_RealVector_Onorm__class_Onorm(c_HOL_Ozero__class_Ozero(T_a),T_a),c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),tc_RealDef_Oreal) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_norm__le__zero__iff_0,axiom,
% 14.25/14.37 ( ~ class_RealVector_Oreal__normed__vector(T_a)
% 14.25/14.37 | V_x = c_HOL_Ozero__class_Ozero(T_a)
% 14.25/14.37 | ~ c_lessequals(c_RealVector_Onorm__class_Onorm(V_x,T_a),c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),tc_RealDef_Oreal) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_norm__diff__ineq_0,axiom,
% 14.25/14.37 ( ~ class_RealVector_Oreal__normed__vector(T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Ominus__class_Ominus(c_RealVector_Onorm__class_Onorm(V_a,T_a),c_RealVector_Onorm__class_Onorm(V_b,T_a),tc_RealDef_Oreal),c_RealVector_Onorm__class_Onorm(c_HOL_Oplus__class_Oplus(V_a,V_b,T_a),T_a),tc_RealDef_Oreal) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_norm__sgn_1,axiom,
% 14.25/14.37 ( ~ class_RealVector_Oreal__normed__vector(T_a)
% 14.25/14.37 | c_RealVector_Onorm__class_Onorm(c_HOL_Osgn__class_Osgn(V_x,T_a),T_a) = c_HOL_Oone__class_Oone(tc_RealDef_Oreal)
% 14.25/14.37 | V_x = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_norm__mult__less_0,axiom,
% 14.25/14.37 ( ~ class_RealVector_Oreal__normed__algebra(T_a)
% 14.25/14.37 | c_HOL_Oord__class_Oless(c_RealVector_Onorm__class_Onorm(c_HOL_Otimes__class_Otimes(V_x,V_y,T_a),T_a),c_HOL_Otimes__class_Otimes(V_r,V_s,tc_RealDef_Oreal),tc_RealDef_Oreal)
% 14.25/14.37 | ~ c_HOL_Oord__class_Oless(c_RealVector_Onorm__class_Onorm(V_y,T_a),V_s,tc_RealDef_Oreal)
% 14.25/14.37 | ~ c_HOL_Oord__class_Oless(c_RealVector_Onorm__class_Onorm(V_x,T_a),V_r,tc_RealDef_Oreal) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_norm__triangle__ineq2_0,axiom,
% 14.25/14.37 ( ~ class_RealVector_Oreal__normed__vector(T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Ominus__class_Ominus(c_RealVector_Onorm__class_Onorm(V_a,T_a),c_RealVector_Onorm__class_Onorm(V_b,T_a),tc_RealDef_Oreal),c_RealVector_Onorm__class_Onorm(c_HOL_Ominus__class_Ominus(V_a,V_b,T_a),T_a),tc_RealDef_Oreal) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_norm__add__less_0,axiom,
% 14.25/14.37 ( ~ class_RealVector_Oreal__normed__vector(T_a)
% 14.25/14.37 | c_HOL_Oord__class_Oless(c_RealVector_Onorm__class_Onorm(c_HOL_Oplus__class_Oplus(V_x,V_y,T_a),T_a),c_HOL_Oplus__class_Oplus(V_r,V_s,tc_RealDef_Oreal),tc_RealDef_Oreal)
% 14.25/14.37 | ~ c_HOL_Oord__class_Oless(c_RealVector_Onorm__class_Onorm(V_y,T_a),V_s,tc_RealDef_Oreal)
% 14.25/14.37 | ~ c_HOL_Oord__class_Oless(c_RealVector_Onorm__class_Onorm(V_x,T_a),V_r,tc_RealDef_Oreal) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_real__mult__self__sum__ge__zero_0,axiom,
% 14.25/14.37 c_lessequals(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_x,V_x,tc_RealDef_Oreal),c_HOL_Otimes__class_Otimes(V_y,V_y,tc_RealDef_Oreal),tc_RealDef_Oreal),tc_RealDef_Oreal) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_le__real__sqrt__sumsq_0,axiom,
% 14.25/14.37 c_lessequals(V_x,c_NthRoot_Osqrt(c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_x,V_x,tc_RealDef_Oreal),c_HOL_Otimes__class_Otimes(V_y,V_y,tc_RealDef_Oreal),tc_RealDef_Oreal)),tc_RealDef_Oreal) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_real__squared__diff__one__factored_0,axiom,
% 14.25/14.37 c_HOL_Ominus__class_Ominus(c_HOL_Otimes__class_Otimes(V_x,V_x,tc_RealDef_Oreal),c_HOL_Oone__class_Oone(tc_RealDef_Oreal),tc_RealDef_Oreal) = c_HOL_Otimes__class_Otimes(c_HOL_Oplus__class_Oplus(V_x,c_HOL_Oone__class_Oone(tc_RealDef_Oreal),tc_RealDef_Oreal),c_HOL_Ominus__class_Ominus(V_x,c_HOL_Oone__class_Oone(tc_RealDef_Oreal),tc_RealDef_Oreal),tc_RealDef_Oreal) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_one__poly__def_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 14.25/14.37 | c_HOL_Oone__class_Oone(tc_Polynomial_Opoly(T_a)) = c_Polynomial_OpCons(c_HOL_Oone__class_Oone(T_a),c_HOL_Ozero__class_Ozero(tc_Polynomial_Opoly(T_a)),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult__left_Ononneg__bounded_0,axiom,
% 14.25/14.37 ( ~ class_RealVector_Oreal__normed__algebra(T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),c_RealVector_Osko__RealVector__Xmult__left__Xnonneg__bounded__1__1(V_y,T_a),tc_RealDef_Oreal) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult__right_Ononneg__bounded_0,axiom,
% 14.25/14.37 ( ~ class_RealVector_Oreal__normed__algebra(T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),c_RealVector_Osko__RealVector__Xmult__right__Xnonneg__bounded__1__1(V_x,T_a),tc_RealDef_Oreal) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult_Ononneg__bounded_0,axiom,
% 14.25/14.37 ( ~ class_RealVector_Oreal__normed__algebra(T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),c_RealVector_Osko__RealVector__Xmult__Xnonneg__bounded__1__1(V_vskULp,T_a),tc_RealDef_Oreal) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_complex__mod__triangle__sub_0,axiom,
% 14.25/14.37 c_lessequals(c_RealVector_Onorm__class_Onorm(V_w,tc_Complex_Ocomplex),c_HOL_Oplus__class_Oplus(c_RealVector_Onorm__class_Onorm(c_HOL_Oplus__class_Oplus(V_w,V_z,tc_Complex_Ocomplex),tc_Complex_Ocomplex),c_RealVector_Onorm__class_Onorm(V_z,tc_Complex_Ocomplex),tc_RealDef_Oreal),tc_RealDef_Oreal) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_poly__minimum__modulus__disc_0,axiom,
% 14.25/14.37 ( c_lessequals(c_RealVector_Onorm__class_Onorm(c_Polynomial_Opoly(V_p,v_sko__Fundamental__Theorem__Algebra__Mirabelle__Xpoly__minimum__modulus__disc__1(V_p,V_r),tc_Complex_Ocomplex),tc_Complex_Ocomplex),c_RealVector_Onorm__class_Onorm(c_Polynomial_Opoly(V_p,V_w,tc_Complex_Ocomplex),tc_Complex_Ocomplex),tc_RealDef_Oreal)
% 14.25/14.37 | ~ c_lessequals(c_RealVector_Onorm__class_Onorm(V_w,tc_Complex_Ocomplex),V_r,tc_RealDef_Oreal) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_norm__ratiotest__lemma_0,axiom,
% 14.25/14.37 ( ~ class_RealVector_Oreal__normed__vector(T_a)
% 14.25/14.37 | V_x = c_HOL_Ozero__class_Ozero(T_a)
% 14.25/14.37 | ~ c_lessequals(c_RealVector_Onorm__class_Onorm(V_x,T_a),c_HOL_Otimes__class_Otimes(V_c,c_RealVector_Onorm__class_Onorm(V_y,T_a),tc_RealDef_Oreal),tc_RealDef_Oreal)
% 14.25/14.37 | ~ c_lessequals(V_c,c_HOL_Ozero__class_Ozero(tc_RealDef_Oreal),tc_RealDef_Oreal) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_h_0,axiom,
% 14.25/14.37 c_lessequals(c_HOL_Oplus__class_Oplus(c_HOL_Oone__class_Oone(tc_RealDef_Oreal),c_HOL_Oabs__class_Oabs(v_r____,tc_RealDef_Oreal),tc_RealDef_Oreal),c_RealVector_Onorm__class_Onorm(v_z____,tc_Complex_Ocomplex),tc_RealDef_Oreal) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_pCons_I1_J_0,axiom,
% 14.25/14.37 ( c_lessequals(V_d,c_RealVector_Onorm__class_Onorm(c_Polynomial_Opoly(c_Polynomial_OpCons(V_a,v_cs____,tc_Complex_Ocomplex),V_z,tc_Complex_Ocomplex),tc_Complex_Ocomplex),tc_RealDef_Oreal)
% 14.25/14.37 | ~ c_lessequals(v_sko__local__XpCons__1__1(V_a,v_cs____,V_d),c_RealVector_Onorm__class_Onorm(V_z,tc_Complex_Ocomplex),tc_RealDef_Oreal)
% 14.25/14.37 | v_cs____ = c_HOL_Ozero__class_Ozero(tc_Polynomial_Opoly(tc_Complex_Ocomplex)) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_pCons_Ohyps_0,axiom,
% 14.25/14.37 ( c_lessequals(V_d,c_RealVector_Onorm__class_Onorm(c_Polynomial_Opoly(c_Polynomial_OpCons(V_a,v_cs____,tc_Complex_Ocomplex),V_z,tc_Complex_Ocomplex),tc_Complex_Ocomplex),tc_RealDef_Oreal)
% 14.25/14.37 | ~ c_lessequals(v_sko__local__XpCons__Xhyps__1(V_a,v_cs____,V_d),c_RealVector_Onorm__class_Onorm(V_z,tc_Complex_Ocomplex),tc_RealDef_Oreal)
% 14.25/14.37 | v_cs____ = c_HOL_Ozero__class_Ozero(tc_Polynomial_Opoly(tc_Complex_Ocomplex)) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_sum__squares__eq__zero__iff_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 14.25/14.37 | c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_x,V_x,T_a),c_HOL_Otimes__class_Otimes(V_y,V_y,T_a),T_a) != c_HOL_Ozero__class_Ozero(T_a)
% 14.25/14.37 | V_x = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_class__ringb_Oadd__scale__eq__noteq_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oidom(T_a)
% 14.25/14.37 | ~ class_Int_Onumber__ring(T_a)
% 14.25/14.37 | c_HOL_Oplus__class_Oplus(V_x,c_HOL_Otimes__class_Otimes(V_r,V_c,T_a),T_a) != c_HOL_Oplus__class_Oplus(V_x,c_HOL_Otimes__class_Otimes(V_r,V_d,T_a),T_a)
% 14.25/14.37 | V_c = V_d
% 14.25/14.37 | V_r = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_eq__add__iff2_1,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oring(T_a)
% 14.25/14.37 | c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_a,V_e,T_a),c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(c_HOL_Ominus__class_Ominus(V_b,V_a,T_a),V_e,T_a),V_d,T_a),T_a) = c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_b,V_e,T_a),V_d,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult_Oprod__diff__prod_0,axiom,
% 14.25/14.37 ( ~ class_RealVector_Oreal__normed__algebra(T_a)
% 14.25/14.37 | c_HOL_Ominus__class_Ominus(c_HOL_Otimes__class_Otimes(V_x,V_y,T_a),c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),T_a) = c_HOL_Oplus__class_Oplus(c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(c_HOL_Ominus__class_Ominus(V_x,V_a,T_a),c_HOL_Ominus__class_Ominus(V_y,V_b,T_a),T_a),c_HOL_Otimes__class_Otimes(c_HOL_Ominus__class_Ominus(V_x,V_a,T_a),V_b,T_a),T_a),c_HOL_Otimes__class_Otimes(V_a,c_HOL_Ominus__class_Ominus(V_y,V_b,T_a),T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_not__one__le__zero_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oordered__semidom(T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Oone__class_Oone(T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_zero__le__one_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oordered__semidom(T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oone__class_Oone(T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_sum__squares__le__zero__iff_2,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Ozero__class_Ozero(T_a),T_a),c_HOL_Otimes__class_Otimes(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Ozero__class_Ozero(T_a),T_a),T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_sum__squares__ge__zero_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_x,V_x,T_a),c_HOL_Otimes__class_Otimes(V_y,V_y,T_a),T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_le__add__iff2_1,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Opordered__ring(T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_a,V_e,T_a),V_c,T_a),c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_b,V_e,T_a),V_d,T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(V_c,c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(c_HOL_Ominus__class_Ominus(V_b,V_a,T_a),V_e,T_a),V_d,T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_le__add__iff2_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Opordered__ring(T_a)
% 14.25/14.37 | c_lessequals(V_c,c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(c_HOL_Ominus__class_Ominus(V_b,V_a,T_a),V_e,T_a),V_d,T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_a,V_e,T_a),V_c,T_a),c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_b,V_e,T_a),V_d,T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_le__add__iff1_1,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Opordered__ring(T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_a,V_e,T_a),V_c,T_a),c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_b,V_e,T_a),V_d,T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(c_HOL_Ominus__class_Ominus(V_a,V_b,T_a),V_e,T_a),V_c,T_a),V_d,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_le__add__iff1_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Opordered__ring(T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(c_HOL_Ominus__class_Ominus(V_a,V_b,T_a),V_e,T_a),V_c,T_a),V_d,T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_a,V_e,T_a),V_c,T_a),c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_b,V_e,T_a),V_d,T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_sum__squares__le__zero__iff_1,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 14.25/14.37 | V_y = c_HOL_Ozero__class_Ozero(T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_x,V_x,T_a),c_HOL_Otimes__class_Otimes(V_y,V_y,T_a),T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_sum__squares__le__zero__iff_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 14.25/14.37 | V_x = c_HOL_Ozero__class_Ozero(T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_x,V_x,T_a),c_HOL_Otimes__class_Otimes(V_y,V_y,T_a),T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult__right__le__one__le_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oordered__idom(T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Otimes__class_Otimes(V_x,V_y,T_a),V_x,T_a)
% 14.25/14.37 | ~ c_lessequals(V_y,c_HOL_Oone__class_Oone(T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_y,T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_x,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult__left__le__one__le_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oordered__idom(T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Otimes__class_Otimes(V_y,V_x,T_a),V_x,T_a)
% 14.25/14.37 | ~ c_lessequals(V_y,c_HOL_Oone__class_Oone(T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_y,T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_x,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_norm__triangle__ineq4_0,axiom,
% 14.25/14.37 ( ~ class_RealVector_Oreal__normed__vector(T_a)
% 14.25/14.37 | c_lessequals(c_RealVector_Onorm__class_Onorm(c_HOL_Ominus__class_Ominus(V_a,V_b,T_a),T_a),c_HOL_Oplus__class_Oplus(c_RealVector_Onorm__class_Onorm(V_a,T_a),c_RealVector_Onorm__class_Onorm(V_b,T_a),tc_RealDef_Oreal),tc_RealDef_Oreal) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_sum__squares__eq__zero__iff_1,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 14.25/14.37 | c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_x,V_x,T_a),c_HOL_Otimes__class_Otimes(V_y,V_y,T_a),T_a) != c_HOL_Ozero__class_Ozero(T_a)
% 14.25/14.37 | V_y = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_eq__add__iff1_1,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oring(T_a)
% 14.25/14.37 | c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_a,V_e,T_a),V_c,T_a) = c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_b,V_e,T_a),c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(c_HOL_Ominus__class_Ominus(V_a,V_b,T_a),V_e,T_a),V_c,T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_eq__add__iff1_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oring(T_a)
% 14.25/14.37 | c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_a,V_e,T_a),V_c,T_a) != c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_b,V_e,T_a),V_d,T_a)
% 14.25/14.37 | c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(c_HOL_Ominus__class_Ominus(V_a,V_b,T_a),V_e,T_a),V_c,T_a) = V_d ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_eq__add__iff2_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oring(T_a)
% 14.25/14.37 | c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_a,V_e,T_a),V_c,T_a) != c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_b,V_e,T_a),V_d,T_a)
% 14.25/14.37 | V_c = c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(c_HOL_Ominus__class_Ominus(V_b,V_a,T_a),V_e,T_a),V_d,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_sum__squares__eq__zero__iff_2,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 14.25/14.37 | c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Ozero__class_Ozero(T_a),T_a),c_HOL_Otimes__class_Otimes(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Ozero__class_Ozero(T_a),T_a),T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_add__nonneg__eq__0__iff_2,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Opordered__comm__monoid__add(T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.25/14.37 | c_HOL_Oplus__class_Oplus(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_add__increasing_0,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Opordered__ab__semigroup__add__imp__le(T_a)
% 14.25/14.37 | ~ class_OrderedGroup_Ocomm__monoid__add(T_a)
% 14.25/14.37 | c_lessequals(V_b,c_HOL_Oplus__class_Oplus(V_a,V_c,T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(V_b,V_c,T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_add__increasing2_0,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Opordered__ab__semigroup__add__imp__le(T_a)
% 14.25/14.37 | ~ class_OrderedGroup_Ocomm__monoid__add(T_a)
% 14.25/14.37 | c_lessequals(V_b,c_HOL_Oplus__class_Oplus(V_a,V_c,T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(V_b,V_a,T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_add__nonneg__eq__0__iff_0,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Opordered__comm__monoid__add(T_a)
% 14.25/14.37 | c_HOL_Oplus__class_Oplus(V_x,V_y,T_a) != c_HOL_Ozero__class_Ozero(T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_y,T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_x,T_a)
% 14.25/14.37 | V_x = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_add__nonneg__eq__0__iff_1,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Opordered__comm__monoid__add(T_a)
% 14.25/14.37 | c_HOL_Oplus__class_Oplus(V_x,V_y,T_a) != c_HOL_Ozero__class_Ozero(T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_y,T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_x,T_a)
% 14.25/14.37 | V_y = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_add__nonneg__nonneg_0,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Opordered__comm__monoid__add(T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oplus__class_Oplus(V_a,V_b,T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_zero__le__double__add__iff__zero__le__single__add_0,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Olordered__ab__group__add(T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oplus__class_Oplus(V_a,V_a,T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_zero__le__double__add__iff__zero__le__single__add_1,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Olordered__ab__group__add(T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Oplus__class_Oplus(V_a,V_a,T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_double__add__le__zero__iff__single__add__le__zero_0,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Olordered__ab__group__add(T_a)
% 14.25/14.37 | c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Oplus__class_Oplus(V_a,V_a,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_double__add__le__zero__iff__single__add__le__zero_1,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Olordered__ab__group__add(T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Oplus__class_Oplus(V_a,V_a,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_add__nonpos__nonpos_0,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Opordered__comm__monoid__add(T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Oplus__class_Oplus(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult__le__0__iff_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 14.25/14.37 | c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult__le__0__iff_1,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult__le__0__iff_2,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 14.25/14.37 | c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.25/14.37 | c_lessequals(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult__le__0__iff_3,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 14.25/14.37 | c_lessequals(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult__mono1_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Omult__mono1(T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Otimes__class_Otimes(V_c,V_a,T_a),c_HOL_Otimes__class_Otimes(V_c,V_b,T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 14.25/14.37 | ~ c_lessequals(V_a,V_b,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult__left__mono_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Omult__mono(T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Otimes__class_Otimes(V_c,V_a,T_a),c_HOL_Otimes__class_Otimes(V_c,V_b,T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 14.25/14.37 | ~ c_lessequals(V_a,V_b,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult__right__mono_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Omult__mono(T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),c_HOL_Otimes__class_Otimes(V_b,V_c,T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 14.25/14.37 | ~ c_lessequals(V_a,V_b,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult__left__mono__neg_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Opordered__ring(T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Otimes__class_Otimes(V_c,V_a,T_a),c_HOL_Otimes__class_Otimes(V_c,V_b,T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(V_b,V_a,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult__right__mono__neg_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Opordered__ring(T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),c_HOL_Otimes__class_Otimes(V_b,V_c,T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(V_c,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(V_b,V_a,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_split__mult__pos__le_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Opordered__ring(T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_split__mult__pos__le_1,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Opordered__ring(T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult__nonpos__nonpos_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Opordered__ring(T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_zero__le__square_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Otimes__class_Otimes(V_a,V_a,T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_zero__le__mult__iff_4,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_zero__le__mult__iff_5,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult__nonneg__nonneg_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Opordered__cancel__semiring(T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_zero__le__mult__iff_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 14.25/14.37 | c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_zero__le__mult__iff_1,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 14.25/14.37 | c_lessequals(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_zero__le__mult__iff_2,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 14.25/14.37 | c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_zero__le__mult__iff_3,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 14.25/14.37 | c_lessequals(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult__mono_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Opordered__semiring(T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),c_HOL_Otimes__class_Otimes(V_b,V_d,T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 14.25/14.37 | ~ c_lessequals(V_c,V_d,T_a)
% 14.25/14.37 | ~ c_lessequals(V_a,V_b,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult__mono_H_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Opordered__semiring(T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),c_HOL_Otimes__class_Otimes(V_b,V_d,T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_c,T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a)
% 14.25/14.37 | ~ c_lessequals(V_c,V_d,T_a)
% 14.25/14.37 | ~ c_lessequals(V_a,V_b,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult__le__0__iff_4,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult__le__0__iff_5,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oordered__ring__strict(T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 14.25/14.37 | ~ c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_split__mult__neg__le_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Opordered__cancel__semiring(T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_split__mult__neg__le_1,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Opordered__cancel__semiring(T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 14.25/14.37 | ~ c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult__nonneg__nonpos_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Opordered__cancel__semiring(T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult__nonpos__nonneg_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Opordered__cancel__semiring(T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a)
% 14.25/14.37 | ~ c_lessequals(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult__nonneg__nonpos2_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Opordered__cancel__semiring(T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Otimes__class_Otimes(V_b,V_a,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(V_b,c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_H_0,axiom,
% 14.25/14.37 v_cs____ != c_HOL_Ozero__class_Ozero(tc_Polynomial_Opoly(tc_Complex_Ocomplex)) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_pCons__eq__0__iff_1,axiom,
% 14.25/14.37 ( ~ class_HOL_Ozero(T_a)
% 14.25/14.37 | c_Polynomial_OpCons(V_a,V_p,T_a) != c_HOL_Ozero__class_Ozero(tc_Polynomial_Opoly(T_a))
% 14.25/14.37 | V_p = c_HOL_Ozero__class_Ozero(tc_Polynomial_Opoly(T_a)) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_norm__minus__commute_0,axiom,
% 14.25/14.37 ( ~ class_RealVector_Oreal__normed__vector(T_a)
% 14.25/14.37 | c_RealVector_Onorm__class_Onorm(c_HOL_Ominus__class_Ominus(V_a,V_b,T_a),T_a) = c_RealVector_Onorm__class_Onorm(c_HOL_Ominus__class_Ominus(V_b,V_a,T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_one__neq__zero_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Ozero__neq__one(T_a)
% 14.25/14.37 | c_HOL_Oone__class_Oone(T_a) != c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_zero__neq__one_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Ozero__neq__one(T_a)
% 14.25/14.37 | c_HOL_Ozero__class_Ozero(T_a) != c_HOL_Oone__class_Oone(T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_add__diff__cancel_0,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 14.25/14.37 | c_HOL_Ominus__class_Ominus(c_HOL_Oplus__class_Oplus(V_a,V_b,T_a),V_b,T_a) = V_a ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_class__semiring_Osemiring__rules_I5_J_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 14.25/14.37 | c_HOL_Oplus__class_Oplus(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) = V_a ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_class__semiring_Osemiring__rules_I6_J_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 14.25/14.37 | c_HOL_Oplus__class_Oplus(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) = V_a ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_comm__monoid__add_Omult__1_0,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Ocomm__monoid__add(T_a)
% 14.25/14.37 | c_HOL_Oplus__class_Oplus(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) = V_a ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_class__semiring_Oadd__0_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 14.25/14.37 | c_HOL_Oplus__class_Oplus(c_HOL_Ozero__class_Ozero(T_a),V_x,T_a) = V_x ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_class__ringb_Oadd__r0__iff_1,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oidom(T_a)
% 14.25/14.37 | ~ class_Int_Onumber__ring(T_a)
% 14.25/14.37 | V_x = c_HOL_Oplus__class_Oplus(V_x,c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_comm__monoid__add_Omult__1__right_0,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Ocomm__monoid__add(T_a)
% 14.25/14.37 | c_HOL_Oplus__class_Oplus(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) = V_a ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_add__0__left_0,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Omonoid__add(T_a)
% 14.25/14.37 | c_HOL_Oplus__class_Oplus(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) = V_a ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_monoid__add__class_Oadd__0__right_0,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Omonoid__add(T_a)
% 14.25/14.37 | c_HOL_Oplus__class_Oplus(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) = V_a ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_Deriv_Oadd__diff__add_0,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Oab__group__add(T_a)
% 14.25/14.37 | c_HOL_Ominus__class_Ominus(c_HOL_Oplus__class_Oplus(V_a,V_c,T_a),c_HOL_Oplus__class_Oplus(V_b,V_d,T_a),T_a) = c_HOL_Oplus__class_Oplus(c_HOL_Ominus__class_Ominus(V_a,V_b,T_a),c_HOL_Ominus__class_Ominus(V_c,V_d,T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_double__eq__0__iff_1,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Olordered__ab__group__add(T_a)
% 14.25/14.37 | c_HOL_Oplus__class_Oplus(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_diff__add__cancel_0,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 14.25/14.37 | c_HOL_Oplus__class_Oplus(c_HOL_Ominus__class_Ominus(V_a,V_b,T_a),V_b,T_a) = V_a ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_class__ringb_Oadd__r0__iff_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oidom(T_a)
% 14.25/14.37 | ~ class_Int_Onumber__ring(T_a)
% 14.25/14.37 | V_x != c_HOL_Oplus__class_Oplus(V_x,V_a,T_a)
% 14.25/14.37 | V_a = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_double__eq__0__iff_0,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Olordered__ab__group__add(T_a)
% 14.25/14.37 | c_HOL_Oplus__class_Oplus(V_a,V_a,T_a) != c_HOL_Ozero__class_Ozero(T_a)
% 14.25/14.37 | V_a = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult__left_Odiff_0,axiom,
% 14.25/14.37 ( ~ class_RealVector_Oreal__normed__algebra(T_a)
% 14.25/14.37 | c_HOL_Otimes__class_Otimes(c_HOL_Ominus__class_Ominus(V_x,V_y,T_a),V_ya,T_a) = c_HOL_Ominus__class_Ominus(c_HOL_Otimes__class_Otimes(V_x,V_ya,T_a),c_HOL_Otimes__class_Otimes(V_y,V_ya,T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult_Odiff__left_0,axiom,
% 14.25/14.37 ( ~ class_RealVector_Oreal__normed__algebra(T_a)
% 14.25/14.37 | c_HOL_Otimes__class_Otimes(c_HOL_Ominus__class_Ominus(V_a,V_a_H,T_a),V_b,T_a) = c_HOL_Ominus__class_Ominus(c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),c_HOL_Otimes__class_Otimes(V_a_H,V_b,T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult_Odiff__right_0,axiom,
% 14.25/14.37 ( ~ class_RealVector_Oreal__normed__algebra(T_a)
% 14.25/14.37 | c_HOL_Otimes__class_Otimes(V_a,c_HOL_Ominus__class_Ominus(V_b,V_b_H,T_a),T_a) = c_HOL_Ominus__class_Ominus(c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),c_HOL_Otimes__class_Otimes(V_a,V_b_H,T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult__right_Odiff_0,axiom,
% 14.25/14.37 ( ~ class_RealVector_Oreal__normed__algebra(T_a)
% 14.25/14.37 | c_HOL_Otimes__class_Otimes(V_xa,c_HOL_Ominus__class_Ominus(V_x,V_y,T_a),T_a) = c_HOL_Ominus__class_Ominus(c_HOL_Otimes__class_Otimes(V_xa,V_x,T_a),c_HOL_Otimes__class_Otimes(V_xa,V_y,T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_no__zero__divirors__neq0_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Ono__zero__divisors(T_a)
% 14.25/14.37 | c_HOL_Otimes__class_Otimes(V_a,V_b,T_a) != c_HOL_Ozero__class_Ozero(T_a)
% 14.25/14.37 | V_a = c_HOL_Ozero__class_Ozero(T_a)
% 14.25/14.37 | V_b = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_no__zero__divisors_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Ono__zero__divisors(T_a)
% 14.25/14.37 | c_HOL_Otimes__class_Otimes(V_a,V_b,T_a) != c_HOL_Ozero__class_Ozero(T_a)
% 14.25/14.37 | V_b = c_HOL_Ozero__class_Ozero(T_a)
% 14.25/14.37 | V_a = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult__eq__0__iff_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oring__no__zero__divisors(T_a)
% 14.25/14.37 | c_HOL_Otimes__class_Otimes(V_a,V_b,T_a) != c_HOL_Ozero__class_Ozero(T_a)
% 14.25/14.37 | V_b = c_HOL_Ozero__class_Ozero(T_a)
% 14.25/14.37 | V_a = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_class__semiring_Osemiring__rules_I9_J_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 14.25/14.37 | c_HOL_Otimes__class_Otimes(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_class__semiring_Osemiring__rules_I10_J_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 14.25/14.37 | c_HOL_Otimes__class_Otimes(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult__left_Ozero_0,axiom,
% 14.25/14.37 ( ~ class_RealVector_Oreal__normed__algebra(T_a)
% 14.25/14.37 | c_HOL_Otimes__class_Otimes(c_HOL_Ozero__class_Ozero(T_a),V_y,T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult_Ozero__left_0,axiom,
% 14.25/14.37 ( ~ class_RealVector_Oreal__normed__algebra(T_a)
% 14.25/14.37 | c_HOL_Otimes__class_Otimes(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult_Ozero__right_0,axiom,
% 14.25/14.37 ( ~ class_RealVector_Oreal__normed__algebra(T_a)
% 14.25/14.37 | c_HOL_Otimes__class_Otimes(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult__right_Ozero_0,axiom,
% 14.25/14.37 ( ~ class_RealVector_Oreal__normed__algebra(T_a)
% 14.25/14.37 | c_HOL_Otimes__class_Otimes(V_x,c_HOL_Ozero__class_Ozero(T_a),T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_class__semiring_Omul__0_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 14.25/14.37 | c_HOL_Otimes__class_Otimes(c_HOL_Ozero__class_Ozero(T_a),V_x,T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult__zero__left_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Omult__zero(T_a)
% 14.25/14.37 | c_HOL_Otimes__class_Otimes(c_HOL_Ozero__class_Ozero(T_a),V_a,T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult__zero__right_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Omult__zero(T_a)
% 14.25/14.37 | c_HOL_Otimes__class_Otimes(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult__eq__0__iff_1,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oring__no__zero__divisors(T_a)
% 14.25/14.37 | c_HOL_Otimes__class_Otimes(c_HOL_Ozero__class_Ozero(T_a),V_b,T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult__eq__0__iff_2,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oring__no__zero__divisors(T_a)
% 14.25/14.37 | c_HOL_Otimes__class_Otimes(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_le__eqI_1,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 14.25/14.37 | c_HOL_Ominus__class_Ominus(V_x,V_y,T_a) != c_HOL_Ominus__class_Ominus(V_x_H,V_y_H,T_a)
% 14.25/14.37 | c_lessequals(V_y,V_x,T_a)
% 14.25/14.37 | ~ c_lessequals(V_y_H,V_x_H,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_le__eqI_0,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 14.25/14.37 | c_HOL_Ominus__class_Ominus(V_x,V_y,T_a) != c_HOL_Ominus__class_Ominus(V_x_H,V_y_H,T_a)
% 14.25/14.37 | c_lessequals(V_y_H,V_x_H,T_a)
% 14.25/14.37 | ~ c_lessequals(V_y,V_x,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_class__ringb_Osubr0__iff_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oidom(T_a)
% 14.25/14.37 | ~ class_Int_Onumber__ring(T_a)
% 14.25/14.37 | c_HOL_Ominus__class_Ominus(V_x,V_y,T_a) != c_HOL_Ozero__class_Ozero(T_a)
% 14.25/14.37 | V_x = V_y ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_right__minus__eq_0,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 14.25/14.37 | c_HOL_Ominus__class_Ominus(V_a,V_b,T_a) != c_HOL_Ozero__class_Ozero(T_a)
% 14.25/14.37 | V_a = V_b ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_eq__iff__diff__eq__0_1,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Oab__group__add(T_a)
% 14.25/14.37 | c_HOL_Ominus__class_Ominus(V_a,V_b,T_a) != c_HOL_Ozero__class_Ozero(T_a)
% 14.25/14.37 | V_a = V_b ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_eq__eqI_1,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Oab__group__add(T_a)
% 14.25/14.37 | c_HOL_Ominus__class_Ominus(V_xa,V_y,T_a) != c_HOL_Ominus__class_Ominus(V_x,V_x,T_a)
% 14.25/14.37 | V_xa = V_y ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_eq__eqI_0,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Oab__group__add(T_a)
% 14.25/14.37 | c_HOL_Ominus__class_Ominus(V_x,V_x,T_a) != c_HOL_Ominus__class_Ominus(V_x_H,V_y_H,T_a)
% 14.25/14.37 | V_x_H = V_y_H ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_class__ringb_Osubr0__iff_1,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oidom(T_a)
% 14.25/14.37 | ~ class_Int_Onumber__ring(T_a)
% 14.25/14.37 | c_HOL_Ominus__class_Ominus(V_x,V_x,T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_diff__self_0,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 14.25/14.37 | c_HOL_Ominus__class_Ominus(V_a,V_a,T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_diff__0__right_0,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 14.25/14.37 | c_HOL_Ominus__class_Ominus(V_a,c_HOL_Ozero__class_Ozero(T_a),T_a) = V_a ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_right__minus__eq_1,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Ogroup__add(T_a)
% 14.25/14.37 | c_HOL_Ominus__class_Ominus(V_x,V_x,T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_eq__iff__diff__eq__0_0,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Oab__group__add(T_a)
% 14.25/14.37 | c_HOL_Ominus__class_Ominus(V_x,V_x,T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_order__root_1,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oidom(T_a)
% 14.25/14.37 | c_Polynomial_Opoly(c_HOL_Ozero__class_Ozero(tc_Polynomial_Opoly(T_a)),V_a,T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_poly__0_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Ocomm__semiring__0(T_a)
% 14.25/14.37 | c_Polynomial_Opoly(c_HOL_Ozero__class_Ozero(tc_Polynomial_Opoly(T_a)),V_x,T_a) = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_pCons__0__0_0,axiom,
% 14.25/14.37 ( ~ class_HOL_Ozero(T_a)
% 14.25/14.37 | c_Polynomial_OpCons(c_HOL_Ozero__class_Ozero(T_a),c_HOL_Ozero__class_Ozero(tc_Polynomial_Opoly(T_a)),T_a) = c_HOL_Ozero__class_Ozero(tc_Polynomial_Opoly(T_a)) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_pCons__eq__0__iff_0,axiom,
% 14.25/14.37 ( ~ class_HOL_Ozero(T_a)
% 14.25/14.37 | c_Polynomial_OpCons(V_a,V_p,T_a) != c_HOL_Ozero__class_Ozero(tc_Polynomial_Opoly(T_a))
% 14.25/14.37 | V_a = c_HOL_Ozero__class_Ozero(T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_le__iff__diff__le__0_0,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Ominus__class_Ominus(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(V_a,V_b,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_le__iff__diff__le__0_1,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 14.25/14.37 | c_lessequals(V_a,V_b,T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Ominus__class_Ominus(V_a,V_b,T_a),c_HOL_Ozero__class_Ozero(T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_poly__bound__exists_1,axiom,
% 14.25/14.37 ( c_lessequals(c_RealVector_Onorm__class_Onorm(c_Polynomial_Opoly(V_p,V_z,tc_Complex_Ocomplex),tc_Complex_Ocomplex),v_sko__Fundamental__Theorem__Algebra__Mirabelle__Xpoly__bound__exists__1(V_p,V_r),tc_RealDef_Oreal)
% 14.25/14.37 | ~ c_lessequals(c_RealVector_Onorm__class_Onorm(V_z,tc_Complex_Ocomplex),V_r,tc_RealDef_Oreal) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult_Obounded_0,axiom,
% 14.25/14.37 ( ~ class_RealVector_Oreal__normed__algebra(T_a)
% 14.25/14.37 | c_lessequals(c_RealVector_Onorm__class_Onorm(c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),T_a),c_HOL_Otimes__class_Otimes(c_HOL_Otimes__class_Otimes(c_RealVector_Onorm__class_Onorm(V_a,T_a),c_RealVector_Onorm__class_Onorm(V_b,T_a),tc_RealDef_Oreal),c_RealVector_Osko__RealVector__Xmult__Xbounded__1__1(V_vskULj,T_a),tc_RealDef_Oreal),tc_RealDef_Oreal) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult__left_Obounded_0,axiom,
% 14.25/14.37 ( ~ class_RealVector_Oreal__normed__algebra(T_a)
% 14.25/14.37 | c_lessequals(c_RealVector_Onorm__class_Onorm(c_HOL_Otimes__class_Otimes(V_K,V_y,T_a),T_a),c_HOL_Otimes__class_Otimes(c_RealVector_Onorm__class_Onorm(V_K,T_a),c_RealVector_Osko__RealVector__Xmult__left__Xbounded__1__1(V_y,T_a),tc_RealDef_Oreal),tc_RealDef_Oreal) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult__right_Opos__bounded_1,axiom,
% 14.25/14.37 ( ~ class_RealVector_Oreal__normed__algebra(T_a)
% 14.25/14.37 | c_lessequals(c_RealVector_Onorm__class_Onorm(c_HOL_Otimes__class_Otimes(V_x,V_K,T_a),T_a),c_HOL_Otimes__class_Otimes(c_RealVector_Onorm__class_Onorm(V_K,T_a),c_RealVector_Osko__RealVector__Xmult__right__Xpos__bounded__1__1(V_x,T_a),tc_RealDef_Oreal),tc_RealDef_Oreal) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult_Opos__bounded_1,axiom,
% 14.25/14.37 ( ~ class_RealVector_Oreal__normed__algebra(T_a)
% 14.25/14.37 | c_lessequals(c_RealVector_Onorm__class_Onorm(c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),T_a),c_HOL_Otimes__class_Otimes(c_HOL_Otimes__class_Otimes(c_RealVector_Onorm__class_Onorm(V_a,T_a),c_RealVector_Onorm__class_Onorm(V_b,T_a),tc_RealDef_Oreal),c_RealVector_Osko__RealVector__Xmult__Xpos__bounded__1__1(V_vskULn,T_a),tc_RealDef_Oreal),tc_RealDef_Oreal) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult__left_Ononneg__bounded_1,axiom,
% 14.25/14.37 ( ~ class_RealVector_Oreal__normed__algebra(T_a)
% 14.25/14.37 | c_lessequals(c_RealVector_Onorm__class_Onorm(c_HOL_Otimes__class_Otimes(V_K,V_y,T_a),T_a),c_HOL_Otimes__class_Otimes(c_RealVector_Onorm__class_Onorm(V_K,T_a),c_RealVector_Osko__RealVector__Xmult__left__Xnonneg__bounded__1__1(V_y,T_a),tc_RealDef_Oreal),tc_RealDef_Oreal) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult__right_Obounded_0,axiom,
% 14.25/14.37 ( ~ class_RealVector_Oreal__normed__algebra(T_a)
% 14.25/14.37 | c_lessequals(c_RealVector_Onorm__class_Onorm(c_HOL_Otimes__class_Otimes(V_x,V_K,T_a),T_a),c_HOL_Otimes__class_Otimes(c_RealVector_Onorm__class_Onorm(V_K,T_a),c_RealVector_Osko__RealVector__Xmult__right__Xbounded__1__1(V_x,T_a),tc_RealDef_Oreal),tc_RealDef_Oreal) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult_Ononneg__bounded_1,axiom,
% 14.25/14.37 ( ~ class_RealVector_Oreal__normed__algebra(T_a)
% 14.25/14.37 | c_lessequals(c_RealVector_Onorm__class_Onorm(c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),T_a),c_HOL_Otimes__class_Otimes(c_HOL_Otimes__class_Otimes(c_RealVector_Onorm__class_Onorm(V_a,T_a),c_RealVector_Onorm__class_Onorm(V_b,T_a),tc_RealDef_Oreal),c_RealVector_Osko__RealVector__Xmult__Xnonneg__bounded__1__1(V_vskULp,T_a),tc_RealDef_Oreal),tc_RealDef_Oreal) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult__right_Ononneg__bounded_1,axiom,
% 14.25/14.37 ( ~ class_RealVector_Oreal__normed__algebra(T_a)
% 14.25/14.37 | c_lessequals(c_RealVector_Onorm__class_Onorm(c_HOL_Otimes__class_Otimes(V_x,V_K,T_a),T_a),c_HOL_Otimes__class_Otimes(c_RealVector_Onorm__class_Onorm(V_K,T_a),c_RealVector_Osko__RealVector__Xmult__right__Xnonneg__bounded__1__1(V_x,T_a),tc_RealDef_Oreal),tc_RealDef_Oreal) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult__left_Opos__bounded_1,axiom,
% 14.25/14.37 ( ~ class_RealVector_Oreal__normed__algebra(T_a)
% 14.25/14.37 | c_lessequals(c_RealVector_Onorm__class_Onorm(c_HOL_Otimes__class_Otimes(V_K,V_y,T_a),T_a),c_HOL_Otimes__class_Otimes(c_RealVector_Onorm__class_Onorm(V_K,T_a),c_RealVector_Osko__RealVector__Xmult__left__Xpos__bounded__1__1(V_y,T_a),tc_RealDef_Oreal),tc_RealDef_Oreal) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_norm__diff__triangle__ineq_0,axiom,
% 14.25/14.37 ( ~ class_RealVector_Oreal__normed__vector(T_a)
% 14.25/14.37 | c_lessequals(c_RealVector_Onorm__class_Onorm(c_HOL_Ominus__class_Ominus(c_HOL_Oplus__class_Oplus(V_a,V_b,T_a),c_HOL_Oplus__class_Oplus(V_c,V_d,T_a),T_a),T_a),c_HOL_Oplus__class_Oplus(c_RealVector_Onorm__class_Onorm(c_HOL_Ominus__class_Ominus(V_a,V_c,T_a),T_a),c_RealVector_Onorm__class_Onorm(c_HOL_Ominus__class_Ominus(V_b,V_d,T_a),T_a),tc_RealDef_Oreal),tc_RealDef_Oreal) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_r0_0,axiom,
% 14.25/14.37 c_lessequals(v_r____,c_RealVector_Onorm__class_Onorm(v_z____,tc_Complex_Ocomplex),tc_RealDef_Oreal) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_pCons_Oprems_0,axiom,
% 14.25/14.37 c_Polynomial_OpCons(v_c____,v_cs____,tc_Complex_Ocomplex) != c_HOL_Ozero__class_Ozero(tc_Polynomial_Opoly(tc_Complex_Ocomplex)) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_r_0,axiom,
% 14.25/14.37 ( c_lessequals(c_HOL_Oplus__class_Oplus(v_da____,c_RealVector_Onorm__class_Onorm(v_aa____,tc_Complex_Ocomplex),tc_RealDef_Oreal),c_RealVector_Onorm__class_Onorm(c_Polynomial_Opoly(c_Polynomial_OpCons(v_c____,v_cs____,tc_Complex_Ocomplex),V_z,tc_Complex_Ocomplex),tc_Complex_Ocomplex),tc_RealDef_Oreal)
% 14.25/14.37 | ~ c_lessequals(v_r____,c_RealVector_Onorm__class_Onorm(V_z,tc_Complex_Ocomplex),tc_RealDef_Oreal) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_real__le__linear_0,axiom,
% 14.25/14.37 ( c_lessequals(V_w,V_z,tc_RealDef_Oreal)
% 14.25/14.37 | c_lessequals(V_z,V_w,tc_RealDef_Oreal) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_linorder__linear_0,axiom,
% 14.25/14.37 ( ~ class_Orderings_Olinorder(T_a)
% 14.25/14.37 | c_lessequals(V_y,V_x,T_a)
% 14.25/14.37 | c_lessequals(V_x,V_y,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_poly__pCons_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Ocomm__semiring__0(T_a)
% 14.25/14.37 | c_Polynomial_Opoly(c_Polynomial_OpCons(V_a,V_p,T_a),V_x,T_a) = c_HOL_Oplus__class_Oplus(V_a,c_HOL_Otimes__class_Otimes(V_x,c_Polynomial_Opoly(V_p,V_x,T_a),T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_xt1_I6_J_0,axiom,
% 14.25/14.37 ( ~ class_Orderings_Oorder(T_a)
% 14.25/14.37 | c_lessequals(V_z,V_x,T_a)
% 14.25/14.37 | ~ c_lessequals(V_z,V_y,T_a)
% 14.25/14.37 | ~ c_lessequals(V_y,V_x,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_order__trans_0,axiom,
% 14.25/14.37 ( ~ class_Orderings_Opreorder(T_a)
% 14.25/14.37 | c_lessequals(V_x,V_z,T_a)
% 14.25/14.37 | ~ c_lessequals(V_y,V_z,T_a)
% 14.25/14.37 | ~ c_lessequals(V_x,V_y,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_le__add__right__mono_0,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Opordered__ab__group__add(T_a)
% 14.25/14.37 | c_lessequals(V_a,c_HOL_Oplus__class_Oplus(V_b,V_d,T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(V_c,V_d,T_a)
% 14.25/14.37 | ~ c_lessequals(V_a,c_HOL_Oplus__class_Oplus(V_b,V_c,T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_real__le__refl_0,axiom,
% 14.25/14.37 c_lessequals(V_w,V_w,tc_RealDef_Oreal) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_real__le__trans_0,axiom,
% 14.25/14.37 ( c_lessequals(V_i,V_k,tc_RealDef_Oreal)
% 14.25/14.37 | ~ c_lessequals(V_j,V_k,tc_RealDef_Oreal)
% 14.25/14.37 | ~ c_lessequals(V_i,V_j,tc_RealDef_Oreal) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_order__eq__iff_0,axiom,
% 14.25/14.37 ( ~ class_Orderings_Oorder(T_a)
% 14.25/14.37 | c_lessequals(V_x,V_x,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_order__eq__refl_0,axiom,
% 14.25/14.37 ( ~ class_Orderings_Opreorder(T_a)
% 14.25/14.37 | c_lessequals(V_x,V_x,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_norm__triangle__ineq_0,axiom,
% 14.25/14.37 ( ~ class_RealVector_Oreal__normed__vector(T_a)
% 14.25/14.37 | c_lessequals(c_RealVector_Onorm__class_Onorm(c_HOL_Oplus__class_Oplus(V_x,V_y,T_a),T_a),c_HOL_Oplus__class_Oplus(c_RealVector_Onorm__class_Onorm(V_x,T_a),c_RealVector_Onorm__class_Onorm(V_y,T_a),tc_RealDef_Oreal),tc_RealDef_Oreal) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_class__semiring_Osemiring__rules_I3_J_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 14.25/14.37 | c_HOL_Oplus__class_Oplus(V_m,c_HOL_Otimes__class_Otimes(V_a,V_m,T_a),T_a) = c_HOL_Otimes__class_Otimes(c_HOL_Oplus__class_Oplus(V_a,c_HOL_Oone__class_Oone(T_a),T_a),V_m,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_class__semiring_Osemiring__rules_I2_J_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 14.25/14.37 | c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_a,V_m,T_a),V_m,T_a) = c_HOL_Otimes__class_Otimes(c_HOL_Oplus__class_Oplus(V_a,c_HOL_Oone__class_Oone(T_a),T_a),V_m,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_class__ringb_Oadd__mul__solve_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oidom(T_a)
% 14.25/14.37 | ~ class_Int_Onumber__ring(T_a)
% 14.25/14.37 | c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_w,V_y,T_a),c_HOL_Otimes__class_Otimes(V_x,V_z,T_a),T_a) != c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_w,V_z,T_a),c_HOL_Otimes__class_Otimes(V_x,V_y,T_a),T_a)
% 14.25/14.37 | V_y = V_z
% 14.25/14.37 | V_w = V_x ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_class__ringb_Onoteq__reduce_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oidom(T_a)
% 14.25/14.37 | ~ class_Int_Onumber__ring(T_a)
% 14.25/14.37 | c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),c_HOL_Otimes__class_Otimes(V_b,V_d,T_a),T_a) != c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_a,V_d,T_a),c_HOL_Otimes__class_Otimes(V_b,V_c,T_a),T_a)
% 14.25/14.37 | V_c = V_d
% 14.25/14.37 | V_a = V_b ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_class__semiring_Osemiring__rules_I4_J_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 14.25/14.37 | c_HOL_Oplus__class_Oplus(V_m,V_m,T_a) = c_HOL_Otimes__class_Otimes(c_HOL_Oplus__class_Oplus(c_HOL_Oone__class_Oone(T_a),c_HOL_Oone__class_Oone(T_a),T_a),V_m,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_norm__mult_0,axiom,
% 14.25/14.37 ( ~ class_RealVector_Oreal__normed__div__algebra(T_a)
% 14.25/14.37 | c_RealVector_Onorm__class_Onorm(c_HOL_Otimes__class_Otimes(V_x,V_y,T_a),T_a) = c_HOL_Otimes__class_Otimes(c_RealVector_Onorm__class_Onorm(V_x,T_a),c_RealVector_Onorm__class_Onorm(V_y,T_a),tc_RealDef_Oreal) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_comm__monoid__add_Omult__commute_0,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Ocomm__monoid__add(T_a)
% 14.25/14.37 | c_HOL_Oplus__class_Oplus(V_a,V_b,T_a) = c_HOL_Oplus__class_Oplus(V_b,V_a,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_class__semiring_Oadd__c_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 14.25/14.37 | c_HOL_Oplus__class_Oplus(V_x,V_y,T_a) = c_HOL_Oplus__class_Oplus(V_y,V_x,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_class__semiring_Osemiring__rules_I24_J_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 14.25/14.37 | c_HOL_Oplus__class_Oplus(V_a,V_c,T_a) = c_HOL_Oplus__class_Oplus(V_c,V_a,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_add__mono_0,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Opordered__ab__semigroup__add(T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Oplus__class_Oplus(V_a,V_c,T_a),c_HOL_Oplus__class_Oplus(V_b,V_d,T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(V_c,V_d,T_a)
% 14.25/14.37 | ~ c_lessequals(V_a,V_b,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_add__cancel__21_0,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Oab__group__add(T_a)
% 14.25/14.37 | c_HOL_Oplus__class_Oplus(V_x,c_HOL_Oplus__class_Oplus(V_y,V_z,T_a),T_a) != c_HOL_Oplus__class_Oplus(V_y,V_u,T_a)
% 14.25/14.37 | c_HOL_Oplus__class_Oplus(V_x,V_z,T_a) = V_u ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_norm__one_0,axiom,
% 14.25/14.37 ( ~ class_RealVector_Oreal__normed__algebra__1(T_a)
% 14.25/14.37 | c_RealVector_Onorm__class_Onorm(c_HOL_Oone__class_Oone(T_a),T_a) = c_HOL_Oone__class_Oone(tc_RealDef_Oreal) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_add__right__cancel_0,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Ocancel__semigroup__add(T_a)
% 14.25/14.37 | c_HOL_Oplus__class_Oplus(V_b,V_a,T_a) != c_HOL_Oplus__class_Oplus(V_c,V_a,T_a)
% 14.25/14.37 | V_b = V_c ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_add__left__cancel_0,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Ocancel__semigroup__add(T_a)
% 14.25/14.37 | c_HOL_Oplus__class_Oplus(V_a,V_b,T_a) != c_HOL_Oplus__class_Oplus(V_a,V_c,T_a)
% 14.25/14.37 | V_b = V_c ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_add__imp__eq_0,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Ocancel__ab__semigroup__add(T_a)
% 14.25/14.37 | c_HOL_Oplus__class_Oplus(V_a,V_b,T_a) != c_HOL_Oplus__class_Oplus(V_a,V_c,T_a)
% 14.25/14.37 | V_b = V_c ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_class__ringb_Oadd__cancel_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oidom(T_a)
% 14.25/14.37 | ~ class_Int_Onumber__ring(T_a)
% 14.25/14.37 | c_HOL_Oplus__class_Oplus(V_x,V_y,T_a) != c_HOL_Oplus__class_Oplus(V_x,V_z,T_a)
% 14.25/14.37 | V_y = V_z ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_class__semiring_Osemiring__rules_I20_J_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 14.25/14.37 | c_HOL_Oplus__class_Oplus(c_HOL_Oplus__class_Oplus(V_a,V_b,T_a),c_HOL_Oplus__class_Oplus(V_c,V_d,T_a),T_a) = c_HOL_Oplus__class_Oplus(c_HOL_Oplus__class_Oplus(V_a,V_c,T_a),c_HOL_Oplus__class_Oplus(V_b,V_d,T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_class__semiring_Osemiring__rules_I1_J_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 14.25/14.37 | c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_a,V_m,T_a),c_HOL_Otimes__class_Otimes(V_b,V_m,T_a),T_a) = c_HOL_Otimes__class_Otimes(c_HOL_Oplus__class_Oplus(V_a,V_b,T_a),V_m,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_comm__semiring__class_Odistrib_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Ocomm__semiring(T_a)
% 14.25/14.37 | c_HOL_Otimes__class_Otimes(c_HOL_Oplus__class_Oplus(V_a,V_b,T_a),V_c,T_a) = c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),c_HOL_Otimes__class_Otimes(V_b,V_c,T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_class__semiring_Omul__d_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 14.25/14.37 | c_HOL_Otimes__class_Otimes(V_x,c_HOL_Oplus__class_Oplus(V_y,V_z,T_a),T_a) = c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_x,V_y,T_a),c_HOL_Otimes__class_Otimes(V_x,V_z,T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_real__add__mult__distrib_0,axiom,
% 14.25/14.37 c_HOL_Otimes__class_Otimes(c_HOL_Oplus__class_Oplus(V_z1,V_z2,tc_RealDef_Oreal),V_w,tc_RealDef_Oreal) = c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_z1,V_w,tc_RealDef_Oreal),c_HOL_Otimes__class_Otimes(V_z2,V_w,tc_RealDef_Oreal),tc_RealDef_Oreal) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult_Oadd__left_0,axiom,
% 14.25/14.37 ( ~ class_RealVector_Oreal__normed__algebra(T_a)
% 14.25/14.37 | c_HOL_Otimes__class_Otimes(c_HOL_Oplus__class_Oplus(V_a,V_a_H,T_a),V_b,T_a) = c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),c_HOL_Otimes__class_Otimes(V_a_H,V_b,T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult__left_Oadd_0,axiom,
% 14.25/14.37 ( ~ class_RealVector_Oreal__normed__algebra(T_a)
% 14.25/14.37 | c_HOL_Otimes__class_Otimes(c_HOL_Oplus__class_Oplus(V_x,V_y,T_a),V_ya,T_a) = c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_x,V_ya,T_a),c_HOL_Otimes__class_Otimes(V_y,V_ya,T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult_Oadd__right_0,axiom,
% 14.25/14.37 ( ~ class_RealVector_Oreal__normed__algebra(T_a)
% 14.25/14.37 | c_HOL_Otimes__class_Otimes(V_a,c_HOL_Oplus__class_Oplus(V_b,V_b_H,T_a),T_a) = c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),c_HOL_Otimes__class_Otimes(V_a,V_b_H,T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult__right_Oadd_0,axiom,
% 14.25/14.37 ( ~ class_RealVector_Oreal__normed__algebra(T_a)
% 14.25/14.37 | c_HOL_Otimes__class_Otimes(V_xa,c_HOL_Oplus__class_Oplus(V_x,V_y,T_a),T_a) = c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_xa,V_x,T_a),c_HOL_Otimes__class_Otimes(V_xa,V_y,T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_class__semiring_Osemiring__rules_I8_J_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 14.25/14.37 | c_HOL_Otimes__class_Otimes(c_HOL_Oplus__class_Oplus(V_a,V_b,T_a),V_c,T_a) = c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_a,V_c,T_a),c_HOL_Otimes__class_Otimes(V_b,V_c,T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_class__semiring_Omul__a_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 14.25/14.37 | c_HOL_Otimes__class_Otimes(V_x,c_HOL_Otimes__class_Otimes(V_y,V_z,T_a),T_a) = c_HOL_Otimes__class_Otimes(c_HOL_Otimes__class_Otimes(V_x,V_y,T_a),V_z,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_real__mult__assoc_0,axiom,
% 14.25/14.37 c_HOL_Otimes__class_Otimes(c_HOL_Otimes__class_Otimes(V_z1,V_z2,tc_RealDef_Oreal),V_z3,tc_RealDef_Oreal) = c_HOL_Otimes__class_Otimes(V_z1,c_HOL_Otimes__class_Otimes(V_z2,V_z3,tc_RealDef_Oreal),tc_RealDef_Oreal) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_class__semiring_Osemiring__rules_I19_J_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 14.25/14.37 | c_HOL_Otimes__class_Otimes(V_lx,c_HOL_Otimes__class_Otimes(V_rx,V_ry,T_a),T_a) = c_HOL_Otimes__class_Otimes(V_rx,c_HOL_Otimes__class_Otimes(V_lx,V_ry,T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_class__semiring_Osemiring__rules_I18_J_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 14.25/14.37 | c_HOL_Otimes__class_Otimes(V_lx,c_HOL_Otimes__class_Otimes(V_rx,V_ry,T_a),T_a) = c_HOL_Otimes__class_Otimes(c_HOL_Otimes__class_Otimes(V_lx,V_rx,T_a),V_ry,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_class__semiring_Osemiring__rules_I17_J_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 14.25/14.37 | c_HOL_Otimes__class_Otimes(c_HOL_Otimes__class_Otimes(V_lx,V_ly,T_a),V_rx,T_a) = c_HOL_Otimes__class_Otimes(V_lx,c_HOL_Otimes__class_Otimes(V_ly,V_rx,T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_class__semiring_Osemiring__rules_I16_J_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 14.25/14.37 | c_HOL_Otimes__class_Otimes(c_HOL_Otimes__class_Otimes(V_lx,V_ly,T_a),V_rx,T_a) = c_HOL_Otimes__class_Otimes(c_HOL_Otimes__class_Otimes(V_lx,V_rx,T_a),V_ly,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_ab__semigroup__mult__class_Omult__ac_I1_J_0,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Oab__semigroup__mult(T_a)
% 14.25/14.37 | c_HOL_Otimes__class_Otimes(c_HOL_Otimes__class_Otimes(V_a,V_b,T_a),V_c,T_a) = c_HOL_Otimes__class_Otimes(V_a,c_HOL_Otimes__class_Otimes(V_b,V_c,T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult__idem_0,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Oab__semigroup__idem__mult(T_a)
% 14.25/14.37 | c_HOL_Otimes__class_Otimes(V_x,V_x,T_a) = V_x ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_pCons__eq__iff_0,axiom,
% 14.25/14.37 ( ~ class_HOL_Ozero(T_a)
% 14.25/14.37 | c_Polynomial_OpCons(V_a,V_p,T_a) != c_Polynomial_OpCons(V_b,V_q,T_a)
% 14.25/14.37 | V_a = V_b ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_pCons__eq__iff_1,axiom,
% 14.25/14.37 ( ~ class_HOL_Ozero(T_a)
% 14.25/14.37 | c_Polynomial_OpCons(V_a,V_p,T_a) != c_Polynomial_OpCons(V_b,V_q,T_a)
% 14.25/14.37 | V_p = V_q ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult__left__idem_0,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Oab__semigroup__idem__mult(T_a)
% 14.25/14.37 | c_HOL_Otimes__class_Otimes(V_x,c_HOL_Otimes__class_Otimes(V_x,V_y,T_a),T_a) = c_HOL_Otimes__class_Otimes(V_x,V_y,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_add__le__cancel__right_1,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Opordered__ab__semigroup__add__imp__le(T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Oplus__class_Oplus(V_a,V_c,T_a),c_HOL_Oplus__class_Oplus(V_b,V_c,T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(V_a,V_b,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_add__le__cancel__right_0,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Opordered__ab__semigroup__add__imp__le(T_a)
% 14.25/14.37 | c_lessequals(V_a,V_b,T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Oplus__class_Oplus(V_a,V_c,T_a),c_HOL_Oplus__class_Oplus(V_b,V_c,T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_add__le__cancel__left_1,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Opordered__ab__semigroup__add__imp__le(T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Oplus__class_Oplus(V_c,V_a,T_a),c_HOL_Oplus__class_Oplus(V_c,V_b,T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(V_a,V_b,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_add__le__cancel__left_0,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Opordered__ab__semigroup__add__imp__le(T_a)
% 14.25/14.37 | c_lessequals(V_a,V_b,T_a)
% 14.25/14.37 | ~ c_lessequals(c_HOL_Oplus__class_Oplus(V_c,V_a,T_a),c_HOL_Oplus__class_Oplus(V_c,V_b,T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_add__right__mono_0,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Opordered__ab__semigroup__add(T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Oplus__class_Oplus(V_a,V_c,T_a),c_HOL_Oplus__class_Oplus(V_b,V_c,T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(V_a,V_b,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_add__left__mono_0,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Opordered__ab__semigroup__add(T_a)
% 14.25/14.37 | c_lessequals(c_HOL_Oplus__class_Oplus(V_c,V_a,T_a),c_HOL_Oplus__class_Oplus(V_c,V_b,T_a),T_a)
% 14.25/14.37 | ~ c_lessequals(V_a,V_b,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_real__add__left__mono_0,axiom,
% 14.25/14.37 ( c_lessequals(c_HOL_Oplus__class_Oplus(V_z,V_x,tc_RealDef_Oreal),c_HOL_Oplus__class_Oplus(V_z,V_y,tc_RealDef_Oreal),tc_RealDef_Oreal)
% 14.25/14.37 | ~ c_lessequals(V_x,V_y,tc_RealDef_Oreal) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_order__antisym__conv_0,axiom,
% 14.25/14.37 ( ~ class_Orderings_Oorder(T_a)
% 14.25/14.37 | V_x = V_y
% 14.25/14.37 | ~ c_lessequals(V_x,V_y,T_a)
% 14.25/14.37 | ~ c_lessequals(V_y,V_x,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_order__eq__iff_2,axiom,
% 14.25/14.37 ( ~ class_Orderings_Oorder(T_a)
% 14.25/14.37 | V_x = V_y
% 14.25/14.37 | ~ c_lessequals(V_y,V_x,T_a)
% 14.25/14.37 | ~ c_lessequals(V_x,V_y,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_order__antisym_0,axiom,
% 14.25/14.37 ( ~ class_Orderings_Oorder(T_a)
% 14.25/14.37 | V_x = V_y
% 14.25/14.37 | ~ c_lessequals(V_y,V_x,T_a)
% 14.25/14.37 | ~ c_lessequals(V_x,V_y,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_real__le__antisym_0,axiom,
% 14.25/14.37 ( V_z = V_w
% 14.25/14.37 | ~ c_lessequals(V_w,V_z,tc_RealDef_Oreal)
% 14.25/14.37 | ~ c_lessequals(V_z,V_w,tc_RealDef_Oreal) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_class__semiring_Osemiring__rules_I15_J_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 14.25/14.37 | c_HOL_Otimes__class_Otimes(c_HOL_Otimes__class_Otimes(V_lx,V_ly,T_a),c_HOL_Otimes__class_Otimes(V_rx,V_ry,T_a),T_a) = c_HOL_Otimes__class_Otimes(V_rx,c_HOL_Otimes__class_Otimes(c_HOL_Otimes__class_Otimes(V_lx,V_ly,T_a),V_ry,T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_class__semiring_Osemiring__rules_I14_J_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 14.25/14.37 | c_HOL_Otimes__class_Otimes(c_HOL_Otimes__class_Otimes(V_lx,V_ly,T_a),c_HOL_Otimes__class_Otimes(V_rx,V_ry,T_a),T_a) = c_HOL_Otimes__class_Otimes(V_lx,c_HOL_Otimes__class_Otimes(V_ly,c_HOL_Otimes__class_Otimes(V_rx,V_ry,T_a),T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_class__semiring_Osemiring__rules_I13_J_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 14.25/14.37 | c_HOL_Otimes__class_Otimes(c_HOL_Otimes__class_Otimes(V_lx,V_ly,T_a),c_HOL_Otimes__class_Otimes(V_rx,V_ry,T_a),T_a) = c_HOL_Otimes__class_Otimes(c_HOL_Otimes__class_Otimes(V_lx,V_rx,T_a),c_HOL_Otimes__class_Otimes(V_ly,V_ry,T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_norm__mult__ineq_0,axiom,
% 14.25/14.37 ( ~ class_RealVector_Oreal__normed__algebra(T_a)
% 14.25/14.37 | c_lessequals(c_RealVector_Onorm__class_Onorm(c_HOL_Otimes__class_Otimes(V_x,V_y,T_a),T_a),c_HOL_Otimes__class_Otimes(c_RealVector_Onorm__class_Onorm(V_x,T_a),c_RealVector_Onorm__class_Onorm(V_y,T_a),tc_RealDef_Oreal),tc_RealDef_Oreal) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult__1__right_0,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Omonoid__mult(T_a)
% 14.25/14.37 | c_HOL_Otimes__class_Otimes(V_a,c_HOL_Oone__class_Oone(T_a),T_a) = V_a ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult__1__left_0,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Omonoid__mult(T_a)
% 14.25/14.37 | c_HOL_Otimes__class_Otimes(c_HOL_Oone__class_Oone(T_a),V_a,T_a) = V_a ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_mult__1_0,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Ocomm__monoid__mult(T_a)
% 14.25/14.37 | c_HOL_Otimes__class_Otimes(c_HOL_Oone__class_Oone(T_a),V_a,T_a) = V_a ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_class__semiring_Omul__1_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 14.25/14.37 | c_HOL_Otimes__class_Otimes(c_HOL_Oone__class_Oone(T_a),V_x,T_a) = V_x ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_real__mult__1_0,axiom,
% 14.25/14.37 c_HOL_Otimes__class_Otimes(c_HOL_Oone__class_Oone(tc_RealDef_Oreal),V_z,tc_RealDef_Oreal) = V_z ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_class__semiring_Osemiring__rules_I12_J_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 14.25/14.37 | c_HOL_Otimes__class_Otimes(V_a,c_HOL_Oone__class_Oone(T_a),T_a) = V_a ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_class__semiring_Osemiring__rules_I11_J_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 14.25/14.37 | c_HOL_Otimes__class_Otimes(c_HOL_Oone__class_Oone(T_a),V_a,T_a) = V_a ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_class__ringb_Oadd__mul__solve_1,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oidom(T_a)
% 14.25/14.37 | ~ class_Int_Onumber__ring(T_a)
% 14.25/14.37 | c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_x,V_y,T_a),c_HOL_Otimes__class_Otimes(V_x,V_z,T_a),T_a) = c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_x,V_z,T_a),c_HOL_Otimes__class_Otimes(V_x,V_y,T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_class__ringb_Onoteq__reduce_1,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Oidom(T_a)
% 14.25/14.37 | ~ class_Int_Onumber__ring(T_a)
% 14.25/14.37 | c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_x,V_c,T_a),c_HOL_Otimes__class_Otimes(V_x,V_d,T_a),T_a) = c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_x,V_d,T_a),c_HOL_Otimes__class_Otimes(V_x,V_c,T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_class__semiring_Omul__c_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 14.25/14.37 | c_HOL_Otimes__class_Otimes(V_x,V_y,T_a) = c_HOL_Otimes__class_Otimes(V_y,V_x,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_real__mult__commute_0,axiom,
% 14.25/14.37 c_HOL_Otimes__class_Otimes(V_z,V_w,tc_RealDef_Oreal) = c_HOL_Otimes__class_Otimes(V_w,V_z,tc_RealDef_Oreal) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_class__semiring_Osemiring__rules_I7_J_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 14.25/14.37 | c_HOL_Otimes__class_Otimes(V_a,V_b,T_a) = c_HOL_Otimes__class_Otimes(V_b,V_a,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_comm__monoid__add_Omult__left__commute_0,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Ocomm__monoid__add(T_a)
% 14.25/14.37 | c_HOL_Oplus__class_Oplus(V_a,c_HOL_Oplus__class_Oplus(V_b,V_c,T_a),T_a) = c_HOL_Oplus__class_Oplus(V_b,c_HOL_Oplus__class_Oplus(V_a,V_c,T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_comm__monoid__add_Omult__assoc_0,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Ocomm__monoid__add(T_a)
% 14.25/14.37 | c_HOL_Oplus__class_Oplus(c_HOL_Oplus__class_Oplus(V_a,V_b,T_a),V_c,T_a) = c_HOL_Oplus__class_Oplus(V_a,c_HOL_Oplus__class_Oplus(V_b,V_c,T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_class__semiring_Oadd__a_0,axiom,
% 14.25/14.37 ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 14.25/14.37 | c_HOL_Oplus__class_Oplus(V_x,c_HOL_Oplus__class_Oplus(V_y,V_z,T_a),T_a) = c_HOL_Oplus__class_Oplus(c_HOL_Oplus__class_Oplus(V_x,V_y,T_a),V_z,T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_add__cancel__21_1,axiom,
% 14.25/14.37 ( ~ class_OrderedGroup_Oab__group__add(T_a)
% 14.25/14.37 | c_HOL_Oplus__class_Oplus(V_x,c_HOL_Oplus__class_Oplus(V_y,V_z,T_a),T_a) = c_HOL_Oplus__class_Oplus(V_y,c_HOL_Oplus__class_Oplus(V_x,V_z,T_a),T_a) ) ).
% 14.25/14.37
% 14.25/14.37 cnf(cls_ab__semigroup__add__class_Oadd__ac_I1_J_0,axiom,
% 14.25/14.38 ( ~ class_OrderedGroup_Oab__semigroup__add(T_a)
% 14.25/14.38 | c_HOL_Oplus__class_Oplus(c_HOL_Oplus__class_Oplus(V_a,V_b,T_a),V_c,T_a) = c_HOL_Oplus__class_Oplus(V_a,c_HOL_Oplus__class_Oplus(V_b,V_c,T_a),T_a) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_class__semiring_Osemiring__rules_I25_J_0,axiom,
% 14.25/14.38 ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 14.25/14.38 | c_HOL_Oplus__class_Oplus(V_a,c_HOL_Oplus__class_Oplus(V_c,V_d,T_a),T_a) = c_HOL_Oplus__class_Oplus(c_HOL_Oplus__class_Oplus(V_a,V_c,T_a),V_d,T_a) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_class__semiring_Osemiring__rules_I23_J_0,axiom,
% 14.25/14.38 ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 14.25/14.38 | c_HOL_Oplus__class_Oplus(c_HOL_Oplus__class_Oplus(V_a,V_b,T_a),V_c,T_a) = c_HOL_Oplus__class_Oplus(c_HOL_Oplus__class_Oplus(V_a,V_c,T_a),V_b,T_a) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_class__semiring_Osemiring__rules_I22_J_0,axiom,
% 14.25/14.38 ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 14.25/14.38 | c_HOL_Oplus__class_Oplus(V_a,c_HOL_Oplus__class_Oplus(V_c,V_d,T_a),T_a) = c_HOL_Oplus__class_Oplus(V_c,c_HOL_Oplus__class_Oplus(V_a,V_d,T_a),T_a) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_class__semiring_Osemiring__rules_I21_J_0,axiom,
% 14.25/14.38 ( ~ class_Ring__and__Field_Ocomm__semiring__1(T_a)
% 14.25/14.38 | c_HOL_Oplus__class_Oplus(c_HOL_Oplus__class_Oplus(V_a,V_b,T_a),V_c,T_a) = c_HOL_Oplus__class_Oplus(V_a,c_HOL_Oplus__class_Oplus(V_b,V_c,T_a),T_a) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_combine__common__factor_0,axiom,
% 14.25/14.38 ( ~ class_Ring__and__Field_Osemiring(T_a)
% 14.25/14.38 | c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_a,V_e,T_a),c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(V_b,V_e,T_a),V_c,T_a),T_a) = c_HOL_Oplus__class_Oplus(c_HOL_Otimes__class_Otimes(c_HOL_Oplus__class_Oplus(V_a,V_b,T_a),V_e,T_a),V_c,T_a) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_real__mult__is__one_1,axiom,
% 14.25/14.38 c_HOL_Otimes__class_Otimes(c_HOL_Oone__class_Oone(tc_RealDef_Oreal),c_HOL_Oone__class_Oone(tc_RealDef_Oreal),tc_RealDef_Oreal) = c_HOL_Oone__class_Oone(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_CHAINED_0,axiom,
% 14.25/14.38 c_lessequals(c_HOL_Oplus__class_Oplus(v_da____,c_RealVector_Onorm__class_Onorm(v_aa____,tc_Complex_Ocomplex),tc_RealDef_Oreal),c_RealVector_Onorm__class_Onorm(c_Polynomial_Opoly(c_Polynomial_OpCons(v_c____,v_cs____,tc_Complex_Ocomplex),v_z____,tc_Complex_Ocomplex),tc_Complex_Ocomplex),tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(cls_conjecture_0,negated_conjecture,
% 14.25/14.38 ~ c_lessequals(c_HOL_Oplus__class_Oplus(v_da____,c_RealVector_Onorm__class_Onorm(v_aa____,tc_Complex_Ocomplex),tc_RealDef_Oreal),c_HOL_Otimes__class_Otimes(c_HOL_Oone__class_Oone(tc_RealDef_Oreal),c_RealVector_Onorm__class_Onorm(c_Polynomial_Opoly(c_Polynomial_OpCons(v_c____,v_cs____,tc_Complex_Ocomplex),v_z____,tc_Complex_Ocomplex),tc_Complex_Ocomplex),tc_RealDef_Oreal),tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Polynomial__Opoly__OrderedGroup_Ocancel__comm__monoid__add,axiom,
% 14.25/14.38 ( class_OrderedGroup_Ocancel__comm__monoid__add(tc_Polynomial_Opoly(T_1))
% 14.25/14.38 | ~ class_OrderedGroup_Ocancel__comm__monoid__add(T_1) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Complex__Ocomplex__OrderedGroup_Ocancel__comm__monoid__add,axiom,
% 14.25/14.38 class_OrderedGroup_Ocancel__comm__monoid__add(tc_Complex_Ocomplex) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_RealDef__Oreal__OrderedGroup_Ocancel__comm__monoid__add,axiom,
% 14.25/14.38 class_OrderedGroup_Ocancel__comm__monoid__add(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_RealDef__Oreal__OrderedGroup_Opordered__cancel__ab__semigroup__add,axiom,
% 14.25/14.38 class_OrderedGroup_Opordered__cancel__ab__semigroup__add(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_RealDef__Oreal__OrderedGroup_Opordered__ab__semigroup__add__imp__le,axiom,
% 14.25/14.38 class_OrderedGroup_Opordered__ab__semigroup__add__imp__le(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_RealDef__Oreal__Ring__and__Field_Oordered__comm__semiring__strict,axiom,
% 14.25/14.38 class_Ring__and__Field_Oordered__comm__semiring__strict(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_RealDef__Oreal__Ring__and__Field_Opordered__cancel__semiring,axiom,
% 14.25/14.38 class_Ring__and__Field_Opordered__cancel__semiring(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_RealDef__Oreal__Ring__and__Field_Oordered__semiring__strict,axiom,
% 14.25/14.38 class_Ring__and__Field_Oordered__semiring__strict(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_RealDef__Oreal__OrderedGroup_Opordered__ab__semigroup__add,axiom,
% 14.25/14.38 class_OrderedGroup_Opordered__ab__semigroup__add(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_RealDef__Oreal__OrderedGroup_Opordered__ab__group__add__abs,axiom,
% 14.25/14.38 class_OrderedGroup_Opordered__ab__group__add__abs(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_RealDef__Oreal__OrderedGroup_Olordered__ab__group__add__abs,axiom,
% 14.25/14.38 class_OrderedGroup_Olordered__ab__group__add__abs(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_RealDef__Oreal__OrderedGroup_Opordered__comm__monoid__add,axiom,
% 14.25/14.38 class_OrderedGroup_Opordered__comm__monoid__add(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_RealDef__Oreal__Ring__and__Field_Oring__no__zero__divisors,axiom,
% 14.25/14.38 class_Ring__and__Field_Oring__no__zero__divisors(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_RealDef__Oreal__OrderedGroup_Ocancel__ab__semigroup__add,axiom,
% 14.25/14.38 class_OrderedGroup_Ocancel__ab__semigroup__add(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_RealDef__Oreal__Ring__and__Field_Oordered__ring__strict,axiom,
% 14.25/14.38 class_Ring__and__Field_Oordered__ring__strict(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_RealDef__Oreal__RealVector_Oreal__normed__div__algebra,axiom,
% 14.25/14.38 class_RealVector_Oreal__normed__div__algebra(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_RealDef__Oreal__OrderedGroup_Opordered__ab__group__add,axiom,
% 14.25/14.38 class_OrderedGroup_Opordered__ab__group__add(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_RealDef__Oreal__OrderedGroup_Olordered__ab__group__add,axiom,
% 14.25/14.38 class_OrderedGroup_Olordered__ab__group__add(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_RealDef__Oreal__OrderedGroup_Oordered__ab__group__add,axiom,
% 14.25/14.38 class_OrderedGroup_Oordered__ab__group__add(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_RealDef__Oreal__OrderedGroup_Ocancel__semigroup__add,axiom,
% 14.25/14.38 class_OrderedGroup_Ocancel__semigroup__add(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_RealDef__Oreal__Ring__and__Field_Opordered__semiring,axiom,
% 14.25/14.38 class_Ring__and__Field_Opordered__semiring(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_RealDef__Oreal__Ring__and__Field_Opordered__ring__abs,axiom,
% 14.25/14.38 class_Ring__and__Field_Opordered__ring__abs(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_RealDef__Oreal__RealVector_Oreal__normed__algebra__1,axiom,
% 14.25/14.38 class_RealVector_Oreal__normed__algebra__1(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_RealDef__Oreal__Ring__and__Field_Oordered__semiring,axiom,
% 14.25/14.38 class_Ring__and__Field_Oordered__semiring(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_RealDef__Oreal__Ring__and__Field_Ono__zero__divisors,axiom,
% 14.25/14.38 class_Ring__and__Field_Ono__zero__divisors(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_RealDef__Oreal__Ring__and__Field_Odivision__by__zero,axiom,
% 14.25/14.38 class_Ring__and__Field_Odivision__by__zero(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_RealDef__Oreal__Ring__and__Field_Oordered__semidom,axiom,
% 14.25/14.38 class_Ring__and__Field_Oordered__semidom(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_RealDef__Oreal__Ring__and__Field_Ocomm__semiring__1,axiom,
% 14.25/14.38 class_Ring__and__Field_Ocomm__semiring__1(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_RealDef__Oreal__Ring__and__Field_Ocomm__semiring__0,axiom,
% 14.25/14.38 class_Ring__and__Field_Ocomm__semiring__0(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_RealDef__Oreal__RealVector_Oreal__normed__algebra,axiom,
% 14.25/14.38 class_RealVector_Oreal__normed__algebra(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_RealDef__Oreal__OrderedGroup_Oab__semigroup__mult,axiom,
% 14.25/14.38 class_OrderedGroup_Oab__semigroup__mult(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_RealDef__Oreal__RealVector_Oreal__normed__vector,axiom,
% 14.25/14.38 class_RealVector_Oreal__normed__vector(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_RealDef__Oreal__OrderedGroup_Ocomm__monoid__mult,axiom,
% 14.25/14.38 class_OrderedGroup_Ocomm__monoid__mult(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_RealDef__Oreal__OrderedGroup_Oab__semigroup__add,axiom,
% 14.25/14.38 class_OrderedGroup_Oab__semigroup__add(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_RealDef__Oreal__Ring__and__Field_Opordered__ring,axiom,
% 14.25/14.38 class_Ring__and__Field_Opordered__ring(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_RealDef__Oreal__Ring__and__Field_Oordered__field,axiom,
% 14.25/14.38 class_Ring__and__Field_Oordered__field(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_RealDef__Oreal__Ring__and__Field_Olordered__ring,axiom,
% 14.25/14.38 class_Ring__and__Field_Olordered__ring(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_RealDef__Oreal__Ring__and__Field_Odivision__ring,axiom,
% 14.25/14.38 class_Ring__and__Field_Odivision__ring(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_RealDef__Oreal__Ring__and__Field_Ocomm__semiring,axiom,
% 14.25/14.38 class_Ring__and__Field_Ocomm__semiring(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_RealDef__Oreal__RealVector_Oreal__normed__field,axiom,
% 14.25/14.38 class_RealVector_Oreal__normed__field(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_RealDef__Oreal__OrderedGroup_Ocomm__monoid__add,axiom,
% 14.25/14.38 class_OrderedGroup_Ocomm__monoid__add(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_RealDef__Oreal__Ring__and__Field_Ozero__neq__one,axiom,
% 14.25/14.38 class_Ring__and__Field_Ozero__neq__one(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_RealDef__Oreal__Ring__and__Field_Oordered__idom,axiom,
% 14.25/14.38 class_Ring__and__Field_Oordered__idom(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_RealDef__Oreal__Ring__and__Field_Ocomm__ring__1,axiom,
% 14.25/14.38 class_Ring__and__Field_Ocomm__ring__1(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_RealDef__Oreal__Ring__and__Field_Omult__mono1,axiom,
% 14.25/14.38 class_Ring__and__Field_Omult__mono1(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_RealDef__Oreal__OrderedGroup_Oab__group__add,axiom,
% 14.25/14.38 class_OrderedGroup_Oab__group__add(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_RealDef__Oreal__Ring__and__Field_Omult__zero,axiom,
% 14.25/14.38 class_Ring__and__Field_Omult__zero(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_RealDef__Oreal__Ring__and__Field_Omult__mono,axiom,
% 14.25/14.38 class_Ring__and__Field_Omult__mono(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_RealDef__Oreal__Ring__and__Field_Ocomm__ring,axiom,
% 14.25/14.38 class_Ring__and__Field_Ocomm__ring(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_RealDef__Oreal__OrderedGroup_Omonoid__mult,axiom,
% 14.25/14.38 class_OrderedGroup_Omonoid__mult(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_RealDef__Oreal__Ring__and__Field_Osemiring,axiom,
% 14.25/14.38 class_Ring__and__Field_Osemiring(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_RealDef__Oreal__OrderedGroup_Omonoid__add,axiom,
% 14.25/14.38 class_OrderedGroup_Omonoid__add(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_RealDef__Oreal__OrderedGroup_Ogroup__add,axiom,
% 14.25/14.38 class_OrderedGroup_Ogroup__add(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_RealDef__Oreal__Ring__and__Field_Osgn__if,axiom,
% 14.25/14.38 class_Ring__and__Field_Osgn__if(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_RealDef__Oreal__Ring__and__Field_Oabs__if,axiom,
% 14.25/14.38 class_Ring__and__Field_Oabs__if(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_RealDef__Oreal__RealVector_Oreal__field,axiom,
% 14.25/14.38 class_RealVector_Oreal__field(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_RealDef__Oreal__Ring__and__Field_Ofield,axiom,
% 14.25/14.38 class_Ring__and__Field_Ofield(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_RealDef__Oreal__Ring__and__Field_Oring,axiom,
% 14.25/14.38 class_Ring__and__Field_Oring(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_RealDef__Oreal__Ring__and__Field_Oidom,axiom,
% 14.25/14.38 class_Ring__and__Field_Oidom(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_RealDef__Oreal__Ring__and__Field_Odvd,axiom,
% 14.25/14.38 class_Ring__and__Field_Odvd(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_RealDef__Oreal__Orderings_Opreorder,axiom,
% 14.25/14.38 class_Orderings_Opreorder(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_RealDef__Oreal__Orderings_Olinorder,axiom,
% 14.25/14.38 class_Orderings_Olinorder(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_RealDef__Oreal__Orderings_Oorder,axiom,
% 14.25/14.38 class_Orderings_Oorder(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_RealDef__Oreal__Int_Onumber__ring,axiom,
% 14.25/14.38 class_Int_Onumber__ring(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_RealDef__Oreal__HOL_Ozero,axiom,
% 14.25/14.38 class_HOL_Ozero(tc_RealDef_Oreal) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Complex__Ocomplex__Ring__and__Field_Oring__no__zero__divisors,axiom,
% 14.25/14.38 class_Ring__and__Field_Oring__no__zero__divisors(tc_Complex_Ocomplex) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Complex__Ocomplex__OrderedGroup_Ocancel__ab__semigroup__add,axiom,
% 14.25/14.38 class_OrderedGroup_Ocancel__ab__semigroup__add(tc_Complex_Ocomplex) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Complex__Ocomplex__RealVector_Oreal__normed__div__algebra,axiom,
% 14.25/14.38 class_RealVector_Oreal__normed__div__algebra(tc_Complex_Ocomplex) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Complex__Ocomplex__OrderedGroup_Ocancel__semigroup__add,axiom,
% 14.25/14.38 class_OrderedGroup_Ocancel__semigroup__add(tc_Complex_Ocomplex) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Complex__Ocomplex__RealVector_Oreal__normed__algebra__1,axiom,
% 14.25/14.38 class_RealVector_Oreal__normed__algebra__1(tc_Complex_Ocomplex) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Complex__Ocomplex__Ring__and__Field_Ono__zero__divisors,axiom,
% 14.25/14.38 class_Ring__and__Field_Ono__zero__divisors(tc_Complex_Ocomplex) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Complex__Ocomplex__Ring__and__Field_Odivision__by__zero,axiom,
% 14.25/14.38 class_Ring__and__Field_Odivision__by__zero(tc_Complex_Ocomplex) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Complex__Ocomplex__Ring__and__Field_Ocomm__semiring__1,axiom,
% 14.25/14.38 class_Ring__and__Field_Ocomm__semiring__1(tc_Complex_Ocomplex) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Complex__Ocomplex__Ring__and__Field_Ocomm__semiring__0,axiom,
% 14.25/14.38 class_Ring__and__Field_Ocomm__semiring__0(tc_Complex_Ocomplex) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Complex__Ocomplex__RealVector_Oreal__normed__algebra,axiom,
% 14.25/14.38 class_RealVector_Oreal__normed__algebra(tc_Complex_Ocomplex) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Complex__Ocomplex__OrderedGroup_Oab__semigroup__mult,axiom,
% 14.25/14.38 class_OrderedGroup_Oab__semigroup__mult(tc_Complex_Ocomplex) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Complex__Ocomplex__RealVector_Oreal__normed__vector,axiom,
% 14.25/14.38 class_RealVector_Oreal__normed__vector(tc_Complex_Ocomplex) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Complex__Ocomplex__OrderedGroup_Ocomm__monoid__mult,axiom,
% 14.25/14.38 class_OrderedGroup_Ocomm__monoid__mult(tc_Complex_Ocomplex) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Complex__Ocomplex__OrderedGroup_Oab__semigroup__add,axiom,
% 14.25/14.38 class_OrderedGroup_Oab__semigroup__add(tc_Complex_Ocomplex) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Complex__Ocomplex__Ring__and__Field_Odivision__ring,axiom,
% 14.25/14.38 class_Ring__and__Field_Odivision__ring(tc_Complex_Ocomplex) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Complex__Ocomplex__Ring__and__Field_Ocomm__semiring,axiom,
% 14.25/14.38 class_Ring__and__Field_Ocomm__semiring(tc_Complex_Ocomplex) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Complex__Ocomplex__RealVector_Oreal__normed__field,axiom,
% 14.25/14.38 class_RealVector_Oreal__normed__field(tc_Complex_Ocomplex) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Complex__Ocomplex__OrderedGroup_Ocomm__monoid__add,axiom,
% 14.25/14.38 class_OrderedGroup_Ocomm__monoid__add(tc_Complex_Ocomplex) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Complex__Ocomplex__Ring__and__Field_Ozero__neq__one,axiom,
% 14.25/14.38 class_Ring__and__Field_Ozero__neq__one(tc_Complex_Ocomplex) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Complex__Ocomplex__Ring__and__Field_Ocomm__ring__1,axiom,
% 14.25/14.38 class_Ring__and__Field_Ocomm__ring__1(tc_Complex_Ocomplex) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Complex__Ocomplex__OrderedGroup_Oab__group__add,axiom,
% 14.25/14.38 class_OrderedGroup_Oab__group__add(tc_Complex_Ocomplex) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Complex__Ocomplex__Ring__and__Field_Omult__zero,axiom,
% 14.25/14.38 class_Ring__and__Field_Omult__zero(tc_Complex_Ocomplex) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Complex__Ocomplex__Ring__and__Field_Ocomm__ring,axiom,
% 14.25/14.38 class_Ring__and__Field_Ocomm__ring(tc_Complex_Ocomplex) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Complex__Ocomplex__OrderedGroup_Omonoid__mult,axiom,
% 14.25/14.38 class_OrderedGroup_Omonoid__mult(tc_Complex_Ocomplex) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Complex__Ocomplex__Ring__and__Field_Osemiring,axiom,
% 14.25/14.38 class_Ring__and__Field_Osemiring(tc_Complex_Ocomplex) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Complex__Ocomplex__OrderedGroup_Omonoid__add,axiom,
% 14.25/14.38 class_OrderedGroup_Omonoid__add(tc_Complex_Ocomplex) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Complex__Ocomplex__OrderedGroup_Ogroup__add,axiom,
% 14.25/14.38 class_OrderedGroup_Ogroup__add(tc_Complex_Ocomplex) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Complex__Ocomplex__RealVector_Oreal__field,axiom,
% 14.25/14.38 class_RealVector_Oreal__field(tc_Complex_Ocomplex) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Complex__Ocomplex__Ring__and__Field_Ofield,axiom,
% 14.25/14.38 class_Ring__and__Field_Ofield(tc_Complex_Ocomplex) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Complex__Ocomplex__Ring__and__Field_Oring,axiom,
% 14.25/14.38 class_Ring__and__Field_Oring(tc_Complex_Ocomplex) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Complex__Ocomplex__Ring__and__Field_Oidom,axiom,
% 14.25/14.38 class_Ring__and__Field_Oidom(tc_Complex_Ocomplex) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Complex__Ocomplex__Ring__and__Field_Odvd,axiom,
% 14.25/14.38 class_Ring__and__Field_Odvd(tc_Complex_Ocomplex) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Complex__Ocomplex__Int_Onumber__ring,axiom,
% 14.25/14.38 class_Int_Onumber__ring(tc_Complex_Ocomplex) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Complex__Ocomplex__HOL_Ozero,axiom,
% 14.25/14.38 class_HOL_Ozero(tc_Complex_Ocomplex) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Polynomial__Opoly__OrderedGroup_Opordered__cancel__ab__semigroup__add,axiom,
% 14.25/14.38 ( class_OrderedGroup_Opordered__cancel__ab__semigroup__add(tc_Polynomial_Opoly(T_1))
% 14.25/14.38 | ~ class_Ring__and__Field_Oordered__idom(T_1) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Polynomial__Opoly__OrderedGroup_Opordered__ab__semigroup__add__imp__le,axiom,
% 14.25/14.38 ( class_OrderedGroup_Opordered__ab__semigroup__add__imp__le(tc_Polynomial_Opoly(T_1))
% 14.25/14.38 | ~ class_Ring__and__Field_Oordered__idom(T_1) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Polynomial__Opoly__Ring__and__Field_Oordered__comm__semiring__strict,axiom,
% 14.25/14.38 ( class_Ring__and__Field_Oordered__comm__semiring__strict(tc_Polynomial_Opoly(T_1))
% 14.25/14.38 | ~ class_Ring__and__Field_Oordered__idom(T_1) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Polynomial__Opoly__Ring__and__Field_Opordered__cancel__semiring,axiom,
% 14.25/14.38 ( class_Ring__and__Field_Opordered__cancel__semiring(tc_Polynomial_Opoly(T_1))
% 14.25/14.38 | ~ class_Ring__and__Field_Oordered__idom(T_1) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Polynomial__Opoly__Ring__and__Field_Oordered__semiring__strict,axiom,
% 14.25/14.38 ( class_Ring__and__Field_Oordered__semiring__strict(tc_Polynomial_Opoly(T_1))
% 14.25/14.38 | ~ class_Ring__and__Field_Oordered__idom(T_1) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Polynomial__Opoly__OrderedGroup_Opordered__ab__semigroup__add,axiom,
% 14.25/14.38 ( class_OrderedGroup_Opordered__ab__semigroup__add(tc_Polynomial_Opoly(T_1))
% 14.25/14.38 | ~ class_Ring__and__Field_Oordered__idom(T_1) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Polynomial__Opoly__OrderedGroup_Opordered__ab__group__add__abs,axiom,
% 14.25/14.38 ( class_OrderedGroup_Opordered__ab__group__add__abs(tc_Polynomial_Opoly(T_1))
% 14.25/14.38 | ~ class_Ring__and__Field_Oordered__idom(T_1) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Polynomial__Opoly__OrderedGroup_Opordered__comm__monoid__add,axiom,
% 14.25/14.38 ( class_OrderedGroup_Opordered__comm__monoid__add(tc_Polynomial_Opoly(T_1))
% 14.25/14.38 | ~ class_Ring__and__Field_Oordered__idom(T_1) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Polynomial__Opoly__Ring__and__Field_Oring__no__zero__divisors,axiom,
% 14.25/14.38 ( class_Ring__and__Field_Oring__no__zero__divisors(tc_Polynomial_Opoly(T_1))
% 14.25/14.38 | ~ class_Ring__and__Field_Oidom(T_1) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Polynomial__Opoly__OrderedGroup_Ocancel__ab__semigroup__add,axiom,
% 14.25/14.38 ( class_OrderedGroup_Ocancel__ab__semigroup__add(tc_Polynomial_Opoly(T_1))
% 14.25/14.38 | ~ class_OrderedGroup_Ocancel__comm__monoid__add(T_1) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Polynomial__Opoly__Ring__and__Field_Oordered__ring__strict,axiom,
% 14.25/14.38 ( class_Ring__and__Field_Oordered__ring__strict(tc_Polynomial_Opoly(T_1))
% 14.25/14.38 | ~ class_Ring__and__Field_Oordered__idom(T_1) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Polynomial__Opoly__OrderedGroup_Opordered__ab__group__add,axiom,
% 14.25/14.38 ( class_OrderedGroup_Opordered__ab__group__add(tc_Polynomial_Opoly(T_1))
% 14.25/14.38 | ~ class_Ring__and__Field_Oordered__idom(T_1) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Polynomial__Opoly__OrderedGroup_Oordered__ab__group__add,axiom,
% 14.25/14.38 ( class_OrderedGroup_Oordered__ab__group__add(tc_Polynomial_Opoly(T_1))
% 14.25/14.38 | ~ class_Ring__and__Field_Oordered__idom(T_1) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Polynomial__Opoly__OrderedGroup_Ocancel__semigroup__add,axiom,
% 14.25/14.38 ( class_OrderedGroup_Ocancel__semigroup__add(tc_Polynomial_Opoly(T_1))
% 14.25/14.38 | ~ class_OrderedGroup_Ocancel__comm__monoid__add(T_1) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Polynomial__Opoly__Ring__and__Field_Opordered__semiring,axiom,
% 14.25/14.38 ( class_Ring__and__Field_Opordered__semiring(tc_Polynomial_Opoly(T_1))
% 14.25/14.38 | ~ class_Ring__and__Field_Oordered__idom(T_1) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Polynomial__Opoly__Ring__and__Field_Opordered__ring__abs,axiom,
% 14.25/14.38 ( class_Ring__and__Field_Opordered__ring__abs(tc_Polynomial_Opoly(T_1))
% 14.25/14.38 | ~ class_Ring__and__Field_Oordered__idom(T_1) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Polynomial__Opoly__Ring__and__Field_Oordered__semiring,axiom,
% 14.25/14.38 ( class_Ring__and__Field_Oordered__semiring(tc_Polynomial_Opoly(T_1))
% 14.25/14.38 | ~ class_Ring__and__Field_Oordered__idom(T_1) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Polynomial__Opoly__Ring__and__Field_Ono__zero__divisors,axiom,
% 14.25/14.38 ( class_Ring__and__Field_Ono__zero__divisors(tc_Polynomial_Opoly(T_1))
% 14.25/14.38 | ~ class_Ring__and__Field_Oidom(T_1) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Polynomial__Opoly__Ring__and__Field_Oordered__semidom,axiom,
% 14.25/14.38 ( class_Ring__and__Field_Oordered__semidom(tc_Polynomial_Opoly(T_1))
% 14.25/14.38 | ~ class_Ring__and__Field_Oordered__idom(T_1) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Polynomial__Opoly__Ring__and__Field_Ocomm__semiring__1,axiom,
% 14.25/14.38 ( class_Ring__and__Field_Ocomm__semiring__1(tc_Polynomial_Opoly(T_1))
% 14.25/14.38 | ~ class_Ring__and__Field_Ocomm__semiring__1(T_1) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Polynomial__Opoly__Ring__and__Field_Ocomm__semiring__0,axiom,
% 14.25/14.38 ( class_Ring__and__Field_Ocomm__semiring__0(tc_Polynomial_Opoly(T_1))
% 14.25/14.38 | ~ class_Ring__and__Field_Ocomm__semiring__0(T_1) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Polynomial__Opoly__OrderedGroup_Oab__semigroup__mult,axiom,
% 14.25/14.38 ( class_OrderedGroup_Oab__semigroup__mult(tc_Polynomial_Opoly(T_1))
% 14.25/14.38 | ~ class_Ring__and__Field_Ocomm__semiring__0(T_1) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Polynomial__Opoly__OrderedGroup_Ocomm__monoid__mult,axiom,
% 14.25/14.38 ( class_OrderedGroup_Ocomm__monoid__mult(tc_Polynomial_Opoly(T_1))
% 14.25/14.38 | ~ class_Ring__and__Field_Ocomm__semiring__1(T_1) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Polynomial__Opoly__OrderedGroup_Oab__semigroup__add,axiom,
% 14.25/14.38 ( class_OrderedGroup_Oab__semigroup__add(tc_Polynomial_Opoly(T_1))
% 14.25/14.38 | ~ class_OrderedGroup_Ocomm__monoid__add(T_1) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Polynomial__Opoly__Ring__and__Field_Opordered__ring,axiom,
% 14.25/14.38 ( class_Ring__and__Field_Opordered__ring(tc_Polynomial_Opoly(T_1))
% 14.25/14.38 | ~ class_Ring__and__Field_Oordered__idom(T_1) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Polynomial__Opoly__Ring__and__Field_Ocomm__semiring,axiom,
% 14.25/14.38 ( class_Ring__and__Field_Ocomm__semiring(tc_Polynomial_Opoly(T_1))
% 14.25/14.38 | ~ class_Ring__and__Field_Ocomm__semiring__0(T_1) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Polynomial__Opoly__OrderedGroup_Ocomm__monoid__add,axiom,
% 14.25/14.38 ( class_OrderedGroup_Ocomm__monoid__add(tc_Polynomial_Opoly(T_1))
% 14.25/14.38 | ~ class_OrderedGroup_Ocomm__monoid__add(T_1) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Polynomial__Opoly__Ring__and__Field_Ozero__neq__one,axiom,
% 14.25/14.38 ( class_Ring__and__Field_Ozero__neq__one(tc_Polynomial_Opoly(T_1))
% 14.25/14.38 | ~ class_Ring__and__Field_Ocomm__semiring__1(T_1) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Polynomial__Opoly__Ring__and__Field_Oordered__idom,axiom,
% 14.25/14.38 ( class_Ring__and__Field_Oordered__idom(tc_Polynomial_Opoly(T_1))
% 14.25/14.38 | ~ class_Ring__and__Field_Oordered__idom(T_1) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Polynomial__Opoly__Ring__and__Field_Ocomm__ring__1,axiom,
% 14.25/14.38 ( class_Ring__and__Field_Ocomm__ring__1(tc_Polynomial_Opoly(T_1))
% 14.25/14.38 | ~ class_Ring__and__Field_Ocomm__ring__1(T_1) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Polynomial__Opoly__Ring__and__Field_Omult__mono1,axiom,
% 14.25/14.38 ( class_Ring__and__Field_Omult__mono1(tc_Polynomial_Opoly(T_1))
% 14.25/14.38 | ~ class_Ring__and__Field_Oordered__idom(T_1) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Polynomial__Opoly__OrderedGroup_Oab__group__add,axiom,
% 14.25/14.38 ( class_OrderedGroup_Oab__group__add(tc_Polynomial_Opoly(T_1))
% 14.25/14.38 | ~ class_OrderedGroup_Oab__group__add(T_1) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Polynomial__Opoly__Ring__and__Field_Omult__zero,axiom,
% 14.25/14.38 ( class_Ring__and__Field_Omult__zero(tc_Polynomial_Opoly(T_1))
% 14.25/14.38 | ~ class_Ring__and__Field_Ocomm__semiring__0(T_1) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Polynomial__Opoly__Ring__and__Field_Omult__mono,axiom,
% 14.25/14.38 ( class_Ring__and__Field_Omult__mono(tc_Polynomial_Opoly(T_1))
% 14.25/14.38 | ~ class_Ring__and__Field_Oordered__idom(T_1) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Polynomial__Opoly__Ring__and__Field_Ocomm__ring,axiom,
% 14.25/14.38 ( class_Ring__and__Field_Ocomm__ring(tc_Polynomial_Opoly(T_1))
% 14.25/14.38 | ~ class_Ring__and__Field_Ocomm__ring(T_1) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Polynomial__Opoly__OrderedGroup_Omonoid__mult,axiom,
% 14.25/14.38 ( class_OrderedGroup_Omonoid__mult(tc_Polynomial_Opoly(T_1))
% 14.25/14.38 | ~ class_Ring__and__Field_Ocomm__semiring__1(T_1) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Polynomial__Opoly__Ring__and__Field_Osemiring,axiom,
% 14.25/14.38 ( class_Ring__and__Field_Osemiring(tc_Polynomial_Opoly(T_1))
% 14.25/14.38 | ~ class_Ring__and__Field_Ocomm__semiring__0(T_1) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Polynomial__Opoly__OrderedGroup_Omonoid__add,axiom,
% 14.25/14.38 ( class_OrderedGroup_Omonoid__add(tc_Polynomial_Opoly(T_1))
% 14.25/14.38 | ~ class_OrderedGroup_Ocomm__monoid__add(T_1) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Polynomial__Opoly__OrderedGroup_Ogroup__add,axiom,
% 14.25/14.38 ( class_OrderedGroup_Ogroup__add(tc_Polynomial_Opoly(T_1))
% 14.25/14.38 | ~ class_OrderedGroup_Oab__group__add(T_1) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Polynomial__Opoly__Ring__and__Field_Osgn__if,axiom,
% 14.25/14.38 ( class_Ring__and__Field_Osgn__if(tc_Polynomial_Opoly(T_1))
% 14.25/14.38 | ~ class_Ring__and__Field_Oordered__idom(T_1) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Polynomial__Opoly__Ring__and__Field_Oabs__if,axiom,
% 14.25/14.38 ( class_Ring__and__Field_Oabs__if(tc_Polynomial_Opoly(T_1))
% 14.25/14.38 | ~ class_Ring__and__Field_Oordered__idom(T_1) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Polynomial__Opoly__Divides_Osemiring__div,axiom,
% 14.25/14.38 ( class_Divides_Osemiring__div(tc_Polynomial_Opoly(T_1))
% 14.25/14.38 | ~ class_Ring__and__Field_Ofield(T_1) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Polynomial__Opoly__Ring__and__Field_Oring,axiom,
% 14.25/14.38 ( class_Ring__and__Field_Oring(tc_Polynomial_Opoly(T_1))
% 14.25/14.38 | ~ class_Ring__and__Field_Ocomm__ring(T_1) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Polynomial__Opoly__Ring__and__Field_Oidom,axiom,
% 14.25/14.38 ( class_Ring__and__Field_Oidom(tc_Polynomial_Opoly(T_1))
% 14.25/14.38 | ~ class_Ring__and__Field_Oidom(T_1) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Polynomial__Opoly__Ring__and__Field_Odvd,axiom,
% 14.25/14.38 ( class_Ring__and__Field_Odvd(tc_Polynomial_Opoly(T_1))
% 14.25/14.38 | ~ class_Ring__and__Field_Ocomm__semiring__1(T_1) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Polynomial__Opoly__Orderings_Opreorder,axiom,
% 14.25/14.38 ( class_Orderings_Opreorder(tc_Polynomial_Opoly(T_1))
% 14.25/14.38 | ~ class_Ring__and__Field_Oordered__idom(T_1) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Polynomial__Opoly__Orderings_Olinorder,axiom,
% 14.25/14.38 ( class_Orderings_Olinorder(tc_Polynomial_Opoly(T_1))
% 14.25/14.38 | ~ class_Ring__and__Field_Oordered__idom(T_1) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Polynomial__Opoly__Divides_Oring__div,axiom,
% 14.25/14.38 ( class_Divides_Oring__div(tc_Polynomial_Opoly(T_1))
% 14.25/14.38 | ~ class_Ring__and__Field_Ofield(T_1) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Polynomial__Opoly__Orderings_Oorder,axiom,
% 14.25/14.38 ( class_Orderings_Oorder(tc_Polynomial_Opoly(T_1))
% 14.25/14.38 | ~ class_Ring__and__Field_Oordered__idom(T_1) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Polynomial__Opoly__Int_Onumber__ring,axiom,
% 14.25/14.38 ( class_Int_Onumber__ring(tc_Polynomial_Opoly(T_1))
% 14.25/14.38 | ~ class_Ring__and__Field_Ocomm__ring__1(T_1) ) ).
% 14.25/14.38
% 14.25/14.38 cnf(clsarity_Polynomial__Opoly__HOL_Ozero,axiom,
% 14.25/14.38 ( class_HOL_Ozero(tc_Polynomial_Opoly(T_1))
% 14.25/14.38 | ~ class_HOL_Ozero(T_1) ) ).
% 14.25/14.38
% 14.25/14.38 %------------------------------------------------------------------------------
% 14.25/14.38 %-------------------------------------------
% 14.25/14.38 % Proof found
% 14.25/14.38 % SZS status Theorem for theBenchmark
% 14.25/14.38 % SZS output start Proof
% 14.25/14.38 %ClaNum:1134(EqnAxiom:142)
% 14.25/14.38 %VarNum:7507(SingletonVarNum:2229)
% 14.25/14.38 %MaxLitNum:6
% 14.25/14.38 %MaxfuncDepth:4
% 14.25/14.38 %SharedTerms:135
% 14.25/14.38 %goalClause: 269
% 14.25/14.38 %singleGoalClaCount:1
% 14.25/14.38 [143]P1(a1)
% 14.25/14.38 [144]P2(a1)
% 14.25/14.38 [145]P2(a2)
% 14.25/14.38 [146]P47(a1)
% 14.25/14.38 [147]P47(a2)
% 14.25/14.38 [148]P3(a1)
% 14.25/14.38 [149]P3(a2)
% 14.25/14.38 [150]P4(a1)
% 14.25/14.38 [151]P57(a1)
% 14.25/14.38 [152]P40(a1)
% 14.25/14.38 [153]P40(a2)
% 14.25/14.38 [154]P41(a1)
% 14.25/14.38 [155]P41(a2)
% 14.25/14.38 [156]P29(a1)
% 14.25/14.38 [157]P5(a1)
% 14.25/14.38 [158]P5(a2)
% 14.25/14.38 [159]P23(a1)
% 14.25/14.38 [160]P48(a1)
% 14.25/14.38 [161]P48(a2)
% 14.25/14.38 [162]P24(a1)
% 14.25/14.38 [163]P42(a1)
% 14.25/14.38 [164]P42(a2)
% 14.25/14.38 [165]P58(a1)
% 14.25/14.38 [166]P34(a1)
% 14.25/14.38 [167]P34(a2)
% 14.25/14.38 [168]P43(a1)
% 14.25/14.38 [169]P25(a1)
% 14.25/14.38 [170]P6(a1)
% 14.25/14.38 [171]P6(a2)
% 14.25/14.38 [172]P35(a1)
% 14.25/14.38 [173]P36(a1)
% 14.25/14.38 [174]P13(a1)
% 14.25/14.38 [175]P13(a2)
% 14.25/14.38 [176]P26(a1)
% 14.25/14.38 [177]P50(a1)
% 14.25/14.38 [178]P50(a2)
% 14.25/14.38 [179]P59(a1)
% 14.25/14.38 [180]P38(a1)
% 14.25/14.38 [181]P38(a2)
% 14.25/14.38 [182]P60(a1)
% 14.25/14.38 [183]P60(a2)
% 14.25/14.38 [184]P49(a1)
% 14.25/14.38 [185]P49(a2)
% 14.25/14.38 [186]P30(a1)
% 14.25/14.38 [187]P31(a1)
% 14.25/14.38 [188]P39(a1)
% 14.25/14.38 [189]P39(a2)
% 14.25/14.38 [190]P61(a1)
% 14.25/14.38 [191]P51(a1)
% 14.25/14.38 [192]P33(a1)
% 14.25/14.38 [193]P62(a1)
% 14.25/14.38 [194]P52(a1)
% 14.25/14.38 [195]P64(a1)
% 14.25/14.38 [196]P63(a1)
% 14.25/14.38 [197]P15(a1)
% 14.25/14.38 [198]P15(a2)
% 14.25/14.38 [199]P65(a1)
% 14.25/14.38 [200]P37(a1)
% 14.25/14.38 [201]P37(a2)
% 14.25/14.38 [202]P44(a1)
% 14.25/14.38 [203]P44(a2)
% 14.25/14.38 [204]P53(a1)
% 14.25/14.38 [205]P54(a1)
% 14.25/14.38 [206]P66(a1)
% 14.25/14.38 [207]P67(a1)
% 14.25/14.38 [208]P7(a1)
% 14.25/14.38 [209]P7(a2)
% 14.25/14.38 [210]P70(a1)
% 14.25/14.38 [211]P70(a2)
% 14.25/14.38 [212]P27(a1)
% 14.25/14.38 [213]P27(a2)
% 14.25/14.38 [214]P55(a1)
% 14.25/14.38 [215]P55(a2)
% 14.25/14.38 [216]P68(a1)
% 14.25/14.38 [217]P68(a2)
% 14.25/14.38 [218]P56(a1)
% 14.25/14.38 [219]P56(a2)
% 14.25/14.38 [220]P45(a1)
% 14.25/14.38 [221]P45(a2)
% 14.25/14.38 [222]P32(a1)
% 14.25/14.38 [223]P16(a1)
% 14.25/14.38 [224]P16(a2)
% 14.25/14.38 [225]P17(a1)
% 14.25/14.38 [226]P17(a2)
% 14.25/14.38 [227]P46(a1)
% 14.25/14.38 [228]P46(a2)
% 14.25/14.38 [229]P18(a1)
% 14.25/14.38 [230]P18(a2)
% 14.25/14.38 [231]P28(a1)
% 14.25/14.38 [232]P28(a2)
% 14.25/14.38 [233]P22(a1)
% 14.25/14.38 [234]P22(a2)
% 14.25/14.38 [235]P19(a1)
% 14.25/14.38 [236]P19(a2)
% 14.25/14.38 [237]P69(a1)
% 14.25/14.38 [238]P69(a2)
% 14.25/14.38 [239]P21(a1)
% 14.25/14.38 [240]P21(a2)
% 14.25/14.38 [246]P8(a28,f15(a33,a2),a1)
% 14.25/14.38 [263]~E(f4(a1),f3(a1))
% 14.25/14.38 [241]E(f14(f3(a1)),f3(a1))
% 14.25/14.38 [242]E(f14(f4(a1)),f4(a1))
% 14.25/14.38 [252]P8(f11(f4(a1),f5(a28,a1),a1),f15(a33,a2),a1)
% 14.25/14.38 [264]~E(f3(f27(a2)),a32)
% 14.25/14.38 [266]~E(f16(a31,a32,a2),f3(f27(a2)))
% 14.25/14.38 [267]~P9(f3(a1),f10(f3(a1),f3(a1),a1),a1)
% 14.25/14.38 [253]E(f11(f10(f3(a1),f3(a1),a1),f10(f3(a1),f3(a1),a1),a1),f3(a1))
% 14.25/14.38 [260]P8(f11(a29,f15(a30,a2),a1),f15(f17(f16(a31,a32,a2),a33,a2),a2),a1)
% 14.25/14.38 [269]~P8(f11(a29,f15(a30,a2),a1),f10(f4(a1),f15(f17(f16(a31,a32,a2),a33,a2),a2),a1),a1)
% 14.25/14.38 [243]P8(x2431,x2431,a1)
% 14.25/14.38 [265]~P9(x2651,x2651,a1)
% 14.25/14.38 [244]E(f10(f4(a1),x2441,a1),x2441)
% 14.25/14.38 [249]E(f14(f10(x2491,x2491,a1)),f5(x2491,a1))
% 14.25/14.38 [251]P9(f3(a1),f11(f4(a1),f5(x2511,a1),a1),a1)
% 14.25/14.38 [268]~P9(f11(f5(x2681,a1),f4(a1),a1),x2681,a1)
% 14.25/14.38 [256]E(f10(f11(x2561,f4(a1),a1),f7(x2561,f4(a1),a1),a1),f7(f10(x2561,x2561,a1),f4(a1),a1))
% 14.25/14.38 [247]P9(f3(a1),f34(x2471,x2472),a1)
% 14.25/14.38 [248]E(f10(x2481,x2482,a1),f10(x2482,x2481,a1))
% 14.25/14.38 [250]E(f10(f14(x2501),f14(x2502),a1),f14(f10(x2501,x2502,a1)))
% 14.25/14.38 [257]P8(f3(a1),f11(f10(x2571,x2571,a1),f10(x2572,x2572,a1),a1),a1)
% 14.25/14.38 [258]P8(f15(x2581,a2),f11(f15(f11(x2581,x2582,a2),a2),f15(x2582,a2),a1),a1)
% 14.25/14.38 [259]P8(f7(f15(f11(x2591,x2592,a2),a2),f15(x2591,a2),a1),f15(x2592,a2),a1)
% 14.25/14.38 [261]P8(x2611,f14(f11(f10(x2611,x2611,a1),f10(x2612,x2612,a1),a1)),a1)
% 14.25/14.38 [262]P8(f3(a1),f14(f11(f10(x2621,x2621,a1),f10(x2622,x2622,a1),a1)),a1)
% 14.25/14.38 [254]E(f10(f10(x2541,x2542,a1),x2543,a1),f10(x2541,f10(x2542,x2543,a1),a1))
% 14.25/14.38 [255]E(f11(f10(x2551,x2552,a1),f10(x2553,x2552,a1),a1),f10(f11(x2551,x2553,a1),x2552,a1))
% 14.25/14.38 [270]~E(f14(x2701),f3(a1))+E(x2701,f3(a1))
% 14.25/14.38 [271]~E(f14(x2711),f4(a1))+E(x2711,f4(a1))
% 14.25/14.38 [273]~P57(x2731)+P4(f27(x2731))
% 14.25/14.38 [274]~P57(x2741)+P57(f27(x2741))
% 14.25/14.38 [275]~P47(x2751)+P11(f27(x2751))
% 14.25/14.38 [276]~P41(x2761)+P41(f27(x2761))
% 14.25/14.38 [277]~P57(x2771)+P29(f27(x2771))
% 14.25/14.38 [278]~P13(x2781)+P5(f27(x2781))
% 14.25/14.38 [279]~P57(x2791)+P23(f27(x2791))
% 14.25/14.38 [280]~P47(x2801)+P12(f27(x2801))
% 14.25/14.38 [281]~P57(x2811)+P24(f27(x2811))
% 14.25/14.38 [282]~P42(x2821)+P42(f27(x2821))
% 14.25/14.38 [283]~P57(x2831)+P58(f27(x2831))
% 14.25/14.38 [284]~P57(x2841)+P43(f27(x2841))
% 14.25/14.38 [285]~P42(x2851)+P6(f27(x2851))
% 14.25/14.38 [286]~P57(x2861)+P35(f27(x2861))
% 14.25/14.38 [287]~P57(x2871)+P36(f27(x2871))
% 14.25/14.38 [288]~P13(x2881)+P13(f27(x2881))
% 14.25/14.38 [289]~P50(x2891)+P50(f27(x2891))
% 14.25/14.38 [290]~P57(x2901)+P59(f27(x2901))
% 14.25/14.38 [291]~P44(x2911)+P60(f27(x2911))
% 14.25/14.38 [292]~P41(x2921)+P49(f27(x2921))
% 14.25/14.38 [293]~P57(x2931)+P30(f27(x2931))
% 14.25/14.38 [294]~P57(x2941)+P31(f27(x2941))
% 14.25/14.38 [295]~P57(x2951)+P61(f27(x2951))
% 14.25/14.38 [296]~P57(x2961)+P51(f27(x2961))
% 14.25/14.38 [297]~P57(x2971)+P33(f27(x2971))
% 14.25/14.38 [298]~P57(x2981)+P62(f27(x2981))
% 14.25/14.38 [299]~P57(x2991)+P64(f27(x2991))
% 14.25/14.38 [300]~P57(x3001)+P63(f27(x3001))
% 14.25/14.38 [301]~P15(x3011)+P15(f27(x3011))
% 14.25/14.38 [302]~P57(x3021)+P65(f27(x3021))
% 14.25/14.38 [303]~P44(x3031)+P44(f27(x3031))
% 14.25/14.38 [304]~P57(x3041)+P53(f27(x3041))
% 14.25/14.38 [305]~P57(x3051)+P54(f27(x3051))
% 14.25/14.38 [306]~P57(x3061)+P66(f27(x3061))
% 14.25/14.38 [307]~P57(x3071)+P67(f27(x3071))
% 14.25/14.38 [308]~P7(x3081)+P7(f27(x3081))
% 14.25/14.38 [309]~P41(x3091)+P70(f27(x3091))
% 14.25/14.38 [310]~P15(x3101)+P27(f27(x3101))
% 14.25/14.38 [311]~P50(x3111)+P55(f27(x3111))
% 14.25/14.38 [312]~P50(x3121)+P68(f27(x3121))
% 14.25/14.38 [313]~P45(x3131)+P56(f27(x3131))
% 14.25/14.38 [314]~P45(x3141)+P45(f27(x3141))
% 14.25/14.38 [315]~P57(x3151)+P32(f27(x3151))
% 14.25/14.38 [316]~P21(x3161)+P16(f27(x3161))
% 14.25/14.38 [317]~P21(x3171)+P17(f27(x3171))
% 14.25/14.38 [318]~P45(x3181)+P46(f27(x3181))
% 14.25/14.38 [319]~P45(x3191)+P18(f27(x3191))
% 14.25/14.38 [320]~P41(x3201)+P28(f27(x3201))
% 14.25/14.38 [321]~P41(x3211)+P22(f27(x3211))
% 14.25/14.38 [322]~P15(x3221)+P19(f27(x3221))
% 14.25/14.38 [323]~P45(x3231)+P69(f27(x3231))
% 14.25/14.38 [324]~P21(x3241)+P21(f27(x3241))
% 14.25/14.38 [326]~P70(x3261)+~E(f4(x3261),f3(x3261))
% 14.25/14.38 [395]E(f5(x3951,a1),x3951)+P9(x3951,f3(a1),a1)
% 14.25/14.38 [415]~P62(x4151)+P8(f3(x4151),f4(x4151),x4151)
% 14.25/14.38 [416]~P62(x4161)+P9(f3(x4161),f4(x4161),x4161)
% 14.25/14.38 [462]~E(f14(x4621),f3(a1))+~P9(f3(a1),x4621,a1)
% 14.25/14.38 [480]~P62(x4801)+~P8(f4(x4801),f3(x4801),x4801)
% 14.25/14.38 [481]~P62(x4811)+~P9(f4(x4811),f3(x4811),x4811)
% 14.25/14.38 [541]~P8(x5411,f3(a1),a1)+P8(f14(x5411),f3(a1),a1)
% 14.25/14.38 [542]~P8(x5421,f4(a1),a1)+P8(f14(x5421),f4(a1),a1)
% 14.25/14.38 [543]~P9(x5431,f3(a1),a1)+P9(f14(x5431),f3(a1),a1)
% 14.25/14.38 [544]~P9(x5441,f4(a1),a1)+P9(f14(x5441),f4(a1),a1)
% 14.25/14.38 [546]~P8(f3(a1),x5461,a1)+P8(f3(a1),f14(x5461),a1)
% 14.25/14.38 [548]~P8(f4(a1),x5481,a1)+P8(f4(a1),f14(x5481),a1)
% 14.25/14.38 [550]~P9(f3(a1),x5501,a1)+P9(f3(a1),f14(x5501),a1)
% 14.25/14.38 [551]~P9(f4(a1),x5511,a1)+P9(f4(a1),f14(x5511),a1)
% 14.25/14.38 [552]~P8(f14(x5521),f3(a1),a1)+P8(x5521,f3(a1),a1)
% 14.25/14.38 [553]~P8(f14(x5531),f4(a1),a1)+P8(x5531,f4(a1),a1)
% 14.25/14.38 [554]~P9(f14(x5541),f3(a1),a1)+P9(x5541,f3(a1),a1)
% 14.25/14.38 [555]~P9(f14(x5551),f4(a1),a1)+P9(x5551,f4(a1),a1)
% 14.25/14.38 [556]~P8(f3(a1),f14(x5561),a1)+P8(f3(a1),x5561,a1)
% 14.25/14.38 [557]~P8(f4(a1),f14(x5571),a1)+P8(f4(a1),x5571,a1)
% 14.25/14.38 [558]~P9(f3(a1),f14(x5581),a1)+P9(f3(a1),x5581,a1)
% 14.25/14.38 [559]~P9(f4(a1),f14(x5591),a1)+P9(f4(a1),x5591,a1)
% 14.25/14.38 [564]E(x5641,f3(a1))+P9(f3(a1),f10(x5641,x5641,a1),a1)
% 14.25/14.38 [327]~P40(x3271)+E(f15(f3(x3271),x3271),f3(a1))
% 14.25/14.38 [328]~P39(x3281)+E(f15(f4(x3281),x3281),f4(a1))
% 14.25/14.38 [330]~P2(x3301)+E(f8(f3(x3301),x3301),f3(x3301))
% 14.25/14.38 [331]~P48(x3311)+E(f8(f4(x3311),x3311),f4(x3311))
% 14.25/14.38 [332]~P5(x3321)+E(f13(f3(x3321),x3321),f3(x3321))
% 14.25/14.38 [333]~P24(x3331)+E(f13(f3(x3331),x3331),f3(x3331))
% 14.25/14.38 [334]~P4(x3341)+E(f5(f3(x3341),x3341),f3(x3341))
% 14.25/14.38 [335]~P57(x3351)+E(f5(f4(x3351),x3351),f4(x3351))
% 14.25/14.38 [336]~P57(x3361)+E(f12(f3(x3361),x3361),f3(x3361))
% 14.25/14.38 [337]~P40(x3371)+E(f12(f3(x3371),x3371),f3(x3371))
% 14.25/14.38 [338]~P58(x3381)+E(f12(f3(x3381),x3381),f3(x3381))
% 14.25/14.38 [339]~P39(x3391)+E(f12(f4(x3391),x3391),f4(x3391))
% 14.25/14.38 [418]~P26(x4181)+E(f11(f3(x4181),f3(x4181),x4181),f3(x4181))
% 14.25/14.38 [464]~P40(x4641)+P8(f15(f3(x4641),x4641),f3(a1),a1)
% 14.25/14.38 [469]~P4(x4691)+P8(f5(f3(x4691),x4691),f3(x4691),x4691)
% 14.25/14.38 [560]~P40(x5601)+~P9(f3(a1),f15(f3(x5601),x5601),a1)
% 14.25/14.38 [563]~P4(x5631)+~P9(f3(x5631),f5(f3(x5631),x5631),x5631)
% 14.25/14.38 [653]~P62(x6531)+P9(f3(x6531),f11(f4(x6531),f4(x6531),x6531),x6531)
% 14.25/14.38 [371]~P40(x3711)+E(f15(f12(f3(x3711),x3711),x3711),f3(a1))
% 14.25/14.38 [455]~P41(x4551)+E(f16(f4(x4551),f3(f27(x4551)),x4551),f4(f27(x4551)))
% 14.25/14.38 [456]~P7(x4561)+E(f16(f3(x4561),f3(f27(x4561)),x4561),f3(f27(x4561)))
% 14.25/14.38 [775]~P59(x7751)+E(f11(f10(f3(x7751),f3(x7751),x7751),f10(f3(x7751),f3(x7751),x7751),x7751),f3(x7751))
% 14.25/14.38 [1080]~P59(x10801)+P8(f11(f10(f3(x10801),f3(x10801),x10801),f10(f3(x10801),f3(x10801),x10801),x10801),f3(x10801),x10801)
% 14.25/14.38 [1108]~P8(a28,f15(x11081,a2),a1)+P8(f11(a29,f15(a30,a2),a1),f15(f17(f16(a31,a32,a2),x11081,a2),a2),a1)
% 14.25/14.38 [1119]~P59(x11191)+~P9(f3(x11191),f11(f10(f3(x11191),f3(x11191),x11191),f10(f3(x11191),f3(x11191),x11191),x11191),x11191)
% 14.25/14.38 [368]~P35(x3682)+P8(x3681,x3681,x3682)
% 14.25/14.38 [369]~P36(x3692)+P8(x3691,x3691,x3692)
% 14.25/14.38 [370]~P41(x3702)+P10(x3701,x3701,x3702)
% 14.25/14.38 [448]~P9(x4482,x4482,x4481)+~P29(x4481)
% 14.25/14.38 [449]~P9(x4492,x4492,x4491)+~P35(x4491)
% 14.25/14.38 [450]~P9(x4502,x4502,x4501)+~P36(x4501)
% 14.25/14.38 [471]P8(x4712,x4711,a1)+P8(x4711,x4712,a1)
% 14.25/14.38 [514]~P9(x5141,x5142,a1)+P8(x5141,x5142,a1)
% 14.25/14.38 [272]E(x2721,x2722)+~E(f14(x2721),f14(x2722))
% 14.25/14.38 [372]~P20(x3722)+E(f10(x3721,x3721,x3722),x3721)
% 14.25/14.38 [375]~P5(x3752)+E(f7(x3751,x3751,x3752),f3(x3752))
% 14.25/14.38 [376]~P13(x3762)+E(f7(x3761,x3761,x3762),f3(x3762))
% 14.25/14.38 [377]~P41(x3772)+P10(x3771,f3(x3772),x3772)
% 14.25/14.38 [378]~P41(x3781)+P10(f4(x3781),x3782,x3781)
% 14.25/14.38 [432]~P4(x4322)+P8(x4321,f5(x4321,x4322),x4322)
% 14.25/14.38 [434]~P40(x4342)+P8(f3(a1),f15(x4341,x4342),a1)
% 14.25/14.38 [435]~P34(x4352)+P8(f3(a1),f18(x4351,x4352),a1)
% 14.25/14.38 [436]~P34(x4362)+P8(f3(a1),f23(x4361,x4362),a1)
% 14.25/14.38 [437]~P34(x4372)+P8(f3(a1),f19(x4371,x4372),a1)
% 14.25/14.38 [438]~P34(x4382)+P9(f3(a1),f24(x4381,x4382),a1)
% 14.25/14.38 [439]~P34(x4392)+P9(f3(a1),f21(x4391,x4392),a1)
% 14.25/14.38 [440]~P34(x4402)+P9(f3(a1),f26(x4401,x4402),a1)
% 14.25/14.38 [451]~P4(x4511)+P8(f3(x4511),f5(x4512,x4511),x4511)
% 14.25/14.38 [482]~P4(x4822)+P8(f13(x4821,x4822),f5(x4821,x4822),x4822)
% 14.25/14.38 [513]~P40(x5131)+~P9(f15(x5132,x5131),f3(a1),a1)
% 14.25/14.38 [525]~P4(x5251)+~P9(f5(x5252,x5251),f3(x5251),x5251)
% 14.25/14.38 [531]~P8(x5311,x5312,a1)+P8(f14(x5311),f14(x5312),a1)
% 14.25/14.38 [532]~P9(x5321,x5322,a1)+P9(f14(x5321),f14(x5322),a1)
% 14.25/14.38 [561]P8(x5611,x5612,a1)+~P8(f14(x5611),f14(x5612),a1)
% 14.25/14.38 [562]P9(x5621,x5622,a1)+~P9(f14(x5621),f14(x5622),a1)
% 14.25/14.38 [577]P8(x5771,x5772,a1)+~P8(f5(x5771,a1),x5772,a1)
% 14.25/14.38 [583]~P59(x5831)+P8(f3(x5831),f10(x5832,x5832,x5831),x5831)
% 14.25/14.38 [717]~P8(x7171,x7172,a1)+P8(f7(x7171,x7172,a1),f3(a1),a1)
% 14.25/14.38 [733]~P59(x7331)+~P9(f10(x7332,x7332,x7331),f3(x7331),x7331)
% 14.25/14.38 [761]P8(x7611,x7612,a1)+~P8(f7(x7611,x7612,a1),f3(a1),a1)
% 14.25/14.38 [352]~P14(x3522)+E(f13(f13(x3521,x3522),x3522),x3521)
% 14.25/14.38 [354]~P5(x3542)+E(f13(f13(x3541,x3542),x3542),x3541)
% 14.25/14.38 [362]~P40(x3622)+E(f5(f15(x3621,x3622),a1),f15(x3621,x3622))
% 14.25/14.38 [364]~P4(x3642)+E(f5(f13(x3641,x3642),x3642),f5(x3641,x3642))
% 14.25/14.38 [365]~P4(x3652)+E(f5(f5(x3651,x3652),x3652),f5(x3651,x3652))
% 14.25/14.38 [366]~P40(x3662)+E(f15(f13(x3661,x3662),x3662),f15(x3661,x3662))
% 14.25/14.38 [367]~P57(x3672)+E(f12(f12(x3671,x3672),x3672),f12(x3671,x3672))
% 14.25/14.38 [379]~P47(x3792)+E(f9(x3791,f4(x3792),x3792),x3791)
% 14.25/14.38 [380]~P41(x3802)+E(f10(x3801,f4(x3802),x3802),x3801)
% 14.25/14.38 [381]~P28(x3812)+E(f10(x3811,f4(x3812),x3812),x3811)
% 14.25/14.38 [382]~P5(x3822)+E(f7(x3821,f3(x3822),x3822),x3821)
% 14.25/14.38 [383]~P11(x3832)+E(f6(x3831,f4(x3832),x3832),x3831)
% 14.25/14.38 [384]~P41(x3842)+E(f11(x3841,f3(x3842),x3842),x3841)
% 14.25/14.38 [385]~P15(x3852)+E(f11(x3851,f3(x3852),x3852),x3851)
% 14.25/14.38 [386]~P27(x3862)+E(f11(x3861,f3(x3862),x3862),x3861)
% 14.25/14.38 [388]~P41(x3881)+E(f10(f4(x3881),x3882,x3881),x3882)
% 14.25/14.38 [389]~P28(x3891)+E(f10(f4(x3891),x3892,x3891),x3892)
% 14.25/14.38 [390]~P22(x3901)+E(f10(f4(x3901),x3902,x3901),x3902)
% 14.25/14.38 [392]~P41(x3921)+E(f11(f3(x3921),x3922,x3921),x3922)
% 14.25/14.38 [393]~P15(x3931)+E(f11(f3(x3931),x3932,x3931),x3932)
% 14.25/14.38 [394]~P27(x3941)+E(f11(f3(x3941),x3942,x3941),x3942)
% 14.25/14.38 [399]~P41(x3992)+E(f10(x3991,f3(x3992),x3992),f3(x3992))
% 14.25/14.38 [401]~P34(x4012)+E(f10(x4011,f3(x4012),x4012),f3(x4012))
% 14.25/14.38 [402]~P68(x4022)+E(f10(x4021,f3(x4022),x4022),f3(x4022))
% 14.25/14.38 [403]~P56(x4032)+E(f10(x4031,f3(x4032),x4032),f3(x4032))
% 14.25/14.38 [404]~P11(x4042)+E(f6(x4041,f3(x4042),x4042),f3(x4042))
% 14.25/14.38 [405]~P47(x4051)+E(f9(f3(x4051),x4052,x4051),f3(x4051))
% 14.25/14.38 [406]~P3(x4061)+E(f9(f3(x4061),x4062,x4061),f3(x4061))
% 14.25/14.38 [408]~P41(x4081)+E(f10(f3(x4081),x4082,x4081),f3(x4081))
% 14.25/14.38 [410]~P34(x4101)+E(f10(f3(x4101),x4102,x4101),f3(x4101))
% 14.25/14.38 [411]~P68(x4111)+E(f10(f3(x4111),x4112,x4111),f3(x4111))
% 14.25/14.38 [412]~P56(x4121)+E(f10(f3(x4121),x4122,x4121),f3(x4121))
% 14.25/14.38 [413]~P11(x4131)+E(f6(f3(x4131),x4132,x4131),f3(x4131))
% 14.25/14.38 [423]~P47(x4231)+E(f9(f4(x4231),x4232,x4231),f8(x4232,x4231))
% 14.25/14.38 [424]~P5(x4241)+E(f7(f3(x4241),x4242,x4241),f13(x4242,x4241))
% 14.25/14.38 [430]~P40(x4302)+E(f12(f13(x4301,x4302),x4302),f13(f12(x4301,x4302),x4302))
% 14.25/14.38 [442]~P5(x4422)+E(f11(x4421,f13(x4421,x4422),x4422),f3(x4422))
% 14.25/14.38 [444]~P5(x4442)+E(f11(f13(x4441,x4442),x4441,x4442),f3(x4442))
% 14.25/14.38 [445]~P13(x4452)+E(f11(f13(x4451,x4452),x4451,x4452),f3(x4452))
% 14.25/14.38 [463]~P57(x4632)+E(f10(x4631,f12(x4631,x4632),x4632),f5(x4631,x4632))
% 14.25/14.38 [485]~P57(x4852)+E(f10(f12(x4851,x4852),f5(x4851,x4852),x4852),x4851)
% 14.25/14.38 [526]~P4(x5262)+P8(f13(f5(x5261,x5262),x5262),f3(x5262),x5262)
% 14.25/14.38 [567]~P50(x5672)+E(f10(f13(x5671,x5672),f13(x5671,x5672),x5672),f10(x5671,x5671,x5672))
% 14.25/14.38 [568]~P57(x5682)+E(f10(f5(x5681,x5682),f5(x5681,x5682),x5682),f10(x5681,x5681,x5682))
% 14.25/14.38 [604]~P62(x6042)+P9(x6041,f11(x6041,f4(x6042),x6042),x6042)
% 14.25/14.38 [903]E(x9031,f3(a1))+~E(f11(f10(x9032,x9032,a1),f10(x9031,x9031,a1),a1),f3(a1))
% 14.25/14.38 [904]E(x9041,f3(a1))+~E(f11(f10(x9041,x9041,a1),f10(x9042,x9042,a1),a1),f3(a1))
% 14.25/14.38 [1031]E(x10311,f3(a1))+P9(f3(a1),f11(f10(x10312,x10312,a1),f10(x10311,x10311,a1),a1),a1)
% 14.25/14.38 [1032]E(x10321,f3(a1))+P9(f3(a1),f11(f10(x10321,x10321,a1),f10(x10322,x10322,a1),a1),a1)
% 14.25/14.38 [426]~P50(x4261)+E(f17(f3(f27(x4261)),x4262,x4261),f3(x4261))
% 14.25/14.38 [427]~P45(x4271)+E(f17(f3(f27(x4271)),x4272,x4271),f3(x4271))
% 14.25/14.38 [428]~P41(x4281)+E(f17(f4(f27(x4281)),x4282,x4281),f4(x4281))
% 14.25/14.38 [483]~P6(x4831)+E(f10(f13(f4(x4831),x4831),x4832,x4831),f13(x4832,x4831))
% 14.25/14.38 [719]~P41(x7192)+E(f11(x7191,x7191,x7192),f10(f11(f4(x7192),f4(x7192),x7192),x7191,x7192))
% 14.25/14.38 [490]~P41(x4903)+E(f10(x4901,x4902,x4903),f10(x4902,x4901,x4903))
% 14.25/14.38 [492]~P41(x4923)+E(f11(x4921,x4922,x4923),f11(x4922,x4921,x4923))
% 14.25/14.38 [493]~P15(x4933)+E(f11(x4931,x4932,x4933),f11(x4932,x4931,x4933))
% 14.25/14.38 [569]~P41(x5693)+P10(x5691,f10(x5692,x5691,x5693),x5693)
% 14.25/14.38 [570]~P41(x5703)+P10(x5701,f10(x5701,x5702,x5703),x5703)
% 14.25/14.38 [571]~P49(x5713)+P10(x5711,f10(x5711,x5712,x5713),x5713)
% 14.25/14.38 [809]~P8(x8092,x8093,a1)+P8(f11(x8091,x8092,a1),f11(x8091,x8093,a1),a1)
% 14.25/14.38 [519]~P47(x5193)+E(f10(x5191,f8(x5192,x5193),x5193),f9(x5191,x5192,x5193))
% 14.25/14.38 [520]~P5(x5203)+E(f11(x5201,f13(x5202,x5203),x5203),f7(x5201,x5202,x5203))
% 14.25/14.38 [521]~P6(x5213)+E(f11(x5211,f13(x5212,x5213),x5213),f7(x5211,x5212,x5213))
% 14.25/14.38 [523]~P13(x5233)+E(f11(x5231,f13(x5232,x5233),x5233),f7(x5231,x5232,x5233))
% 14.25/14.38 [524]~P5(x5243)+E(f7(x5241,f13(x5242,x5243),x5243),f11(x5241,x5242,x5243))
% 14.25/14.38 [565]~P60(x5652)+E(f10(f13(x5651,x5652),x5653,x5652),f10(x5651,f13(x5653,x5652),x5652))
% 14.25/14.38 [566]~P60(x5662)+E(f10(f13(x5661,x5662),f13(x5663,x5662),x5662),f10(x5661,x5663,x5662))
% 14.25/14.38 [572]~P5(x5723)+E(f7(f11(x5721,x5722,x5723),x5722,x5723),x5721)
% 14.25/14.38 [573]~P5(x5733)+E(f11(f7(x5731,x5732,x5733),x5732,x5733),x5731)
% 14.25/14.38 [612]~P13(x6123)+E(f13(f7(x6121,x6122,x6123),x6123),f7(x6122,x6121,x6123))
% 14.25/14.38 [642]~P13(x6422)+E(f11(f13(x6421,x6422),f11(x6423,x6421,x6422),x6422),x6423)
% 14.25/14.38 [643]~P5(x6432)+E(f11(f13(x6431,x6432),f11(x6431,x6433,x6432),x6432),x6433)
% 14.25/14.38 [663]~P60(x6633)+E(f10(x6631,f13(x6632,x6633),x6633),f13(f10(x6631,x6632,x6633),x6633))
% 14.25/14.38 [664]~P47(x6642)+E(f9(f13(x6641,x6642),x6643,x6642),f13(f9(x6641,x6643,x6642),x6642))
% 14.25/14.38 [665]~P60(x6652)+E(f10(f13(x6651,x6652),x6653,x6652),f13(f10(x6651,x6653,x6652),x6652))
% 14.25/14.38 [667]~P34(x6673)+E(f10(x6671,f13(x6672,x6673),x6673),f13(f10(x6671,x6672,x6673),x6673))
% 14.25/14.38 [668]~P3(x6682)+E(f9(f13(x6681,x6682),x6683,x6682),f13(f9(x6681,x6683,x6682),x6682))
% 14.25/14.38 [670]~P34(x6702)+E(f10(f13(x6701,x6702),x6703,x6702),f13(f10(x6701,x6703,x6702),x6702))
% 14.25/14.38 [695]~P20(x6953)+E(f10(x6951,f10(x6951,x6952,x6953),x6953),f10(x6951,x6952,x6953))
% 14.25/14.38 [698]~P38(x6982)+E(f10(f15(x6981,x6982),f15(x6983,x6982),a1),f15(f10(x6981,x6983,x6982),x6982))
% 14.25/14.38 [699]~P5(x6992)+E(f11(f13(x6991,x6992),f13(x6993,x6992),x6992),f13(f11(x6993,x6991,x6992),x6992))
% 14.25/14.38 [700]~P13(x7002)+E(f11(f13(x7001,x7002),f13(x7003,x7002),x7002),f13(f11(x7001,x7003,x7002),x7002))
% 14.25/14.38 [701]~P57(x7012)+E(f10(f5(x7011,x7012),f5(x7013,x7012),x7012),f5(f10(x7011,x7013,x7012),x7012))
% 14.25/14.38 [702]~P57(x7022)+E(f10(f12(x7021,x7022),f12(x7023,x7022),x7022),f12(f10(x7021,x7023,x7022),x7022))
% 14.25/14.38 [703]~P38(x7032)+E(f10(f12(x7031,x7032),f12(x7033,x7032),x7032),f12(f10(x7031,x7033,x7032),x7032))
% 14.25/14.38 [704]~P13(x7042)+E(f7(f13(x7041,x7042),f13(x7043,x7042),x7042),f13(f7(x7041,x7043,x7042),x7042))
% 14.25/14.38 [720]~P4(x7203)+E(f5(f7(x7201,x7202,x7203),x7203),f5(f7(x7202,x7201,x7203),x7203))
% 14.25/14.38 [721]~P40(x7213)+E(f15(f7(x7211,x7212,x7213),x7213),f15(f7(x7212,x7211,x7213),x7213))
% 14.25/14.38 [753]~P50(x7532)+P10(f10(x7531,f3(x7532),x7532),f10(x7533,f3(x7532),x7532),x7532)
% 14.25/14.38 [754]~P50(x7541)+P10(f10(f3(x7541),x7542,x7541),f10(f3(x7541),x7543,x7541),x7541)
% 14.25/14.38 [911]~P8(f15(x9112,a2),x9113,a1)+P8(f15(f17(x9111,x9112,a2),a2),f34(x9111,x9113),a1)
% 14.25/14.38 [976]~P34(x9763)+P8(f15(f10(x9761,x9762,x9763),x9763),f10(f15(x9762,x9763),f26(x9761,x9763),a1),a1)
% 14.25/14.38 [977]~P34(x9773)+P8(f15(f10(x9771,x9772,x9773),x9773),f10(f15(x9772,x9773),f23(x9771,x9773),a1),a1)
% 14.25/14.38 [978]~P34(x9783)+P8(f15(f10(x9781,x9782,x9783),x9783),f10(f15(x9782,x9783),f25(x9781,x9783),a1),a1)
% 14.25/14.38 [979]~P34(x9793)+P8(f15(f10(x9791,x9792,x9793),x9793),f10(f15(x9791,x9793),f15(x9792,x9793),a1),a1)
% 14.25/14.38 [980]~P34(x9803)+P8(f15(f10(x9801,x9802,x9803),x9803),f10(f15(x9801,x9803),f24(x9802,x9803),a1),a1)
% 14.25/14.38 [981]~P34(x9813)+P8(f15(f10(x9811,x9812,x9813),x9813),f10(f15(x9811,x9813),f18(x9812,x9813),a1),a1)
% 14.25/14.38 [982]~P34(x9823)+P8(f15(f10(x9821,x9822,x9823),x9823),f10(f15(x9821,x9823),f22(x9822,x9823),a1),a1)
% 14.25/14.38 [983]~P40(x9833)+P8(f15(f7(x9831,x9832,x9833),x9833),f11(f15(x9831,x9833),f15(x9832,x9833),a1),a1)
% 14.25/14.38 [984]~P40(x9843)+P8(f15(f11(x9841,x9842,x9843),x9843),f11(f15(x9841,x9843),f15(x9842,x9843),a1),a1)
% 14.25/14.38 [985]~P40(x9852)+P8(f7(f15(x9851,x9852),f15(x9853,x9852),a1),f15(f7(x9851,x9853,x9852),x9852),a1)
% 14.25/14.38 [986]~P40(x9862)+P8(f7(f15(x9861,x9862),f15(x9863,x9862),a1),f15(f11(x9861,x9863,x9862),x9862),a1)
% 14.25/14.38 [988]~P52(x9883)+P8(f5(f10(x9881,x9882,x9883),x9883),f10(f5(x9881,x9883),f5(x9882,x9883),x9883),x9883)
% 14.25/14.38 [989]~P4(x9893)+P8(f5(f7(x9891,x9892,x9893),x9893),f11(f5(x9891,x9893),f5(x9892,x9893),x9893),x9893)
% 14.25/14.38 [990]~P4(x9903)+P8(f5(f11(x9901,x9902,x9903),x9903),f11(f5(x9901,x9903),f5(x9902,x9903),x9903),x9903)
% 14.25/14.38 [991]~P4(x9912)+P8(f7(f5(x9911,x9912),f5(x9913,x9912),x9912),f5(f7(x9911,x9913,x9912),x9912),x9912)
% 14.25/14.38 [1059]~P59(x10591)+P8(f3(x10591),f11(f10(x10592,x10592,x10591),f10(x10593,x10593,x10591),x10591),x10591)
% 14.25/14.38 [1109]~P59(x11091)+~P9(f11(f10(x11092,x11092,x11091),f10(x11093,x11093,x11091),x11091),f3(x11091),x11091)
% 14.25/14.38 [694]~P5(x6942)+E(f11(x6941,f11(f13(x6941,x6942),x6943,x6942),x6942),x6943)
% 14.25/14.38 [759]~P11(x7591)+E(f6(f10(f3(x7591),x7592,x7591),f10(f3(x7591),x7593,x7591),x7591),f3(x7591))
% 14.25/14.38 [800]~P4(x8002)+E(f5(f11(f5(x8001,x8002),f5(x8003,x8002),x8002),x8002),f11(f5(x8001,x8002),f5(x8003,x8002),x8002))
% 14.25/14.38 [805]~P41(x8053)+E(f11(x8051,f10(x8052,x8051,x8053),x8053),f10(f11(x8052,f4(x8053),x8053),x8051,x8053))
% 14.25/14.38 [806]~P41(x8063)+E(f11(f10(x8061,x8062,x8063),x8062,x8063),f10(f11(x8061,f4(x8063),x8063),x8062,x8063))
% 14.25/14.38 [1088]~P8(f15(x10883,a2),x10882,a1)+P8(f15(f17(x10881,f35(x10881,x10882),a2),a2),f15(f17(x10881,x10883,a2),a2),a1)
% 14.25/14.38 [1089]~P40(x10892)+P8(f5(f7(f15(x10891,x10892),f15(x10893,x10892),a1),a1),f15(f7(x10891,x10893,x10892),x10892),a1)
% 14.25/14.38 [1090]~P4(x10902)+P8(f5(f7(f5(x10901,x10902),f5(x10903,x10902),x10902),x10902),f5(f7(x10901,x10903,x10902),x10902),x10902)
% 14.25/14.38 [776]~P41(x7764)+E(f10(x7761,f10(x7762,x7763,x7764),x7764),f10(x7762,f10(x7761,x7763,x7764),x7764))
% 14.25/14.38 [777]~P41(x7774)+E(f11(x7771,f11(x7772,x7773,x7774),x7774),f11(x7772,f11(x7771,x7773,x7774),x7774))
% 14.25/14.38 [778]~P13(x7784)+E(f11(x7781,f11(x7782,x7783,x7784),x7784),f11(x7782,f11(x7781,x7783,x7784),x7784))
% 14.25/14.38 [779]~P15(x7794)+E(f11(x7791,f11(x7792,x7793,x7794),x7794),f11(x7792,f11(x7791,x7793,x7794),x7794))
% 14.25/14.38 [784]~P41(x7843)+E(f10(f10(x7841,x7842,x7843),x7844,x7843),f10(x7841,f10(x7842,x7844,x7843),x7843))
% 14.25/14.38 [785]~P18(x7853)+E(f10(f10(x7851,x7852,x7853),x7854,x7853),f10(x7851,f10(x7852,x7854,x7853),x7853))
% 14.25/14.38 [786]~P41(x7863)+E(f11(f11(x7861,x7862,x7863),x7864,x7863),f11(x7861,f11(x7862,x7864,x7863),x7863))
% 14.25/14.38 [787]~P15(x7873)+E(f11(f11(x7871,x7872,x7873),x7874,x7873),f11(x7871,f11(x7872,x7874,x7873),x7873))
% 14.25/14.38 [788]~P19(x7883)+E(f11(f11(x7881,x7882,x7883),x7884,x7883),f11(x7881,f11(x7882,x7884,x7883),x7883))
% 14.25/14.38 [789]~P41(x7893)+E(f10(f10(x7891,x7892,x7893),x7894,x7893),f10(f10(x7891,x7894,x7893),x7892,x7893))
% 14.25/14.38 [790]~P41(x7903)+E(f11(f11(x7901,x7902,x7903),x7904,x7903),f11(f11(x7901,x7904,x7903),x7902,x7903))
% 14.25/14.38 [917]~P34(x9173)+E(f7(f10(x9171,x9172,x9173),f10(x9171,x9174,x9173),x9173),f10(x9171,f7(x9172,x9174,x9173),x9173))
% 14.25/14.38 [918]~P41(x9183)+E(f11(f10(x9181,x9182,x9183),f10(x9181,x9184,x9183),x9183),f10(x9181,f11(x9182,x9184,x9183),x9183))
% 14.25/14.38 [920]~P34(x9203)+E(f11(f10(x9201,x9202,x9203),f10(x9201,x9204,x9203),x9203),f10(x9201,f11(x9202,x9204,x9203),x9203))
% 14.25/14.38 [921]~P47(x9213)+E(f7(f9(x9211,x9212,x9213),f9(x9214,x9212,x9213),x9213),f9(f7(x9211,x9214,x9213),x9212,x9213))
% 14.25/14.38 [922]~P3(x9223)+E(f7(f9(x9221,x9222,x9223),f9(x9224,x9222,x9223),x9223),f9(f7(x9221,x9224,x9223),x9222,x9223))
% 14.25/14.38 [923]~P47(x9233)+E(f11(f9(x9231,x9232,x9233),f9(x9234,x9232,x9233),x9233),f9(f11(x9231,x9234,x9233),x9232,x9233))
% 14.25/14.38 [924]~P3(x9243)+E(f11(f9(x9241,x9242,x9243),f9(x9244,x9242,x9243),x9243),f9(f11(x9241,x9244,x9243),x9242,x9243))
% 14.25/14.38 [926]~P34(x9263)+E(f7(f10(x9261,x9262,x9263),f10(x9264,x9262,x9263),x9263),f10(f7(x9261,x9264,x9263),x9262,x9263))
% 14.25/14.38 [929]~P34(x9293)+E(f11(f10(x9291,x9292,x9293),f10(x9294,x9292,x9293),x9293),f10(f11(x9291,x9294,x9293),x9292,x9293))
% 14.25/14.38 [930]~P46(x9303)+E(f11(f10(x9301,x9302,x9303),f10(x9304,x9302,x9303),x9303),f10(f11(x9301,x9304,x9303),x9302,x9303))
% 14.25/14.38 [931]~P41(x9313)+E(f11(f10(x9311,x9312,x9313),f10(x9314,x9312,x9313),x9313),f10(f11(x9311,x9314,x9313),x9312,x9313))
% 14.25/14.38 [1103]~P34(x11033)+P8(f15(f10(x11031,x11032,x11033),x11033),f10(f10(f15(x11031,x11033),f15(x11032,x11033),a1),f21(x11034,x11033),a1),a1)
% 14.25/14.38 [1104]~P34(x11043)+P8(f15(f10(x11041,x11042,x11043),x11043),f10(f10(f15(x11041,x11043),f15(x11042,x11043),a1),f19(x11044,x11043),a1),a1)
% 14.25/14.38 [1105]~P34(x11053)+P8(f15(f10(x11051,x11052,x11053),x11053),f10(f10(f15(x11051,x11053),f15(x11052,x11053),a1),f20(x11054,x11053),a1),a1)
% 14.25/14.38 [1008]~P45(x10084)+E(f11(x10081,f10(x10082,f17(x10083,x10082,x10084),x10084),x10084),f17(f16(x10081,x10083,x10084),x10082,x10084))
% 14.25/14.38 [1009]~P41(x10093)+E(f10(f10(x10091,x10092,x10093),f10(x10094,x10095,x10093),x10093),f10(f10(x10091,x10094,x10093),f10(x10092,x10095,x10093),x10093))
% 14.25/14.38 [1010]~P13(x10103)+E(f7(f11(x10101,x10102,x10103),f11(x10104,x10105,x10103),x10103),f11(f7(x10101,x10104,x10103),f7(x10102,x10105,x10103),x10103))
% 14.25/14.38 [1011]~P41(x10113)+E(f11(f11(x10111,x10112,x10113),f11(x10114,x10115,x10113),x10113),f11(f11(x10111,x10114,x10113),f11(x10112,x10115,x10113),x10113))
% 14.25/14.38 [1102]~P69(x11023)+E(f11(f10(x11021,x11022,x11023),f11(f10(x11024,x11022,x11023),x11025,x11023),x11023),f11(f10(f11(x11021,x11024,x11023),x11022,x11023),x11025,x11023))
% 14.25/14.38 [1132]~P40(x11323)+P8(f15(f7(f11(x11321,x11322,x11323),f11(x11324,x11325,x11323),x11323),x11323),f11(f15(f7(x11321,x11324,x11323),x11323),f15(f7(x11322,x11325,x11323),x11323),a1),a1)
% 14.25/14.38 [1133]~P4(x11333)+P8(f5(f7(f11(x11331,x11332,x11333),f11(x11334,x11335,x11333),x11333),x11333),f11(f5(f7(x11331,x11334,x11333),x11333),f5(f7(x11332,x11335,x11333),x11333),x11333),x11333)
% 14.25/14.38 [1134]~P34(x11343)+E(f11(f11(f10(f7(x11341,x11342,x11343),f7(x11344,x11345,x11343),x11343),f10(f7(x11341,x11342,x11343),x11345,x11343),x11343),f10(x11342,f7(x11344,x11345,x11343),x11343),x11343),f7(f10(x11341,x11344,x11343),f10(x11342,x11345,x11343),x11343))
% 14.25/14.38 [1118]~P60(x11183)+E(f11(f10(x11181,x11182,x11183),f11(f10(f7(x11184,x11181,x11183),x11182,x11183),x11185,x11183),x11183),f11(f10(x11184,x11182,x11183),x11185,x11183))
% 14.25/14.38 [1131]~P37(x11314)+E(f11(f10(x11311,f9(f7(x11312,x11313,x11314),x11315,x11314),x11314),f10(f9(f7(x11311,x11316,x11314),x11315,x11314),x11313,x11314),x11314),f9(f7(f10(x11311,x11312,x11314),f10(x11316,x11313,x11314),x11314),x11315,x11314))
% 14.25/14.38 [342]~P2(x3421)+~P47(x3421)+E(f8(f4(x3421),x3421),f4(x3421))
% 14.25/14.38 [613]~P33(x6131)+~P8(f3(x6131),f3(x6131),x6131)+E(f11(f3(x6131),f3(x6131),x6131),f3(x6131))
% 14.25/14.38 [517]E(x5171,x5172)+P9(x5171,x5172,a1)+~P8(x5171,x5172,a1)
% 14.25/14.38 [574]E(x5741,x5742)+~P8(x5742,x5741,a1)+~P8(x5741,x5742,a1)
% 14.25/14.38 [340]~P24(x3402)+~E(f13(x3401,x3402),x3401)+E(x3401,f3(x3402))
% 14.25/14.38 [343]~P40(x3432)+E(x3431,f3(x3432))+~E(f15(x3431,x3432),f3(a1))
% 14.25/14.38 [344]~P48(x3442)+~E(f8(x3441,x3442),f3(x3442))+E(x3441,f3(x3442))
% 14.25/14.38 [345]~P5(x3452)+~E(f13(x3451,x3452),f3(x3452))+E(x3451,f3(x3452))
% 14.25/14.38 [346]~P4(x3462)+~E(f5(x3461,x3462),f3(x3462))+E(x3461,f3(x3462))
% 14.25/14.38 [347]~P57(x3472)+~E(f12(x3471,x3472),f3(x3472))+E(x3471,f3(x3472))
% 14.25/14.38 [348]~P40(x3482)+~E(f12(x3481,x3482),f3(x3482))+E(x3481,f3(x3482))
% 14.25/14.38 [349]~P5(x3491)+~E(f13(x3492,x3491),f3(x3491))+E(f3(x3491),x3492)
% 14.25/14.38 [397]~P47(x3972)+E(f9(x3971,x3971,x3972),f4(x3972))+E(x3971,f3(x3972))
% 14.25/14.38 [398]~P11(x3982)+E(f6(x3981,x3981,x3982),f4(x3982))+E(x3981,f3(x3982))
% 14.25/14.38 [414]~P6(x4142)+~P50(x4142)+E(f7(x4141,x4141,x4142),f3(x4142))
% 14.25/14.38 [425]~P43(x4252)+P9(x4251,f3(x4252),x4252)+E(f5(x4251,x4252),x4251)
% 14.25/14.38 [454]~P40(x4542)+E(x4541,f3(x4542))+P9(f3(a1),f15(x4541,x4542),a1)
% 14.25/14.38 [457]~P57(x4571)+P9(f3(x4571),x4572,x4571)+~E(f12(x4572,x4571),f4(x4571))
% 14.25/14.38 [461]~P4(x4612)+P9(f3(x4612),f5(x4611,x4612),x4612)+E(x4611,f3(x4612))
% 14.25/14.38 [468]~P26(x4682)+~E(f11(x4681,x4681,x4682),f3(x4682))+E(x4681,f3(x4682))
% 14.25/14.38 [475]~P41(x4752)+~P10(f3(x4752),x4751,x4752)+E(x4751,f3(x4752))
% 14.25/14.38 [499]~P4(x4992)+~P8(f3(x4992),x4991,x4992)+E(f5(x4991,x4992),x4991)
% 14.25/14.38 [500]~P4(x5002)+~P9(f3(x5002),x5001,x5002)+E(f5(x5001,x5002),x5001)
% 14.25/14.38 [507]~P57(x5072)+~P9(f3(x5072),x5071,x5072)+E(f12(x5071,x5072),f4(x5072))
% 14.25/14.38 [510]~P4(x5102)+~P8(x5101,f3(x5102),x5102)+E(f13(x5101,x5102),f5(x5101,x5102))
% 14.25/14.38 [511]~P4(x5112)+~P9(x5111,f3(x5112),x5112)+E(f13(x5111,x5112),f5(x5111,x5112))
% 14.25/14.38 [512]~P43(x5122)+~P9(x5121,f3(x5122),x5122)+E(f13(x5121,x5122),f5(x5121,x5122))
% 14.25/14.38 [518]~P40(x5182)+E(x5181,f3(x5182))+~P8(f15(x5181,x5182),f3(a1),a1)
% 14.25/14.38 [529]~P4(x5292)+~P8(f5(x5291,x5292),f3(x5292),x5292)+E(x5291,f3(x5292))
% 14.25/14.38 [614]~P24(x6142)+~P8(x6141,f3(x6142),x6142)+P8(x6141,f13(x6141,x6142),x6142)
% 14.25/14.38 [615]~P26(x6152)+~P8(x6151,f3(x6152),x6152)+P8(x6151,f13(x6151,x6152),x6152)
% 14.25/14.38 [616]~P57(x6162)+~P9(x6161,f3(x6162),x6162)+P9(x6161,f13(x6161,x6162),x6162)
% 14.25/14.38 [617]~P24(x6172)+~P8(f3(x6172),x6171,x6172)+P8(f13(x6171,x6172),x6171,x6172)
% 14.25/14.38 [618]~P26(x6182)+~P8(f3(x6182),x6181,x6182)+P8(f13(x6181,x6182),x6181,x6182)
% 14.25/14.38 [627]~P23(x6271)+~P8(x6272,f3(x6271),x6271)+P8(f3(x6271),f13(x6272,x6271),x6271)
% 14.25/14.38 [628]~P23(x6281)+~P9(x6282,f3(x6281),x6281)+P9(f3(x6281),f13(x6282,x6281),x6281)
% 14.25/14.38 [629]~P1(x6291)+~P9(f3(x6291),x6292,x6291)+P9(f3(x6291),f8(x6292,x6291),x6291)
% 14.25/14.38 [630]~P57(x6301)+~P9(f3(x6301),x6302,x6301)+P9(f3(x6301),f12(x6302,x6301),x6301)
% 14.25/14.38 [631]~P1(x6312)+~P9(x6311,f3(x6312),x6312)+P9(f8(x6311,x6312),f3(x6312),x6312)
% 14.25/14.38 [632]~P57(x6322)+~P9(x6321,f3(x6322),x6322)+P9(f12(x6321,x6322),f3(x6322),x6322)
% 14.25/14.38 [633]~P23(x6332)+~P8(f3(x6332),x6331,x6332)+P8(f13(x6331,x6332),f3(x6332),x6332)
% 14.25/14.38 [634]~P23(x6342)+~P9(f3(x6342),x6341,x6342)+P9(f13(x6341,x6342),f3(x6342),x6342)
% 14.25/14.38 [637]~P24(x6372)+~P8(x6371,f13(x6371,x6372),x6372)+P8(x6371,f3(x6372),x6372)
% 14.25/14.38 [638]~P26(x6382)+~P8(x6381,f13(x6381,x6382),x6382)+P8(x6381,f3(x6382),x6382)
% 14.25/14.38 [639]~P57(x6392)+~P9(x6391,f13(x6391,x6392),x6392)+P9(x6391,f3(x6392),x6392)
% 14.25/14.38 [640]~P24(x6401)+~P8(f13(x6402,x6401),x6402,x6401)+P8(f3(x6401),x6402,x6401)
% 14.25/14.38 [641]~P26(x6411)+~P8(f13(x6412,x6411),x6412,x6411)+P8(f3(x6411),x6412,x6411)
% 14.25/14.38 [657]~P23(x6572)+~P8(f3(x6572),f13(x6571,x6572),x6572)+P8(x6571,f3(x6572),x6572)
% 14.25/14.38 [658]~P23(x6582)+~P9(f3(x6582),f13(x6581,x6582),x6582)+P9(x6581,f3(x6582),x6582)
% 14.25/14.38 [659]~P57(x6592)+~P9(f12(x6591,x6592),f3(x6592),x6592)+P9(x6591,f3(x6592),x6592)
% 14.25/14.38 [660]~P57(x6601)+~P9(f3(x6601),f12(x6602,x6601),x6601)+P9(f3(x6601),x6602,x6601)
% 14.25/14.38 [661]~P23(x6611)+~P8(f13(x6612,x6611),f3(x6611),x6611)+P8(f3(x6611),x6612,x6611)
% 14.25/14.38 [662]~P23(x6621)+~P9(f13(x6622,x6621),f3(x6621),x6621)+P9(f3(x6621),x6622,x6621)
% 14.25/14.38 [728]~P26(x7281)+~P8(f3(x7281),x7282,x7281)+P8(f3(x7281),f11(x7282,x7282,x7281),x7281)
% 14.25/14.38 [729]~P26(x7291)+~P9(f3(x7291),x7292,x7291)+P9(f3(x7291),f11(x7292,x7292,x7291),x7291)
% 14.25/14.38 [730]~P26(x7302)+~P8(x7301,f3(x7302),x7302)+P8(f11(x7301,x7301,x7302),f3(x7302),x7302)
% 14.25/14.38 [731]~P57(x7312)+~P9(x7311,f3(x7312),x7312)+P9(f11(x7311,x7311,x7312),f3(x7312),x7312)
% 14.25/14.38 [732]~P26(x7322)+~P9(x7321,f3(x7322),x7322)+P9(f11(x7321,x7321,x7322),f3(x7322),x7322)
% 14.25/14.38 [791]~P26(x7912)+~P8(f11(x7911,x7911,x7912),f3(x7912),x7912)+P8(x7911,f3(x7912),x7912)
% 14.25/14.38 [792]~P57(x7922)+~P9(f11(x7921,x7921,x7922),f3(x7922),x7922)+P9(x7921,f3(x7922),x7922)
% 14.25/14.38 [793]~P26(x7932)+~P9(f11(x7931,x7931,x7932),f3(x7932),x7932)+P9(x7931,f3(x7932),x7932)
% 14.25/14.38 [794]~P26(x7941)+~P8(f3(x7941),f11(x7942,x7942,x7941),x7941)+P8(f3(x7941),x7942,x7941)
% 14.25/14.38 [795]~P26(x7951)+~P9(f3(x7951),f11(x7952,x7952,x7951),x7951)+P9(f3(x7951),x7952,x7951)
% 14.25/14.38 [799]~P9(f3(a1),x7992,a1)+~P9(f3(a1),x7991,a1)+P9(f3(a1),f10(x7991,x7992,a1),a1)
% 14.25/14.38 [357]~P48(x3572)+E(x3571,f3(x3572))+E(f8(f8(x3571,x3572),x3572),x3571)
% 14.25/14.38 [360]~P40(x3602)+E(x3601,f3(x3602))+E(f15(f12(x3601,x3602),x3602),f4(a1))
% 14.25/14.38 [361]~P2(x3612)+~P48(x3612)+E(f8(f8(x3611,x3612),x3612),x3611)
% 14.25/14.38 [417]~P6(x4172)+~P50(x4172)+E(f11(x4171,f3(x4172),x4172),x4171)
% 14.25/14.38 [422]~P2(x4222)+~P47(x4222)+E(f9(x4221,f3(x4222),x4222),f3(x4222))
% 14.25/14.38 [446]~P48(x4462)+E(x4461,f3(x4462))+E(f8(f13(x4461,x4462),x4462),f13(f8(x4461,x4462),x4462))
% 14.25/14.38 [447]~P1(x4472)+E(x4471,f3(x4472))+E(f8(f5(x4471,x4472),x4472),f5(f8(x4471,x4472),x4472))
% 14.25/14.38 [452]~P2(x4522)+~P48(x4522)+E(f8(f13(x4521,x4522),x4522),f13(f8(x4521,x4522),x4522))
% 14.25/14.38 [453]~P1(x4532)+~P2(x4532)+E(f8(f5(x4531,x4532),x4532),f5(f8(x4531,x4532),x4532))
% 14.25/14.38 [458]~P48(x4582)+E(x4581,f3(x4582))+E(f10(x4581,f8(x4581,x4582),x4582),f4(x4582))
% 14.25/14.38 [459]~P47(x4592)+E(x4591,f3(x4592))+E(f10(f8(x4591,x4592),x4591,x4592),f4(x4592))
% 14.25/14.38 [460]~P48(x4602)+E(x4601,f3(x4602))+E(f10(f8(x4601,x4602),x4601,x4602),f4(x4602))
% 14.25/14.38 [508]~P57(x5082)+P9(x5081,f3(x5082),x5082)+~E(f12(x5081,x5082),f13(f4(x5082),x5082))
% 14.25/14.38 [515]~P57(x5152)+~P9(x5151,f3(x5152),x5152)+E(f12(x5151,x5152),f13(f4(x5152),x5152))
% 14.25/14.38 [636]~P2(x6361)+~P47(x6361)+E(f9(f10(f3(x6361),x6362,x6361),x6362,x6361),f3(x6361))
% 14.25/14.38 [494]P8(x4942,x4941,x4943)+~P29(x4943)+P8(x4941,x4942,x4943)
% 14.25/14.38 [497]P9(x4972,x4971,x4973)+~P29(x4973)+P8(x4971,x4972,x4973)
% 14.25/14.38 [527]~P35(x5273)+~P9(x5271,x5272,x5273)+P8(x5271,x5272,x5273)
% 14.25/14.38 [528]~P36(x5283)+~P9(x5281,x5282,x5283)+P8(x5281,x5282,x5283)
% 14.25/14.38 [590]~P9(x5903,x5902,x5901)+~P29(x5901)+~P8(x5902,x5903,x5901)
% 14.25/14.38 [592]~P9(x5923,x5922,x5921)+~P29(x5921)+~P9(x5922,x5923,x5921)
% 14.25/14.38 [593]~P9(x5933,x5932,x5931)+~P35(x5931)+~P9(x5932,x5933,x5931)
% 14.25/14.38 [594]~P9(x5943,x5942,x5941)+~P36(x5941)+~P8(x5942,x5943,x5941)
% 14.25/14.38 [596]~P9(x5963,x5962,x5961)+~P36(x5961)+~P9(x5962,x5963,x5961)
% 14.25/14.38 [693]~P8(x6931,x6933,a1)+P8(x6931,x6932,a1)+~P8(x6933,x6932,a1)
% 14.25/14.38 [358]~P14(x3583)+E(x3581,x3582)+~E(f13(x3581,x3583),f13(x3582,x3583))
% 14.25/14.38 [359]~P5(x3593)+E(x3591,x3592)+~E(f13(x3591,x3593),f13(x3592,x3593))
% 14.25/14.38 [465]~P5(x4653)+E(x4651,x4652)+~E(f7(x4651,x4652,x4653),f3(x4653))
% 14.25/14.38 [466]~P13(x4663)+E(x4661,x4662)+~E(f7(x4661,x4662,x4663),f3(x4663))
% 14.25/14.38 [470]~P57(x4703)+P10(x4701,x4702,x4703)+~E(f5(x4701,x4703),f5(x4702,x4703))
% 14.25/14.38 [486]~P5(x4863)+~E(f11(x4861,x4862,x4863),f3(x4863))+E(x4861,f13(x4862,x4863))
% 14.25/14.38 [487]~P48(x4872)+~E(f10(x4871,x4873,x4872),f4(x4872))+E(f8(x4871,x4872),x4873)
% 14.25/14.38 [488]~P5(x4882)+~E(f11(x4881,x4883,x4882),f3(x4882))+E(f13(x4881,x4882),x4883)
% 14.25/14.38 [575]E(x5751,x5752)+~E(f10(x5753,x5751,a1),f10(x5753,x5752,a1))+E(x5753,f3(a1))
% 14.25/14.38 [576]E(x5761,x5762)+~E(f10(x5761,x5763,a1),f10(x5762,x5763,a1))+E(x5763,f3(a1))
% 14.25/14.38 [579]~P42(x5793)+~P10(x5791,x5792,x5793)+P10(x5791,f13(x5792,x5793),x5793)
% 14.25/14.38 [580]~P57(x5803)+~P10(x5801,x5802,x5803)+P10(x5801,f5(x5802,x5803),x5803)
% 14.25/14.38 [581]~P42(x5812)+~P10(x5811,x5813,x5812)+P10(f13(x5811,x5812),x5813,x5812)
% 14.25/14.38 [582]~P57(x5822)+~P10(x5821,x5823,x5822)+P10(f5(x5821,x5822),x5823,x5822)
% 14.25/14.38 [620]~P57(x6203)+P10(x6201,x6202,x6203)+~P10(x6201,f5(x6202,x6203),x6203)
% 14.25/14.38 [621]~P42(x6213)+P10(x6211,x6212,x6213)+~P10(x6211,f13(x6212,x6213),x6213)
% 14.25/14.38 [622]~P4(x6223)+P8(x6221,x6222,x6223)+~P8(f5(x6221,x6223),x6222,x6223)
% 14.25/14.38 [623]~P57(x6233)+P9(x6231,x6232,x6233)+~P9(f5(x6231,x6233),x6232,x6233)
% 14.25/14.38 [624]~P57(x6243)+P10(x6241,x6242,x6243)+~P10(f5(x6241,x6243),x6242,x6243)
% 14.25/14.38 [625]~P42(x6253)+P10(x6251,x6252,x6253)+~P10(f13(x6251,x6253),x6252,x6253)
% 14.25/14.38 [654]~P23(x6542)+~P8(x6543,x6541,x6542)+P8(f13(x6541,x6542),f13(x6543,x6542),x6542)
% 14.25/14.38 [655]~P23(x6552)+~P9(x6553,x6551,x6552)+P9(f13(x6551,x6552),f13(x6553,x6552),x6552)
% 14.25/14.38 [683]~P23(x6833)+~P8(x6832,f13(x6831,x6833),x6833)+P8(x6831,f13(x6832,x6833),x6833)
% 14.25/14.38 [685]~P23(x6853)+~P9(x6852,f13(x6851,x6853),x6853)+P9(x6851,f13(x6852,x6853),x6853)
% 14.25/14.38 [686]~P4(x6862)+~P8(f5(x6861,x6862),x6863,x6862)+P8(f13(x6861,x6862),x6863,x6862)
% 14.25/14.38 [688]~P23(x6882)+~P8(f13(x6883,x6882),x6881,x6882)+P8(f13(x6881,x6882),x6883,x6882)
% 14.25/14.38 [689]~P57(x6892)+~P9(f5(x6891,x6892),x6893,x6892)+P9(f13(x6891,x6892),x6893,x6892)
% 14.25/14.38 [691]~P23(x6912)+~P9(f13(x6913,x6912),x6911,x6912)+P9(f13(x6911,x6912),x6913,x6912)
% 14.25/14.38 [696]~P23(x6963)+P8(x6961,x6962,x6963)+~P8(f13(x6962,x6963),f13(x6961,x6963),x6963)
% 14.25/14.38 [697]~P23(x6973)+P9(x6971,x6972,x6973)+~P9(f13(x6972,x6973),f13(x6971,x6973),x6973)
% 14.25/14.38 [726]~P23(x7263)+~P8(x7261,x7262,x7263)+P8(f7(x7261,x7262,x7263),f3(x7263),x7263)
% 14.25/14.38 [727]~P23(x7273)+~P9(x7271,x7272,x7273)+P9(f7(x7271,x7272,x7273),f3(x7273),x7273)
% 14.25/14.38 [758]~P26(x7583)+~P8(x7581,f13(x7582,x7583),x7583)+P8(f11(x7581,x7582,x7583),f3(x7583),x7583)
% 14.25/14.38 [769]~P23(x7693)+P8(x7691,x7692,x7693)+~P8(f7(x7691,x7692,x7693),f3(x7693),x7693)
% 14.25/14.38 [770]~P23(x7703)+P9(x7701,x7702,x7703)+~P9(f7(x7701,x7702,x7703),f3(x7703),x7703)
% 14.25/14.38 [811]~P26(x8113)+~P8(f11(x8111,x8112,x8113),f3(x8113),x8113)+P8(x8111,f13(x8112,x8113),x8113)
% 14.25/14.38 [912]~P8(x9121,x9123,a1)+P8(f10(x9121,x9122,a1),f10(x9123,x9122,a1),a1)+~P9(f3(a1),x9122,a1)
% 14.25/14.38 [913]~P8(x9132,x9133,a1)+P8(f10(x9131,x9132,a1),f10(x9131,x9133,a1),a1)+~P9(f3(a1),x9131,a1)
% 14.25/14.38 [914]~P9(x9141,x9143,a1)+P9(f10(x9141,x9142,a1),f10(x9143,x9142,a1),a1)+~P9(f3(a1),x9142,a1)
% 14.25/14.38 [915]~P9(x9152,x9153,a1)+P9(f10(x9151,x9152,a1),f10(x9151,x9153,a1),a1)+~P9(f3(a1),x9151,a1)
% 14.25/14.38 [1023]P8(x10231,x10232,a1)+~P8(f10(x10233,x10231,a1),f10(x10233,x10232,a1),a1)+~P9(f3(a1),x10233,a1)
% 14.25/14.38 [1024]P8(x10241,x10242,a1)+~P8(f10(x10241,x10243,a1),f10(x10242,x10243,a1),a1)+~P9(f3(a1),x10243,a1)
% 14.25/14.38 [1025]P9(x10251,x10252,a1)+~P9(f10(x10251,x10253,a1),f10(x10252,x10253,a1),a1)+~P9(f3(a1),x10253,a1)
% 14.25/14.38 [484]~P7(x4842)+E(x4841,f3(x4842))+~E(f16(x4841,x4843,x4842),f3(f27(x4842)))
% 14.25/14.38 [506]~P7(x5062)+~E(f16(x5063,x5061,x5062),f3(f27(x5062)))+E(x5061,f3(f27(x5062)))
% 14.25/14.38 [578]~P47(x5782)+E(x5781,f3(x5782))+E(f9(f13(x5783,x5782),f13(x5781,x5782),x5782),f9(x5783,x5781,x5782))
% 14.25/14.38 [585]~P11(x5852)+E(x5851,f3(x5852))+E(f6(f10(x5853,x5851,x5852),x5851,x5852),x5853)
% 14.25/14.38 [586]~P47(x5862)+E(x5861,f3(x5862))+E(f9(f10(x5863,x5861,x5862),x5861,x5862),x5863)
% 14.25/14.38 [587]~P11(x5872)+E(x5871,f3(x5872))+E(f6(f10(x5871,x5873,x5872),x5871,x5872),x5873)
% 14.25/14.38 [588]~P2(x5882)+~P47(x5882)+E(f9(f13(x5881,x5882),f13(x5883,x5882),x5882),f9(x5881,x5883,x5882))
% 14.25/14.38 [626]~P2(x6263)+~P47(x6263)+E(f8(f9(x6261,x6262,x6263),x6263),f9(x6262,x6261,x6263))
% 14.25/14.38 [681]~P47(x6812)+E(x6811,f3(x6812))+E(f9(x6813,f13(x6811,x6812),x6812),f13(f9(x6813,x6811,x6812),x6812))
% 14.25/14.38 [692]~P2(x6923)+~P47(x6923)+E(f9(x6921,f13(x6922,x6923),x6923),f13(f9(x6921,x6922,x6923),x6923))
% 14.25/14.38 [714]~P1(x7142)+E(x7141,f3(x7142))+E(f9(f5(x7143,x7142),f5(x7141,x7142),x7142),f5(f9(x7143,x7141,x7142),x7142))
% 14.25/14.38 [715]~P2(x7152)+~P47(x7152)+E(f10(f8(x7151,x7152),f8(x7153,x7152),x7152),f8(f10(x7151,x7153,x7152),x7152))
% 14.25/14.38 [716]~P1(x7162)+~P2(x7162)+E(f9(f5(x7161,x7162),f5(x7163,x7162),x7162),f5(f9(x7161,x7163,x7162),x7162))
% 14.25/14.38 [724]~P11(x7243)+~P10(x7241,x7242,x7243)+E(f10(x7241,f6(x7242,x7241,x7243),x7243),x7242)
% 14.25/14.38 [725]~P11(x7253)+~P10(x7252,x7251,x7253)+E(f10(f6(x7251,x7252,x7253),x7252,x7253),x7251)
% 14.25/14.38 [743]~P12(x7433)+~P10(x7432,x7431,x7433)+E(f6(x7431,f13(x7432,x7433),x7433),f13(f6(x7431,x7432,x7433),x7433))
% 14.25/14.38 [744]~P12(x7442)+~P10(x7443,x7441,x7442)+E(f6(f13(x7441,x7442),x7443,x7442),f13(f6(x7441,x7443,x7442),x7442))
% 14.25/14.38 [760]~P57(x7602)+~P8(f3(x7602),x7603,x7602)+E(f10(f5(x7601,x7602),x7603,x7602),f5(f10(x7601,x7603,x7602),x7602))
% 14.25/14.38 [801]~P11(x8012)+E(x8011,f3(x8012))+E(f6(f11(x8013,x8011,x8012),x8011,x8012),f11(f6(x8013,x8011,x8012),f4(x8012),x8012))
% 14.25/14.38 [802]~P11(x8022)+E(x8021,f3(x8022))+E(f6(f11(x8021,x8023,x8022),x8021,x8022),f11(f6(x8023,x8021,x8022),f4(x8022),x8022))
% 14.25/14.38 [932]~P59(x9322)+E(x9321,f3(x9322))+~E(f11(f10(x9323,x9323,x9322),f10(x9321,x9321,x9322),x9322),f3(x9322))
% 14.25/14.38 [933]~P59(x9332)+E(x9331,f3(x9332))+~E(f11(f10(x9331,x9331,x9332),f10(x9333,x9333,x9332),x9332),f3(x9332))
% 14.25/14.38 [934]E(x9341,f3(a1))+~P8(x9342,f3(a1),a1)+~P8(f5(x9341,a1),f10(x9342,f5(x9343,a1),a1),a1)
% 14.25/14.38 [1060]~P59(x10602)+E(x10601,f3(x10602))+P9(f3(x10602),f11(f10(x10603,x10603,x10602),f10(x10601,x10601,x10602),x10602),x10602)
% 14.25/14.38 [1061]~P59(x10612)+E(x10611,f3(x10612))+P9(f3(x10612),f11(f10(x10611,x10611,x10612),f10(x10613,x10613,x10612),x10612),x10612)
% 14.25/14.38 [1110]~P59(x11102)+E(x11101,f3(x11102))+~P8(f11(f10(x11103,x11103,x11102),f10(x11101,x11101,x11102),x11102),f3(x11102),x11102)
% 14.25/14.38 [1111]~P59(x11112)+E(x11111,f3(x11112))+~P8(f11(f10(x11111,x11111,x11112),f10(x11113,x11113,x11112),x11112),f3(x11112),x11112)
% 14.25/14.38 [1086]~P1(x10863)+~P9(x10861,x10862,x10863)+P9(x10861,f9(f11(x10861,x10862,x10863),f11(f4(x10863),f4(x10863),x10863),x10863),x10863)
% 14.25/14.38 [1087]~P1(x10873)+~P9(x10871,x10872,x10873)+P9(f9(f11(x10871,x10872,x10873),f11(f4(x10873),f4(x10873),x10873),x10873),x10872,x10873)
% 14.25/14.38 [1112]~P8(f36(x11122,a32,x11121),f15(x11123,a2),a1)+P8(x11121,f15(f17(f16(x11122,a32,a2),x11123,a2),a2),a1)+E(f3(f27(a2)),a32)
% 14.25/14.38 [1113]~P8(f37(x11132,a32,x11131),f15(x11133,a2),a1)+P8(x11131,f15(f17(f16(x11132,a32,a2),x11133,a2),a2),a1)+E(f3(f27(a2)),a32)
% 14.25/14.38 [598]~P13(x5984)+E(x5981,x5982)+~E(f7(x5983,x5983,x5984),f7(x5981,x5982,x5984))
% 14.25/14.38 [599]~P16(x5994)+E(x5991,x5992)+~E(f11(x5993,x5991,x5994),f11(x5993,x5992,x5994))
% 14.25/14.38 [600]~P17(x6004)+E(x6001,x6002)+~E(f11(x6003,x6001,x6004),f11(x6003,x6002,x6004))
% 14.25/14.38 [601]~P16(x6014)+E(x6011,x6012)+~E(f11(x6011,x6013,x6014),f11(x6012,x6013,x6014))
% 14.25/14.38 [603]~P13(x6033)+E(x6031,x6032)+~E(f7(x6031,x6032,x6033),f7(x6034,x6034,x6033))
% 14.25/14.38 [722]~P41(x7224)+~P10(x7221,x7223,x7224)+P10(x7221,f10(x7222,x7223,x7224),x7224)
% 14.25/14.38 [723]~P41(x7234)+~P10(x7231,x7232,x7234)+P10(x7231,f10(x7232,x7233,x7234),x7234)
% 14.25/14.38 [763]~P41(x7633)+P10(x7631,x7632,x7633)+~P10(f10(x7634,x7631,x7633),x7632,x7633)
% 14.25/14.38 [764]~P41(x7643)+P10(x7641,x7642,x7643)+~P10(f10(x7641,x7644,x7643),x7642,x7643)
% 14.25/14.38 [820]~P31(x8203)+~P8(x8201,x8204,x8203)+P8(f11(x8201,x8202,x8203),f11(x8204,x8202,x8203),x8203)
% 14.25/14.38 [821]~P32(x8213)+~P8(x8211,x8214,x8213)+P8(f11(x8211,x8212,x8213),f11(x8214,x8212,x8213),x8213)
% 14.25/14.38 [822]~P31(x8223)+~P8(x8222,x8224,x8223)+P8(f11(x8221,x8222,x8223),f11(x8221,x8224,x8223),x8223)
% 14.25/14.38 [823]~P32(x8233)+~P8(x8232,x8234,x8233)+P8(f11(x8231,x8232,x8233),f11(x8231,x8234,x8233),x8233)
% 14.25/14.38 [824]~P30(x8243)+~P9(x8241,x8244,x8243)+P9(f11(x8241,x8242,x8243),f11(x8244,x8242,x8243),x8243)
% 14.25/14.38 [825]~P31(x8253)+~P9(x8251,x8254,x8253)+P9(f11(x8251,x8252,x8253),f11(x8254,x8252,x8253),x8253)
% 14.25/14.38 [826]~P30(x8263)+~P9(x8262,x8264,x8263)+P9(f11(x8261,x8262,x8263),f11(x8261,x8264,x8263),x8263)
% 14.25/14.38 [827]~P31(x8273)+~P9(x8272,x8274,x8273)+P9(f11(x8271,x8272,x8273),f11(x8271,x8274,x8273),x8273)
% 14.25/14.38 [828]~P50(x8283)+~P10(x8281,x8284,x8283)+P10(f10(x8281,x8282,x8283),f10(x8284,x8282,x8283),x8283)
% 14.25/14.38 [829]~P50(x8293)+~P10(x8292,x8294,x8293)+P10(f10(x8291,x8292,x8293),f10(x8291,x8294,x8293),x8293)
% 14.25/14.38 [970]~P31(x9703)+P8(x9701,x9702,x9703)+~P8(f11(x9704,x9701,x9703),f11(x9704,x9702,x9703),x9703)
% 14.25/14.38 [971]~P31(x9713)+P8(x9711,x9712,x9713)+~P8(f11(x9711,x9714,x9713),f11(x9712,x9714,x9713),x9713)
% 14.25/14.38 [972]~P31(x9723)+P9(x9721,x9722,x9723)+~P9(f11(x9724,x9721,x9723),f11(x9724,x9722,x9723),x9723)
% 14.25/14.38 [973]~P31(x9733)+P9(x9731,x9732,x9733)+~P9(f11(x9731,x9734,x9733),f11(x9732,x9734,x9733),x9733)
% 14.25/14.38 [736]~P13(x7363)+E(x7361,f13(x7362,x7363))+~E(f11(x7361,f11(x7364,x7362,x7363),x7363),x7364)
% 14.25/14.38 [796]~P11(x7962)+E(x7961,f3(x7962))+E(f6(f10(x7963,x7961,x7962),f10(x7964,x7961,x7962),x7962),f6(x7963,x7964,x7962))
% 14.25/14.38 [797]~P11(x7972)+E(x7971,f3(x7972))+E(f6(f10(x7971,x7973,x7972),f10(x7971,x7974,x7972),x7972),f6(x7973,x7974,x7972))
% 14.25/14.38 [798]~P2(x7983)+~P47(x7983)+E(f9(f10(x7981,x7982,x7983),x7984,x7983),f10(f9(x7981,x7984,x7983),x7982,x7983))
% 14.25/14.38 [902]~P11(x9023)+~P10(x9024,x9021,x9023)+E(f6(f10(x9021,x9022,x9023),x9024,x9023),f10(f6(x9021,x9024,x9023),x9022,x9023))
% 14.25/14.38 [969]~P25(x9694)+~P8(f11(x9691,x9693,x9694),x9692,x9694)+P8(x9691,f11(x9692,f5(x9693,x9694),x9694),x9694)
% 14.25/14.38 [1020]~P6(x10203)+~P50(x10203)+E(f11(f10(x10201,x10202,x10203),f10(x10201,x10204,x10203),x10203),f11(f10(x10201,x10204,x10203),f10(x10201,x10202,x10203),x10203))
% 14.25/14.38 [1063]~P57(x10634)+P9(x10631,f11(x10632,x10633,x10634),x10634)+~P9(f5(f7(x10631,x10632,x10634),x10634),x10633,x10634)
% 14.25/14.38 [1064]~P57(x10643)+P9(f7(x10641,x10642,x10643),x10644,x10643)+~P9(f5(f7(x10644,x10641,x10643),x10643),x10642,x10643)
% 14.25/14.38 [1016]~P11(x10162)+E(x10161,f3(x10162))+E(f6(f11(x10163,f10(x10164,x10161,x10162),x10162),x10161,x10162),f11(x10164,f6(x10163,x10161,x10162),x10162))
% 14.25/14.38 [1017]~P11(x10172)+E(x10171,f3(x10172))+E(f6(f11(x10173,f10(x10171,x10174,x10172),x10172),x10171,x10172),f11(x10174,f6(x10173,x10171,x10172),x10172))
% 14.25/14.38 [597]~P7(x5974)+E(x5971,x5972)+~E(f16(x5973,x5971,x5974),f16(x5975,x5972,x5974))
% 14.25/14.38 [602]~P7(x6024)+E(x6021,x6022)+~E(f16(x6021,x6023,x6024),f16(x6022,x6025,x6024))
% 14.25/14.38 [901]~P13(x9013)+E(f11(x9011,x9012,x9013),x9014)+~E(f11(x9011,f11(x9015,x9012,x9013),x9013),f11(x9015,x9014,x9013))
% 14.25/14.38 [1018]~P2(x10183)+~P47(x10183)+E(f9(f10(x10181,x10182,x10183),f10(x10184,x10185,x10183),x10183),f10(f9(x10181,x10184,x10183),f9(x10182,x10185,x10183),x10183))
% 14.25/14.38 [1106]~P60(x11064)+~E(f11(f10(x11063,x11065,x11064),x11061,x11064),f11(f10(x11062,x11065,x11064),x11066,x11064))+E(x11061,f11(f10(f7(x11062,x11063,x11064),x11065,x11064),x11066,x11064))
% 14.25/14.38 [1107]~P60(x11073)+~E(f11(f10(x11071,x11074,x11073),x11075,x11073),f11(f10(x11072,x11074,x11073),x11076,x11073))+E(f11(f10(f7(x11071,x11072,x11073),x11074,x11073),x11075,x11073),x11076)
% 14.25/14.38 [1122]~P65(x11224)+~P8(f11(f10(x11223,x11225,x11224),x11221,x11224),f11(f10(x11222,x11225,x11224),x11226,x11224),x11224)+P8(x11221,f11(f10(f7(x11222,x11223,x11224),x11225,x11224),x11226,x11224),x11224)
% 14.25/14.38 [1123]~P65(x11234)+~P9(f11(f10(x11233,x11235,x11234),x11231,x11234),f11(f10(x11232,x11235,x11234),x11236,x11234),x11234)+P9(x11231,f11(f10(f7(x11232,x11233,x11234),x11235,x11234),x11236,x11234),x11234)
% 14.25/14.38 [1124]~P65(x11243)+~P8(f11(f10(x11241,x11244,x11243),x11245,x11243),f11(f10(x11242,x11244,x11243),x11246,x11243),x11243)+P8(f11(f10(f7(x11241,x11242,x11243),x11244,x11243),x11245,x11243),x11246,x11243)
% 14.25/14.38 [1125]~P65(x11253)+~P9(f11(f10(x11251,x11254,x11253),x11255,x11253),f11(f10(x11252,x11254,x11253),x11256,x11253),x11253)+P9(f11(f10(f7(x11251,x11252,x11253),x11254,x11253),x11255,x11253),x11256,x11253)
% 14.25/14.38 [1126]~P65(x11263)+P8(f11(f10(x11261,x11262,x11263),x11264,x11263),f11(f10(x11265,x11262,x11263),x11266,x11263),x11263)+~P8(x11264,f11(f10(f7(x11265,x11261,x11263),x11262,x11263),x11266,x11263),x11263)
% 14.25/14.38 [1127]~P65(x11273)+P9(f11(f10(x11271,x11272,x11273),x11274,x11273),f11(f10(x11275,x11272,x11273),x11276,x11273),x11273)+~P9(x11274,f11(f10(f7(x11275,x11271,x11273),x11272,x11273),x11276,x11273),x11273)
% 14.25/14.38 [1128]~P65(x11283)+P8(f11(f10(x11281,x11282,x11283),x11284,x11283),f11(f10(x11285,x11282,x11283),x11286,x11283),x11283)+~P8(f11(f10(f7(x11281,x11285,x11283),x11282,x11283),x11284,x11283),x11286,x11283)
% 14.25/14.38 [1129]~P65(x11293)+P9(f11(f10(x11291,x11292,x11293),x11294,x11293),f11(f10(x11295,x11292,x11293),x11296,x11293),x11293)+~P9(f11(f10(f7(x11291,x11295,x11293),x11292,x11293),x11294,x11293),x11296,x11293)
% 14.25/14.38 [356]~P2(x3562)+~P47(x3562)+~E(f8(x3561,x3562),f4(x3562))+E(x3561,f4(x3562))
% 14.25/14.38 [441]~P29(x4412)+~P25(x4412)+P9(x4411,f3(x4412),x4412)+E(f5(x4411,x4412),x4411)
% 14.25/14.38 [509]~P58(x5092)+~P9(f3(x5092),x5091,x5092)+E(f12(x5091,x5092),f4(x5092))+E(x5091,f3(x5092))
% 14.25/14.38 [516]~P29(x5162)+~P25(x5162)+~P9(x5161,f3(x5162),x5162)+E(f13(x5161,x5162),f5(x5161,x5162))
% 14.25/14.38 [645]~P1(x6451)+~P2(x6451)+~P8(f3(x6451),x6452,x6451)+P8(f3(x6451),f8(x6452,x6451),x6451)
% 14.25/14.38 [647]~P1(x6472)+~P2(x6472)+~P8(x6471,f3(x6472),x6472)+P8(f8(x6471,x6472),f3(x6472),x6472)
% 14.25/14.38 [648]~P1(x6482)+~P2(x6482)+~P8(x6481,f3(x6482),x6482)+P8(f8(x6481,x6482),f4(x6482),x6482)
% 14.25/14.38 [650]~P1(x6502)+~P2(x6502)+~P8(x6501,f3(x6502),x6502)+P9(f8(x6501,x6502),f4(x6502),x6502)
% 14.25/14.38 [651]~P1(x6512)+~P2(x6512)+~P8(f4(x6512),x6511,x6512)+P8(f8(x6511,x6512),f4(x6512),x6512)
% 14.25/14.38 [652]~P1(x6522)+~P2(x6522)+~P9(f4(x6522),x6521,x6522)+P9(f8(x6521,x6522),f4(x6522),x6522)
% 14.25/14.38 [671]~P1(x6712)+~P9(f8(x6711,x6712),f3(x6712),x6712)+P9(x6711,f3(x6712),x6712)+E(x6711,f3(x6712))
% 14.25/14.38 [672]~P1(x6722)+~P9(f3(x6722),f8(x6721,x6722),x6722)+P9(f3(x6722),x6721,x6722)+E(x6721,f3(x6722))
% 14.25/14.38 [673]~P1(x6732)+~P2(x6732)+~P8(f4(x6732),f8(x6731,x6732),x6732)+P8(x6731,f4(x6732),x6732)
% 14.25/14.38 [674]~P1(x6742)+~P2(x6742)+~P9(f4(x6742),f8(x6741,x6742),x6742)+P9(x6741,f4(x6742),x6742)
% 14.25/14.38 [675]~P1(x6752)+~P2(x6752)+~P8(f8(x6751,x6752),f3(x6752),x6752)+P8(x6751,f3(x6752),x6752)
% 14.25/14.38 [676]~P1(x6762)+~P2(x6762)+~P9(f8(x6761,x6762),f3(x6762),x6762)+P9(x6761,f3(x6762),x6762)
% 14.25/14.38 [677]~P1(x6771)+~P2(x6771)+~P8(f3(x6771),f8(x6772,x6771),x6771)+P8(f3(x6771),x6772,x6771)
% 14.25/14.38 [678]~P1(x6781)+~P2(x6781)+~P8(f4(x6781),f8(x6782,x6781),x6781)+P9(f3(x6781),x6782,x6781)
% 14.25/14.38 [679]~P1(x6791)+~P2(x6791)+~P9(f3(x6791),f8(x6792,x6791),x6791)+P9(f3(x6791),x6792,x6791)
% 14.25/14.38 [680]~P1(x6801)+~P2(x6801)+~P9(f4(x6801),f8(x6802,x6801),x6801)+P9(f3(x6801),x6802,x6801)
% 14.25/14.38 [474]~P58(x4742)+P9(f3(x4742),x4741,x4742)+E(x4741,f3(x4742))+E(f12(x4741,x4742),f13(f4(x4742),x4742))
% 14.25/14.38 [737]~P1(x7371)+~P2(x7371)+~P8(f3(x7371),x7372,x7371)+P8(f3(x7371),f9(f4(x7371),x7372,x7371),x7371)
% 14.25/14.38 [738]~P1(x7381)+~P2(x7381)+~P9(f3(x7381),x7382,x7381)+P9(f3(x7381),f9(f4(x7381),x7382,x7381),x7381)
% 14.25/14.38 [739]~P1(x7391)+~P2(x7391)+~P8(x7392,f3(x7391),x7391)+P8(f9(f4(x7391),x7392,x7391),f3(x7391),x7391)
% 14.25/14.38 [740]~P1(x7401)+~P2(x7401)+~P9(x7402,f3(x7401),x7401)+P9(f9(f4(x7401),x7402,x7401),f3(x7401),x7401)
% 14.25/14.38 [812]~P1(x8122)+~P2(x8122)+P8(x8121,f3(x8122),x8122)+~P8(f9(f4(x8122),x8121,x8122),f3(x8122),x8122)
% 14.25/14.38 [813]~P1(x8132)+~P2(x8132)+P9(x8131,f3(x8132),x8132)+~P9(f9(f4(x8132),x8131,x8132),f3(x8132),x8132)
% 14.25/14.38 [814]~P1(x8141)+~P2(x8141)+P8(f3(x8141),x8142,x8141)+~P8(f3(x8141),f9(f4(x8141),x8142,x8141),x8141)
% 14.25/14.38 [815]~P1(x8151)+~P2(x8151)+P9(f3(x8151),x8152,x8151)+~P9(f3(x8151),f9(f4(x8151),x8152,x8151),x8151)
% 14.25/14.38 [501]P9(x5011,x5012,x5013)+~P57(x5013)+E(x5011,x5012)+P9(x5012,x5011,x5013)
% 14.25/14.38 [505]P9(x5051,x5052,x5053)+~P29(x5053)+E(x5051,x5052)+P9(x5052,x5051,x5053)
% 14.25/14.38 [534]~P29(x5343)+~P8(x5341,x5342,x5343)+E(x5341,x5342)+P9(x5341,x5342,x5343)
% 14.25/14.38 [540]~P35(x5403)+~P8(x5401,x5402,x5403)+E(x5401,x5402)+P9(x5401,x5402,x5403)
% 14.25/14.38 [607]~P8(x6072,x6071,x6073)+~P8(x6071,x6072,x6073)+E(x6071,x6072)+~P35(x6073)
% 14.25/14.38 [656]P9(x6562,x6561,x6563)+~P36(x6563)+~P8(x6562,x6561,x6563)+P8(x6561,x6562,x6563)
% 14.25/14.38 [363]~P2(x3633)+~P48(x3633)+E(x3631,x3632)+~E(f8(x3631,x3633),f8(x3632,x3633))
% 14.25/14.38 [472]~P47(x4723)+E(x4721,x4722)+~E(f9(x4721,x4722,x4723),f4(x4723))+E(x4722,f3(x4723))
% 14.25/14.38 [473]~P6(x4732)+~P50(x4732)+~E(f11(x4733,x4731,x4732),x4733)+E(x4731,f3(x4732))
% 14.25/14.38 [476]~P6(x4763)+~P50(x4763)+E(x4761,x4762)+~E(f7(x4761,x4762,x4763),f3(x4763))
% 14.25/14.38 [478]~P55(x4782)+~E(f10(x4783,x4781,x4782),f3(x4782))+E(x4781,f3(x4782))+E(x4783,f3(x4782))
% 14.25/14.38 [479]~P68(x4792)+~E(f10(x4793,x4791,x4792),f3(x4792))+E(x4791,f3(x4792))+E(x4793,f3(x4792))
% 14.25/14.38 [644]~P50(x6443)+E(x6441,x6442)+~E(f10(x6441,x6441,x6443),f10(x6442,x6442,x6443))+E(x6441,f13(x6442,x6443))
% 14.25/14.38 [745]~P1(x7452)+~P8(x7453,x7451,x7452)+~P9(x7451,f3(x7452),x7452)+P8(f8(x7451,x7452),f8(x7453,x7452),x7452)
% 14.25/14.38 [746]~P1(x7462)+~P9(x7463,x7461,x7462)+~P9(x7461,f3(x7462),x7462)+P9(f8(x7461,x7462),f8(x7463,x7462),x7462)
% 14.25/14.38 [747]~P1(x7472)+~P8(x7473,x7471,x7472)+~P9(f3(x7472),x7473,x7472)+P8(f8(x7471,x7472),f8(x7473,x7472),x7472)
% 14.25/14.38 [748]~P1(x7482)+~P9(x7483,x7481,x7482)+~P9(f3(x7482),x7483,x7482)+P9(f8(x7481,x7482),f8(x7483,x7482),x7482)
% 14.25/14.38 [756]~P4(x7562)+~P8(x7561,x7563,x7562)+~P8(f13(x7561,x7562),x7563,x7562)+P8(f5(x7561,x7562),x7563,x7562)
% 14.25/14.38 [757]~P57(x7572)+~P9(x7571,x7573,x7572)+~P9(f13(x7571,x7572),x7573,x7572)+P9(f5(x7571,x7572),x7573,x7572)
% 14.25/14.38 [771]~P1(x7713)+P8(x7711,x7712,x7713)+~P9(x7711,f3(x7713),x7713)+~P8(f8(x7712,x7713),f8(x7711,x7713),x7713)
% 14.25/14.38 [772]~P1(x7723)+P9(x7721,x7722,x7723)+~P9(x7721,f3(x7723),x7723)+~P9(f8(x7722,x7723),f8(x7721,x7723),x7723)
% 14.25/14.38 [773]~P1(x7733)+P8(x7731,x7732,x7733)+~P9(f3(x7733),x7732,x7733)+~P8(f8(x7732,x7733),f8(x7731,x7733),x7733)
% 14.25/14.38 [774]~P1(x7743)+P9(x7741,x7742,x7743)+~P9(f3(x7743),x7742,x7743)+~P9(f8(x7742,x7743),f8(x7741,x7743),x7743)
% 14.25/14.38 [830]~P1(x8301)+~P8(x8302,f3(x8301),x8301)+~P9(x8303,f3(x8301),x8301)+P8(f3(x8301),f9(x8302,x8303,x8301),x8301)
% 14.25/14.38 [831]~P59(x8311)+~P8(x8313,f3(x8311),x8311)+~P8(x8312,f3(x8311),x8311)+P8(f3(x8311),f10(x8312,x8313,x8311),x8311)
% 14.25/14.38 [833]~P65(x8331)+~P8(x8333,f3(x8331),x8331)+~P8(x8332,f3(x8331),x8331)+P8(f3(x8331),f10(x8332,x8333,x8331),x8331)
% 14.25/14.38 [834]~P1(x8341)+~P9(x8343,f3(x8341),x8341)+~P9(x8342,f3(x8341),x8341)+P9(f3(x8341),f9(x8342,x8343,x8341),x8341)
% 14.25/14.38 [835]~P59(x8351)+~P9(x8353,f3(x8351),x8351)+~P9(x8352,f3(x8351),x8351)+P9(f3(x8351),f10(x8352,x8353,x8351),x8351)
% 14.25/14.38 [836]~P1(x8361)+~P8(f3(x8361),x8362,x8361)+~P9(f3(x8361),x8363,x8361)+P8(f3(x8361),f9(x8362,x8363,x8361),x8361)
% 14.25/14.38 [837]~P59(x8371)+~P8(f3(x8371),x8373,x8371)+~P8(f3(x8371),x8372,x8371)+P8(f3(x8371),f10(x8372,x8373,x8371),x8371)
% 14.25/14.38 [838]~P65(x8381)+~P8(f3(x8381),x8383,x8381)+~P8(f3(x8381),x8382,x8381)+P8(f3(x8381),f10(x8382,x8383,x8381),x8381)
% 14.25/14.38 [839]~P66(x8391)+~P8(f3(x8391),x8393,x8391)+~P8(f3(x8391),x8392,x8391)+P8(f3(x8391),f10(x8392,x8393,x8391),x8391)
% 14.25/14.38 [840]~P33(x8401)+~P8(f3(x8401),x8403,x8401)+~P8(f3(x8401),x8402,x8401)+P8(f3(x8401),f11(x8402,x8403,x8401),x8401)
% 14.25/14.38 [841]~P1(x8411)+~P9(f3(x8411),x8413,x8411)+~P9(f3(x8411),x8412,x8411)+P9(f3(x8411),f9(x8412,x8413,x8411),x8411)
% 14.25/14.38 [842]~P61(x8421)+~P9(f3(x8421),x8423,x8421)+~P9(f3(x8421),x8422,x8421)+P9(f3(x8421),f10(x8422,x8423,x8421),x8421)
% 14.25/14.38 [843]~P33(x8431)+~P8(f3(x8431),x8433,x8431)+~P9(f3(x8431),x8432,x8431)+P9(f3(x8431),f11(x8432,x8433,x8431),x8431)
% 14.25/14.38 [844]~P33(x8441)+~P8(f3(x8441),x8442,x8441)+~P9(f3(x8441),x8443,x8441)+P9(f3(x8441),f11(x8442,x8443,x8441),x8441)
% 14.25/14.38 [845]~P33(x8451)+~P9(f3(x8451),x8453,x8451)+~P9(f3(x8451),x8452,x8451)+P9(f3(x8451),f11(x8452,x8453,x8451),x8451)
% 14.25/14.38 [846]~P62(x8461)+~P9(f4(x8461),x8463,x8461)+~P9(f4(x8461),x8462,x8461)+P9(f4(x8461),f10(x8462,x8463,x8461),x8461)
% 14.25/14.38 [847]~P33(x8473)+~P8(x8472,f3(x8473),x8473)+~P8(x8471,f3(x8473),x8473)+P8(f11(x8471,x8472,x8473),f3(x8473),x8473)
% 14.25/14.38 [848]~P33(x8483)+~P8(x8482,f3(x8483),x8483)+~P9(x8481,f3(x8483),x8483)+P9(f11(x8481,x8482,x8483),f3(x8483),x8483)
% 14.25/14.38 [849]~P33(x8493)+~P8(x8491,f3(x8493),x8493)+~P9(x8492,f3(x8493),x8493)+P9(f11(x8491,x8492,x8493),f3(x8493),x8493)
% 14.25/14.38 [850]~P33(x8503)+~P9(x8502,f3(x8503),x8503)+~P9(x8501,f3(x8503),x8503)+P9(f11(x8501,x8502,x8503),f3(x8503),x8503)
% 14.25/14.38 [851]~P1(x8513)+~P8(x8511,f3(x8513),x8513)+~P9(f3(x8513),x8512,x8513)+P8(f9(x8511,x8512,x8513),f3(x8513),x8513)
% 14.25/14.38 [852]~P1(x8523)+~P9(x8522,f3(x8523),x8523)+~P8(f3(x8523),x8521,x8523)+P8(f9(x8521,x8522,x8523),f3(x8523),x8523)
% 14.25/14.38 [853]~P59(x8533)+~P8(x8532,f3(x8533),x8533)+~P8(f3(x8533),x8531,x8533)+P8(f10(x8531,x8532,x8533),f3(x8533),x8533)
% 14.25/14.38 [854]~P59(x8543)+~P8(x8541,f3(x8543),x8543)+~P8(f3(x8543),x8542,x8543)+P8(f10(x8541,x8542,x8543),f3(x8543),x8543)
% 14.25/14.38 [856]~P66(x8563)+~P8(x8562,f3(x8563),x8563)+~P8(f3(x8563),x8561,x8563)+P8(f10(x8561,x8562,x8563),f3(x8563),x8563)
% 14.25/14.38 [859]~P66(x8593)+~P8(x8591,f3(x8593),x8593)+~P8(f3(x8593),x8592,x8593)+P8(f10(x8591,x8592,x8593),f3(x8593),x8593)
% 14.25/14.38 [860]~P1(x8603)+~P9(x8602,f3(x8603),x8603)+~P9(f3(x8603),x8601,x8603)+P9(f9(x8601,x8602,x8603),f3(x8603),x8603)
% 14.25/14.38 [861]~P1(x8613)+~P9(x8611,f3(x8613),x8613)+~P9(f3(x8613),x8612,x8613)+P9(f9(x8611,x8612,x8613),f3(x8613),x8613)
% 14.25/14.38 [862]~P61(x8623)+~P9(x8622,f3(x8623),x8623)+~P9(f3(x8623),x8621,x8623)+P9(f10(x8621,x8622,x8623),f3(x8623),x8623)
% 14.25/14.38 [864]~P61(x8643)+~P9(x8641,f3(x8643),x8643)+~P9(f3(x8643),x8642,x8643)+P9(f10(x8641,x8642,x8643),f3(x8643),x8643)
% 14.25/14.38 [873]~P59(x8732)+~P8(f10(x8733,x8731,x8732),f3(x8732),x8732)+P8(x8731,f3(x8732),x8732)+P8(x8733,f3(x8732),x8732)
% 14.25/14.38 [874]~P59(x8742)+~P8(f3(x8742),f10(x8743,x8741,x8742),x8742)+P8(x8741,f3(x8742),x8742)+P8(f3(x8742),x8743,x8742)
% 14.25/14.38 [875]~P59(x8752)+~P8(f3(x8752),f10(x8751,x8753,x8752),x8752)+P8(x8751,f3(x8752),x8752)+P8(f3(x8752),x8753,x8752)
% 14.25/14.38 [876]~P59(x8762)+~P8(f3(x8762),f10(x8763,x8761,x8762),x8762)+P8(x8761,f3(x8762),x8762)+P8(f3(x8762),x8761,x8762)
% 14.25/14.38 [877]~P59(x8772)+~P8(f3(x8772),f10(x8771,x8773,x8772),x8772)+P8(x8771,f3(x8772),x8772)+P8(f3(x8772),x8771,x8772)
% 14.25/14.38 [878]~P59(x8782)+~P8(f10(x8783,x8781,x8782),f3(x8782),x8782)+P8(x8781,f3(x8782),x8782)+P8(f3(x8782),x8781,x8782)
% 14.25/14.38 [879]~P59(x8792)+~P8(f10(x8791,x8793,x8792),f3(x8792),x8792)+P8(x8791,f3(x8792),x8792)+P8(f3(x8792),x8791,x8792)
% 14.25/14.38 [880]~P59(x8801)+~P8(f10(x8802,x8803,x8801),f3(x8801),x8801)+P8(f3(x8801),x8802,x8801)+P8(f3(x8801),x8803,x8801)
% 14.25/14.38 [909]~P61(x9091)+~P9(f3(x9091),f10(x9093,x9092,x9091),x9091)+P9(f3(x9091),x9092,x9091)+~P9(f3(x9091),x9093,x9091)
% 14.25/14.38 [910]~P61(x9101)+~P9(f3(x9101),f10(x9102,x9103,x9101),x9101)+P9(f3(x9101),x9102,x9101)+~P9(f3(x9101),x9103,x9101)
% 14.25/14.38 [611]~P2(x6112)+~P47(x6112)+E(x6111,f3(x6112))+E(f10(f9(x6113,x6111,x6112),x6111,x6112),x6113)
% 14.25/14.38 [718]~P48(x7182)+E(x7181,f3(x7182))+E(x7183,f3(x7182))+E(f10(f8(x7181,x7182),f8(x7183,x7182),x7182),f8(f10(x7183,x7181,x7182),x7182))
% 14.25/14.38 [762]~P1(x7622)+~P2(x7622)+~P9(f3(x7622),x7623,x7622)+E(f9(f5(x7621,x7622),x7623,x7622),f5(f9(x7621,x7623,x7622),x7622))
% 14.25/14.38 [905]~P64(x9052)+~P8(x9053,f3(x9052),x9052)+~P8(x9051,f3(x9052),x9052)+E(f10(f5(x9051,x9052),f5(x9053,x9052),x9052),f5(f10(x9051,x9053,x9052),x9052))
% 14.25/14.38 [906]~P64(x9062)+~P8(x9063,f3(x9062),x9062)+~P8(f3(x9062),x9061,x9062)+E(f10(f5(x9061,x9062),f5(x9063,x9062),x9062),f5(f10(x9061,x9063,x9062),x9062))
% 14.25/14.38 [907]~P64(x9072)+~P8(x9071,f3(x9072),x9072)+~P8(f3(x9072),x9073,x9072)+E(f10(f5(x9071,x9072),f5(x9073,x9072),x9072),f5(f10(x9071,x9073,x9072),x9072))
% 14.25/14.38 [908]~P64(x9082)+~P8(f3(x9082),x9083,x9082)+~P8(f3(x9082),x9081,x9082)+E(f10(f5(x9081,x9082),f5(x9083,x9082),x9082),f5(f10(x9081,x9083,x9082),x9082))
% 14.25/14.38 [1028]~P48(x10282)+E(x10281,f3(x10282))+E(x10283,f3(x10282))+E(f10(f10(f8(x10283,x10282),f7(x10281,x10283,x10282),x10282),f8(x10281,x10282),x10282),f7(f8(x10283,x10282),f8(x10281,x10282),x10282))
% 14.25/14.38 [1029]~P48(x10292)+E(x10291,f3(x10292))+E(x10293,f3(x10292))+E(f10(f10(f8(x10293,x10292),f11(x10293,x10291,x10292),x10292),f8(x10291,x10292),x10292),f11(f8(x10293,x10292),f8(x10291,x10292),x10292))
% 14.25/14.38 [1030]~P47(x10302)+E(x10301,f3(x10302))+E(x10303,f3(x10302))+E(f10(f10(f11(x10303,x10301,x10302),f8(x10303,x10302),x10302),f8(x10301,x10302),x10302),f11(f8(x10303,x10302),f8(x10301,x10302),x10302))
% 14.25/14.38 [1116]~P48(x11162)+E(x11161,f3(x11162))+E(x11163,f3(x11162))+E(f13(f10(f10(f8(x11163,x11162),f7(x11163,x11161,x11162),x11162),f8(x11161,x11162),x11162),x11162),f7(f8(x11163,x11162),f8(x11161,x11162),x11162))
% 14.25/14.38 [705]~P35(x7053)+~P8(x7051,x7054,x7053)+P8(x7051,x7052,x7053)+~P8(x7054,x7052,x7053)
% 14.25/14.38 [706]~P36(x7063)+~P8(x7061,x7064,x7063)+P8(x7061,x7062,x7063)+~P8(x7064,x7062,x7063)
% 14.25/14.38 [707]~P35(x7073)+~P9(x7071,x7074,x7073)+P9(x7071,x7072,x7073)+~P8(x7074,x7072,x7073)
% 14.25/14.38 [708]~P35(x7083)+~P9(x7084,x7082,x7083)+P9(x7081,x7082,x7083)+~P8(x7081,x7084,x7083)
% 14.25/14.38 [709]~P35(x7093)+~P9(x7091,x7094,x7093)+P9(x7091,x7092,x7093)+~P9(x7094,x7092,x7093)
% 14.25/14.38 [710]~P36(x7103)+~P9(x7101,x7104,x7103)+P9(x7101,x7102,x7103)+~P8(x7104,x7102,x7103)
% 14.25/14.38 [711]~P36(x7113)+~P9(x7114,x7112,x7113)+P9(x7111,x7112,x7113)+~P8(x7111,x7114,x7113)
% 14.25/14.38 [712]~P36(x7123)+~P9(x7121,x7124,x7123)+P9(x7121,x7122,x7123)+~P9(x7124,x7122,x7123)
% 14.25/14.38 [713]~P41(x7133)+~P10(x7131,x7134,x7133)+P10(x7131,x7132,x7133)+~P10(x7134,x7132,x7133)
% 14.25/14.38 [619]~P6(x6194)+~P50(x6194)+E(x6191,x6192)+~E(f11(x6193,x6191,x6194),f11(x6193,x6192,x6194))
% 14.25/14.38 [803]~P42(x8034)+~P10(x8031,x8033,x8034)+~P10(x8031,x8032,x8034)+P10(x8031,f7(x8032,x8033,x8034),x8034)
% 14.25/14.38 [804]~P41(x8044)+~P10(x8041,x8043,x8044)+~P10(x8041,x8042,x8044)+P10(x8041,f11(x8042,x8043,x8044),x8044)
% 14.25/14.38 [810]~P62(x8104)+~P9(x8101,x8103,x8104)+~P9(f3(x8104),x8102,x8104)+P9(x8101,f11(x8102,x8103,x8104),x8104)
% 14.25/14.38 [946]~P65(x9463)+~P8(x9464,x9461,x9463)+~P8(x9462,f3(x9463),x9463)+P8(f10(x9461,x9462,x9463),f10(x9464,x9462,x9463),x9463)
% 14.25/14.38 [947]~P59(x9473)+~P8(x9474,x9472,x9473)+~P9(x9471,f3(x9473),x9473)+P8(f10(x9471,x9472,x9473),f10(x9471,x9474,x9473),x9473)
% 14.25/14.38 [948]~P65(x9483)+~P8(x9484,x9482,x9483)+~P8(x9481,f3(x9483),x9483)+P8(f10(x9481,x9482,x9483),f10(x9481,x9484,x9483),x9483)
% 14.25/14.38 [949]~P1(x9493)+~P9(x9494,x9491,x9493)+~P9(x9492,f3(x9493),x9493)+P9(f9(x9491,x9492,x9493),f9(x9494,x9492,x9493),x9493)
% 14.25/14.38 [951]~P59(x9513)+~P9(x9514,x9511,x9513)+~P9(x9512,f3(x9513),x9513)+P9(f10(x9511,x9512,x9513),f10(x9514,x9512,x9513),x9513)
% 14.25/14.38 [954]~P59(x9543)+~P9(x9544,x9542,x9543)+~P9(x9541,f3(x9543),x9543)+P9(f10(x9541,x9542,x9543),f10(x9541,x9544,x9543),x9543)
% 14.25/14.38 [955]~P54(x9553)+~P8(x9551,x9554,x9553)+~P8(f3(x9553),x9552,x9553)+P8(f10(x9551,x9552,x9553),f10(x9554,x9552,x9553),x9553)
% 14.25/14.38 [956]~P59(x9563)+~P8(x9562,x9564,x9563)+~P9(f3(x9563),x9561,x9563)+P8(f10(x9561,x9562,x9563),f10(x9561,x9564,x9563),x9563)
% 14.25/14.38 [957]~P53(x9573)+~P8(x9572,x9574,x9573)+~P8(f3(x9573),x9571,x9573)+P8(f10(x9571,x9572,x9573),f10(x9571,x9574,x9573),x9573)
% 14.25/14.38 [958]~P54(x9583)+~P8(x9582,x9584,x9583)+~P8(f3(x9583),x9581,x9583)+P8(f10(x9581,x9582,x9583),f10(x9581,x9584,x9583),x9583)
% 14.25/14.38 [959]~P1(x9593)+~P9(x9591,x9594,x9593)+~P9(f3(x9593),x9592,x9593)+P9(f9(x9591,x9592,x9593),f9(x9594,x9592,x9593),x9593)
% 14.25/14.38 [960]~P59(x9603)+~P9(x9601,x9604,x9603)+~P9(f3(x9603),x9602,x9603)+P9(f10(x9601,x9602,x9603),f10(x9604,x9602,x9603),x9603)
% 14.25/14.38 [961]~P61(x9613)+~P9(x9611,x9614,x9613)+~P9(f3(x9613),x9612,x9613)+P9(f10(x9611,x9612,x9613),f10(x9614,x9612,x9613),x9613)
% 14.25/14.38 [963]~P59(x9633)+~P9(x9632,x9634,x9633)+~P9(f3(x9633),x9631,x9633)+P9(f10(x9631,x9632,x9633),f10(x9631,x9634,x9633),x9633)
% 14.25/14.38 [964]~P61(x9643)+~P9(x9642,x9644,x9643)+~P9(f3(x9643),x9641,x9643)+P9(f10(x9641,x9642,x9643),f10(x9641,x9644,x9643),x9643)
% 14.25/14.38 [965]~P51(x9653)+~P9(x9652,x9654,x9653)+~P9(f3(x9653),x9651,x9653)+P9(f10(x9651,x9652,x9653),f10(x9651,x9654,x9653),x9653)
% 14.25/14.38 [974]~P50(x9742)+P10(x9743,x9744,x9742)+~P10(f10(x9741,x9743,x9742),f10(x9741,x9744,x9742),x9742)+E(x9741,f3(x9742))
% 14.25/14.38 [975]~P50(x9752)+P10(x9753,x9754,x9752)+~P10(f10(x9753,x9751,x9752),f10(x9754,x9751,x9752),x9752)+E(x9751,f3(x9752))
% 14.25/14.38 [992]~P1(x9924)+~P9(f3(x9924),x9923,x9924)+~P8(f10(x9921,x9923,x9924),x9922,x9924)+P8(x9921,f9(x9922,x9923,x9924),x9924)
% 14.25/14.38 [993]~P1(x9934)+~P9(f3(x9934),x9933,x9934)+~P9(f10(x9931,x9933,x9934),x9932,x9934)+P9(x9931,f9(x9932,x9933,x9934),x9934)
% 14.25/14.38 [994]~P1(x9943)+~P9(f3(x9943),x9942,x9943)+~P8(x9941,f10(x9944,x9942,x9943),x9943)+P8(f9(x9941,x9942,x9943),x9944,x9943)
% 14.25/14.38 [995]~P1(x9953)+~P9(f3(x9953),x9952,x9953)+~P9(x9951,f10(x9954,x9952,x9953),x9953)+P9(f9(x9951,x9952,x9953),x9954,x9953)
% 14.25/14.38 [1006]P9(x10062,x10061,x10063)+~P59(x10063)+P9(x10061,x10062,x10063)+~P9(f10(x10064,x10061,x10063),f10(x10064,x10062,x10063),x10063)
% 14.25/14.38 [1007]P9(x10072,x10071,x10073)+~P59(x10073)+P9(x10071,x10072,x10073)+~P9(f10(x10071,x10074,x10073),f10(x10072,x10074,x10073),x10073)
% 14.25/14.38 [1012]~P59(x10123)+P9(x10121,x10122,x10123)+~P9(f10(x10121,x10124,x10123),f10(x10122,x10124,x10123),x10123)+P9(x10124,f3(x10123),x10123)
% 14.25/14.38 [1013]~P59(x10133)+P9(x10131,x10132,x10133)+~P9(f10(x10134,x10131,x10133),f10(x10134,x10132,x10133),x10133)+P9(x10134,f3(x10133),x10133)
% 14.25/14.38 [1014]~P59(x10143)+P9(x10141,x10142,x10143)+~P9(f10(x10144,x10142,x10143),f10(x10144,x10141,x10143),x10143)+P9(f3(x10143),x10144,x10143)
% 14.25/14.38 [1015]~P59(x10153)+P9(x10151,x10152,x10153)+~P9(f10(x10152,x10154,x10153),f10(x10151,x10154,x10153),x10153)+P9(f3(x10153),x10154,x10153)
% 14.25/14.38 [1021]~P59(x10212)+~P9(f10(x10213,x10211,x10212),f10(x10214,x10211,x10212),x10212)+P9(x10211,f3(x10212),x10212)+P9(f3(x10212),x10211,x10212)
% 14.25/14.38 [1022]~P59(x10222)+~P9(f10(x10221,x10223,x10222),f10(x10221,x10224,x10222),x10222)+P9(x10221,f3(x10222),x10222)+P9(f3(x10222),x10221,x10222)
% 14.25/14.38 [1033]~P59(x10333)+P8(x10331,x10332,x10333)+~P8(f10(x10334,x10332,x10333),f10(x10334,x10331,x10333),x10333)+~P9(x10334,f3(x10333),x10333)
% 14.25/14.38 [1034]~P59(x10343)+P9(x10341,x10342,x10343)+~P9(f10(x10344,x10342,x10343),f10(x10344,x10341,x10343),x10343)+~P9(x10344,f3(x10343),x10343)
% 14.25/14.38 [1035]~P59(x10353)+P8(x10351,x10352,x10353)+~P8(f10(x10354,x10351,x10353),f10(x10354,x10352,x10353),x10353)+~P9(f3(x10353),x10354,x10353)
% 14.25/14.38 [1036]~P61(x10363)+P8(x10361,x10362,x10363)+~P8(f10(x10364,x10361,x10363),f10(x10364,x10362,x10363),x10363)+~P9(f3(x10363),x10364,x10363)
% 14.25/14.38 [1037]~P61(x10373)+P8(x10371,x10372,x10373)+~P8(f10(x10371,x10374,x10373),f10(x10372,x10374,x10373),x10373)+~P9(f3(x10373),x10374,x10373)
% 14.25/14.38 [1038]~P59(x10383)+P9(x10381,x10382,x10383)+~P9(f10(x10384,x10381,x10383),f10(x10384,x10382,x10383),x10383)+~P9(f3(x10383),x10384,x10383)
% 14.25/14.38 [1039]~P61(x10393)+P9(x10391,x10392,x10393)+~P9(f10(x10394,x10391,x10393),f10(x10394,x10392,x10393),x10393)+~P8(f3(x10393),x10394,x10393)
% 14.25/14.38 [1040]~P61(x10403)+P9(x10401,x10402,x10403)+~P9(f10(x10401,x10404,x10403),f10(x10402,x10404,x10403),x10403)+~P8(f3(x10403),x10404,x10403)
% 14.25/14.38 [1041]~P63(x10413)+P9(x10411,x10412,x10413)+~P9(f10(x10414,x10411,x10413),f10(x10414,x10412,x10413),x10413)+~P8(f3(x10413),x10414,x10413)
% 14.25/14.38 [1042]~P63(x10423)+P9(x10421,x10422,x10423)+~P9(f10(x10421,x10424,x10423),f10(x10422,x10424,x10423),x10423)+~P8(f3(x10423),x10424,x10423)
% 14.25/14.38 [807]~P2(x8072)+~P47(x8072)+E(x8071,f3(x8072))+E(f9(f10(x8073,x8071,x8072),f10(x8074,x8071,x8072),x8072),f9(x8073,x8074,x8072))
% 14.25/14.38 [808]~P2(x8082)+~P47(x8082)+E(x8081,f3(x8082))+E(f9(f10(x8081,x8083,x8082),f10(x8081,x8084,x8082),x8082),f9(x8083,x8084,x8082))
% 14.25/14.38 [968]~P40(x9682)+E(x9681,f3(x9682))+~P8(x9683,f3(a1),a1)+~P8(f15(x9681,x9682),f10(x9683,f15(x9684,x9682),a1),a1)
% 14.25/14.38 [1062]~P11(x10623)+~P10(x10622,x10624,x10623)+~P10(x10622,x10621,x10623)+E(f11(f6(x10621,x10622,x10623),f6(x10624,x10622,x10623),x10623),f6(f11(x10621,x10624,x10623),x10622,x10623))
% 14.25/14.38 [1099]~P57(x10993)+~P9(x10991,f11(x10992,x10994,x10993),x10993)+~P9(f7(x10992,x10994,x10993),x10991,x10993)+P9(f5(f7(x10991,x10992,x10993),x10993),x10994,x10993)
% 14.25/14.38 [1026]~P2(x10262)+~P47(x10262)+E(x10261,f3(x10262))+E(f9(f11(x10263,f10(x10264,x10261,x10262),x10262),x10261,x10262),f11(x10264,f9(x10263,x10261,x10262),x10262))
% 14.25/14.38 [1027]~P2(x10272)+~P47(x10272)+E(x10271,f3(x10272))+E(f9(f11(x10273,f10(x10274,x10271,x10272),x10272),x10271,x10272),f11(f9(x10273,x10271,x10272),x10274,x10272))
% 14.25/14.38 [1130]~P3(x11302)+E(x11301,f3(x11302))+E(x11303,f3(x11302))+E(f13(f10(f10(f8(x11303,x11302),f9(f7(x11303,x11301,x11302),x11304,x11302),x11302),f8(x11301,x11302),x11302),x11302),f9(f7(f8(x11303,x11302),f8(x11301,x11302),x11302),x11304,x11302))
% 14.25/14.38 [765]~P23(x7653)+~P8(x7655,x7654,x7653)+P8(x7651,x7652,x7653)+~E(f7(x7654,x7655,x7653),f7(x7652,x7651,x7653))
% 14.25/14.38 [766]~P23(x7663)+~P8(x7665,x7664,x7663)+P8(x7661,x7662,x7663)+~E(f7(x7662,x7661,x7663),f7(x7664,x7665,x7663))
% 14.25/14.38 [767]~P23(x7673)+~P9(x7674,x7675,x7673)+P9(x7671,x7672,x7673)+~E(f7(x7674,x7675,x7673),f7(x7671,x7672,x7673))
% 14.25/14.38 [768]~P23(x7683)+~P9(x7684,x7685,x7683)+P9(x7681,x7682,x7683)+~E(f7(x7681,x7682,x7683),f7(x7684,x7685,x7683))
% 14.25/14.38 [935]~P32(x9353)+~P8(x9352,x9355,x9353)+~P8(x9351,x9354,x9353)+P8(f11(x9351,x9352,x9353),f11(x9354,x9355,x9353),x9353)
% 14.25/14.38 [936]~P30(x9363)+~P8(x9362,x9365,x9363)+~P9(x9361,x9364,x9363)+P9(f11(x9361,x9362,x9363),f11(x9364,x9365,x9363),x9363)
% 14.25/14.38 [937]~P30(x9373)+~P8(x9371,x9374,x9373)+~P9(x9372,x9375,x9373)+P9(f11(x9371,x9372,x9373),f11(x9374,x9375,x9373),x9373)
% 14.25/14.38 [938]~P30(x9383)+~P9(x9382,x9385,x9383)+~P9(x9381,x9384,x9383)+P9(f11(x9381,x9382,x9383),f11(x9384,x9385,x9383),x9383)
% 14.25/14.38 [939]~P41(x9393)+~P10(x9392,x9395,x9393)+~P10(x9391,x9394,x9393)+P10(f10(x9391,x9392,x9393),f10(x9394,x9395,x9393),x9393)
% 14.25/14.38 [987]~P23(x9874)+~P8(x9875,x9873,x9874)+~P8(x9871,f11(x9872,x9875,x9874),x9874)+P8(x9871,f11(x9872,x9873,x9874),x9874)
% 14.25/14.38 [1065]~P57(x10652)+~P9(f5(x10651,x10652),x10654,x10652)+~P9(f5(x10653,x10652),x10655,x10652)+P9(f10(f5(x10651,x10652),f5(x10653,x10652),x10652),f10(x10654,x10655,x10652),x10652)
% 14.25/14.38 [1077]~P34(x10773)+~P9(f15(x10772,x10773),x10775,a1)+~P9(f15(x10771,x10773),x10774,a1)+P9(f15(f10(x10771,x10772,x10773),x10773),f10(x10774,x10775,a1),a1)
% 14.25/14.38 [1078]~P40(x10783)+~P9(f15(x10782,x10783),x10785,a1)+~P9(f15(x10781,x10783),x10784,a1)+P9(f15(f11(x10781,x10782,x10783),x10783),f11(x10784,x10785,a1),a1)
% 14.25/14.38 [1081]~P11(x10813)+~P10(x10815,x10812,x10813)+~P10(x10814,x10811,x10813)+E(f6(f10(x10811,x10812,x10813),f10(x10814,x10815,x10813),x10813),f10(f6(x10811,x10814,x10813),f6(x10812,x10815,x10813),x10813))
% 14.25/14.38 [1114]~P47(x11142)+E(x11141,f3(x11142))+E(x11143,f3(x11142))+E(f9(f7(f10(x11144,x11141,x11142),f10(x11145,x11143,x11142),x11142),f10(x11143,x11141,x11142),x11142),f7(f9(x11144,x11143,x11142),f9(x11145,x11141,x11142),x11142))
% 14.25/14.38 [1115]~P47(x11152)+E(x11151,f3(x11152))+E(x11153,f3(x11152))+E(f9(f11(f10(x11154,x11151,x11152),f10(x11155,x11153,x11152),x11152),f10(x11153,x11151,x11152),x11152),f11(f9(x11154,x11153,x11152),f9(x11155,x11151,x11152),x11152))
% 14.25/14.38 [734]~P1(x7342)+~P2(x7342)+P8(f4(x7342),x7341,x7342)+~P8(f8(x7341,x7342),f4(x7342),x7342)+P8(x7341,f3(x7342),x7342)
% 14.25/14.38 [735]~P1(x7352)+~P2(x7352)+P9(f4(x7352),x7351,x7352)+~P9(f8(x7351,x7352),f4(x7352),x7352)+P8(x7351,f3(x7352),x7352)
% 14.25/14.38 [741]~P1(x7411)+~P2(x7411)+~P9(f3(x7411),x7412,x7411)+~P8(x7412,f4(x7411),x7411)+P8(f4(x7411),f8(x7412,x7411),x7411)
% 14.25/14.38 [742]~P1(x7421)+~P2(x7421)+~P9(f3(x7421),x7422,x7421)+~P9(x7422,f4(x7421),x7421)+P9(f4(x7421),f8(x7422,x7421),x7421)
% 14.25/14.38 [373]~P48(x3733)+E(x3731,x3732)+~E(f8(x3731,x3733),f8(x3732,x3733))+E(x3732,f3(x3733))+E(x3731,f3(x3733))
% 14.25/14.38 [749]~P33(x7492)+~P8(f3(x7492),x7491,x7492)+~P8(f3(x7492),x7493,x7492)+~E(f11(x7493,x7491,x7492),f3(x7492))+E(x7491,f3(x7492))
% 14.25/14.38 [750]~P33(x7502)+~P8(f3(x7502),x7503,x7502)+~P8(f3(x7502),x7501,x7502)+~E(f11(x7501,x7503,x7502),f3(x7502))+E(x7501,f3(x7502))
% 14.25/14.38 [865]~P1(x8651)+~P2(x8651)+~P8(x8653,f3(x8651),x8651)+~P8(x8652,f3(x8651),x8651)+P8(f3(x8651),f9(x8652,x8653,x8651),x8651)
% 14.25/14.38 [867]~P1(x8671)+~P2(x8671)+~P8(f3(x8671),x8673,x8671)+~P8(f3(x8671),x8672,x8671)+P8(f3(x8671),f9(x8672,x8673,x8671),x8671)
% 14.25/14.38 [869]~P1(x8693)+~P2(x8693)+~P8(x8692,f3(x8693),x8693)+~P8(f3(x8693),x8691,x8693)+P8(f9(x8691,x8692,x8693),f3(x8693),x8693)
% 14.25/14.38 [870]~P1(x8703)+~P2(x8703)+~P8(x8701,f3(x8703),x8703)+~P8(f3(x8703),x8702,x8703)+P8(f9(x8701,x8702,x8703),f3(x8703),x8703)
% 14.25/14.38 [885]~P1(x8852)+~P2(x8852)+~P8(f9(x8853,x8851,x8852),f3(x8852),x8852)+P8(x8851,f3(x8852),x8852)+P8(x8853,f3(x8852),x8852)
% 14.25/14.38 [886]~P1(x8862)+~P2(x8862)+~P9(f9(x8863,x8861,x8862),f3(x8862),x8862)+P9(x8861,f3(x8862),x8862)+P9(x8863,f3(x8862),x8862)
% 14.25/14.38 [887]~P1(x8872)+~P2(x8872)+~P8(f3(x8872),f9(x8873,x8871,x8872),x8872)+P8(x8871,f3(x8872),x8872)+P8(f3(x8872),x8873,x8872)
% 14.25/14.38 [888]~P1(x8882)+~P2(x8882)+~P8(f3(x8882),f9(x8881,x8883,x8882),x8882)+P8(x8881,f3(x8882),x8882)+P8(f3(x8882),x8883,x8882)
% 14.25/14.38 [889]~P1(x8892)+~P2(x8892)+~P8(f3(x8892),f9(x8893,x8891,x8892),x8892)+P8(x8891,f3(x8892),x8892)+P8(f3(x8892),x8891,x8892)
% 14.25/14.38 [890]~P1(x8902)+~P2(x8902)+~P8(f3(x8902),f9(x8901,x8903,x8902),x8902)+P8(x8901,f3(x8902),x8902)+P8(f3(x8902),x8901,x8902)
% 14.25/14.38 [891]~P1(x8912)+~P2(x8912)+~P9(f3(x8912),f9(x8913,x8911,x8912),x8912)+P9(x8911,f3(x8912),x8912)+P9(f3(x8912),x8913,x8912)
% 14.25/14.38 [892]~P1(x8922)+~P2(x8922)+~P9(f3(x8922),f9(x8921,x8923,x8922),x8922)+P9(x8921,f3(x8922),x8922)+P9(f3(x8922),x8923,x8922)
% 14.25/14.38 [893]~P1(x8932)+~P2(x8932)+~P9(f3(x8932),f9(x8933,x8931,x8932),x8932)+P9(x8931,f3(x8932),x8932)+P9(f3(x8932),x8931,x8932)
% 14.25/14.38 [894]~P1(x8942)+~P2(x8942)+~P9(f3(x8942),f9(x8941,x8943,x8942),x8942)+P9(x8941,f3(x8942),x8942)+P9(f3(x8942),x8941,x8942)
% 14.25/14.38 [895]~P1(x8952)+~P2(x8952)+~P8(f9(x8953,x8951,x8952),f3(x8952),x8952)+P8(x8951,f3(x8952),x8952)+P8(f3(x8952),x8951,x8952)
% 14.25/14.38 [896]~P1(x8962)+~P2(x8962)+~P8(f9(x8961,x8963,x8962),f3(x8962),x8962)+P8(x8961,f3(x8962),x8962)+P8(f3(x8962),x8961,x8962)
% 14.25/14.38 [897]~P1(x8972)+~P2(x8972)+~P9(f9(x8973,x8971,x8972),f3(x8972),x8972)+P9(x8971,f3(x8972),x8972)+P9(f3(x8972),x8971,x8972)
% 14.25/14.38 [898]~P1(x8982)+~P2(x8982)+~P9(f9(x8981,x8983,x8982),f3(x8982),x8982)+P9(x8981,f3(x8982),x8982)+P9(f3(x8982),x8981,x8982)
% 14.25/14.38 [899]~P1(x8991)+~P2(x8991)+~P8(f9(x8992,x8993,x8991),f3(x8991),x8991)+P8(f3(x8991),x8992,x8991)+P8(f3(x8991),x8993,x8991)
% 14.25/14.38 [900]~P1(x9001)+~P2(x9001)+~P9(f9(x9002,x9003,x9001),f3(x9001),x9001)+P9(f3(x9001),x9002,x9001)+P9(f3(x9001),x9003,x9001)
% 14.25/14.38 [944]~P57(x9443)+~P8(x9441,f4(x9443),x9443)+~P8(f3(x9443),x9442,x9443)+~P8(f3(x9443),x9441,x9443)+P8(f10(x9441,x9442,x9443),x9442,x9443)
% 14.25/14.38 [945]~P57(x9453)+~P8(x9452,f4(x9453),x9453)+~P8(f3(x9453),x9452,x9453)+~P8(f3(x9453),x9451,x9453)+P8(f10(x9451,x9452,x9453),x9451,x9453)
% 14.25/14.38 [816]~P31(x8164)+~P15(x8164)+~P8(x8161,x8163,x8164)+~P8(f3(x8164),x8162,x8164)+P8(x8161,f11(x8162,x8163,x8164),x8164)
% 14.25/14.38 [817]~P31(x8174)+~P15(x8174)+~P8(x8171,x8172,x8174)+~P8(f3(x8174),x8173,x8174)+P8(x8171,f11(x8172,x8173,x8174),x8174)
% 14.25/14.38 [818]~P31(x8184)+~P15(x8184)+~P8(x8181,x8183,x8184)+~P9(f3(x8184),x8182,x8184)+P9(x8181,f11(x8182,x8183,x8184),x8184)
% 14.25/14.38 [819]~P31(x8194)+~P15(x8194)+~P9(x8191,x8193,x8194)+~P8(f3(x8194),x8192,x8194)+P9(x8191,f11(x8192,x8193,x8194),x8194)
% 14.25/14.38 [966]~P1(x9663)+~P2(x9663)+~P8(x9664,x9661,x9663)+~P8(x9662,f3(x9663),x9663)+P8(f9(x9661,x9662,x9663),f9(x9664,x9662,x9663),x9663)
% 14.25/14.38 [967]~P1(x9673)+~P2(x9673)+~P8(x9671,x9674,x9673)+~P8(f3(x9673),x9672,x9673)+P8(f9(x9671,x9672,x9673),f9(x9674,x9672,x9673),x9673)
% 14.25/14.38 [997]~P1(x9974)+~P2(x9974)+~P9(f3(x9974),x9973,x9974)+~P8(f9(x9971,x9973,x9974),x9972,x9974)+P8(x9971,f10(x9972,x9973,x9974),x9974)
% 14.25/14.38 [999]~P1(x9994)+~P2(x9994)+~P9(f3(x9994),x9993,x9994)+~P9(f9(x9991,x9993,x9994),x9992,x9994)+P9(x9991,f10(x9992,x9993,x9994),x9994)
% 14.25/14.38 [1001]~P1(x10013)+~P2(x10013)+~P9(f3(x10013),x10012,x10013)+~P8(x10011,f9(x10014,x10012,x10013),x10013)+P8(f10(x10011,x10012,x10013),x10014,x10013)
% 14.25/14.38 [1003]~P1(x10033)+~P2(x10033)+~P9(f3(x10033),x10032,x10033)+~P9(x10031,f9(x10034,x10032,x10033),x10033)+P9(f10(x10031,x10032,x10033),x10034,x10033)
% 14.25/14.38 [1005]~P11(x10053)+~P10(x10052,x10054,x10053)+~P10(x10052,x10051,x10053)+~P10(x10051,x10054,x10053)+P10(f6(x10051,x10052,x10053),f6(x10054,x10052,x10053),x10053)
% 14.25/14.38 [1079]~P11(x10793)+~P10(x10794,x10791,x10793)+P10(x10791,x10792,x10793)+~P10(x10794,x10792,x10793)+~P10(f6(x10791,x10794,x10793),f6(x10792,x10794,x10793),x10793)
% 14.25/14.38 [1082]~P1(x10823)+~P9(x10822,x10824,x10823)+~P9(x10821,f3(x10823),x10823)+~P9(f3(x10823),f10(x10822,x10824,x10823),x10823)+P9(f9(x10821,x10822,x10823),f9(x10821,x10824,x10823),x10823)
% 14.25/14.38 [1083]~P1(x10833)+~P8(x10834,x10832,x10833)+~P8(f3(x10833),x10831,x10833)+~P9(f3(x10833),f10(x10832,x10834,x10833),x10833)+P8(f9(x10831,x10832,x10833),f9(x10831,x10834,x10833),x10833)
% 14.25/14.38 [1084]~P1(x10843)+~P9(x10844,x10842,x10843)+~P9(f3(x10843),x10841,x10843)+~P9(f3(x10843),f10(x10842,x10844,x10843),x10843)+P9(f9(x10841,x10842,x10843),f9(x10841,x10844,x10843),x10843)
% 14.25/14.38 [751]~P47(x7512)+~E(f10(x7514,x7513,x7512),f10(x7515,x7511,x7512))+E(f9(x7514,x7511,x7512),f9(x7515,x7513,x7512))+E(x7511,f3(x7512))+E(x7513,f3(x7512))
% 14.25/14.38 [752]~P47(x7522)+~E(f9(x7524,x7523,x7522),f9(x7525,x7521,x7522))+E(f10(x7524,x7521,x7522),f10(x7525,x7523,x7522))+E(x7521,f3(x7522))+E(x7523,f3(x7522))
% 14.25/14.38 [1004]~P6(x10044)+~P50(x10044)+E(x10041,x10042)+E(x10043,f3(x10044))+~E(f11(x10045,f10(x10043,x10041,x10044),x10044),f11(x10045,f10(x10043,x10042,x10044),x10044))
% 14.25/14.38 [1101]~P6(x11015)+~P50(x11015)+E(x11011,x11012)+E(x11013,x11014)+~E(f11(f10(x11013,x11011,x11015),f10(x11014,x11012,x11015),x11015),f11(f10(x11013,x11012,x11015),f10(x11014,x11011,x11015),x11015))
% 14.25/14.38 [1120]~P49(x11205)+~P44(x11205)+~P10(x11201,x11204,x11205)+~P10(x11201,f11(x11202,x11206,x11205),x11205)+P10(x11201,f11(f7(x11202,f10(x11203,x11204,x11205),x11205),x11206,x11205),x11205)
% 14.25/14.38 [1121]~P49(x11214)+~P44(x11214)+~P10(x11211,x11215,x11214)+P10(x11211,f11(x11212,x11213,x11214),x11214)+~P10(x11211,f11(f7(x11212,f10(x11216,x11215,x11214),x11214),x11213,x11214),x11214)
% 14.25/14.38 [881]~P1(x8812)+~P2(x8812)+P9(x8811,f3(x8812),x8812)+P9(f3(x8812),x8811,x8812)+~P8(x8813,f3(x8812),x8812)+P8(x8813,f9(x8814,x8811,x8812),x8812)
% 14.25/14.38 [882]~P1(x8822)+~P2(x8822)+P9(x8821,f3(x8822),x8822)+P9(f3(x8822),x8821,x8822)+~P9(x8823,f3(x8822),x8822)+P9(x8823,f9(x8824,x8821,x8822),x8822)
% 14.25/14.38 [883]~P1(x8832)+~P2(x8832)+P9(x8831,f3(x8832),x8832)+P9(f3(x8832),x8831,x8832)+~P8(f3(x8832),x8834,x8832)+P8(f9(x8833,x8831,x8832),x8834,x8832)
% 14.25/14.38 [884]~P1(x8842)+~P2(x8842)+P9(x8841,f3(x8842),x8842)+P9(f3(x8842),x8841,x8842)+~P9(f3(x8842),x8844,x8842)+P9(f9(x8843,x8841,x8842),x8844,x8842)
% 14.25/14.38 [940]~P1(x9402)+~P2(x9402)+P8(x9401,f3(x9402),x9402)+P9(f3(x9402),x9403,x9402)+~P8(x9401,f9(x9404,x9403,x9402),x9402)+P9(x9403,f3(x9402),x9402)
% 14.25/14.38 [941]~P1(x9412)+~P2(x9412)+P9(x9411,f3(x9412),x9412)+P9(f3(x9412),x9411,x9412)+~P9(x9413,f9(x9414,x9411,x9412),x9412)+P9(x9413,f3(x9412),x9412)
% 14.25/14.38 [942]~P1(x9422)+~P2(x9422)+P9(x9421,f3(x9422),x9422)+P9(f3(x9422),x9421,x9422)+~P8(f9(x9424,x9421,x9422),x9423,x9422)+P8(f3(x9422),x9423,x9422)
% 14.25/14.38 [943]~P1(x9432)+~P2(x9432)+P9(x9431,f3(x9432),x9432)+P9(f3(x9432),x9431,x9432)+~P9(f9(x9434,x9431,x9432),x9433,x9432)+P9(f3(x9432),x9433,x9432)
% 14.25/14.38 [1043]~P1(x10432)+~P2(x10432)+~P8(f10(x10433,x10431,x10432),x10434,x10432)+P9(x10431,f3(x10432),x10432)+~P8(x10433,f3(x10432),x10432)+P8(x10433,f9(x10434,x10431,x10432),x10432)
% 14.25/14.38 [1044]~P1(x10442)+~P2(x10442)+~P9(f10(x10443,x10441,x10442),x10444,x10442)+P9(x10441,f3(x10442),x10442)+~P9(x10443,f3(x10442),x10442)+P9(x10443,f9(x10444,x10441,x10442),x10442)
% 14.25/14.38 [1045]~P1(x10452)+~P2(x10452)+~P8(x10453,f10(x10454,x10451,x10452),x10452)+P9(x10451,f3(x10452),x10452)+~P8(f3(x10452),x10454,x10452)+P8(f9(x10453,x10451,x10452),x10454,x10452)
% 14.25/14.38 [1046]~P1(x10462)+~P2(x10462)+~P9(x10463,f10(x10464,x10461,x10462),x10462)+P9(x10461,f3(x10462),x10462)+~P9(f3(x10462),x10464,x10462)+P9(f9(x10463,x10461,x10462),x10464,x10462)
% 14.25/14.38 [1047]~P1(x10471)+~P2(x10471)+~P8(x10474,f10(x10473,x10472,x10471),x10471)+~P8(x10473,f3(x10471),x10471)+P9(f3(x10471),x10472,x10471)+P8(x10473,f9(x10474,x10472,x10471),x10471)
% 14.25/14.38 [1048]~P1(x10481)+~P2(x10481)+~P8(x10484,f10(x10483,x10482,x10481),x10481)+~P9(x10482,f3(x10481),x10481)+P9(f3(x10481),x10482,x10481)+P8(x10483,f9(x10484,x10482,x10481),x10481)
% 14.25/14.38 [1049]~P1(x10491)+~P2(x10491)+~P8(x10494,f9(x10493,x10492,x10491),x10491)+~P9(x10492,f3(x10491),x10491)+P9(f3(x10491),x10492,x10491)+P8(x10493,f10(x10494,x10492,x10491),x10491)
% 14.25/14.38 [1050]~P1(x10501)+~P2(x10501)+~P9(x10504,f10(x10503,x10502,x10501),x10501)+~P9(x10502,f3(x10501),x10501)+P9(f3(x10501),x10502,x10501)+P9(x10503,f9(x10504,x10502,x10501),x10501)
% 14.25/14.38 [1051]~P1(x10511)+~P2(x10511)+~P9(x10514,f10(x10513,x10512,x10511),x10511)+~P9(x10513,f3(x10511),x10511)+P9(f3(x10511),x10512,x10511)+P9(x10513,f9(x10514,x10512,x10511),x10511)
% 14.25/14.38 [1052]~P1(x10521)+~P2(x10521)+~P9(x10524,f9(x10523,x10522,x10521),x10521)+~P9(x10522,f3(x10521),x10521)+P9(f3(x10521),x10522,x10521)+P9(x10523,f10(x10524,x10522,x10521),x10521)
% 14.25/14.38 [1053]~P1(x10531)+~P2(x10531)+~P8(f10(x10534,x10532,x10531),x10533,x10531)+~P9(x10532,f3(x10531),x10531)+P9(f3(x10531),x10532,x10531)+P8(f9(x10533,x10532,x10531),x10534,x10531)
% 14.25/14.38 [1054]~P1(x10541)+~P2(x10541)+~P8(f9(x10544,x10542,x10541),x10543,x10541)+~P9(x10542,f3(x10541),x10541)+P9(f3(x10541),x10542,x10541)+P8(f10(x10543,x10542,x10541),x10544,x10541)
% 14.25/14.38 [1055]~P1(x10551)+~P2(x10551)+~P9(f10(x10554,x10552,x10551),x10553,x10551)+~P9(x10552,f3(x10551),x10551)+P9(f3(x10551),x10552,x10551)+P9(f9(x10553,x10552,x10551),x10554,x10551)
% 14.25/14.38 [1056]~P1(x10561)+~P2(x10561)+~P9(f9(x10564,x10562,x10561),x10563,x10561)+~P9(x10562,f3(x10561),x10561)+P9(f3(x10561),x10562,x10561)+P9(f10(x10563,x10562,x10561),x10564,x10561)
% 14.25/14.38 [1057]~P1(x10571)+~P2(x10571)+~P8(f10(x10574,x10572,x10571),x10573,x10571)+~P8(f3(x10571),x10574,x10571)+P9(f3(x10571),x10572,x10571)+P8(f9(x10573,x10572,x10571),x10574,x10571)
% 14.25/14.38 [1058]~P1(x10581)+~P2(x10581)+~P9(f10(x10584,x10582,x10581),x10583,x10581)+~P9(f3(x10581),x10584,x10581)+P9(f3(x10581),x10582,x10581)+P9(f9(x10583,x10582,x10581),x10584,x10581)
% 14.25/14.38 [1085]~P1(x10853)+~P2(x10853)+~P8(x10852,x10854,x10853)+~P8(x10851,f3(x10853),x10853)+~P9(f3(x10853),f10(x10852,x10854,x10853),x10853)+P8(f9(x10851,x10852,x10853),f9(x10851,x10854,x10853),x10853)
% 14.25/14.38 [1091]~P1(x10914)+~P2(x10914)+~P8(x10911,f3(x10914),x10914)+~P8(x10912,f10(x10911,x10913,x10914),x10914)+~P8(f10(x10911,x10913,x10914),x10912,x10914)+P8(x10911,f9(x10912,x10913,x10914),x10914)
% 14.25/14.38 [1092]~P1(x10924)+~P2(x10924)+~P9(x10923,f3(x10924),x10924)+~P8(x10922,f10(x10921,x10923,x10924),x10924)+~P8(f10(x10921,x10923,x10924),x10922,x10924)+P8(x10921,f9(x10922,x10923,x10924),x10924)
% 14.25/14.38 [1093]~P1(x10934)+~P2(x10934)+~P9(x10933,f3(x10934),x10934)+~P9(x10932,f10(x10931,x10933,x10934),x10934)+~P9(f10(x10931,x10933,x10934),x10932,x10934)+P9(x10931,f9(x10932,x10933,x10934),x10934)
% 14.25/14.38 [1094]~P1(x10944)+~P2(x10944)+~P9(x10941,f3(x10944),x10944)+~P9(x10942,f10(x10941,x10943,x10944),x10944)+~P9(f10(x10941,x10943,x10944),x10942,x10944)+P9(x10941,f9(x10942,x10943,x10944),x10944)
% 14.25/14.38 [1095]~P1(x10953)+~P2(x10953)+~P9(x10952,f3(x10953),x10953)+~P8(x10951,f10(x10954,x10952,x10953),x10953)+~P8(f10(x10954,x10952,x10953),x10951,x10953)+P8(f9(x10951,x10952,x10953),x10954,x10953)
% 14.25/14.38 [1096]~P1(x10963)+~P2(x10963)+~P9(x10962,f3(x10963),x10963)+~P9(x10961,f10(x10964,x10962,x10963),x10963)+~P9(f10(x10964,x10962,x10963),x10961,x10963)+P9(f9(x10961,x10962,x10963),x10964,x10963)
% 14.25/14.38 [1097]~P1(x10973)+~P2(x10973)+~P8(f3(x10973),x10974,x10973)+~P8(x10971,f10(x10974,x10972,x10973),x10973)+~P8(f10(x10974,x10972,x10973),x10971,x10973)+P8(f9(x10971,x10972,x10973),x10974,x10973)
% 14.25/14.38 [1098]~P1(x10983)+~P2(x10983)+~P9(f3(x10983),x10984,x10983)+~P9(x10981,f10(x10984,x10982,x10983),x10983)+~P9(f10(x10984,x10982,x10983),x10981,x10983)+P9(f9(x10981,x10982,x10983),x10984,x10983)
% 14.25/14.38 [1066]~P1(x10663)+~P8(x10665,x10662,x10663)+~P8(x10661,x10664,x10663)+~P8(f3(x10663),x10661,x10663)+~P9(f3(x10663),x10665,x10663)+P8(f9(x10661,x10662,x10663),f9(x10664,x10665,x10663),x10663)
% 14.25/14.38 [1067]~P67(x10673)+~P8(x10672,x10675,x10673)+~P8(x10671,x10674,x10673)+~P8(f3(x10673),x10674,x10673)+~P8(f3(x10673),x10672,x10673)+P8(f10(x10671,x10672,x10673),f10(x10674,x10675,x10673),x10673)
% 14.25/14.38 [1068]~P67(x10683)+~P8(x10682,x10685,x10683)+~P8(x10681,x10684,x10683)+~P8(f3(x10683),x10682,x10683)+~P8(f3(x10683),x10681,x10683)+P8(f10(x10681,x10682,x10683),f10(x10684,x10685,x10683),x10683)
% 14.25/14.38 [1069]~P1(x10693)+~P8(x10695,x10692,x10693)+~P9(x10691,x10694,x10693)+~P8(f3(x10693),x10691,x10693)+~P9(f3(x10693),x10695,x10693)+P9(f9(x10691,x10692,x10693),f9(x10694,x10695,x10693),x10693)
% 14.25/14.38 [1070]~P1(x10703)+~P8(x10701,x10704,x10703)+~P9(x10705,x10702,x10703)+~P9(f3(x10703),x10705,x10703)+~P9(f3(x10703),x10701,x10703)+P9(f9(x10701,x10702,x10703),f9(x10704,x10705,x10703),x10703)
% 14.25/14.38 [1071]~P61(x10713)+~P8(x10712,x10715,x10713)+~P9(x10711,x10714,x10713)+~P8(f3(x10713),x10711,x10713)+~P9(f3(x10713),x10712,x10713)+P9(f10(x10711,x10712,x10713),f10(x10714,x10715,x10713),x10713)
% 14.25/14.38 [1072]~P61(x10723)+~P8(x10721,x10724,x10723)+~P9(x10722,x10725,x10723)+~P8(f3(x10723),x10722,x10723)+~P9(f3(x10723),x10721,x10723)+P9(f10(x10721,x10722,x10723),f10(x10724,x10725,x10723),x10723)
% 14.25/14.38 [1073]~P61(x10733)+~P9(x10732,x10735,x10733)+~P9(x10731,x10734,x10733)+~P8(f3(x10733),x10732,x10733)+~P8(f3(x10733),x10731,x10733)+P9(f10(x10731,x10732,x10733),f10(x10734,x10735,x10733),x10733)
% 14.25/14.38 [1074]~P61(x10743)+~P9(x10742,x10745,x10743)+~P9(x10741,x10744,x10743)+~P8(f3(x10743),x10742,x10743)+~P9(f3(x10743),x10744,x10743)+P9(f10(x10741,x10742,x10743),f10(x10744,x10745,x10743),x10743)
% 14.25/14.38 %EqnAxiom
% 14.25/14.38 [1]E(x11,x11)
% 14.25/14.38 [2]E(x22,x21)+~E(x21,x22)
% 14.25/14.38 [3]E(x31,x33)+~E(x31,x32)+~E(x32,x33)
% 14.25/14.38 [4]~E(x41,x42)+E(f3(x41),f3(x42))
% 14.25/14.38 [5]~E(x51,x52)+E(f14(x51),f14(x52))
% 14.25/14.38 [6]~E(x61,x62)+E(f7(x61,x63,x64),f7(x62,x63,x64))
% 14.25/14.38 [7]~E(x71,x72)+E(f7(x73,x71,x74),f7(x73,x72,x74))
% 14.25/14.38 [8]~E(x81,x82)+E(f7(x83,x84,x81),f7(x83,x84,x82))
% 14.25/14.38 [9]~E(x91,x92)+E(f4(x91),f4(x92))
% 14.25/14.38 [10]~E(x101,x102)+E(f10(x101,x103,x104),f10(x102,x103,x104))
% 14.25/14.38 [11]~E(x111,x112)+E(f10(x113,x111,x114),f10(x113,x112,x114))
% 14.25/14.38 [12]~E(x121,x122)+E(f10(x123,x124,x121),f10(x123,x124,x122))
% 14.25/14.38 [13]~E(x131,x132)+E(f11(x131,x133,x134),f11(x132,x133,x134))
% 14.25/14.38 [14]~E(x141,x142)+E(f11(x143,x141,x144),f11(x143,x142,x144))
% 14.25/14.38 [15]~E(x151,x152)+E(f11(x153,x154,x151),f11(x153,x154,x152))
% 14.25/14.38 [16]~E(x161,x162)+E(f9(x161,x163,x164),f9(x162,x163,x164))
% 14.25/14.38 [17]~E(x171,x172)+E(f9(x173,x171,x174),f9(x173,x172,x174))
% 14.25/14.38 [18]~E(x181,x182)+E(f9(x183,x184,x181),f9(x183,x184,x182))
% 14.25/14.38 [19]~E(x191,x192)+E(f5(x191,x193),f5(x192,x193))
% 14.25/14.38 [20]~E(x201,x202)+E(f5(x203,x201),f5(x203,x202))
% 14.25/14.38 [21]~E(x211,x212)+E(f15(x211,x213),f15(x212,x213))
% 14.25/14.38 [22]~E(x221,x222)+E(f15(x223,x221),f15(x223,x222))
% 14.25/14.38 [23]~E(x231,x232)+E(f8(x231,x233),f8(x232,x233))
% 14.25/14.38 [24]~E(x241,x242)+E(f8(x243,x241),f8(x243,x242))
% 14.25/14.38 [25]~E(x251,x252)+E(f16(x251,x253,x254),f16(x252,x253,x254))
% 14.25/14.38 [26]~E(x261,x262)+E(f16(x263,x261,x264),f16(x263,x262,x264))
% 14.25/14.38 [27]~E(x271,x272)+E(f16(x273,x274,x271),f16(x273,x274,x272))
% 14.25/14.38 [28]~E(x281,x282)+E(f13(x281,x283),f13(x282,x283))
% 14.25/14.38 [29]~E(x291,x292)+E(f13(x293,x291),f13(x293,x292))
% 14.25/14.38 [30]~E(x301,x302)+E(f12(x301,x303),f12(x302,x303))
% 14.25/14.38 [31]~E(x311,x312)+E(f12(x313,x311),f12(x313,x312))
% 14.25/14.38 [32]~E(x321,x322)+E(f27(x321),f27(x322))
% 14.25/14.38 [33]~E(x331,x332)+E(f34(x331,x333),f34(x332,x333))
% 14.25/14.38 [34]~E(x341,x342)+E(f34(x343,x341),f34(x343,x342))
% 14.25/14.38 [35]~E(x351,x352)+E(f19(x351,x353),f19(x352,x353))
% 14.25/14.38 [36]~E(x361,x362)+E(f19(x363,x361),f19(x363,x362))
% 14.25/14.38 [37]~E(x371,x372)+E(f6(x371,x373,x374),f6(x372,x373,x374))
% 14.25/14.38 [38]~E(x381,x382)+E(f6(x383,x381,x384),f6(x383,x382,x384))
% 14.25/14.38 [39]~E(x391,x392)+E(f6(x393,x394,x391),f6(x393,x394,x392))
% 14.25/14.38 [40]~E(x401,x402)+E(f18(x401,x403),f18(x402,x403))
% 14.25/14.38 [41]~E(x411,x412)+E(f18(x413,x411),f18(x413,x412))
% 14.25/14.38 [42]~E(x421,x422)+E(f17(x421,x423,x424),f17(x422,x423,x424))
% 14.25/14.38 [43]~E(x431,x432)+E(f17(x433,x431,x434),f17(x433,x432,x434))
% 14.25/14.38 [44]~E(x441,x442)+E(f17(x443,x444,x441),f17(x443,x444,x442))
% 14.25/14.38 [45]~E(x451,x452)+E(f20(x451,x453),f20(x452,x453))
% 14.25/14.38 [46]~E(x461,x462)+E(f20(x463,x461),f20(x463,x462))
% 14.25/14.38 [47]~E(x471,x472)+E(f26(x471,x473),f26(x472,x473))
% 14.25/14.38 [48]~E(x481,x482)+E(f26(x483,x481),f26(x483,x482))
% 14.25/14.38 [49]~E(x491,x492)+E(f22(x491,x493),f22(x492,x493))
% 14.25/14.38 [50]~E(x501,x502)+E(f22(x503,x501),f22(x503,x502))
% 14.25/14.38 [51]~E(x511,x512)+E(f21(x511,x513),f21(x512,x513))
% 14.25/14.38 [52]~E(x521,x522)+E(f21(x523,x521),f21(x523,x522))
% 14.25/14.38 [53]~E(x531,x532)+E(f23(x531,x533),f23(x532,x533))
% 14.25/14.38 [54]~E(x541,x542)+E(f23(x543,x541),f23(x543,x542))
% 14.25/14.38 [55]~E(x551,x552)+E(f35(x551,x553),f35(x552,x553))
% 14.25/14.38 [56]~E(x561,x562)+E(f35(x563,x561),f35(x563,x562))
% 14.25/14.38 [57]~E(x571,x572)+E(f25(x571,x573),f25(x572,x573))
% 14.25/14.38 [58]~E(x581,x582)+E(f25(x583,x581),f25(x583,x582))
% 14.25/14.38 [59]~E(x591,x592)+E(f24(x591,x593),f24(x592,x593))
% 14.25/14.38 [60]~E(x601,x602)+E(f24(x603,x601),f24(x603,x602))
% 14.25/14.38 [61]~E(x611,x612)+E(f36(x611,x613,x614),f36(x612,x613,x614))
% 14.25/14.38 [62]~E(x621,x622)+E(f36(x623,x621,x624),f36(x623,x622,x624))
% 14.25/14.38 [63]~E(x631,x632)+E(f36(x633,x634,x631),f36(x633,x634,x632))
% 14.25/14.38 [64]~E(x641,x642)+E(f37(x641,x643,x644),f37(x642,x643,x644))
% 14.25/14.38 [65]~E(x651,x652)+E(f37(x653,x651,x654),f37(x653,x652,x654))
% 14.25/14.38 [66]~E(x661,x662)+E(f37(x663,x664,x661),f37(x663,x664,x662))
% 14.25/14.38 [67]~P1(x671)+P1(x672)+~E(x671,x672)
% 14.25/14.38 [68]~P2(x681)+P2(x682)+~E(x681,x682)
% 14.25/14.38 [69]P9(x692,x693,x694)+~E(x691,x692)+~P9(x691,x693,x694)
% 14.25/14.38 [70]P9(x703,x702,x704)+~E(x701,x702)+~P9(x703,x701,x704)
% 14.25/14.38 [71]P9(x713,x714,x712)+~E(x711,x712)+~P9(x713,x714,x711)
% 14.25/14.38 [72]~P47(x721)+P47(x722)+~E(x721,x722)
% 14.25/14.38 [73]P8(x732,x733,x734)+~E(x731,x732)+~P8(x731,x733,x734)
% 14.25/14.38 [74]P8(x743,x742,x744)+~E(x741,x742)+~P8(x743,x741,x744)
% 14.25/14.38 [75]P8(x753,x754,x752)+~E(x751,x752)+~P8(x753,x754,x751)
% 14.25/14.38 [76]~P3(x761)+P3(x762)+~E(x761,x762)
% 14.25/14.38 [77]~P40(x771)+P40(x772)+~E(x771,x772)
% 14.25/14.38 [78]~P4(x781)+P4(x782)+~E(x781,x782)
% 14.25/14.38 [79]~P57(x791)+P57(x792)+~E(x791,x792)
% 14.25/14.38 [80]~P23(x801)+P23(x802)+~E(x801,x802)
% 14.25/14.38 [81]P10(x812,x813,x814)+~E(x811,x812)+~P10(x811,x813,x814)
% 14.25/14.38 [82]P10(x823,x822,x824)+~E(x821,x822)+~P10(x823,x821,x824)
% 14.25/14.38 [83]P10(x833,x834,x832)+~E(x831,x832)+~P10(x833,x834,x831)
% 14.25/14.38 [84]~P41(x841)+P41(x842)+~E(x841,x842)
% 14.25/14.38 [85]~P35(x851)+P35(x852)+~E(x851,x852)
% 14.25/14.38 [86]~P29(x861)+P29(x862)+~E(x861,x862)
% 14.25/14.38 [87]~P5(x871)+P5(x872)+~E(x871,x872)
% 14.25/14.38 [88]~P18(x881)+P18(x882)+~E(x881,x882)
% 14.25/14.38 [89]~P60(x891)+P60(x892)+~E(x891,x892)
% 14.25/14.38 [90]~P48(x901)+P48(x902)+~E(x901,x902)
% 14.25/14.38 [91]~P67(x911)+P67(x912)+~E(x911,x912)
% 14.25/14.38 [92]~P24(x921)+P24(x922)+~E(x921,x922)
% 14.25/14.38 [93]~P42(x931)+P42(x932)+~E(x931,x932)
% 14.25/14.38 [94]~P33(x941)+P33(x942)+~E(x941,x942)
% 14.25/14.38 [95]~P58(x951)+P58(x952)+~E(x951,x952)
% 14.25/14.38 [96]~P34(x961)+P34(x962)+~E(x961,x962)
% 14.25/14.38 [97]~P13(x971)+P13(x972)+~E(x971,x972)
% 14.25/14.38 [98]~P43(x981)+P43(x982)+~E(x981,x982)
% 14.25/14.38 [99]~P25(x991)+P25(x992)+~E(x991,x992)
% 14.25/14.38 [100]~P6(x1001)+P6(x1002)+~E(x1001,x1002)
% 14.25/14.38 [101]~P31(x1011)+P31(x1012)+~E(x1011,x1012)
% 14.25/14.38 [102]~P59(x1021)+P59(x1022)+~E(x1021,x1022)
% 14.25/14.38 [103]~P36(x1031)+P36(x1032)+~E(x1031,x1032)
% 14.25/14.38 [104]~P68(x1041)+P68(x1042)+~E(x1041,x1042)
% 14.25/14.38 [105]~P55(x1051)+P55(x1052)+~E(x1051,x1052)
% 14.25/14.38 [106]~P26(x1061)+P26(x1062)+~E(x1061,x1062)
% 14.25/14.38 [107]~P50(x1071)+P50(x1072)+~E(x1071,x1072)
% 14.25/14.38 [108]~P52(x1081)+P52(x1082)+~E(x1081,x1082)
% 14.25/14.38 [109]~P30(x1091)+P30(x1092)+~E(x1091,x1092)
% 14.25/14.38 [110]~P38(x1101)+P38(x1102)+~E(x1101,x1102)
% 14.25/14.38 [111]~P44(x1111)+P44(x1112)+~E(x1111,x1112)
% 14.25/14.38 [112]~P15(x1121)+P15(x1122)+~E(x1121,x1122)
% 14.25/14.38 [113]~P20(x1131)+P20(x1132)+~E(x1131,x1132)
% 14.25/14.38 [114]~P49(x1141)+P49(x1142)+~E(x1141,x1142)
% 14.25/14.38 [115]~P65(x1151)+P65(x1152)+~E(x1151,x1152)
% 14.25/14.38 [116]~P11(x1161)+P11(x1162)+~E(x1161,x1162)
% 14.25/14.38 [117]~P62(x1171)+P62(x1172)+~E(x1171,x1172)
% 14.25/14.38 [118]~P39(x1181)+P39(x1182)+~E(x1181,x1182)
% 14.25/14.38 [119]~P54(x1191)+P54(x1192)+~E(x1191,x1192)
% 14.25/14.38 [120]~P61(x1201)+P61(x1202)+~E(x1201,x1202)
% 14.25/14.38 [121]~P51(x1211)+P51(x1212)+~E(x1211,x1212)
% 14.25/14.38 [122]~P64(x1221)+P64(x1222)+~E(x1221,x1222)
% 14.25/14.38 [123]~P19(x1231)+P19(x1232)+~E(x1231,x1232)
% 14.25/14.38 [124]~P66(x1241)+P66(x1242)+~E(x1241,x1242)
% 14.25/14.38 [125]~P56(x1251)+P56(x1252)+~E(x1251,x1252)
% 14.25/14.38 [126]~P63(x1261)+P63(x1262)+~E(x1261,x1262)
% 14.25/14.38 [127]~P22(x1271)+P22(x1272)+~E(x1271,x1272)
% 14.25/14.38 [128]~P45(x1281)+P45(x1282)+~E(x1281,x1282)
% 14.25/14.38 [129]~P70(x1291)+P70(x1292)+~E(x1291,x1292)
% 14.25/14.38 [130]~P37(x1301)+P37(x1302)+~E(x1301,x1302)
% 14.25/14.38 [131]~P17(x1311)+P17(x1312)+~E(x1311,x1312)
% 14.25/14.38 [132]~P14(x1321)+P14(x1322)+~E(x1321,x1322)
% 14.25/14.38 [133]~P12(x1331)+P12(x1332)+~E(x1331,x1332)
% 14.25/14.38 [134]~P53(x1341)+P53(x1342)+~E(x1341,x1342)
% 14.25/14.38 [135]~P27(x1351)+P27(x1352)+~E(x1351,x1352)
% 14.25/14.38 [136]~P16(x1361)+P16(x1362)+~E(x1361,x1362)
% 14.25/14.38 [137]~P32(x1371)+P32(x1372)+~E(x1371,x1372)
% 14.25/14.38 [138]~P7(x1381)+P7(x1382)+~E(x1381,x1382)
% 14.25/14.38 [139]~P46(x1391)+P46(x1392)+~E(x1391,x1392)
% 14.25/14.38 [140]~P28(x1401)+P28(x1402)+~E(x1401,x1402)
% 14.25/14.38 [141]~P21(x1411)+P21(x1412)+~E(x1411,x1412)
% 14.25/14.38 [142]~P69(x1421)+P69(x1422)+~E(x1421,x1422)
% 14.25/14.38
% 14.25/14.38 %-------------------------------------------
% 14.48/14.40 cnf(1135,plain,
% 14.48/14.40 (E(f3(a1),f14(f3(a1)))),
% 14.48/14.40 inference(scs_inference,[],[241,2])).
% 14.48/14.40 cnf(1140,plain,
% 14.48/14.40 (P8(x11401,f5(x11401,a1),a1)),
% 14.48/14.40 inference(scs_inference,[],[269,243,241,2,514,471,577])).
% 14.48/14.40 cnf(1141,plain,
% 14.48/14.40 (P8(x11411,x11411,a1)),
% 14.48/14.40 inference(rename_variables,[],[243])).
% 14.48/14.40 cnf(1144,plain,
% 14.48/14.40 (~P9(x11441,x11441,a1)),
% 14.48/14.40 inference(rename_variables,[],[265])).
% 14.48/14.40 cnf(1147,plain,
% 14.48/14.40 (~P9(x11471,x11471,a1)),
% 14.48/14.40 inference(rename_variables,[],[265])).
% 14.48/14.40 cnf(1149,plain,
% 14.48/14.40 (~E(f14(f34(x11491,x11492)),f3(a1))),
% 14.48/14.40 inference(scs_inference,[],[269,243,265,1144,241,247,2,514,471,577,555,554,462])).
% 14.48/14.40 cnf(1152,plain,
% 14.48/14.40 (~P9(x11521,x11521,a1)),
% 14.48/14.40 inference(rename_variables,[],[265])).
% 14.48/14.40 cnf(1157,plain,
% 14.48/14.40 (~P9(x11571,x11571,a1)),
% 14.48/14.40 inference(rename_variables,[],[265])).
% 14.48/14.40 cnf(1160,plain,
% 14.48/14.40 (~P9(x11601,x11601,a1)),
% 14.48/14.40 inference(rename_variables,[],[265])).
% 14.48/14.40 cnf(1163,plain,
% 14.48/14.40 (P8(x11631,f14(f11(f10(x11631,x11631,a1),f10(x11632,x11632,a1),a1)),a1)),
% 14.48/14.40 inference(rename_variables,[],[261])).
% 14.48/14.40 cnf(1166,plain,
% 14.48/14.40 (P8(x11661,x11661,a1)),
% 14.48/14.40 inference(rename_variables,[],[243])).
% 14.48/14.40 cnf(1168,plain,
% 14.48/14.40 (P8(x11681,x11681,a1)),
% 14.48/14.40 inference(rename_variables,[],[243])).
% 14.48/14.40 cnf(1169,plain,
% 14.48/14.40 (~E(f34(x11691,x11692),f3(a1))),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,265,1144,1147,1152,1157,1160,263,241,247,261,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70])).
% 14.48/14.40 cnf(1170,plain,
% 14.48/14.40 (~P9(x11701,x11701,a1)),
% 14.48/14.40 inference(rename_variables,[],[265])).
% 14.48/14.40 cnf(1172,plain,
% 14.48/14.40 (~P9(x11721,x11721,a1)),
% 14.48/14.40 inference(rename_variables,[],[265])).
% 14.48/14.40 cnf(1174,plain,
% 14.48/14.40 (~P9(f34(x11741,x11742),f3(a1),a1)),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,265,1144,1147,1152,1157,1160,1170,173,263,241,247,261,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596])).
% 14.48/14.40 cnf(1176,plain,
% 14.48/14.40 (~P8(f34(x11761,x11762),f3(a1),a1)),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,265,1144,1147,1152,1157,1160,1170,173,263,241,247,261,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517])).
% 14.48/14.40 cnf(1180,plain,
% 14.48/14.40 (P8(x11801,f14(f11(f10(f5(x11801,a1),f5(x11801,a1),a1),f10(x11802,x11802,a1),a1)),a1)),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,265,1144,1147,1152,1157,1160,1170,150,156,173,263,241,247,261,1163,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622])).
% 14.48/14.40 cnf(1181,plain,
% 14.48/14.40 (P8(x11811,f14(f11(f10(x11811,x11811,a1),f10(x11812,x11812,a1),a1)),a1)),
% 14.48/14.40 inference(rename_variables,[],[261])).
% 14.48/14.40 cnf(1185,plain,
% 14.48/14.40 (~P9(f3(a1),f13(f3(a1),a1),a1)),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,265,1144,1147,1152,1157,1160,1170,1172,150,151,154,156,173,263,241,247,261,1163,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639])).
% 14.48/14.40 cnf(1186,plain,
% 14.48/14.40 (~P9(x11861,x11861,a1)),
% 14.48/14.40 inference(rename_variables,[],[265])).
% 14.48/14.40 cnf(1188,plain,
% 14.48/14.40 (~P8(f34(x11881,x11882),f13(f34(x11881,x11882),a1),a1)),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,265,1144,1147,1152,1157,1160,1170,1172,150,151,154,156,173,176,263,241,247,261,1163,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638])).
% 14.48/14.40 cnf(1195,plain,
% 14.48/14.40 (~P9(f11(f5(x11951,a1),f4(a1),a1),x11951,a1)),
% 14.48/14.40 inference(rename_variables,[],[268])).
% 14.48/14.40 cnf(1198,plain,
% 14.48/14.40 (~P9(x11981,x11981,a1)),
% 14.48/14.40 inference(rename_variables,[],[265])).
% 14.48/14.40 cnf(1201,plain,
% 14.48/14.40 (~P9(x12011,x12011,a1)),
% 14.48/14.40 inference(rename_variables,[],[265])).
% 14.48/14.40 cnf(1204,plain,
% 14.48/14.40 (~P9(x12041,x12041,a1)),
% 14.48/14.40 inference(rename_variables,[],[265])).
% 14.48/14.40 cnf(1206,plain,
% 14.48/14.40 (~P9(f13(f3(a1),a1),f3(a1),a1)),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,150,151,154,156,159,162,173,176,187,263,241,247,268,261,1163,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662])).
% 14.48/14.40 cnf(1207,plain,
% 14.48/14.40 (~P9(x12071,x12071,a1)),
% 14.48/14.40 inference(rename_variables,[],[265])).
% 14.48/14.40 cnf(1210,plain,
% 14.48/14.40 (~P9(x12101,x12101,a1)),
% 14.48/14.40 inference(rename_variables,[],[265])).
% 14.48/14.40 cnf(1213,plain,
% 14.48/14.40 (~P9(x12131,x12131,a1)),
% 14.48/14.40 inference(rename_variables,[],[265])).
% 14.48/14.40 cnf(1216,plain,
% 14.48/14.40 (~P9(f11(f5(x12161,a1),f4(a1),a1),x12161,a1)),
% 14.48/14.40 inference(rename_variables,[],[268])).
% 14.48/14.40 cnf(1220,plain,
% 14.48/14.40 (~P8(f5(f4(a1),a1),f3(a1),a1)),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,150,151,154,156,159,162,173,176,187,263,241,247,268,1195,261,1163,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529])).
% 14.48/14.40 cnf(1224,plain,
% 14.48/14.40 (P9(f3(a1),f5(f4(a1),a1),a1)),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,150,151,154,156,159,162,173,176,187,209,263,241,266,247,268,1195,261,1163,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461])).
% 14.48/14.40 cnf(1226,plain,
% 14.48/14.40 (~E(f13(f34(x12261,x12262),a1),f3(a1))),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,150,151,154,156,157,159,162,173,176,187,209,263,241,266,247,268,1195,261,1163,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349])).
% 14.48/14.40 cnf(1232,plain,
% 14.48/14.40 (~E(f5(f4(a1),a1),f3(a1))),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,150,151,152,154,156,157,159,162,173,176,187,209,263,241,266,247,268,1195,261,1163,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346])).
% 14.48/14.40 cnf(1238,plain,
% 14.48/14.40 (~P9(f3(a1),f11(f3(a1),f3(a1),a1),a1)),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,150,151,152,154,156,157,159,160,162,173,176,187,209,263,241,266,247,268,1195,261,1163,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795])).
% 14.48/14.40 cnf(1239,plain,
% 14.48/14.40 (~P9(x12391,x12391,a1)),
% 14.48/14.40 inference(rename_variables,[],[265])).
% 14.48/14.40 cnf(1244,plain,
% 14.48/14.40 (~P9(x12441,x12441,a1)),
% 14.48/14.40 inference(rename_variables,[],[265])).
% 14.48/14.40 cnf(1247,plain,
% 14.48/14.40 (~P9(f11(f5(x12471,a1),f4(a1),a1),x12471,a1)),
% 14.48/14.40 inference(rename_variables,[],[268])).
% 14.48/14.40 cnf(1257,plain,
% 14.48/14.40 (~E(f11(f34(x12571,x12572),f3(a1),a1),f3(a1))),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,146,150,151,152,154,156,157,159,160,162,173,176,187,209,263,241,266,247,268,1195,1216,261,1163,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488])).
% 14.48/14.40 cnf(1262,plain,
% 14.48/14.40 (P8(x12621,x12621,a1)),
% 14.48/14.40 inference(rename_variables,[],[243])).
% 14.48/14.40 cnf(1265,plain,
% 14.48/14.40 (P8(x12651,x12651,a1)),
% 14.48/14.40 inference(rename_variables,[],[243])).
% 14.48/14.40 cnf(1268,plain,
% 14.48/14.40 (~P9(x12681,x12681,a1)),
% 14.48/14.40 inference(rename_variables,[],[265])).
% 14.48/14.40 cnf(1270,plain,
% 14.48/14.40 (~P9(f11(f10(x12701,x12702,a1),f11(f10(f7(x12703,x12701,a1),x12702,a1),x12704,a1),a1),f11(f10(x12703,x12702,a1),x12704,a1),a1)),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,146,150,151,152,154,156,157,159,160,162,173,176,187,199,209,263,241,266,247,268,1195,1216,261,1163,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123])).
% 14.48/14.40 cnf(1271,plain,
% 14.48/14.40 (~P9(x12711,x12711,a1)),
% 14.48/14.40 inference(rename_variables,[],[265])).
% 14.48/14.40 cnf(1273,plain,
% 14.48/14.40 (~P9(f11(f4(a1),f5(x12731,a1),a1),f3(a1),a1)),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,146,150,151,152,154,156,157,159,160,162,173,176,187,199,209,263,241,266,247,268,1195,1216,251,261,1163,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712])).
% 14.48/14.40 cnf(1274,plain,
% 14.48/14.40 (~P9(x12741,x12741,a1)),
% 14.48/14.40 inference(rename_variables,[],[265])).
% 14.48/14.40 cnf(1276,plain,
% 14.48/14.40 (~P9(f15(a33,a2),a28,a1)),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,146,150,151,152,154,156,157,159,160,162,173,176,187,199,209,246,263,241,266,247,268,1195,1216,251,261,1163,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711])).
% 14.48/14.40 cnf(1277,plain,
% 14.48/14.40 (~P9(x12771,x12771,a1)),
% 14.48/14.40 inference(rename_variables,[],[265])).
% 14.48/14.40 cnf(1279,plain,
% 14.48/14.40 (P9(f3(a1),f15(a33,a2),a1)),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,146,150,151,152,154,156,157,159,160,162,173,176,187,199,209,246,263,241,266,252,247,268,1195,1216,251,261,1163,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710])).
% 14.48/14.40 cnf(1280,plain,
% 14.48/14.40 (P9(f3(a1),f11(f4(a1),f5(x12801,a1),a1),a1)),
% 14.48/14.40 inference(rename_variables,[],[251])).
% 14.48/14.40 cnf(1283,plain,
% 14.48/14.40 (~P9(x12831,x12831,a1)),
% 14.48/14.40 inference(rename_variables,[],[265])).
% 14.48/14.40 cnf(1286,plain,
% 14.48/14.40 (~P9(x12861,x12861,a1)),
% 14.48/14.40 inference(rename_variables,[],[265])).
% 14.48/14.40 cnf(1292,plain,
% 14.48/14.40 (E(x12921,f11(f10(f7(x12922,x12922,a1),x12923,a1),x12921,a1))),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,146,150,151,152,154,156,157,159,160,162,170,172,173,176,177,187,199,209,246,263,241,266,252,260,247,268,1195,1216,251,261,1163,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619])).
% 14.48/14.40 cnf(1294,plain,
% 14.48/14.40 (~E(f11(x12941,f4(a1),a1),x12941)),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,146,150,151,152,154,156,157,159,160,162,170,172,173,176,177,187,199,209,246,263,241,266,252,260,247,268,1195,1216,251,261,1163,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473])).
% 14.48/14.40 cnf(1296,plain,
% 14.48/14.40 (~P9(f11(f34(x12961,x12962),x12963,a1),x12963,a1)),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,146,150,151,152,154,156,157,159,160,162,170,172,173,176,177,187,193,199,209,246,263,241,266,252,260,247,268,1195,1216,251,261,1163,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810])).
% 14.48/14.40 cnf(1297,plain,
% 14.48/14.40 (~P9(x12971,x12971,a1)),
% 14.48/14.40 inference(rename_variables,[],[265])).
% 14.48/14.40 cnf(1299,plain,
% 14.48/14.40 (~P9(x12991,f11(f10(f7(x12992,x12992,a1),x12993,a1),x12991,a1),a1)),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,146,150,151,152,154,156,157,159,160,162,170,172,173,176,177,186,187,193,199,209,246,263,241,266,252,260,247,268,1195,1216,251,261,1163,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937])).
% 14.48/14.40 cnf(1300,plain,
% 14.48/14.40 (P8(x13001,x13001,a1)),
% 14.48/14.40 inference(rename_variables,[],[243])).
% 14.48/14.40 cnf(1306,plain,
% 14.48/14.40 (P8(x13061,f14(f11(f10(x13061,x13061,a1),f10(x13062,x13062,a1),a1)),a1)),
% 14.48/14.40 inference(rename_variables,[],[261])).
% 14.48/14.40 cnf(1310,plain,
% 14.48/14.40 (~P9(x13101,x13101,a1)),
% 14.48/14.40 inference(rename_variables,[],[265])).
% 14.48/14.40 cnf(1313,plain,
% 14.48/14.40 (~P9(x13131,x13131,a1)),
% 14.48/14.40 inference(rename_variables,[],[265])).
% 14.48/14.40 cnf(1315,plain,
% 14.48/14.40 (~P8(f4(a1),f8(f3(a1),a1),a1)),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,143,144,146,150,151,152,154,156,157,159,160,162,170,172,173,176,177,186,187,193,199,209,246,263,241,266,252,260,247,268,1195,1216,251,261,1163,1181,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678])).
% 14.48/14.40 cnf(1316,plain,
% 14.48/14.40 (~P9(x13161,x13161,a1)),
% 14.48/14.40 inference(rename_variables,[],[265])).
% 14.48/14.40 cnf(1321,plain,
% 14.48/14.40 (~P9(x13211,x13211,a1)),
% 14.48/14.40 inference(rename_variables,[],[265])).
% 14.48/14.40 cnf(1326,plain,
% 14.48/14.40 (~P9(x13261,x13261,a1)),
% 14.48/14.40 inference(rename_variables,[],[265])).
% 14.48/14.40 cnf(1335,plain,
% 14.48/14.40 (~P9(f11(f5(x13351,a1),f4(a1),a1),x13351,a1)),
% 14.48/14.40 inference(rename_variables,[],[268])).
% 14.48/14.40 cnf(1338,plain,
% 14.48/14.40 (~P9(f11(f5(x13381,a1),f4(a1),a1),x13381,a1)),
% 14.48/14.40 inference(rename_variables,[],[268])).
% 14.48/14.40 cnf(1342,plain,
% 14.48/14.40 (~P10(f10(f4(a1),f3(a1),a1),f10(f4(a1),f4(a1),a1),a1)),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,143,144,146,150,151,152,154,156,157,159,160,162,170,172,173,176,177,179,186,187,193,199,209,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,251,261,1163,1181,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974])).
% 14.48/14.40 cnf(1344,plain,
% 14.48/14.40 (~P9(x13441,f10(f9(x13441,f34(x13442,x13443),a1),f34(x13442,x13443),a1),a1)),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,143,144,146,150,151,152,154,156,157,159,160,162,170,172,173,176,177,179,186,187,193,199,209,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,251,261,1163,1181,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995])).
% 14.48/14.40 cnf(1345,plain,
% 14.48/14.40 (~P9(x13451,x13451,a1)),
% 14.48/14.40 inference(rename_variables,[],[265])).
% 14.48/14.40 cnf(1347,plain,
% 14.48/14.40 (~P9(f10(f9(x13471,f34(x13472,x13473),a1),f34(x13472,x13473),a1),x13471,a1)),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,143,144,146,150,151,152,154,156,157,159,160,162,170,172,173,176,177,179,186,187,193,199,209,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,251,261,1163,1181,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993])).
% 14.48/14.40 cnf(1348,plain,
% 14.48/14.40 (~P9(x13481,x13481,a1)),
% 14.48/14.40 inference(rename_variables,[],[265])).
% 14.48/14.40 cnf(1351,plain,
% 14.48/14.40 (~P9(x13511,x13511,a1)),
% 14.48/14.40 inference(rename_variables,[],[265])).
% 14.48/14.40 cnf(1354,plain,
% 14.48/14.40 (~P9(x13541,x13541,a1)),
% 14.48/14.40 inference(rename_variables,[],[265])).
% 14.48/14.40 cnf(1358,plain,
% 14.48/14.40 (~P8(f3(a1),f10(f34(x13581,x13582),f13(f34(x13581,x13582),a1),a1),a1)),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,143,144,146,150,151,152,154,156,157,159,160,162,170,172,173,176,177,179,186,187,190,193,199,209,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,251,261,1163,1181,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875])).
% 14.48/14.40 cnf(1360,plain,
% 14.48/14.40 (~P8(f3(a1),f10(f13(f34(x13601,x13602),a1),f34(x13601,x13602),a1),a1)),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,143,144,146,150,151,152,154,156,157,159,160,162,170,172,173,176,177,179,186,187,190,193,199,209,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,251,261,1163,1181,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874])).
% 14.48/14.40 cnf(1370,plain,
% 14.48/14.40 (~E(f10(f4(a1),f4(a1),a1),f3(a1))),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,143,144,146,150,151,152,154,156,157,159,160,162,170,172,173,176,177,179,186,187,190,193,199,209,216,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,251,261,1163,1181,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479])).
% 14.48/14.40 cnf(1372,plain,
% 14.48/14.40 (~E(f10(f14(f34(x13721,x13722)),f14(f34(x13721,x13722)),a1),f3(a1))),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,143,144,146,150,151,152,154,156,157,159,160,162,170,172,173,176,177,179,186,187,190,193,199,209,214,216,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,251,261,1163,1181,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478])).
% 14.48/14.40 cnf(1375,plain,
% 14.48/14.40 (~P9(x13751,x13751,a1)),
% 14.48/14.40 inference(rename_variables,[],[265])).
% 14.48/14.40 cnf(1378,plain,
% 14.48/14.40 (~P9(x13781,x13781,a1)),
% 14.48/14.40 inference(rename_variables,[],[265])).
% 14.48/14.40 cnf(1380,plain,
% 14.48/14.40 (~P9(f7(f4(a1),f5(f7(f3(a1),f4(a1),a1),a1),a1),f3(a1),a1)),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,143,144,146,150,151,152,154,156,157,159,160,162,170,172,173,176,177,179,186,187,190,193,199,209,214,216,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,251,1280,261,1163,1181,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099])).
% 14.48/14.40 cnf(1381,plain,
% 14.48/14.40 (~P9(x13811,x13811,a1)),
% 14.48/14.40 inference(rename_variables,[],[265])).
% 14.48/14.40 cnf(1384,plain,
% 14.48/14.40 (~P9(f11(f3(a1),x13841,a1),x13841,a1)),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,143,144,146,150,151,152,154,156,157,159,160,162,170,172,173,176,177,179,186,187,190,193,197,199,209,214,216,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,251,1280,261,1163,1181,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819])).
% 14.48/14.40 cnf(1385,plain,
% 14.48/14.40 (~P9(x13851,x13851,a1)),
% 14.48/14.40 inference(rename_variables,[],[265])).
% 14.48/14.40 cnf(1386,plain,
% 14.48/14.40 (P8(x13861,x13861,a1)),
% 14.48/14.40 inference(rename_variables,[],[243])).
% 14.48/14.40 cnf(1388,plain,
% 14.48/14.40 (~P8(f11(f34(x13881,x13882),x13883,a1),x13883,a1)),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,143,144,146,150,151,152,154,156,157,159,160,162,170,172,173,176,177,179,186,187,190,193,197,199,209,214,216,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,251,1280,261,1163,1181,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818])).
% 14.48/14.40 cnf(1389,plain,
% 14.48/14.40 (~P9(x13891,x13891,a1)),
% 14.48/14.40 inference(rename_variables,[],[265])).
% 14.48/14.40 cnf(1391,plain,
% 14.48/14.40 (~P8(f11(f34(x13911,x13912),f11(x13913,f3(a1),a1),a1),x13913,a1)),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,143,144,146,150,151,152,154,156,157,159,160,162,170,172,173,176,177,179,186,187,190,193,197,199,209,214,216,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,251,1280,261,1163,1181,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817])).
% 14.48/14.40 cnf(1392,plain,
% 14.48/14.40 (P8(x13921,x13921,a1)),
% 14.48/14.40 inference(rename_variables,[],[243])).
% 14.48/14.40 cnf(1394,plain,
% 14.48/14.40 (~P8(f11(f34(x13941,x13942),f11(f11(f3(a1),x13943,a1),f3(a1),a1),a1),x13943,a1)),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,143,144,146,150,151,152,154,156,157,159,160,162,170,172,173,176,177,179,186,187,190,193,197,199,209,214,216,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,251,1280,261,1163,1181,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816])).
% 14.48/14.40 cnf(1395,plain,
% 14.48/14.40 (P8(x13951,x13951,a1)),
% 14.48/14.40 inference(rename_variables,[],[243])).
% 14.48/14.40 cnf(1397,plain,
% 14.48/14.40 (~P9(x13971,f9(f10(x13971,f34(x13972,x13973),a1),f34(x13972,x13973),a1),a1)),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,143,144,146,150,151,152,154,156,157,159,160,162,170,172,173,176,177,179,186,187,190,193,197,199,209,214,216,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,251,1280,261,1163,1181,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003])).
% 14.48/14.40 cnf(1398,plain,
% 14.48/14.40 (~P9(x13981,x13981,a1)),
% 14.48/14.40 inference(rename_variables,[],[265])).
% 14.48/14.40 cnf(1402,plain,
% 14.48/14.40 (~P9(f9(f10(x14021,f34(x14022,x14023),a1),f34(x14022,x14023),a1),x14021,a1)),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,143,144,146,150,151,152,154,156,157,159,160,162,170,172,173,176,177,179,186,187,190,193,197,199,209,214,216,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,251,1280,261,1163,1181,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999])).
% 14.48/14.40 cnf(1403,plain,
% 14.48/14.40 (~P9(x14031,x14031,a1)),
% 14.48/14.40 inference(rename_variables,[],[265])).
% 14.48/14.40 cnf(1408,plain,
% 14.48/14.40 (~P9(x14081,x14081,a1)),
% 14.48/14.40 inference(rename_variables,[],[265])).
% 14.48/14.40 cnf(1410,plain,
% 14.48/14.40 (~P8(f9(f13(f34(x14101,x14102),a1),f13(f34(x14101,x14102),a1),a1),f3(a1),a1)),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,143,144,146,150,151,152,154,156,157,159,160,162,170,172,173,176,177,179,186,187,190,193,197,199,209,214,216,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,251,1280,261,1163,1181,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899])).
% 14.48/14.40 cnf(1413,plain,
% 14.48/14.40 (~P9(x14131,x14131,a1)),
% 14.48/14.40 inference(rename_variables,[],[265])).
% 14.48/14.40 cnf(1416,plain,
% 14.48/14.40 (~P9(x14161,x14161,a1)),
% 14.48/14.40 inference(rename_variables,[],[265])).
% 14.48/14.40 cnf(1419,plain,
% 14.48/14.40 (~P9(x14191,x14191,a1)),
% 14.48/14.40 inference(rename_variables,[],[265])).
% 14.48/14.40 cnf(1422,plain,
% 14.48/14.40 (~P9(x14221,x14221,a1)),
% 14.48/14.40 inference(rename_variables,[],[265])).
% 14.48/14.40 cnf(1424,plain,
% 14.48/14.40 (~P8(f3(a1),f9(f34(x14241,x14242),f13(f34(x14241,x14242),a1),a1),a1)),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,143,144,146,150,151,152,154,156,157,159,160,162,170,172,173,176,177,179,186,187,190,193,197,199,209,214,216,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,251,1280,261,1163,1181,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888])).
% 14.48/14.40 cnf(1426,plain,
% 14.48/14.40 (~P8(f3(a1),f9(f13(f34(x14261,x14262),a1),f34(x14261,x14262),a1),a1)),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,143,144,146,150,151,152,154,156,157,159,160,162,170,172,173,176,177,179,186,187,190,193,197,199,209,214,216,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,251,1280,261,1163,1181,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887])).
% 14.48/14.40 cnf(1429,plain,
% 14.48/14.40 (~P9(f11(f5(x14291,a1),f4(a1),a1),x14291,a1)),
% 14.48/14.40 inference(rename_variables,[],[268])).
% 14.48/14.40 cnf(1436,plain,
% 14.48/14.40 (~P9(x14361,x14361,a1)),
% 14.48/14.40 inference(rename_variables,[],[265])).
% 14.48/14.40 cnf(1439,plain,
% 14.48/14.40 (~P9(x14391,x14391,a1)),
% 14.48/14.40 inference(rename_variables,[],[265])).
% 14.48/14.40 cnf(1442,plain,
% 14.48/14.40 (~P9(x14421,x14421,a1)),
% 14.48/14.40 inference(rename_variables,[],[265])).
% 14.48/14.40 cnf(1444,plain,
% 14.48/14.40 (~P9(f3(a1),f13(f13(f9(x14441,f3(a1),a1),a1),a1),a1)),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,143,144,146,150,151,152,154,156,157,159,160,162,170,172,173,176,177,179,186,187,190,193,197,199,209,214,216,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,251,1280,261,1163,1181,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884])).
% 14.48/14.40 cnf(1445,plain,
% 14.48/14.40 (~P9(x14451,x14451,a1)),
% 14.48/14.40 inference(rename_variables,[],[265])).
% 14.48/14.40 cnf(1447,plain,
% 14.48/14.40 (P8(f9(x14471,f14(f3(a1)),a1),f3(a1),a1)),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,143,144,146,150,151,152,154,156,157,159,160,162,170,172,173,176,177,179,186,187,190,193,197,199,209,214,216,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,251,1280,261,1163,1181,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883])).
% 14.48/14.40 cnf(1448,plain,
% 14.48/14.40 (P8(x14481,x14481,a1)),
% 14.48/14.40 inference(rename_variables,[],[243])).
% 14.48/14.40 cnf(1451,plain,
% 14.48/14.40 (~P9(x14511,x14511,a1)),
% 14.48/14.40 inference(rename_variables,[],[265])).
% 14.48/14.40 cnf(1452,plain,
% 14.48/14.40 (~P9(f11(f5(x14521,a1),f4(a1),a1),x14521,a1)),
% 14.48/14.40 inference(rename_variables,[],[268])).
% 14.48/14.40 cnf(1455,plain,
% 14.48/14.40 (~P9(x14551,x14551,a1)),
% 14.48/14.40 inference(rename_variables,[],[265])).
% 14.48/14.40 cnf(1458,plain,
% 14.48/14.40 (P8(x14581,x14581,a1)),
% 14.48/14.40 inference(rename_variables,[],[243])).
% 14.48/14.40 cnf(1461,plain,
% 14.48/14.40 (P8(x14611,x14611,a1)),
% 14.48/14.40 inference(rename_variables,[],[243])).
% 14.48/14.40 cnf(1462,plain,
% 14.48/14.40 (P8(x14621,f14(f11(f10(x14621,x14621,a1),f10(x14622,x14622,a1),a1)),a1)),
% 14.48/14.40 inference(rename_variables,[],[261])).
% 14.48/14.40 cnf(1465,plain,
% 14.48/14.40 (P8(x14651,x14651,a1)),
% 14.48/14.40 inference(rename_variables,[],[243])).
% 14.48/14.40 cnf(1466,plain,
% 14.48/14.40 (~P9(x14661,x14661,a1)),
% 14.48/14.40 inference(rename_variables,[],[265])).
% 14.48/14.40 cnf(1467,plain,
% 14.48/14.40 (P8(x14671,f14(f11(f10(x14671,x14671,a1),f10(x14672,x14672,a1),a1)),a1)),
% 14.48/14.40 inference(rename_variables,[],[261])).
% 14.48/14.40 cnf(1470,plain,
% 14.48/14.40 (~P9(x14701,x14701,a1)),
% 14.48/14.40 inference(rename_variables,[],[265])).
% 14.48/14.40 cnf(1471,plain,
% 14.48/14.40 (P8(x14711,x14711,a1)),
% 14.48/14.40 inference(rename_variables,[],[243])).
% 14.48/14.40 cnf(1474,plain,
% 14.48/14.40 (P8(x14741,x14741,a1)),
% 14.48/14.40 inference(rename_variables,[],[243])).
% 14.48/14.40 cnf(1477,plain,
% 14.48/14.40 (~P9(x14771,x14771,a1)),
% 14.48/14.40 inference(rename_variables,[],[265])).
% 14.48/14.40 cnf(1478,plain,
% 14.48/14.40 (P8(x14781,x14781,a1)),
% 14.48/14.40 inference(rename_variables,[],[243])).
% 14.48/14.40 cnf(1479,plain,
% 14.48/14.40 (P8(x14791,f14(f11(f10(x14791,x14791,a1),f10(x14792,x14792,a1),a1)),a1)),
% 14.48/14.40 inference(rename_variables,[],[261])).
% 14.48/14.40 cnf(1481,plain,
% 14.48/14.40 (P10(x14811,x14811,a1)),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,150,151,152,154,156,157,159,160,162,170,172,173,176,177,179,186,187,190,193,197,199,207,209,214,216,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370])).
% 14.48/14.40 cnf(1483,plain,
% 14.48/14.40 (P10(x14831,f10(x14831,x14832,a1),a1)),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,150,151,152,154,156,157,159,160,162,170,172,173,176,177,179,184,186,187,190,193,197,199,207,209,214,216,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571])).
% 14.48/14.40 cnf(1485,plain,
% 14.48/14.40 (P10(x14851,f10(x14851,x14852,a2),a2)),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,150,151,152,154,155,156,157,159,160,162,170,172,173,176,177,179,184,186,187,190,193,197,199,207,209,214,216,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570])).
% 14.48/14.40 cnf(1493,plain,
% 14.48/14.40 (P10(x14931,f3(a1),a1)),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,150,151,152,154,155,156,157,159,160,162,170,172,173,176,177,179,184,186,187,190,193,197,199,207,209,214,216,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377])).
% 14.48/14.40 cnf(1513,plain,
% 14.48/14.40 (P32(f27(a1))),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,150,151,152,154,155,156,157,159,160,162,170,172,173,176,177,179,184,186,187,190,193,197,199,207,209,214,216,220,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315])).
% 14.48/14.40 cnf(1527,plain,
% 14.48/14.40 (P7(f27(a1))),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,150,151,152,154,155,156,157,159,160,162,170,172,173,176,177,179,184,186,187,190,193,197,199,207,208,209,214,216,220,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308])).
% 14.48/14.40 cnf(1531,plain,
% 14.48/14.40 (P66(f27(a1))),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,150,151,152,154,155,156,157,159,160,162,170,172,173,176,177,179,184,186,187,190,193,197,199,207,208,209,214,216,220,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306])).
% 14.48/14.40 cnf(1539,plain,
% 14.48/14.40 (P65(f27(a1))),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,150,151,152,154,155,156,157,159,160,162,170,172,173,176,177,179,184,186,187,190,193,197,199,202,207,208,209,214,216,220,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302])).
% 14.48/14.40 cnf(1545,plain,
% 14.48/14.40 (P64(f27(a1))),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,150,151,152,154,155,156,157,159,160,162,170,172,173,176,177,179,184,186,187,190,193,197,199,202,207,208,209,214,216,220,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299])).
% 14.48/14.40 cnf(1549,plain,
% 14.48/14.40 (P33(f27(a1))),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,150,151,152,154,155,156,157,159,160,162,170,172,173,176,177,179,184,186,187,190,193,197,199,202,207,208,209,214,216,220,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297])).
% 14.48/14.40 cnf(1553,plain,
% 14.48/14.40 (P61(f27(a1))),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,150,151,152,154,155,156,157,159,160,162,170,172,173,176,177,179,184,186,187,190,193,197,199,202,207,208,209,214,216,220,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295])).
% 14.48/14.40 cnf(1555,plain,
% 14.48/14.40 (P31(f27(a1))),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,150,151,152,154,155,156,157,159,160,162,170,172,173,176,177,179,184,186,187,190,193,197,199,202,207,208,209,214,216,220,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294])).
% 14.48/14.40 cnf(1557,plain,
% 14.48/14.40 (P30(f27(a1))),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,150,151,152,154,155,156,157,159,160,162,170,172,173,176,177,179,184,186,187,190,193,197,199,202,207,208,209,214,216,220,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293])).
% 14.48/14.40 cnf(1563,plain,
% 14.48/14.40 (P59(f27(a1))),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,150,151,152,154,155,156,157,159,160,162,170,172,173,176,177,179,184,186,187,190,193,197,199,202,207,208,209,214,216,220,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290])).
% 14.48/14.40 cnf(1565,plain,
% 14.48/14.40 (P50(f27(a1))),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,150,151,152,154,155,156,157,159,160,162,170,172,173,176,177,179,184,186,187,190,193,197,199,202,207,208,209,214,216,220,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289])).
% 14.48/14.40 cnf(1569,plain,
% 14.48/14.40 (P36(f27(a1))),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,150,151,152,154,155,156,157,159,160,162,170,172,173,174,176,177,179,184,186,187,190,193,197,199,202,207,208,209,214,216,220,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287])).
% 14.48/14.40 cnf(1571,plain,
% 14.48/14.40 (P35(f27(a1))),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,150,151,152,154,155,156,157,159,160,162,170,172,173,174,176,177,179,184,186,187,190,193,197,199,202,207,208,209,214,216,220,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286])).
% 14.48/14.40 cnf(1573,plain,
% 14.48/14.40 (P6(f27(a1))),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,150,151,152,154,155,156,157,159,160,162,163,170,172,173,174,176,177,179,184,186,187,190,193,197,199,202,207,208,209,214,216,220,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285])).
% 14.48/14.40 cnf(1575,plain,
% 14.48/14.40 (P43(f27(a1))),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,150,151,152,154,155,156,157,159,160,162,163,170,172,173,174,176,177,179,184,186,187,190,193,197,199,202,207,208,209,214,216,220,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284])).
% 14.48/14.40 cnf(1581,plain,
% 14.48/14.40 (P24(f27(a1))),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,150,151,152,154,155,156,157,159,160,162,163,170,172,173,174,176,177,179,184,186,187,190,193,197,199,202,207,208,209,214,216,220,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281])).
% 14.48/14.40 cnf(1585,plain,
% 14.48/14.40 (P23(f27(a1))),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,150,151,152,154,155,156,157,159,160,162,163,170,172,173,174,176,177,179,184,186,187,190,193,197,199,202,207,208,209,214,216,220,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279])).
% 14.48/14.40 cnf(1587,plain,
% 14.48/14.40 (P5(f27(a1))),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,150,151,152,154,155,156,157,159,160,162,163,170,172,173,174,176,177,179,184,186,187,190,193,197,199,202,207,208,209,214,216,220,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278])).
% 14.48/14.40 cnf(1589,plain,
% 14.48/14.40 (P29(f27(a1))),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,150,151,152,154,155,156,157,159,160,162,163,170,172,173,174,176,177,179,184,186,187,190,193,197,199,202,207,208,209,214,216,220,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277])).
% 14.48/14.40 cnf(1593,plain,
% 14.48/14.40 (P11(f27(a1))),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,150,151,152,154,155,156,157,159,160,162,163,170,172,173,174,176,177,179,184,186,187,190,193,197,199,202,207,208,209,214,216,220,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275])).
% 14.48/14.40 cnf(1595,plain,
% 14.48/14.40 (P57(f27(a1))),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,150,151,152,154,155,156,157,159,160,162,163,170,172,173,174,176,177,179,184,186,187,190,193,197,199,202,207,208,209,214,216,220,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274])).
% 14.48/14.40 cnf(1597,plain,
% 14.48/14.40 (P4(f27(a1))),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,150,151,152,154,155,156,157,159,160,162,163,170,172,173,174,176,177,179,184,186,187,190,193,197,199,202,207,208,209,214,216,220,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273])).
% 14.48/14.40 cnf(1600,plain,
% 14.48/14.40 (P8(x16001,x16001,a1)),
% 14.48/14.40 inference(rename_variables,[],[243])).
% 14.48/14.40 cnf(1603,plain,
% 14.48/14.40 (P8(x16031,x16031,a1)),
% 14.48/14.40 inference(rename_variables,[],[243])).
% 14.48/14.40 cnf(1609,plain,
% 14.48/14.40 (P9(f3(a1),f24(x16091,a1),a1)),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,150,151,152,154,155,156,157,159,160,162,163,166,170,172,173,174,176,177,179,184,186,187,190,193,197,199,202,207,208,209,214,216,220,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438])).
% 14.48/14.40 cnf(1620,plain,
% 14.48/14.40 (P8(x16201,f14(f11(f10(x16201,x16201,a1),f10(x16202,x16202,a1),a1)),a1)),
% 14.48/14.40 inference(rename_variables,[],[261])).
% 14.48/14.40 cnf(1625,plain,
% 14.48/14.40 (P8(x16251,x16251,a1)),
% 14.48/14.40 inference(rename_variables,[],[243])).
% 14.48/14.40 cnf(1628,plain,
% 14.48/14.40 (P8(x16281,x16281,a1)),
% 14.48/14.40 inference(rename_variables,[],[243])).
% 14.48/14.40 cnf(1689,plain,
% 14.48/14.40 (E(f7(x16891,f14(f3(a1)),x16892),f7(x16891,f3(a1),x16892))),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,150,151,152,154,155,156,157,159,160,162,163,166,170,172,173,174,176,177,179,184,186,187,190,193,197,199,202,207,208,209,214,216,220,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7])).
% 14.48/14.40 cnf(1690,plain,
% 14.48/14.40 (E(f7(f14(f3(a1)),x16901,x16902),f7(f3(a1),x16901,x16902))),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,150,151,152,154,155,156,157,159,160,162,163,166,170,172,173,174,176,177,179,184,186,187,190,193,197,199,202,207,208,209,214,216,220,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6])).
% 14.48/14.40 cnf(1695,plain,
% 14.48/14.40 (~P8(f7(f11(a29,f15(a30,a2),a1),f10(f4(a1),f15(f17(f16(a31,a32,a2),a33,a2),a2),a1),a1),f3(a1),a1)),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,150,151,152,154,155,156,157,159,160,162,163,166,170,172,173,174,176,177,179,184,186,187,190,193,197,199,202,207,208,209,214,216,220,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761])).
% 14.48/14.40 cnf(1697,plain,
% 14.48/14.40 (~P9(f10(x16971,x16971,a1),f3(a1),a1)),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,150,151,152,154,155,156,157,159,160,162,163,166,170,172,173,174,176,177,179,184,186,187,190,193,197,199,202,207,208,209,214,216,220,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733])).
% 14.48/14.40 cnf(1701,plain,
% 14.48/14.40 (P9(x17011,f11(x17011,f4(a1),a1),a1)),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,150,151,152,154,155,156,157,159,160,162,163,166,170,172,173,174,176,177,179,184,186,187,190,193,197,199,202,207,208,209,214,216,220,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604])).
% 14.48/14.40 cnf(1703,plain,
% 14.48/14.40 (P8(f3(a1),f10(x17031,x17031,a1),a1)),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,150,151,152,154,155,156,157,159,160,162,163,166,170,172,173,174,176,177,179,184,186,187,190,193,197,199,202,207,208,209,214,216,220,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583])).
% 14.48/14.40 cnf(1705,plain,
% 14.48/14.40 (E(f11(f7(x17051,x17052,a1),x17052,a1),x17051)),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,150,151,152,154,155,156,157,159,160,162,163,166,170,172,173,174,176,177,179,184,186,187,190,193,197,199,202,207,208,209,214,216,220,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573])).
% 14.48/14.40 cnf(1707,plain,
% 14.48/14.40 (E(f7(f11(x17071,x17072,a1),x17072,a1),x17071)),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,150,151,152,154,155,156,157,159,160,162,163,166,170,172,173,174,176,177,179,184,186,187,190,193,197,199,202,207,208,209,214,216,220,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572])).
% 14.48/14.40 cnf(1711,plain,
% 14.48/14.40 (P9(f14(f3(a1)),f14(f34(x17111,x17112)),a1)),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,150,151,152,154,155,156,157,159,160,162,163,166,170,172,173,174,176,177,179,184,186,187,190,193,197,199,202,207,208,209,214,216,220,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532])).
% 14.48/14.40 cnf(1715,plain,
% 14.48/14.40 (~P9(f5(x17151,a1),f3(a1),a1)),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,150,151,152,154,155,156,157,159,160,162,163,166,170,172,173,174,176,177,179,184,186,187,190,193,197,199,202,207,208,209,214,216,220,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525])).
% 14.48/14.40 cnf(1717,plain,
% 14.48/14.40 (E(f11(x17171,x17172,a1),f11(x17172,x17171,a1))),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,150,151,152,154,155,156,157,159,160,162,163,166,170,172,173,174,176,177,179,184,186,187,190,193,197,199,202,207,208,209,214,216,220,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493])).
% 14.48/14.40 cnf(1727,plain,
% 14.48/14.40 (~P8(f4(a1),f3(a1),a1)),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,150,151,152,154,155,156,157,159,160,162,163,166,170,172,173,174,176,177,179,184,186,187,190,193,197,199,202,207,208,209,214,216,220,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480])).
% 14.48/14.40 cnf(1731,plain,
% 14.48/14.40 (P8(f3(a1),f5(x17311,a1),a1)),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,150,151,152,154,155,156,157,159,160,162,163,166,170,172,173,174,176,177,179,184,186,187,190,193,197,199,202,207,208,209,214,216,220,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451])).
% 14.48/14.40 cnf(1733,plain,
% 14.48/14.40 (P9(f3(a1),f4(a1),a1)),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,150,151,152,154,155,156,157,159,160,162,163,166,170,172,173,174,176,177,179,184,186,187,190,193,197,199,202,207,208,209,214,216,220,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416])).
% 14.48/14.40 cnf(1735,plain,
% 14.48/14.40 (P8(f3(a1),f4(a1),a1)),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,150,151,152,154,155,156,157,159,160,162,163,166,170,172,173,174,176,177,179,184,186,187,190,193,197,199,202,207,208,209,214,216,220,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415])).
% 14.48/14.40 cnf(1761,plain,
% 14.48/14.40 (E(f9(x17611,f4(a1),a1),x17611)),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,150,151,152,154,155,156,157,159,160,162,163,166,170,172,173,174,176,177,179,184,186,187,190,193,197,198,199,202,207,208,209,212,214,216,220,231,234,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379])).
% 14.48/14.40 cnf(1775,plain,
% 14.48/14.40 (~E(f4(a2),f3(a2))),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,150,151,152,154,155,156,157,158,159,160,162,163,166,170,172,173,174,176,177,179,184,186,187,188,190,193,197,198,199,202,207,208,209,211,212,214,216,220,231,234,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326])).
% 14.48/14.40 cnf(1779,plain,
% 14.48/14.40 (~E(f11(f10(f4(a1),f4(a1),a1),f10(x17791,x17791,a1),a1),f3(a1))),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,150,151,152,154,155,156,157,158,159,160,162,163,166,170,172,173,174,176,177,179,184,186,187,188,190,193,197,198,199,202,207,208,209,211,212,214,216,220,231,234,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904])).
% 14.48/14.40 cnf(1781,plain,
% 14.48/14.40 (~E(f11(f10(x17811,x17811,a1),f10(f4(a1),f4(a1),a1),a1),f3(a1))),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,150,151,152,154,155,156,157,158,159,160,162,163,166,170,172,173,174,176,177,179,184,186,187,188,190,193,197,198,199,202,207,208,209,211,212,214,216,220,231,234,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903])).
% 14.48/14.40 cnf(1792,plain,
% 14.48/14.40 (P8(x17921,x17921,a1)),
% 14.48/14.40 inference(rename_variables,[],[243])).
% 14.48/14.40 cnf(1795,plain,
% 14.48/14.40 (P8(x17951,x17951,a1)),
% 14.48/14.40 inference(rename_variables,[],[243])).
% 14.48/14.40 cnf(1797,plain,
% 14.48/14.40 (E(f11(x17971,f11(f13(x17971,a1),x17972,a1),a1),x17972)),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,150,151,152,154,155,156,157,158,159,160,162,163,166,170,172,173,174,176,177,179,184,186,187,188,190,193,197,198,199,202,207,208,209,211,212,214,216,220,231,234,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694])).
% 14.48/14.40 cnf(1801,plain,
% 14.48/14.40 (E(f11(f13(x18011,a1),f11(x18012,x18011,a1),a1),x18012)),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,150,151,152,154,155,156,157,158,159,160,162,163,166,170,172,173,174,176,177,179,184,186,187,188,190,193,197,198,199,202,207,208,209,211,212,214,216,220,231,234,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642])).
% 14.48/14.40 cnf(1805,plain,
% 14.48/14.40 (~P9(f3(a1),f5(f3(a1),a1),a1)),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,150,151,152,154,155,156,157,158,159,160,162,163,166,170,172,173,174,176,177,179,184,186,187,188,190,193,197,198,199,202,207,208,209,211,212,214,216,220,231,234,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563])).
% 14.48/14.40 cnf(1819,plain,
% 14.48/14.40 (E(f10(f12(x18191,a1),f5(x18191,a1),a1),x18191)),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,150,151,152,154,155,156,157,158,159,160,162,163,166,170,171,172,173,174,176,177,179,184,186,187,188,190,193,197,198,199,202,207,208,209,211,212,214,216,220,231,234,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485])).
% 14.48/14.40 cnf(1827,plain,
% 14.48/14.40 (E(f11(f13(x18271,a2),x18271,a2),f3(a2))),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,150,151,152,154,155,156,157,158,159,160,162,163,166,170,171,172,173,174,176,177,179,184,186,187,188,190,193,197,198,199,202,207,208,209,211,212,214,216,220,231,234,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444])).
% 14.48/14.40 cnf(1891,plain,
% 14.48/14.40 (~P9(f11(f10(x18911,x18911,a1),f10(x18912,x18912,a1),a1),f3(a1),a1)),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,170,171,172,173,174,176,177,178,179,184,186,187,188,190,193,197,198,199,202,207,208,209,211,212,214,216,217,218,220,231,234,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109])).
% 14.48/14.40 cnf(1895,plain,
% 14.48/14.40 (P8(f3(f27(a1)),f11(f10(x18951,x18951,f27(a1)),f10(x18952,x18952,f27(a1)),f27(a1)),f27(a1))),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,170,171,172,173,174,176,177,178,179,184,186,187,188,190,193,197,198,199,202,207,208,209,211,212,214,216,217,218,220,231,234,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059])).
% 14.48/14.40 cnf(1909,plain,
% 14.48/14.40 (P8(f15(f10(x19091,x19092,a1),a1),f10(f15(x19091,a1),f24(x19092,a1),a1),a1)),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,170,171,172,173,174,176,177,178,179,184,186,187,188,190,193,197,198,199,202,207,208,209,211,212,214,216,217,218,220,231,234,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980])).
% 14.48/14.40 cnf(1947,plain,
% 14.48/14.40 (E(f5(f7(x19471,x19472,a1),a1),f5(f7(x19472,x19471,a1),a1))),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,170,171,172,173,174,175,176,177,178,179,184,186,187,188,190,193,197,198,199,202,207,208,209,211,212,214,216,217,218,220,230,231,234,235,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720])).
% 14.48/14.40 cnf(1963,plain,
% 14.48/14.40 (P9(f3(a1),f11(f4(a1),f4(a1),a1),a1)),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,170,171,172,173,174,175,176,177,178,179,180,183,184,186,187,188,190,193,197,198,199,202,207,208,209,211,212,214,216,217,218,220,230,231,234,235,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653])).
% 14.48/14.40 cnf(2017,plain,
% 14.48/14.40 (E(f11(f10(x20171,x20172,a1),x20172,a1),f10(f11(x20171,f4(a1),a1),x20172,a1))),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,193,194,197,198,199,202,207,208,209,211,212,214,216,217,218,220,230,231,234,235,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806])).
% 14.48/14.40 cnf(2055,plain,
% 14.48/14.40 (P8(f11(f10(f3(a1),f3(a1),a1),f10(f3(a1),f3(a1),a1),a1),f3(a1),a1)),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,193,194,197,198,199,202,207,208,209,211,212,214,216,217,218,220,230,231,234,235,237,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080])).
% 14.48/14.40 cnf(2070,plain,
% 14.48/14.40 (P32(f11(f10(f7(x20701,x20701,a1),x20702,a1),a1,a1))),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,193,194,197,198,199,200,202,207,208,209,211,212,214,216,217,218,220,222,227,230,231,234,235,237,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137])).
% 14.48/14.40 cnf(2073,plain,
% 14.48/14.40 (P53(f11(f10(f7(x20731,x20731,a1),x20732,a1),a1,a1))),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,193,194,197,198,199,200,202,204,207,208,209,211,212,214,216,217,218,220,222,223,227,230,231,234,235,237,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134])).
% 14.48/14.40 cnf(2074,plain,
% 14.48/14.40 (~E(f27(a1),x20741)+P12(x20741)),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,193,194,197,198,199,200,202,204,207,208,209,211,212,214,216,217,218,220,222,223,227,230,231,234,235,237,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133])).
% 14.48/14.40 cnf(2077,plain,
% 14.48/14.40 (P70(f11(f10(f7(x20771,x20771,a1),x20772,a1),a1,a1))),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,193,194,197,198,199,200,202,204,207,208,209,210,211,212,214,216,217,218,220,222,223,225,227,230,231,234,235,237,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129])).
% 14.48/14.40 cnf(2079,plain,
% 14.48/14.40 (P22(f11(f10(f7(x20791,x20791,a1),x20792,a1),a1,a1))),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,193,194,197,198,199,200,202,204,207,208,209,210,211,212,214,216,217,218,220,222,223,225,227,230,231,233,234,235,237,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127])).
% 14.48/14.40 cnf(2080,plain,
% 14.48/14.40 (P63(f11(f10(f7(x20801,x20801,a1),x20802,a1),a1,a1))),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,193,194,196,197,198,199,200,202,204,207,208,209,210,211,212,214,216,217,218,220,222,223,225,227,230,231,233,234,235,237,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126])).
% 14.48/14.40 cnf(2082,plain,
% 14.48/14.40 (P66(f11(f10(f7(x20821,x20821,a1),x20822,a1),a1,a1))),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,193,194,196,197,198,199,200,202,204,206,207,208,209,210,211,212,214,216,217,218,220,222,223,225,227,230,231,233,234,235,237,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124])).
% 14.48/14.40 cnf(2084,plain,
% 14.48/14.40 (P64(f11(f10(f7(x20841,x20841,a1),x20842,a1),a1,a1))),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,193,194,195,196,197,198,199,200,202,204,206,207,208,209,210,211,212,214,216,217,218,220,222,223,225,227,230,231,233,234,235,237,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124,123,122])).
% 14.48/14.40 cnf(2085,plain,
% 14.48/14.40 (P51(f11(f10(f7(x20851,x20851,a1),x20852,a1),a1,a1))),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,191,193,194,195,196,197,198,199,200,202,204,206,207,208,209,210,211,212,214,216,217,218,220,222,223,225,227,230,231,233,234,235,237,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124,123,122,121])).
% 14.48/14.40 cnf(2086,plain,
% 14.48/14.40 (P61(f11(f10(f7(x20861,x20861,a1),x20862,a1),a1,a1))),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,191,193,194,195,196,197,198,199,200,202,204,206,207,208,209,210,211,212,214,216,217,218,220,222,223,225,227,230,231,233,234,235,237,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124,123,122,121,120])).
% 14.48/14.40 cnf(2087,plain,
% 14.48/14.40 (P54(f11(f10(f7(x20871,x20871,a1),x20872,a1),a1,a1))),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,191,193,194,195,196,197,198,199,200,202,204,205,206,207,208,209,210,211,212,214,216,217,218,220,222,223,225,227,230,231,233,234,235,237,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124,123,122,121,120,119])).
% 14.48/14.40 cnf(2089,plain,
% 14.48/14.40 (P62(f11(f10(f7(x20891,x20891,a1),x20892,a1),a1,a1))),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,191,193,194,195,196,197,198,199,200,202,204,205,206,207,208,209,210,211,212,214,216,217,218,220,222,223,225,227,230,231,233,234,235,237,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117])).
% 14.48/14.40 cnf(2090,plain,
% 14.48/14.40 (P65(f11(f10(f7(x20901,x20901,a1),x20902,a1),a1,a1))),
% 14.48/14.40 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,191,193,194,195,196,197,198,199,200,202,204,205,206,207,208,209,210,211,212,214,216,217,218,220,222,223,225,227,230,231,233,234,235,237,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117,115])).
% 14.48/14.40 cnf(2095,plain,
% 14.48/14.40 (P30(f11(f10(f7(x20951,x20951,a1),x20952,a1),a1,a1))),
% 14.48/14.41 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,191,193,194,195,196,197,198,199,200,202,204,205,206,207,208,209,210,211,212,214,216,217,218,220,222,223,225,227,230,231,233,234,235,237,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117,115,114,112,111,110,109])).
% 14.48/14.41 cnf(2096,plain,
% 14.48/14.41 (P52(f11(f10(f7(x20961,x20961,a1),x20962,a1),a1,a1))),
% 14.48/14.41 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,191,193,194,195,196,197,198,199,200,202,204,205,206,207,208,209,210,211,212,214,216,217,218,220,222,223,225,227,230,231,233,234,235,237,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117,115,114,112,111,110,109,108])).
% 14.48/14.41 cnf(2097,plain,
% 14.48/14.41 (P50(f11(f10(f7(x20971,x20971,a1),x20972,a1),a1,a1))),
% 14.48/14.41 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,191,193,194,195,196,197,198,199,200,202,204,205,206,207,208,209,210,211,212,214,216,217,218,220,222,223,225,227,230,231,233,234,235,237,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117,115,114,112,111,110,109,108,107])).
% 14.48/14.41 cnf(2098,plain,
% 14.48/14.41 (P26(f11(f10(f7(x20981,x20981,a1),x20982,a1),a1,a1))),
% 14.48/14.41 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,191,193,194,195,196,197,198,199,200,202,204,205,206,207,208,209,210,211,212,214,216,217,218,220,222,223,225,227,230,231,233,234,235,237,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117,115,114,112,111,110,109,108,107,106])).
% 14.48/14.41 cnf(2101,plain,
% 14.48/14.41 (P36(f11(f10(f7(x21011,x21011,a1),x21012,a1),a1,a1))),
% 14.48/14.41 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,191,193,194,195,196,197,198,199,200,202,204,205,206,207,208,209,210,211,212,214,216,217,218,220,222,223,225,227,230,231,233,234,235,237,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117,115,114,112,111,110,109,108,107,106,105,104,103])).
% 14.48/14.41 cnf(2102,plain,
% 14.48/14.41 (P59(f11(f10(f7(x21021,x21021,a1),x21022,a1),a1,a1))),
% 14.48/14.41 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,191,193,194,195,196,197,198,199,200,202,204,205,206,207,208,209,210,211,212,214,216,217,218,220,222,223,225,227,230,231,233,234,235,237,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117,115,114,112,111,110,109,108,107,106,105,104,103,102])).
% 14.48/14.41 cnf(2103,plain,
% 14.48/14.41 (P31(f11(f10(f7(x21031,x21031,a1),x21032,a1),a1,a1))),
% 14.48/14.41 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,191,193,194,195,196,197,198,199,200,202,204,205,206,207,208,209,210,211,212,214,216,217,218,220,222,223,225,227,230,231,233,234,235,237,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117,115,114,112,111,110,109,108,107,106,105,104,103,102,101])).
% 14.48/14.41 cnf(2104,plain,
% 14.48/14.41 (P6(f11(f10(f7(x21041,x21041,a1),x21042,a1),a1,a1))),
% 14.48/14.41 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,191,193,194,195,196,197,198,199,200,202,204,205,206,207,208,209,210,211,212,214,216,217,218,220,222,223,225,227,230,231,233,234,235,237,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117,115,114,112,111,110,109,108,107,106,105,104,103,102,101,100])).
% 14.48/14.41 cnf(2105,plain,
% 14.48/14.41 (P25(f11(f10(f7(x21051,x21051,a1),x21052,a1),a1,a1))),
% 14.48/14.41 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,169,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,191,193,194,195,196,197,198,199,200,202,204,205,206,207,208,209,210,211,212,214,216,217,218,220,222,223,225,227,230,231,233,234,235,237,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117,115,114,112,111,110,109,108,107,106,105,104,103,102,101,100,99])).
% 14.48/14.41 cnf(2106,plain,
% 14.48/14.41 (P43(f11(f10(f7(x21061,x21061,a1),x21062,a1),a1,a1))),
% 14.48/14.41 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,168,169,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,191,193,194,195,196,197,198,199,200,202,204,205,206,207,208,209,210,211,212,214,216,217,218,220,222,223,225,227,230,231,233,234,235,237,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117,115,114,112,111,110,109,108,107,106,105,104,103,102,101,100,99,98])).
% 14.48/14.41 cnf(2110,plain,
% 14.48/14.41 (P33(f11(f10(f7(x21101,x21101,a1),x21102,a1),a1,a1))),
% 14.48/14.41 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,168,169,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,191,192,193,194,195,196,197,198,199,200,202,204,205,206,207,208,209,210,211,212,214,216,217,218,220,222,223,225,227,230,231,233,234,235,237,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117,115,114,112,111,110,109,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94])).
% 14.48/14.41 cnf(2112,plain,
% 14.48/14.41 (P24(f11(f10(f7(x21121,x21121,a1),x21122,a1),a1,a1))),
% 14.48/14.41 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,168,169,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,191,192,193,194,195,196,197,198,199,200,202,204,205,206,207,208,209,210,211,212,214,216,217,218,220,222,223,225,227,230,231,233,234,235,237,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117,115,114,112,111,110,109,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92])).
% 14.48/14.41 cnf(2116,plain,
% 14.48/14.41 (P18(f11(f10(f7(x21161,x21161,a1),x21162,a1),a1,a1))),
% 14.48/14.41 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,168,169,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,191,192,193,194,195,196,197,198,199,200,202,204,205,206,207,208,209,210,211,212,214,216,217,218,220,222,223,225,227,229,230,231,233,234,235,237,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117,115,114,112,111,110,109,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88])).
% 14.48/14.41 cnf(2118,plain,
% 14.48/14.41 (P29(f11(f10(f7(x21181,x21181,a1),x21182,a1),a1,a1))),
% 14.48/14.41 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,168,169,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,191,192,193,194,195,196,197,198,199,200,202,204,205,206,207,208,209,210,211,212,214,216,217,218,220,222,223,225,227,229,230,231,233,234,235,237,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117,115,114,112,111,110,109,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86])).
% 14.48/14.41 cnf(2119,plain,
% 14.48/14.41 (P35(f11(f10(f7(x21191,x21191,a1),x21192,a1),a1,a1))),
% 14.48/14.41 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,168,169,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,191,192,193,194,195,196,197,198,199,200,202,204,205,206,207,208,209,210,211,212,214,216,217,218,220,222,223,225,227,229,230,231,233,234,235,237,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117,115,114,112,111,110,109,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85])).
% 14.48/14.41 cnf(2120,plain,
% 14.48/14.41 (P41(f11(f10(f7(x21201,x21201,a1),x21202,a1),a1,a1))),
% 14.48/14.41 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,168,169,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,191,192,193,194,195,196,197,198,199,200,202,204,205,206,207,208,209,210,211,212,214,216,217,218,220,222,223,225,227,229,230,231,233,234,235,237,239,246,263,241,266,252,267,260,247,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117,115,114,112,111,110,109,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84])).
% 14.48/14.41 cnf(2121,plain,
% 14.48/14.41 (~P10(f3(a1),f4(a1),f10(f4(a1),a1,a1))),
% 14.48/14.41 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,168,169,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,191,192,193,194,195,196,197,198,199,200,202,204,205,206,207,208,209,210,211,212,214,216,217,218,220,222,223,225,227,229,230,231,233,234,235,237,239,246,263,241,266,252,267,260,247,244,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117,115,114,112,111,110,109,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83])).
% 14.48/14.41 cnf(2125,plain,
% 14.48/14.41 (P57(f11(f10(f7(x21251,x21251,a1),x21252,a1),a1,a1))),
% 14.48/14.41 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,168,169,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,191,192,193,194,195,196,197,198,199,200,202,204,205,206,207,208,209,210,211,212,214,216,217,218,220,222,223,225,227,229,230,231,233,234,235,237,239,246,263,241,242,266,252,267,260,247,244,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117,115,114,112,111,110,109,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79])).
% 14.48/14.41 cnf(2126,plain,
% 14.48/14.41 (P4(f11(f10(f7(x21261,x21261,a1),x21262,a1),a1,a1))),
% 14.48/14.41 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,168,169,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,191,192,193,194,195,196,197,198,199,200,202,204,205,206,207,208,209,210,211,212,214,216,217,218,220,222,223,225,227,229,230,231,233,234,235,237,239,246,263,241,242,266,252,267,260,247,244,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117,115,114,112,111,110,109,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78])).
% 14.48/14.41 cnf(2129,plain,
% 14.48/14.41 (~P8(f11(a29,f15(a30,a2),a1),f10(f4(a1),f15(f17(f16(a31,a32,a2),a33,a2),a2),a1),f10(f4(a1),a1,a1))),
% 14.48/14.41 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,168,169,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,191,192,193,194,195,196,197,198,199,200,202,204,205,206,207,208,209,210,211,212,214,216,217,218,220,222,223,225,227,229,230,231,233,234,235,237,239,246,263,241,242,266,252,267,260,247,244,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117,115,114,112,111,110,109,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75])).
% 14.48/14.41 cnf(2131,plain,
% 14.48/14.41 (~P9(x21311,x21311,f10(f4(a1),a1,a1))),
% 14.48/14.41 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,1477,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,168,169,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,191,192,193,194,195,196,197,198,199,200,202,204,205,206,207,208,209,210,211,212,214,216,217,218,220,222,223,225,227,229,230,231,233,234,235,237,239,246,263,241,242,266,252,267,260,247,244,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117,115,114,112,111,110,109,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,72,71])).
% 14.48/14.41 cnf(2138,plain,
% 14.48/14.41 (~P9(f15(a33,a2),f3(a1),a1)),
% 14.48/14.41 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,1477,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,168,169,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,191,192,193,194,195,196,197,198,199,200,202,204,205,206,207,208,209,210,211,212,214,216,217,218,220,222,223,225,227,229,230,231,233,234,235,237,239,246,263,241,242,266,252,267,260,247,244,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117,115,114,112,111,110,109,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,72,71,68,67,693,594,593])).
% 14.48/14.41 cnf(2142,plain,
% 14.48/14.41 (~P9(f14(f11(f10(x21421,x21421,a1),f10(x21422,x21422,a1),a1)),x21421,a1)),
% 14.48/14.41 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,1477,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,168,169,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,191,192,193,194,195,196,197,198,199,200,202,204,205,206,207,208,209,210,211,212,214,216,217,218,220,222,223,225,227,229,230,231,233,234,235,237,239,246,263,241,242,266,252,267,260,247,244,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,1620,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117,115,114,112,111,110,109,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,72,71,68,67,693,594,593,592,590])).
% 14.48/14.41 cnf(2146,plain,
% 14.48/14.41 (P8(f3(a1),f34(x21461,x21462),a1)),
% 14.48/14.41 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,1477,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,168,169,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,191,192,193,194,195,196,197,198,199,200,202,204,205,206,207,208,209,210,211,212,214,216,217,218,220,222,223,225,227,229,230,231,233,234,235,237,239,246,263,241,242,266,252,267,260,247,244,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,1620,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117,115,114,112,111,110,109,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,72,71,68,67,693,594,593,592,590,574,528])).
% 14.48/14.41 cnf(2148,plain,
% 14.48/14.41 (P8(f13(f34(x21481,x21482),a1),f34(x21481,x21482),a1)),
% 14.48/14.41 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,1477,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,168,169,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,191,192,193,194,195,196,197,198,199,200,202,204,205,206,207,208,209,210,211,212,214,216,217,218,220,222,223,225,227,229,230,231,233,234,235,237,239,246,263,241,242,266,252,267,260,247,244,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,1620,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117,115,114,112,111,110,109,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,72,71,68,67,693,594,593,592,590,574,528,494])).
% 14.48/14.41 cnf(2152,plain,
% 14.48/14.41 (P9(f3(a1),f10(f34(x21521,x21522),f34(x21521,x21522),a1),a1)),
% 14.48/14.41 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,1795,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,1477,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,168,169,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,191,192,193,194,195,196,197,198,199,200,202,204,205,206,207,208,209,210,211,212,214,216,217,218,220,222,223,225,227,229,230,231,233,234,235,237,239,246,263,241,242,266,252,267,260,247,244,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,1620,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117,115,114,112,111,110,109,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,72,71,68,67,693,594,593,592,590,574,528,494,934,799])).
% 14.48/14.41 cnf(2158,plain,
% 14.48/14.41 (P10(x21581,f10(f10(x21581,x21582,a2),x21583,a2),a2)),
% 14.48/14.41 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,1795,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,1477,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,168,169,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,191,192,193,194,195,196,197,198,199,200,202,204,205,206,207,208,209,210,211,212,214,216,217,218,220,222,223,225,227,229,230,231,233,234,235,237,239,246,263,241,242,266,252,267,260,247,244,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,1620,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117,115,114,112,111,110,109,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,72,71,68,67,693,594,593,592,590,574,528,494,934,799,764,763,723])).
% 14.48/14.41 cnf(2160,plain,
% 14.48/14.41 (P10(x21601,f10(x21602,f10(x21601,x21603,a2),a2),a2)),
% 14.48/14.41 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,1795,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,1477,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,168,169,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,191,192,193,194,195,196,197,198,199,200,202,204,205,206,207,208,209,210,211,212,214,216,217,218,220,222,223,225,227,229,230,231,233,234,235,237,239,246,263,241,242,266,252,267,260,247,244,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,1620,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117,115,114,112,111,110,109,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,72,71,68,67,693,594,593,592,590,574,528,494,934,799,764,763,723,722])).
% 14.48/14.41 cnf(2164,plain,
% 14.48/14.41 (~P10(f5(f3(a1),a1),f4(a1),a1)),
% 14.48/14.41 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,1795,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,1477,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,168,169,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,191,192,193,194,195,196,197,198,199,200,202,204,205,206,207,208,209,210,211,212,214,216,217,218,220,222,223,225,227,229,230,231,233,234,235,237,239,246,263,241,242,266,252,267,260,247,244,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,1620,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117,115,114,112,111,110,109,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,72,71,68,67,693,594,593,592,590,574,528,494,934,799,764,763,723,722,625,624])).
% 14.48/14.41 cnf(2170,plain,
% 14.48/14.41 (~P10(f3(a1),f5(f4(a1),a1),a1)),
% 14.48/14.41 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,1795,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,1477,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,168,169,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,191,192,193,194,195,196,197,198,199,200,202,204,205,206,207,208,209,210,211,212,214,216,217,218,220,222,223,225,227,229,230,231,233,234,235,237,239,246,263,241,242,266,252,267,260,247,244,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,1620,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117,115,114,112,111,110,109,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,72,71,68,67,693,594,593,592,590,574,528,494,934,799,764,763,723,722,625,624,623,621,620])).
% 14.48/14.41 cnf(2172,plain,
% 14.48/14.41 (P10(f5(x21721,a1),x21721,a1)),
% 14.48/14.41 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,1795,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,1477,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,168,169,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,191,192,193,194,195,196,197,198,199,200,202,204,205,206,207,208,209,210,211,212,214,216,217,218,220,222,223,225,227,229,230,231,233,234,235,237,239,246,263,241,242,266,252,267,260,247,244,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,1620,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117,115,114,112,111,110,109,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,72,71,68,67,693,594,593,592,590,574,528,494,934,799,764,763,723,722,625,624,623,621,620,582])).
% 14.48/14.41 cnf(2174,plain,
% 14.48/14.41 (P10(f13(x21741,a1),x21741,a1)),
% 14.48/14.41 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,1795,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,1477,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,168,169,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,191,192,193,194,195,196,197,198,199,200,202,204,205,206,207,208,209,210,211,212,214,216,217,218,220,222,223,225,227,229,230,231,233,234,235,237,239,246,263,241,242,266,252,267,260,247,244,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,1620,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117,115,114,112,111,110,109,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,72,71,68,67,693,594,593,592,590,574,528,494,934,799,764,763,723,722,625,624,623,621,620,582,581])).
% 14.48/14.41 cnf(2180,plain,
% 14.48/14.41 (~E(f7(f4(a1),f3(a1),a1),f7(x21801,x21801,a1))),
% 14.48/14.41 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,1795,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,1477,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,168,169,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,191,192,193,194,195,196,197,198,199,200,202,204,205,206,207,208,209,210,211,212,214,216,217,218,220,222,223,225,227,229,230,231,233,234,235,237,239,246,263,241,242,266,252,267,260,247,244,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,1620,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117,115,114,112,111,110,109,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,72,71,68,67,693,594,593,592,590,574,528,494,934,799,764,763,723,722,625,624,623,621,620,582,581,580,579,603])).
% 14.48/14.41 cnf(2188,plain,
% 14.48/14.41 (~E(f11(x21881,f4(a1),a2),f11(x21881,f3(a1),a2))),
% 14.48/14.41 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,1795,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,1477,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,168,169,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,191,192,193,194,195,196,197,198,199,200,202,204,205,206,207,208,209,210,211,212,214,216,217,218,220,222,223,224,225,227,229,230,231,233,234,235,237,239,246,263,241,242,266,252,267,260,247,244,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,1620,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117,115,114,112,111,110,109,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,72,71,68,67,693,594,593,592,590,574,528,494,934,799,764,763,723,722,625,624,623,621,620,582,581,580,579,603,602,601,600,599])).
% 14.48/14.41 cnf(2194,plain,
% 14.48/14.41 (~E(f7(f4(a1),f3(a1),a1),f3(a1))),
% 14.48/14.41 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,1795,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,1477,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,168,169,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,191,192,193,194,195,196,197,198,199,200,202,204,205,206,207,208,209,210,211,212,214,216,217,218,220,222,223,224,225,227,229,230,231,233,234,235,237,239,246,263,241,242,266,252,267,260,247,244,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,1620,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117,115,114,112,111,110,109,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,72,71,68,67,693,594,593,592,590,574,528,494,934,799,764,763,723,722,625,624,623,621,620,582,581,580,579,603,602,601,600,599,598,597,466])).
% 14.48/14.41 cnf(2196,plain,
% 14.48/14.41 (~E(f7(f4(a1),f3(a1),a2),f3(a2))),
% 14.48/14.41 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,1795,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,1477,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,168,169,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,191,192,193,194,195,196,197,198,199,200,202,204,205,206,207,208,209,210,211,212,214,216,217,218,220,222,223,224,225,227,229,230,231,233,234,235,237,239,246,263,241,242,266,252,267,260,247,244,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,1620,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117,115,114,112,111,110,109,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,72,71,68,67,693,594,593,592,590,574,528,494,934,799,764,763,723,722,625,624,623,621,620,582,581,580,579,603,602,601,600,599,598,597,466,465])).
% 14.48/14.41 cnf(2206,plain,
% 14.48/14.41 (P8(f13(f3(a1),a1),f3(a1),a1)),
% 14.48/14.41 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,1795,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,1477,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,168,169,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,191,192,193,194,195,196,197,198,199,200,202,204,205,206,207,208,209,210,211,212,214,216,217,218,220,222,223,224,225,227,229,230,231,233,234,235,237,239,246,263,241,242,266,252,267,260,247,244,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,1620,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117,115,114,112,111,110,109,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,72,71,68,67,693,594,593,592,590,574,528,494,934,799,764,763,723,722,625,624,623,621,620,582,581,580,579,603,602,601,600,599,598,597,466,465,417,414,361,359,618])).
% 14.48/14.41 cnf(2208,plain,
% 14.48/14.41 (P8(f13(f11(f10(f3(a1),f3(a1),a1),f10(f3(a1),f3(a1),a1),a1),a1),f11(f10(f3(a1),f3(a1),a1),f10(f3(a1),f3(a1),a1),a1),a1)),
% 14.48/14.41 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,1795,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,1477,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,168,169,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,191,192,193,194,195,196,197,198,199,200,202,204,205,206,207,208,209,210,211,212,214,216,217,218,220,222,223,224,225,227,229,230,231,233,234,235,237,239,246,263,241,242,266,252,267,260,247,244,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,1620,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117,115,114,112,111,110,109,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,72,71,68,67,693,594,593,592,590,574,528,494,934,799,764,763,723,722,625,624,623,621,620,582,581,580,579,603,602,601,600,599,598,597,466,465,417,414,361,359,618,617])).
% 14.48/14.41 cnf(2210,plain,
% 14.48/14.41 (P8(f3(a1),f13(f3(a1),a1),a1)),
% 14.48/14.41 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,1795,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,1477,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,168,169,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,191,192,193,194,195,196,197,198,199,200,202,204,205,206,207,208,209,210,211,212,214,216,217,218,220,222,223,224,225,227,229,230,231,233,234,235,237,239,246,263,241,242,266,252,267,260,247,244,268,1195,1216,1247,1335,1338,1429,257,251,1280,261,1163,1181,1306,1462,1467,1479,1620,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117,115,114,112,111,110,109,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,72,71,68,67,693,594,593,592,590,574,528,494,934,799,764,763,723,722,625,624,623,621,620,582,581,580,579,603,602,601,600,599,598,597,466,465,417,414,361,359,618,617,615])).
% 14.48/14.41 cnf(2226,plain,
% 14.48/14.41 (~P8(f11(x22261,f11(a29,f15(a30,a2),a1),a1),f11(x22261,f10(f4(a1),f15(f17(f16(a31,a32,a2),a33,a2),a2),a1),a1),a1)),
% 14.48/14.41 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,1795,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,1477,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,168,169,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,191,192,193,194,195,196,197,198,199,200,202,204,205,206,207,208,209,210,211,212,214,216,217,218,220,222,223,224,225,227,229,230,231,233,234,235,237,239,246,263,241,242,266,252,267,260,247,244,268,1195,1216,1247,1335,1338,1429,1452,257,251,1280,261,1163,1181,1306,1462,1467,1479,1620,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117,115,114,112,111,110,109,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,72,71,68,67,693,594,593,592,590,574,528,494,934,799,764,763,723,722,625,624,623,621,620,582,581,580,579,603,602,601,600,599,598,597,466,465,417,414,361,359,618,617,615,614,518,500,499,425,343,454,970])).
% 14.48/14.41 cnf(2232,plain,
% 14.48/14.41 (P9(f11(x22321,f3(a1),a1),f11(x22321,f34(x22322,x22323),a1),a1)),
% 14.48/14.41 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,1795,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,1477,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,168,169,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,191,192,193,194,195,196,197,198,199,200,202,204,205,206,207,208,209,210,211,212,214,216,217,218,220,222,223,224,225,227,229,230,231,233,234,235,237,239,246,263,241,242,266,252,267,260,247,244,268,1195,1216,1247,1335,1338,1429,1452,257,251,1280,261,1163,1181,1306,1462,1467,1479,1620,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117,115,114,112,111,110,109,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,72,71,68,67,693,594,593,592,590,574,528,494,934,799,764,763,723,722,625,624,623,621,620,582,581,580,579,603,602,601,600,599,598,597,466,465,417,414,361,359,618,617,615,614,518,500,499,425,343,454,970,829,828,827])).
% 14.48/14.41 cnf(2242,plain,
% 14.48/14.41 (P9(f7(f3(a1),f34(x22421,x22422),a1),f3(a1),a1)),
% 14.48/14.41 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,1795,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,1477,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,168,169,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,191,192,193,194,195,196,197,198,199,200,202,204,205,206,207,208,209,210,211,212,214,216,217,218,220,222,223,224,225,227,229,230,231,233,234,235,237,239,246,263,241,242,266,252,267,260,247,244,268,1195,1216,1247,1335,1338,1429,1452,257,251,1280,261,1163,1181,1306,1462,1467,1479,1620,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117,115,114,112,111,110,109,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,72,71,68,67,693,594,593,592,590,574,528,494,934,799,764,763,723,722,625,624,623,621,620,582,581,580,579,603,602,601,600,599,598,597,466,465,417,414,361,359,618,617,615,614,518,500,499,425,343,454,970,829,828,827,824,823,821,770,727])).
% 14.48/14.41 cnf(2244,plain,
% 14.48/14.41 (P8(f7(f3(f27(a1)),f11(f10(x22441,x22441,f27(a1)),f10(x22442,x22442,f27(a1)),f27(a1)),f27(a1)),f3(f27(a1)),f27(a1))),
% 14.48/14.41 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,1795,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,1477,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,168,169,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,191,192,193,194,195,196,197,198,199,200,202,204,205,206,207,208,209,210,211,212,214,216,217,218,220,222,223,224,225,227,229,230,231,233,234,235,237,239,246,263,241,242,266,252,267,260,247,244,268,1195,1216,1247,1335,1338,1429,1452,257,251,1280,261,1163,1181,1306,1462,1467,1479,1620,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117,115,114,112,111,110,109,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,72,71,68,67,693,594,593,592,590,574,528,494,934,799,764,763,723,722,625,624,623,621,620,582,581,580,579,603,602,601,600,599,598,597,466,465,417,414,361,359,618,617,615,614,518,500,499,425,343,454,970,829,828,827,824,823,821,770,727,726])).
% 14.48/14.41 cnf(2246,plain,
% 14.48/14.41 (~P8(f13(f10(f4(a1),f15(f17(f16(a31,a32,a2),a33,a2),a2),a1),a1),f13(f11(a29,f15(a30,a2),a1),a1),a1)),
% 14.48/14.41 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,1795,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,1477,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,168,169,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,191,192,193,194,195,196,197,198,199,200,202,204,205,206,207,208,209,210,211,212,214,216,217,218,220,222,223,224,225,227,229,230,231,233,234,235,237,239,246,263,241,242,266,252,267,260,247,244,268,1195,1216,1247,1335,1338,1429,1452,257,251,1280,261,1163,1181,1306,1462,1467,1479,1620,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117,115,114,112,111,110,109,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,72,71,68,67,693,594,593,592,590,574,528,494,934,799,764,763,723,722,625,624,623,621,620,582,581,580,579,603,602,601,600,599,598,597,466,465,417,414,361,359,618,617,615,614,518,500,499,425,343,454,970,829,828,827,824,823,821,770,727,726,696])).
% 14.48/14.41 cnf(2248,plain,
% 14.48/14.41 (P8(f13(f14(f11(f10(f13(x22481,a1),f13(x22481,a1),a1),f10(x22482,x22482,a1),a1)),a1),x22481,a1)),
% 14.48/14.41 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,1795,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,1477,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,168,169,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,191,192,193,194,195,196,197,198,199,200,202,204,205,206,207,208,209,210,211,212,214,216,217,218,220,222,223,224,225,227,229,230,231,233,234,235,237,239,246,263,241,242,266,252,267,260,247,244,268,1195,1216,1247,1335,1338,1429,1452,257,251,1280,261,1163,1181,1306,1462,1467,1479,1620,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117,115,114,112,111,110,109,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,72,71,68,67,693,594,593,592,590,574,528,494,934,799,764,763,723,722,625,624,623,621,620,582,581,580,579,603,602,601,600,599,598,597,466,465,417,414,361,359,618,617,615,614,518,500,499,425,343,454,970,829,828,827,824,823,821,770,727,726,696,688])).
% 14.48/14.41 cnf(2252,plain,
% 14.48/14.41 (P9(f13(f34(x22521,x22522),a1),f13(f3(a1),a1),a1)),
% 14.48/14.41 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,1795,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,1477,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,168,169,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,191,192,193,194,195,196,197,198,199,200,202,204,205,206,207,208,209,210,211,212,214,216,217,218,220,222,223,224,225,227,229,230,231,233,234,235,237,239,246,263,241,242,266,252,267,260,247,244,268,1195,1216,1247,1335,1338,1429,1452,257,251,1280,261,1163,1181,1306,1462,1467,1479,1620,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117,115,114,112,111,110,109,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,72,71,68,67,693,594,593,592,590,574,528,494,934,799,764,763,723,722,625,624,623,621,620,582,581,580,579,603,602,601,600,599,598,597,466,465,417,414,361,359,618,617,615,614,518,500,499,425,343,454,970,829,828,827,824,823,821,770,727,726,696,688,686,655])).
% 14.48/14.41 cnf(2258,plain,
% 14.48/14.41 (~E(f5(f3(a1),a1),f5(f4(a1),a1))),
% 14.48/14.41 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,1795,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,1477,143,144,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,168,169,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,191,192,193,194,195,196,197,198,199,200,202,204,205,206,207,208,209,210,211,212,214,216,217,218,220,222,223,224,225,227,229,230,231,233,234,235,237,239,246,263,241,242,266,252,267,260,247,244,268,1195,1216,1247,1335,1338,1429,1452,257,251,1280,261,1163,1181,1306,1462,1467,1479,1620,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117,115,114,112,111,110,109,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,72,71,68,67,693,594,593,592,590,574,528,494,934,799,764,763,723,722,625,624,623,621,620,582,581,580,579,603,602,601,600,599,598,597,466,465,417,414,361,359,618,617,615,614,518,500,499,425,343,454,970,829,828,827,824,823,821,770,727,726,696,688,686,655,654,626,470])).
% 14.48/14.41 cnf(2264,plain,
% 14.48/14.41 (P9(f13(f34(x22641,x22642),a1),f3(a1),a1)),
% 14.48/14.41 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,1795,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,1477,143,144,145,146,147,148,150,151,152,153,154,155,156,157,158,159,160,162,163,165,166,168,169,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,191,192,193,194,195,196,197,198,199,200,202,204,205,206,207,208,209,210,211,212,214,216,217,218,220,222,223,224,225,227,229,230,231,233,234,235,237,239,246,263,241,242,266,252,267,260,247,244,268,1195,1216,1247,1335,1338,1429,1452,257,251,1280,261,1163,1181,1306,1462,1467,1479,1620,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117,115,114,112,111,110,109,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,72,71,68,67,693,594,593,592,590,574,528,494,934,799,764,763,723,722,625,624,623,621,620,582,581,580,579,603,602,601,600,599,598,597,466,465,417,414,361,359,618,617,615,614,518,500,499,425,343,454,970,829,828,827,824,823,821,770,727,726,696,688,686,655,654,626,470,422,342,634])).
% 14.48/14.41 cnf(2292,plain,
% 14.48/14.41 (P9(f11(f7(f3(a1),f34(x22921,x22922),a1),f7(f3(a1),f34(x22921,x22922),a1),a1),f3(a1),a1)),
% 14.48/14.41 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,1795,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,1477,143,144,145,146,147,148,150,151,152,153,154,155,156,157,158,159,160,161,162,163,165,166,168,169,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,191,192,193,194,195,196,197,198,199,200,202,204,205,206,207,208,209,210,211,212,214,216,217,218,220,222,223,224,225,227,229,230,231,233,234,235,237,239,246,263,241,242,266,252,267,260,247,244,268,1195,1216,1247,1335,1338,1429,1452,257,251,1280,261,1163,1181,1306,1462,1467,1479,1620,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117,115,114,112,111,110,109,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,72,71,68,67,693,594,593,592,590,574,528,494,934,799,764,763,723,722,625,624,623,621,620,582,581,580,579,603,602,601,600,599,598,597,466,465,417,414,361,359,618,617,615,614,518,500,499,425,343,454,970,829,828,827,824,823,821,770,727,726,696,688,686,655,654,626,470,422,342,634,633,632,631,630,629,628,627,507,484,457,360,357,798,732])).
% 14.48/14.41 cnf(2300,plain,
% 14.48/14.41 (P8(f3(a1),f11(f3(a1),f3(a1),a1),a1)),
% 14.48/14.41 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,1795,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,1477,143,144,145,146,147,148,150,151,152,153,154,155,156,157,158,159,160,161,162,163,165,166,168,169,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,191,192,193,194,195,196,197,198,199,200,202,204,205,206,207,208,209,210,211,212,214,216,217,218,220,222,223,224,225,227,229,230,231,233,234,235,237,239,246,263,241,242,266,252,267,260,247,244,268,1195,1216,1247,1335,1338,1429,1452,257,251,1280,261,1163,1181,1306,1462,1467,1479,1620,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117,115,114,112,111,110,109,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,72,71,68,67,693,594,593,592,590,574,528,494,934,799,764,763,723,722,625,624,623,621,620,582,581,580,579,603,602,601,600,599,598,597,466,465,417,414,361,359,618,617,615,614,518,500,499,425,343,454,970,829,828,827,824,823,821,770,727,726,696,688,686,655,654,626,470,422,342,634,633,632,631,630,629,628,627,507,484,457,360,357,798,732,731,730,729,728])).
% 14.48/14.41 cnf(2326,plain,
% 14.48/14.41 (~E(f11(f13(f4(a1),a1),f11(x23261,f3(a1),a1),a1),x23261)),
% 14.48/14.41 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,1795,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,1477,143,144,145,146,147,148,150,151,152,153,154,155,156,157,158,159,160,161,162,163,165,166,168,169,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,191,192,193,194,195,196,197,198,199,200,202,204,205,206,207,208,209,210,211,212,214,216,217,218,220,222,223,224,225,227,229,230,231,233,234,235,237,239,246,263,241,242,266,252,267,260,247,244,268,1195,1216,1247,1335,1338,1429,1452,257,251,1280,261,1163,1181,1306,1462,1467,1479,1620,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117,115,114,112,111,110,109,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,72,71,68,67,693,594,593,592,590,574,528,494,934,799,764,763,723,722,625,624,623,621,620,582,581,580,579,603,602,601,600,599,598,597,466,465,417,414,361,359,618,617,615,614,518,500,499,425,343,454,970,829,828,827,824,823,821,770,727,726,696,688,686,655,654,626,470,422,342,634,633,632,631,630,629,628,627,507,484,457,360,357,798,732,731,730,729,728,692,636,588,587,586,585,512,511,510,453,452,758,736])).
% 14.48/14.41 cnf(2330,plain,
% 14.48/14.41 (~E(f12(f3(a1),a1),f13(f4(a1),a1))),
% 14.48/14.41 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,1795,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,1477,143,144,145,146,147,148,150,151,152,153,154,155,156,157,158,159,160,161,162,163,165,166,168,169,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,191,192,193,194,195,196,197,198,199,200,202,204,205,206,207,208,209,210,211,212,214,216,217,218,220,222,223,224,225,227,229,230,231,233,234,235,237,239,246,263,241,242,266,252,267,260,247,244,268,1195,1216,1247,1335,1338,1429,1452,257,251,1280,261,1163,1181,1306,1462,1467,1479,1620,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117,115,114,112,111,110,109,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,72,71,68,67,693,594,593,592,590,574,528,494,934,799,764,763,723,722,625,624,623,621,620,582,581,580,579,603,602,601,600,599,598,597,466,465,417,414,361,359,618,617,615,614,518,500,499,425,343,454,970,829,828,827,824,823,821,770,727,726,696,688,686,655,654,626,470,422,342,634,633,632,631,630,629,628,627,507,484,457,360,357,798,732,731,730,729,728,692,636,588,587,586,585,512,511,510,453,452,758,736,515,508])).
% 14.48/14.41 cnf(2354,plain,
% 14.48/14.41 (P9(f9(f11(f3(a1),f34(x23541,x23542),a1),f11(f4(a1),f4(a1),a1),a1),f34(x23541,x23542),a1)),
% 14.48/14.41 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,1795,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,1477,143,144,145,146,147,148,150,151,152,153,154,155,156,157,158,159,160,161,162,163,165,166,168,169,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,191,192,193,194,195,196,197,198,199,200,202,204,205,206,207,208,209,210,211,212,214,216,217,218,220,222,223,224,225,227,229,230,231,233,234,235,237,239,246,263,241,242,266,252,267,260,253,247,244,268,1195,1216,1247,1335,1338,1429,1452,257,251,1280,261,1163,1181,1306,1462,1467,1479,1620,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117,115,114,112,111,110,109,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,72,71,68,67,693,594,593,592,590,574,528,494,934,799,764,763,723,722,625,624,623,621,620,582,581,580,579,603,602,601,600,599,598,597,466,465,417,414,361,359,618,617,615,614,518,500,499,425,343,454,970,829,828,827,824,823,821,770,727,726,696,688,686,655,654,626,470,422,342,634,633,632,631,630,629,628,627,507,484,457,360,357,798,732,731,730,729,728,692,636,588,587,586,585,512,511,510,453,452,758,736,515,508,486,1064,1063,969,716,715,460,459,458,1111,1110,1087])).
% 14.48/14.41 cnf(2356,plain,
% 14.48/14.41 (P9(f3(a1),f9(f11(f3(a1),f34(x23561,x23562),a1),f11(f4(a1),f4(a1),a1),a1),a1)),
% 14.48/14.41 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,1795,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,1477,143,144,145,146,147,148,150,151,152,153,154,155,156,157,158,159,160,161,162,163,165,166,168,169,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,191,192,193,194,195,196,197,198,199,200,202,204,205,206,207,208,209,210,211,212,214,216,217,218,220,222,223,224,225,227,229,230,231,233,234,235,237,239,246,263,241,242,266,252,267,260,253,247,244,268,1195,1216,1247,1335,1338,1429,1452,257,251,1280,261,1163,1181,1306,1462,1467,1479,1620,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117,115,114,112,111,110,109,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,72,71,68,67,693,594,593,592,590,574,528,494,934,799,764,763,723,722,625,624,623,621,620,582,581,580,579,603,602,601,600,599,598,597,466,465,417,414,361,359,618,617,615,614,518,500,499,425,343,454,970,829,828,827,824,823,821,770,727,726,696,688,686,655,654,626,470,422,342,634,633,632,631,630,629,628,627,507,484,457,360,357,798,732,731,730,729,728,692,636,588,587,586,585,512,511,510,453,452,758,736,515,508,486,1064,1063,969,716,715,460,459,458,1111,1110,1087,1086])).
% 14.48/14.41 cnf(2358,plain,
% 14.48/14.41 (P9(f3(a1),f11(f10(f14(f34(x23581,x23582)),f14(f34(x23581,x23582)),a1),f10(x23583,x23583,a1),a1),a1)),
% 14.48/14.41 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,1795,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,1477,143,144,145,146,147,148,150,151,152,153,154,155,156,157,158,159,160,161,162,163,165,166,168,169,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,191,192,193,194,195,196,197,198,199,200,202,204,205,206,207,208,209,210,211,212,214,216,217,218,220,222,223,224,225,227,229,230,231,233,234,235,237,239,246,263,241,242,266,252,267,260,253,247,244,268,1195,1216,1247,1335,1338,1429,1452,257,251,1280,261,1163,1181,1306,1462,1467,1479,1620,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117,115,114,112,111,110,109,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,72,71,68,67,693,594,593,592,590,574,528,494,934,799,764,763,723,722,625,624,623,621,620,582,581,580,579,603,602,601,600,599,598,597,466,465,417,414,361,359,618,617,615,614,518,500,499,425,343,454,970,829,828,827,824,823,821,770,727,726,696,688,686,655,654,626,470,422,342,634,633,632,631,630,629,628,627,507,484,457,360,357,798,732,731,730,729,728,692,636,588,587,586,585,512,511,510,453,452,758,736,515,508,486,1064,1063,969,716,715,460,459,458,1111,1110,1087,1086,1061])).
% 14.48/14.41 cnf(2366,plain,
% 14.48/14.41 (~E(f11(f10(f14(f34(x23661,x23662)),f14(f34(x23661,x23662)),a1),f10(x23663,x23663,a1),a1),f3(a1))),
% 14.48/14.41 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,1795,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,1477,143,144,145,146,147,148,150,151,152,153,154,155,156,157,158,159,160,161,162,163,165,166,168,169,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,191,192,193,194,195,196,197,198,199,200,202,204,205,206,207,208,209,210,211,212,214,216,217,218,220,222,223,224,225,227,229,230,231,233,234,235,237,239,246,263,241,242,266,252,267,260,253,247,244,268,1195,1216,1247,1335,1338,1429,1452,257,251,1280,261,1163,1181,1306,1462,1467,1479,1620,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117,115,114,112,111,110,109,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,72,71,68,67,693,594,593,592,590,574,528,494,934,799,764,763,723,722,625,624,623,621,620,582,581,580,579,603,602,601,600,599,598,597,466,465,417,414,361,359,618,617,615,614,518,500,499,425,343,454,970,829,828,827,824,823,821,770,727,726,696,688,686,655,654,626,470,422,342,634,633,632,631,630,629,628,627,507,484,457,360,357,798,732,731,730,729,728,692,636,588,587,586,585,512,511,510,453,452,758,736,515,508,486,1064,1063,969,716,715,460,459,458,1111,1110,1087,1086,1061,1060,1020,1018,933])).
% 14.48/14.41 cnf(2368,plain,
% 14.48/14.41 (~E(f11(f10(x23681,x23681,a1),f10(f14(f34(x23682,x23683)),f14(f34(x23682,x23683)),a1),a1),f3(a1))),
% 14.48/14.41 inference(scs_inference,[],[269,243,1141,1166,1168,1262,1265,1300,1386,1392,1395,1448,1458,1461,1465,1471,1474,1478,1600,1603,1625,1628,1792,1795,265,1144,1147,1152,1157,1160,1170,1172,1186,1198,1201,1204,1207,1210,1213,1239,1244,1268,1271,1274,1277,1283,1286,1297,1310,1313,1316,1321,1326,1345,1348,1351,1354,1375,1378,1381,1385,1389,1398,1403,1408,1413,1416,1419,1422,1436,1439,1442,1445,1451,1455,1466,1470,1477,143,144,145,146,147,148,150,151,152,153,154,155,156,157,158,159,160,161,162,163,165,166,168,169,170,171,172,173,174,175,176,177,178,179,180,182,183,184,186,187,188,190,191,192,193,194,195,196,197,198,199,200,202,204,205,206,207,208,209,210,211,212,214,216,217,218,220,222,223,224,225,227,229,230,231,233,234,235,237,239,246,263,241,242,266,252,267,260,253,247,244,268,1195,1216,1247,1335,1338,1429,1452,257,251,1280,261,1163,1181,1306,1462,1467,1479,1620,258,262,2,514,471,577,555,554,462,395,270,559,558,561,74,73,70,69,3,596,517,497,622,475,639,638,340,971,825,691,689,685,662,660,659,658,657,529,506,461,349,348,347,346,345,344,795,794,793,792,791,468,397,811,488,487,1128,1126,1125,1123,712,711,710,709,708,707,607,619,473,810,937,936,756,680,679,678,677,676,675,674,356,1015,1014,1013,1012,975,974,995,993,910,909,880,875,874,873,864,842,671,479,478,1022,1021,1099,819,818,817,816,1003,1001,999,997,900,899,898,897,894,893,888,887,886,885,943,942,941,940,884,883,882,881,1067,1066,1057,1047,1045,1043,370,571,570,569,513,378,377,324,323,322,321,320,319,318,317,316,315,314,313,312,311,310,309,308,307,306,305,304,303,302,301,300,299,298,297,296,295,294,293,292,291,290,289,288,287,286,285,284,283,282,281,280,279,278,277,276,275,274,273,542,541,440,439,438,437,436,435,434,557,550,548,546,66,65,64,63,62,61,60,59,58,57,56,55,54,53,52,51,50,49,48,47,46,45,44,43,42,41,40,39,38,37,36,35,34,33,32,31,30,29,28,27,26,25,24,23,22,21,20,19,18,17,16,15,14,13,12,11,10,9,8,7,6,5,4,809,761,733,717,604,583,573,572,562,532,531,525,493,492,490,482,481,480,464,451,416,415,394,393,392,390,389,386,385,384,383,382,381,380,379,376,375,362,354,328,327,326,272,904,903,560,1032,1031,564,1088,911,694,643,642,612,563,526,524,523,521,520,519,485,469,463,445,444,442,428,427,426,424,423,413,412,411,408,406,405,404,403,402,399,371,367,366,365,364,339,338,337,336,335,334,333,332,331,330,1109,1089,1059,986,985,984,983,982,981,980,979,978,977,976,790,789,788,787,786,785,784,779,778,777,776,754,753,721,720,698,670,668,667,665,664,663,653,568,567,566,565,483,456,455,430,1105,1104,1103,1008,991,990,989,988,931,930,926,924,923,922,921,920,918,917,806,805,719,704,703,702,701,700,699,1090,1011,1010,1009,759,1118,1102,800,1132,1119,1080,775,1133,1131,1134,142,141,140,139,138,137,136,135,134,133,131,130,129,128,127,126,125,124,123,122,121,120,119,118,117,115,114,112,111,110,109,108,107,106,105,104,103,102,101,100,99,98,97,96,95,94,93,92,91,90,89,88,87,86,85,84,83,82,81,80,79,78,77,76,75,72,71,68,67,693,594,593,592,590,574,528,494,934,799,764,763,723,722,625,624,623,621,620,582,581,580,579,603,602,601,600,599,598,597,466,465,417,414,361,359,618,617,615,614,518,500,499,425,343,454,970,829,828,827,824,823,821,770,727,726,696,688,686,655,654,626,470,422,342,634,633,632,631,630,629,628,627,507,484,457,360,357,798,732,731,730,729,728,692,636,588,587,586,585,512,511,510,453,452,758,736,515,508,486,1064,1063,969,716,715,460,459,458,1111,1110,1087,1086,1061,1060,1020,1018,933,932])).
% 14.48/14.41 cnf(2701,plain,
% 14.48/14.41 (~P8(f36(x27011,a32,x27012),f15(x27013,a2),a1)+P8(x27012,f15(f17(f16(x27011,a32,a2),x27013,a2),a2),a1)),
% 14.48/14.41 inference(scs_inference,[],[264,1112])).
% 14.48/14.41 cnf(2702,plain,
% 14.48/14.41 (~P8(f37(x27021,a32,x27022),f15(x27023,a2),a1)+P8(x27022,f15(f17(f16(x27021,a32,a2),x27023,a2),a2),a1)),
% 14.48/14.41 inference(scs_inference,[],[264,1113])).
% 14.48/14.41 cnf(2704,plain,
% 14.48/14.41 (E(x27041,f11(f10(f7(x27042,x27042,a1),x27043,a1),x27041,a1))),
% 14.48/14.41 inference(rename_variables,[],[1292])).
% 14.48/14.41 cnf(2710,plain,
% 14.48/14.41 (P9(x27101,f11(x27101,f4(a1),a1),a1)),
% 14.48/14.41 inference(rename_variables,[],[1701])).
% 14.48/14.41 cnf(2712,plain,
% 14.48/14.41 (P11(f11(f10(f7(x27121,x27121,a1),x27122,a1),f27(a1),a1))),
% 14.48/14.41 inference(scs_inference,[],[1733,1292,2704,1701,1593,2292,2074,544,543,551,116])).
% 14.48/14.41 cnf(2713,plain,
% 14.48/14.41 (E(x27131,f11(f10(f7(x27132,x27132,a1),x27133,a1),x27131,a1))),
% 14.48/14.41 inference(rename_variables,[],[1292])).
% 14.48/14.41 cnf(2719,plain,
% 14.48/14.41 (P8(f3(a1),f10(x27191,x27191,a1),a1)),
% 14.48/14.41 inference(rename_variables,[],[1703])).
% 14.48/14.41 cnf(2727,plain,
% 14.48/14.41 (P9(x27271,f11(x27271,f4(a1),a1),a1)),
% 14.48/14.41 inference(rename_variables,[],[1701])).
% 14.48/14.41 cnf(2730,plain,
% 14.48/14.41 (P9(x27301,f11(x27301,f4(a1),a1),a1)),
% 14.48/14.41 inference(rename_variables,[],[1701])).
% 14.48/14.41 cnf(2731,plain,
% 14.48/14.41 (P9(x27311,f11(x27311,f4(a1),a1),a1)),
% 14.48/14.41 inference(rename_variables,[],[1701])).
% 14.48/14.41 cnf(2733,plain,
% 14.48/14.41 (P9(f10(f5(x27331,a1),f5(x27331,a1),a1),f10(f11(f5(x27331,a1),f4(a1),a1),f11(f5(x27331,a1),f4(a1),a1),a1),a1)),
% 14.48/14.41 inference(scs_inference,[],[167,259,153,251,179,151,1733,1292,2704,1895,2244,1701,2710,2727,2731,1539,1563,1593,1703,1358,2292,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065])).
% 14.48/14.41 cnf(2734,plain,
% 14.48/14.41 (P9(x27341,f11(x27341,f4(a1),a1),a1)),
% 14.48/14.41 inference(rename_variables,[],[1701])).
% 14.48/14.41 cnf(2735,plain,
% 14.48/14.41 (P9(x27351,f11(x27351,f4(a1),a1),a1)),
% 14.48/14.41 inference(rename_variables,[],[1701])).
% 14.48/14.41 cnf(2738,plain,
% 14.48/14.41 (P8(x27381,x27381,a1)),
% 14.48/14.41 inference(rename_variables,[],[243])).
% 14.48/14.41 cnf(2741,plain,
% 14.48/14.41 (~P9(x27411,x27411,a1)),
% 14.48/14.41 inference(rename_variables,[],[265])).
% 14.48/14.41 cnf(2744,plain,
% 14.48/14.41 (P8(x27441,x27441,a1)),
% 14.48/14.41 inference(rename_variables,[],[243])).
% 14.48/14.41 cnf(2745,plain,
% 14.48/14.41 (P8(x27451,f14(f11(f10(x27451,x27451,a1),f10(x27452,x27452,a1),a1)),a1)),
% 14.48/14.41 inference(rename_variables,[],[261])).
% 14.48/14.41 cnf(2748,plain,
% 14.48/14.41 (P8(x27481,x27481,a1)),
% 14.48/14.41 inference(rename_variables,[],[243])).
% 14.48/14.41 cnf(2749,plain,
% 14.48/14.41 (P8(x27491,f14(f11(f10(x27491,x27491,a1),f10(x27492,x27492,a1),a1)),a1)),
% 14.48/14.41 inference(rename_variables,[],[261])).
% 14.48/14.41 cnf(2752,plain,
% 14.48/14.41 (~P9(f10(f9(x27521,f34(x27522,x27523),a1),f34(x27522,x27523),a1),x27521,a1)),
% 14.48/14.41 inference(rename_variables,[],[1347])).
% 14.48/14.41 cnf(2753,plain,
% 14.48/14.41 (P9(x27531,f11(x27531,f4(a1),a1),a1)),
% 14.48/14.41 inference(rename_variables,[],[1701])).
% 14.48/14.41 cnf(2755,plain,
% 14.48/14.41 (P8(x27551,x27551,f11(f10(f7(x27552,x27552,a1),x27553,a1),a1,a1))),
% 14.48/14.41 inference(scs_inference,[],[167,259,243,2738,2744,265,153,261,2745,251,190,179,151,144,143,1733,1292,2704,1895,2244,2101,1347,1701,2710,2727,2731,2735,1539,1563,1593,2146,1703,1358,2292,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369])).
% 14.48/14.41 cnf(2757,plain,
% 14.48/14.41 (P8(x27571,x27571,f27(a1))),
% 14.48/14.41 inference(scs_inference,[],[167,259,243,2738,2744,265,153,261,2745,251,190,179,151,144,143,1733,1292,2704,1895,2244,2101,1347,1701,2710,2727,2731,2735,1539,1563,1571,1593,2146,1703,1358,2292,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368])).
% 14.48/14.41 cnf(2759,plain,
% 14.48/14.41 (P8(x27591,f5(x27591,f11(f10(f7(x27592,x27592,a1),x27593,a1),a1,a1)),f11(f10(f7(x27592,x27592,a1),x27593,a1),a1,a1))),
% 14.48/14.41 inference(scs_inference,[],[167,259,243,2738,2744,265,153,261,2745,251,190,179,151,144,143,1733,1292,2704,1895,2244,2101,2126,1347,1701,2710,2727,2731,2735,1539,1563,1571,1593,2146,1703,1358,2292,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432])).
% 14.48/14.41 cnf(2767,plain,
% 14.48/14.41 (P9(x27671,f11(x27671,f4(a1),a1),a1)),
% 14.48/14.41 inference(rename_variables,[],[1701])).
% 14.48/14.41 cnf(2772,plain,
% 14.48/14.41 (~P9(x27721,f10(f9(x27721,f34(x27722,x27723),a1),f34(x27722,x27723),a1),a1)),
% 14.48/14.41 inference(rename_variables,[],[1344])).
% 14.48/14.41 cnf(2773,plain,
% 14.48/14.41 (P8(x27731,x27731,a1)),
% 14.48/14.41 inference(rename_variables,[],[243])).
% 14.48/14.41 cnf(2776,plain,
% 14.48/14.41 (~P9(x27761,f10(f9(x27761,f34(x27762,x27763),a1),f34(x27762,x27763),a1),a1)),
% 14.48/14.41 inference(rename_variables,[],[1344])).
% 14.48/14.41 cnf(2777,plain,
% 14.48/14.41 (P8(x27771,x27771,a1)),
% 14.48/14.41 inference(rename_variables,[],[243])).
% 14.48/14.41 cnf(2778,plain,
% 14.48/14.41 (P8(x27781,x27781,a1)),
% 14.48/14.41 inference(rename_variables,[],[243])).
% 14.48/14.41 cnf(2780,plain,
% 14.48/14.41 (~P8(f5(f11(a29,f15(a30,a2),a1),a1),f10(f4(a1),f15(f17(f16(a31,a32,a2),a33,a2),a2),a1),a1)),
% 14.48/14.41 inference(scs_inference,[],[269,167,259,243,2738,2744,2748,2773,265,153,261,2745,251,190,179,151,247,144,143,1733,1292,2704,1895,2244,2101,2120,2126,1344,2772,1347,1397,1701,2710,2727,2731,2735,2753,1174,1539,1563,1571,1593,2146,1703,1358,2292,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577])).
% 14.48/14.41 cnf(2785,plain,
% 14.48/14.41 (P8(x27851,x27851,a1)),
% 14.48/14.41 inference(rename_variables,[],[243])).
% 14.48/14.41 cnf(2787,plain,
% 14.48/14.41 (~P10(f10(f10(f4(a1),f3(a1),a1),x27871,a1),f10(f4(a1),f4(a1),a1),a1)),
% 14.48/14.41 inference(scs_inference,[],[269,167,259,243,2738,2744,2748,2773,2778,265,153,261,2745,251,190,154,179,151,247,144,143,2194,1733,1292,2704,1895,2244,2101,2120,2126,1344,2772,1347,1397,1342,1701,2710,2727,2731,2735,2753,1174,1539,1563,1571,1593,2146,1315,1703,1358,2292,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764])).
% 14.48/14.41 cnf(2789,plain,
% 14.48/14.41 (P10(x27891,f10(x27892,f10(x27891,x27893,a1),a1),a1)),
% 14.48/14.41 inference(scs_inference,[],[269,167,259,243,2738,2744,2748,2773,2778,265,153,261,2745,251,190,154,179,151,247,144,143,2194,1733,1292,2704,1895,2244,2101,2120,2126,1483,1344,2772,1347,1397,1342,1701,2710,2727,2731,2735,2753,1174,1539,1563,1571,1593,2146,1315,1703,1358,2292,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722])).
% 14.48/14.41 cnf(2797,plain,
% 14.48/14.41 (P10(f13(x27971,a1),f10(x27971,x27972,a1),a1)),
% 14.48/14.41 inference(scs_inference,[],[269,167,259,243,2738,2744,2748,2773,2778,265,153,268,261,2745,251,163,190,154,179,151,247,144,143,2194,1733,1292,2704,1895,2244,2101,2120,2126,1483,1344,2772,1347,1397,1342,1701,2710,2727,2731,2735,2753,1174,1539,1563,1571,1593,2146,1315,1703,1358,2292,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581])).
% 14.48/14.41 cnf(2805,plain,
% 14.48/14.41 (~E(f11(x28051,f16(a31,a32,a2),a2),f11(x28051,f3(f27(a2)),a2))),
% 14.48/14.41 inference(scs_inference,[],[269,167,226,264,259,243,2738,2744,2748,2773,2778,265,153,175,209,224,266,268,261,2745,251,163,190,154,179,151,247,144,143,2194,1733,1292,2704,1895,2244,2101,2120,2126,1483,1344,2772,1347,1397,1342,1701,2710,2727,2731,2735,2753,1174,1539,1563,1571,1593,2146,1315,1703,1358,2292,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599])).
% 14.48/14.41 cnf(2813,plain,
% 14.48/14.41 (~E(f13(f3(f27(a2)),a2),f13(a32,a2))),
% 14.48/14.41 inference(scs_inference,[],[269,167,226,264,259,243,2738,2744,2748,2773,2778,265,145,153,175,209,224,266,268,261,2745,251,161,158,163,190,154,179,151,247,144,143,2194,1733,1292,2704,1895,2244,2097,2101,2104,2120,2126,1483,1344,2772,1347,1397,1342,1701,2710,2727,2731,2735,2753,1174,1539,1563,1571,1593,2146,1315,1703,1358,2292,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599,598,414,361,359])).
% 14.48/14.41 cnf(2824,plain,
% 14.48/14.41 (~P8(f11(f34(x28241,x28242),f11(x28243,f3(a1),a1),a1),x28243,a1)),
% 14.48/14.41 inference(rename_variables,[],[1391])).
% 14.48/14.41 cnf(2826,plain,
% 14.48/14.41 (P9(f13(f11(f13(x28261,a1),f4(a1),a1),a1),x28261,a1)),
% 14.48/14.41 inference(scs_inference,[],[269,167,226,264,259,243,2738,2744,2748,2773,2778,265,145,153,175,209,224,266,268,261,2745,222,251,161,158,163,190,187,159,154,179,151,247,144,143,2194,1733,1292,2704,2326,1895,2244,2097,2101,2104,2120,2126,1483,1344,2772,1347,1397,1391,1342,1701,2710,2727,2731,2735,2753,2767,1174,1539,1563,1571,1581,1593,1597,2146,1315,1703,1358,2292,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599,598,414,361,359,617,518,499,823,822,691])).
% 14.48/14.41 cnf(2827,plain,
% 14.48/14.41 (P9(x28271,f11(x28271,f4(a1),a1),a1)),
% 14.48/14.41 inference(rename_variables,[],[1701])).
% 14.48/14.41 cnf(2831,plain,
% 14.48/14.41 (~P8(x28311,f13(f11(f34(x28312,x28313),f13(x28311,a1),a1),a1),a1)),
% 14.48/14.41 inference(scs_inference,[],[269,167,226,264,259,243,2738,2744,2748,2773,2778,265,145,153,175,209,224,266,268,261,2745,222,251,161,158,163,190,187,159,154,150,179,151,247,144,143,2194,1733,1292,2704,2326,1895,2244,2097,2101,2104,2120,2126,1483,1388,1344,2772,1347,1397,1391,1342,1701,2710,2727,2731,2735,2753,2767,1174,1539,1563,1571,1581,1593,1597,2146,2246,1315,1703,1358,2292,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599,598,414,361,359,617,518,499,823,822,691,686,683])).
% 14.48/14.41 cnf(2832,plain,
% 14.48/14.41 (~P8(f11(f34(x28321,x28322),x28323,a1),x28323,a1)),
% 14.48/14.41 inference(rename_variables,[],[1388])).
% 14.48/14.41 cnf(2836,plain,
% 14.48/14.41 (P8(f13(f11(f10(x28361,x28361,f27(a1)),f10(x28362,x28362,f27(a1)),f27(a1)),f27(a1)),f3(f27(a1)),f27(a1))),
% 14.48/14.41 inference(scs_inference,[],[269,167,226,264,259,243,2738,2744,2748,2773,2778,265,145,153,175,209,224,266,268,261,2745,222,251,161,158,163,190,187,159,154,150,179,151,247,144,143,2194,1733,1292,2704,2326,1895,2244,2097,2101,2104,2120,2126,1483,1388,1344,2772,1347,1397,1391,1342,1701,2710,2727,2731,2735,2753,2767,1174,1539,1563,1571,1581,1585,1593,1597,2146,2246,1315,1703,1358,2292,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599,598,414,361,359,617,518,499,823,822,691,686,683,661,633])).
% 14.48/14.41 cnf(2855,plain,
% 14.48/14.41 (~E(f11(x28551,f4(a1),a1),x28551)),
% 14.48/14.41 inference(rename_variables,[],[1294])).
% 14.48/14.41 cnf(2860,plain,
% 14.48/14.41 (P9(x28601,f11(x28602,f11(f5(f7(x28601,x28602,a1),a1),f4(a1),a1),a1),a1)),
% 14.48/14.41 inference(scs_inference,[],[269,167,226,264,259,243,2738,2744,2748,2773,2778,265,145,153,175,209,224,266,268,261,2745,222,251,161,158,147,163,190,160,187,176,159,154,150,179,151,247,144,143,2194,1733,1292,2704,2326,1819,1294,2055,1895,2244,2097,2101,2104,2120,2126,1483,1388,1344,2772,1347,1397,1391,1342,1701,2710,2727,2731,2735,2753,2767,2827,1174,1539,1563,1571,1581,1585,1593,1597,2146,2246,1315,1703,1358,2292,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599,598,414,361,359,617,518,499,823,822,691,686,683,661,633,484,360,798,791,636,588,510,452,398,487,1063])).
% 14.48/14.41 cnf(2862,plain,
% 14.48/14.41 (~P8(f11(f11(f34(x28621,x28622),f11(x28623,f5(x28624,a1),a1),a1),x28624,a1),x28623,a1)),
% 14.48/14.41 inference(scs_inference,[],[269,167,226,264,259,243,2738,2744,2748,2773,2778,265,145,153,175,209,224,266,268,261,2745,222,251,161,158,169,147,163,190,160,187,176,159,154,150,179,151,247,144,143,2194,1733,1292,2704,2326,1819,1294,2055,1895,2244,2097,2101,2104,2120,2126,1483,1388,2832,1344,2772,1347,1397,1391,1342,1701,2710,2727,2731,2735,2753,2767,2827,1174,1539,1563,1571,1581,1585,1593,1597,2146,2246,1315,1703,1358,2292,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599,598,414,361,359,617,518,499,823,822,691,686,683,661,633,484,360,798,791,636,588,510,452,398,487,1063,969])).
% 14.48/14.41 cnf(2868,plain,
% 14.48/14.41 (P9(f9(f11(f3(a1),f11(f4(a1),f5(x28681,a1),a1),a1),f11(f4(a1),f4(a1),a1),a1),f11(f4(a1),f5(x28681,a1),a1),a1)),
% 14.48/14.41 inference(scs_inference,[],[269,167,226,264,259,243,2738,2744,2748,2773,2778,265,145,153,175,209,224,266,268,261,2745,222,251,161,158,169,147,163,190,160,187,176,159,154,150,179,151,247,144,143,2194,1733,1292,2704,2326,1819,1294,2855,2055,1895,2244,2097,2101,2104,2120,2126,1483,1388,2832,1344,2772,1347,1397,1391,1342,1701,2710,2727,2731,2735,2753,2767,2827,1174,1539,1563,1571,1581,1585,1593,1597,2146,2246,1315,1703,1358,2292,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599,598,414,361,359,617,518,499,823,822,691,686,683,661,633,484,360,798,791,636,588,510,452,398,487,1063,969,1111,1110,1087])).
% 14.48/14.41 cnf(2881,plain,
% 14.48/14.41 (P9(f11(x28811,f3(a1),a1),f11(x28811,f34(x28812,x28813),a1),a1)),
% 14.48/14.41 inference(rename_variables,[],[2232])).
% 14.48/14.41 cnf(2885,plain,
% 14.48/14.41 (P10(x28851,f11(x28851,x28851,a1),a1)),
% 14.48/14.41 inference(scs_inference,[],[269,167,226,264,259,243,2738,2744,2748,2773,2778,265,145,153,175,209,224,266,268,261,2745,222,183,251,161,158,169,147,163,190,160,199,187,176,159,154,150,179,151,247,144,143,2194,1733,1292,2704,2326,1819,1294,2855,2055,2188,1895,2244,1481,2097,2101,2104,2120,2126,1483,1388,2832,1344,2772,1347,1397,1391,1342,1701,2710,2727,2731,2735,2753,2767,2827,2734,2232,1174,1539,1563,1571,1581,1585,1593,1597,2146,2246,1315,1703,1358,2292,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599,598,414,361,359,617,518,499,823,822,691,686,683,661,633,484,360,798,791,636,588,510,452,398,487,1063,969,1111,1110,1087,1018,1017,1016,802,1127,1123,1106,804])).
% 14.48/14.41 cnf(2887,plain,
% 14.48/14.41 (P10(x28871,f7(x28871,x28871,a1),a1)),
% 14.48/14.41 inference(scs_inference,[],[269,167,226,264,259,243,2738,2744,2748,2773,2778,265,145,153,175,209,224,266,268,261,2745,222,183,251,161,158,169,147,163,190,160,199,187,176,159,154,150,179,151,247,144,143,2194,1733,1292,2704,2326,1819,1294,2855,2055,2188,1895,2244,1481,2097,2101,2104,2120,2126,1483,1388,2832,1344,2772,1347,1397,1391,1342,1701,2710,2727,2731,2735,2753,2767,2827,2734,2232,1174,1539,1563,1571,1581,1585,1593,1597,2146,2246,1315,1703,1358,2292,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599,598,414,361,359,617,518,499,823,822,691,686,683,661,633,484,360,798,791,636,588,510,452,398,487,1063,969,1111,1110,1087,1018,1017,1016,802,1127,1123,1106,804,803])).
% 14.48/14.41 cnf(2891,plain,
% 14.48/14.41 (~E(f8(f3(f27(a2)),a2),f8(a32,a2))),
% 14.48/14.41 inference(scs_inference,[],[269,167,226,264,259,243,2738,2744,2748,2773,2778,265,145,153,175,209,224,266,268,261,2745,222,183,251,161,158,169,170,147,163,190,160,199,187,177,176,159,154,150,179,151,247,144,143,2194,1733,1292,2704,2326,1819,1294,2855,2055,2188,1895,2244,1481,2097,2101,2104,2120,2126,1483,1388,2832,1344,2772,1347,1397,1391,1342,1701,2710,2727,2731,2735,2753,2767,2827,2734,2232,1174,1539,1563,1571,1581,1585,1593,1597,2146,2246,1315,1703,1358,2292,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599,598,414,361,359,617,518,499,823,822,691,686,683,661,633,484,360,798,791,636,588,510,452,398,487,1063,969,1111,1110,1087,1018,1017,1016,802,1127,1123,1106,804,803,619,363])).
% 14.48/14.41 cnf(2894,plain,
% 14.48/14.41 (P8(x28941,x28941,a1)),
% 14.48/14.41 inference(rename_variables,[],[243])).
% 14.48/14.41 cnf(2897,plain,
% 14.48/14.41 (~P9(f10(x28971,x28971,a1),f3(a1),a1)),
% 14.48/14.41 inference(rename_variables,[],[1697])).
% 14.48/14.41 cnf(2900,plain,
% 14.48/14.41 (~P9(f10(x29001,x29001,a1),f3(a1),a1)),
% 14.48/14.41 inference(rename_variables,[],[1697])).
% 14.48/14.41 cnf(2902,plain,
% 14.48/14.41 (~E(f7(x29021,x29021,a1),f7(f3(a1),f11(f4(a1),f5(x29022,a1),a1),a1))),
% 14.48/14.41 inference(scs_inference,[],[269,167,226,264,259,243,2738,2744,2748,2773,2778,2785,265,2741,145,153,175,209,224,266,268,261,2745,222,183,251,161,158,169,170,147,163,190,160,199,267,187,177,176,152,159,154,150,179,151,247,263,144,143,2194,1733,1292,2704,2326,1819,1294,2855,2055,2188,1895,2244,1481,2097,2101,2104,2120,2126,1483,1388,2832,1344,2772,1347,1397,1391,1342,1701,2710,2727,2731,2735,2753,2767,2827,2734,2232,1174,1539,1563,1571,1581,1585,1593,1597,2146,2246,1315,1697,2897,1703,1358,2292,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599,598,414,361,359,617,518,499,823,822,691,686,683,661,633,484,360,798,791,636,588,510,452,398,487,1063,969,1111,1110,1087,1018,1017,1016,802,1127,1123,1106,804,803,619,363,968,1007,1006,768])).
% 14.48/14.41 cnf(2909,plain,
% 14.48/14.41 (P8(x29091,x29091,a1)),
% 14.48/14.41 inference(rename_variables,[],[243])).
% 14.48/14.41 cnf(2912,plain,
% 14.48/14.41 (P8(x29121,x29121,a1)),
% 14.48/14.41 inference(rename_variables,[],[243])).
% 14.48/14.41 cnf(2916,plain,
% 14.48/14.41 (P10(x29161,f10(f10(f11(f13(f4(a1),a1),f11(f3(a2),f3(a1),a1),a1),x29161,a2),x29162,a2),a2)),
% 14.48/14.41 inference(scs_inference,[],[269,167,226,264,259,243,2738,2744,2748,2773,2778,2785,2894,2909,265,2741,145,153,175,209,224,266,268,261,2745,222,183,251,161,178,158,169,170,147,163,190,160,199,267,187,177,176,152,159,154,150,146,179,151,247,263,144,143,2194,1733,1292,2704,2326,1819,1294,2855,2055,2188,1895,2244,1481,2097,2101,2104,2120,2126,1483,1388,2832,1344,2772,1347,1397,2160,1391,1342,1701,2710,2727,2731,2735,2753,2767,2827,2734,2232,1174,1539,1563,1571,1581,1585,1593,1597,2146,2246,1315,1697,2897,1703,1358,2292,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599,598,414,361,359,617,518,499,823,822,691,686,683,661,633,484,360,798,791,636,588,510,452,398,487,1063,969,1111,1110,1087,1018,1017,1016,802,1127,1123,1106,804,803,619,363,968,1007,1006,768,767,765,651,648,611,974])).
% 14.48/14.41 cnf(2922,plain,
% 14.48/14.41 (~P8(f3(a1),f9(f4(a1),f10(f34(x29221,x29222),f13(f34(x29221,x29222),a1),a1),a1),a1)),
% 14.48/14.41 inference(scs_inference,[],[269,167,226,264,259,243,2738,2744,2748,2773,2778,2785,2894,2909,2912,265,2741,145,153,175,209,224,266,268,261,2745,222,183,251,161,205,178,158,169,170,147,163,190,160,199,267,187,177,176,152,159,154,150,146,179,151,247,263,144,143,2194,1733,1292,2704,2326,1819,1294,2855,2055,2188,1895,2244,1481,2097,2101,2104,2120,2126,1483,1388,2832,1344,2772,1347,1397,2160,1391,1342,1701,2710,2727,2731,2735,2753,2767,2827,2734,2232,1174,1539,1563,1571,1581,1585,1593,1597,2146,2246,1315,1697,2897,1703,1358,2292,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599,598,414,361,359,617,518,499,823,822,691,686,683,661,633,484,360,798,791,636,588,510,452,398,487,1063,969,1111,1110,1087,1018,1017,1016,802,1127,1123,1106,804,803,619,363,968,1007,1006,768,767,765,651,648,611,974,958,955,814])).
% 14.48/14.41 cnf(2925,plain,
% 14.48/14.41 (P8(f3(a1),f10(x29251,x29251,a1),a1)),
% 14.48/14.41 inference(rename_variables,[],[1703])).
% 14.48/14.41 cnf(2928,plain,
% 14.48/14.41 (P8(f3(a1),f10(x29281,x29281,a1),a1)),
% 14.48/14.41 inference(rename_variables,[],[1703])).
% 14.48/14.41 cnf(2933,plain,
% 14.48/14.41 (P9(x29331,f11(x29331,f4(a1),a1),a1)),
% 14.48/14.41 inference(rename_variables,[],[1701])).
% 14.48/14.41 cnf(2934,plain,
% 14.48/14.41 (~P9(f10(x29341,x29341,a1),f3(a1),a1)),
% 14.48/14.41 inference(rename_variables,[],[1697])).
% 14.48/14.41 cnf(2937,plain,
% 14.48/14.41 (P8(x29371,f14(f11(f10(x29371,x29371,a1),f10(x29372,x29372,a1),a1)),a1)),
% 14.48/14.41 inference(rename_variables,[],[261])).
% 14.48/14.41 cnf(2938,plain,
% 14.48/14.41 (P8(x29381,x29381,a1)),
% 14.48/14.41 inference(rename_variables,[],[243])).
% 14.48/14.41 cnf(2941,plain,
% 14.48/14.41 (P8(x29411,x29411,a1)),
% 14.48/14.41 inference(rename_variables,[],[243])).
% 14.48/14.41 cnf(2943,plain,
% 14.48/14.41 (P9(f4(a1),f10(f11(f4(a1),f4(a1),a1),f11(f4(a1),f4(a1),a1),a1),a1)),
% 14.48/14.41 inference(scs_inference,[],[269,167,226,264,259,243,2738,2744,2748,2773,2778,2785,2894,2909,2912,2938,265,2741,145,153,175,209,224,266,268,261,2745,2749,262,222,183,251,161,205,206,178,158,169,170,147,163,190,193,160,199,267,187,177,176,152,159,154,150,146,179,151,247,263,144,143,2194,1220,1733,1292,2704,2326,1819,1294,2855,2055,2188,1895,2244,1481,2097,2101,2104,2120,2126,1483,1388,2832,1344,2772,1347,1397,2160,1391,1342,1701,2710,2727,2731,2735,2753,2767,2827,2734,2730,2933,2232,1174,1539,1563,1571,1581,1585,1593,1597,2146,2246,1315,1697,2897,2900,1703,2719,2925,1358,1360,1424,2292,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599,598,414,361,359,617,518,499,823,822,691,686,683,661,633,484,360,798,791,636,588,510,452,398,487,1063,969,1111,1110,1087,1018,1017,1016,802,1127,1123,1106,804,803,619,363,968,1007,1006,768,767,765,651,648,611,974,958,955,814,875,874,873,862,856,853,846])).
% 14.48/14.41 cnf(2944,plain,
% 14.48/14.41 (P9(x29441,f11(x29441,f4(a1),a1),a1)),
% 14.48/14.41 inference(rename_variables,[],[1701])).
% 14.48/14.41 cnf(2967,plain,
% 14.48/14.41 (P9(x29671,f10(f11(f9(x29671,f11(f4(a1),f5(x29672,a1),a1),a1),f4(a1),a1),f11(f4(a1),f5(x29672,a1),a1),a1),a1)),
% 14.48/14.41 inference(scs_inference,[],[269,167,226,264,259,243,2738,2744,2748,2773,2778,2785,2894,2909,2912,2938,2941,265,2741,145,153,175,209,224,266,268,261,2745,2749,262,222,183,251,161,205,206,178,158,169,170,147,163,190,193,160,199,267,187,177,176,152,159,154,150,146,179,151,247,263,144,143,2194,1220,1733,1292,2704,2326,1819,1294,2855,2055,2188,1895,2244,1481,2097,2101,2104,2120,2126,1257,1483,1296,1388,2832,1344,2772,1347,1397,2160,1391,1342,1701,2710,2727,2731,2735,2753,2767,2827,2734,2730,2933,2944,2232,1174,1539,1563,1571,1581,1585,1593,1597,1775,2146,2246,1315,1697,2897,2900,1703,2719,2925,1358,1360,1424,2292,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599,598,414,361,359,617,518,499,823,822,691,686,683,661,633,484,360,798,791,636,588,510,452,398,487,1063,969,1111,1110,1087,1018,1017,1016,802,1127,1123,1106,804,803,619,363,968,1007,1006,768,767,765,651,648,611,974,958,955,814,875,874,873,862,856,853,846,671,762,1027,1026,718,1115,1029,967,966,1003,999])).
% 14.48/14.41 cnf(2968,plain,
% 14.48/14.41 (P9(x29681,f11(x29681,f4(a1),a1),a1)),
% 14.48/14.41 inference(rename_variables,[],[1701])).
% 14.48/14.41 cnf(2970,plain,
% 14.48/14.41 (P8(x29701,f10(f9(x29701,f11(f4(a1),f5(x29702,a1),a1),a1),f11(f4(a1),f5(x29702,a1),a1),a1),a1)),
% 14.48/14.41 inference(scs_inference,[],[269,167,226,264,259,243,2738,2744,2748,2773,2778,2785,2894,2909,2912,2938,2941,2777,265,2741,145,153,175,209,224,266,268,261,2745,2749,262,222,183,251,161,205,206,178,158,169,170,147,163,190,193,160,199,267,187,177,176,152,159,154,150,146,179,151,247,263,144,143,2194,1220,1733,1292,2704,2326,1819,1294,2855,2055,2188,1895,2244,1481,2097,2101,2104,2120,2126,1257,1483,1296,1388,2832,1344,2772,1347,1397,2160,1391,1342,1701,2710,2727,2731,2735,2753,2767,2827,2734,2730,2933,2944,2232,1174,1539,1563,1571,1581,1585,1593,1597,1775,2146,2246,1315,1697,2897,2900,1703,2719,2925,1358,1360,1424,2292,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599,598,414,361,359,617,518,499,823,822,691,686,683,661,633,484,360,798,791,636,588,510,452,398,487,1063,969,1111,1110,1087,1018,1017,1016,802,1127,1123,1106,804,803,619,363,968,1007,1006,768,767,765,651,648,611,974,958,955,814,875,874,873,862,856,853,846,671,762,1027,1026,718,1115,1029,967,966,1003,999,997])).
% 14.48/14.41 cnf(2977,plain,
% 14.48/14.41 (~P9(f9(x29771,f10(f3(a1),f3(a1),a1),a1),f3(a1),a1)),
% 14.48/14.41 inference(scs_inference,[],[269,167,226,264,259,243,2738,2744,2748,2773,2778,2785,2894,2909,2912,2938,2941,2777,265,2741,145,153,175,209,224,266,268,261,2745,2749,262,222,183,251,161,205,206,178,158,169,170,147,163,190,193,160,199,267,187,177,176,152,159,154,150,146,179,151,247,263,144,143,2194,1220,1733,1292,2704,2326,1819,1294,2855,2055,2188,1895,2244,1481,2097,2101,2104,2120,2126,1257,1483,1296,1388,2832,1344,2772,1347,1397,2160,1391,1342,1701,2710,2727,2731,2735,2753,2767,2827,2734,2730,2933,2944,2232,1174,1539,1563,1571,1581,1585,1593,1597,1775,2146,2246,1315,1697,2897,2900,2934,1703,2719,2925,1358,1360,1424,2292,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599,598,414,361,359,617,518,499,823,822,691,686,683,661,633,484,360,798,791,636,588,510,452,398,487,1063,969,1111,1110,1087,1018,1017,1016,802,1127,1123,1106,804,803,619,363,968,1007,1006,768,767,765,651,648,611,974,958,955,814,875,874,873,862,856,853,846,671,762,1027,1026,718,1115,1029,967,966,1003,999,997,900,899,897])).
% 14.48/14.41 cnf(2978,plain,
% 14.48/14.41 (~P9(f10(x29781,x29781,a1),f3(a1),a1)),
% 14.48/14.41 inference(rename_variables,[],[1697])).
% 14.48/14.41 cnf(2980,plain,
% 14.48/14.41 (P8(f9(f3(a1),f3(a1),a1),f3(a1),a1)),
% 14.48/14.41 inference(scs_inference,[],[269,167,226,264,259,243,2738,2744,2748,2773,2778,2785,2894,2909,2912,2938,2941,2777,265,2741,145,153,175,209,224,266,268,261,2745,2749,262,222,183,251,161,205,206,178,158,169,170,147,163,190,193,160,199,267,187,177,176,152,159,154,150,146,179,151,247,263,144,143,2194,1220,1733,1292,2704,2326,1819,1294,2855,2055,2188,1895,2244,1481,2097,2101,2104,2120,2126,1257,1483,1296,1388,2832,1344,2772,1347,1397,2160,1391,1342,1701,2710,2727,2731,2735,2753,2767,2827,2734,2730,2933,2944,2232,1174,1539,1563,1571,1581,1585,1593,1597,1775,2146,2246,1315,1697,2897,2900,2934,1703,2719,2925,1358,1360,1424,2292,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599,598,414,361,359,617,518,499,823,822,691,686,683,661,633,484,360,798,791,636,588,510,452,398,487,1063,969,1111,1110,1087,1018,1017,1016,802,1127,1123,1106,804,803,619,363,968,1007,1006,768,767,765,651,648,611,974,958,955,814,875,874,873,862,856,853,846,671,762,1027,1026,718,1115,1029,967,966,1003,999,997,900,899,897,870])).
% 14.48/14.41 cnf(2981,plain,
% 14.48/14.41 (P8(x29811,x29811,a1)),
% 14.48/14.41 inference(rename_variables,[],[243])).
% 14.48/14.41 cnf(2984,plain,
% 14.48/14.41 (P8(x29841,f14(f11(f10(x29841,x29841,a1),f10(x29842,x29842,a1),a1)),a1)),
% 14.48/14.41 inference(rename_variables,[],[261])).
% 14.48/14.41 cnf(2985,plain,
% 14.48/14.41 (P8(x29851,x29851,a1)),
% 14.48/14.41 inference(rename_variables,[],[243])).
% 14.48/14.41 cnf(2989,plain,
% 14.48/14.41 (~P8(f9(x29891,f3(a1),a1),f10(f34(x29892,x29893),f13(f34(x29892,x29893),a1),a1),a1)),
% 14.48/14.41 inference(scs_inference,[],[269,167,226,264,259,243,2738,2744,2748,2773,2778,2785,2894,2909,2912,2938,2941,2981,2777,265,2741,145,153,175,209,224,266,268,261,2745,2749,2937,262,222,183,251,161,184,205,206,178,158,169,202,170,147,163,190,193,160,199,267,187,177,176,152,159,154,150,146,179,151,247,263,144,143,2194,1220,1733,1292,2704,2326,1819,1294,2855,2055,2188,1895,2244,1481,2097,2101,2104,2120,2126,1257,1483,1296,1388,2832,1344,2772,1347,1397,2160,1391,1342,1701,2710,2727,2731,2735,2753,2767,2827,2734,2730,2933,2944,2232,1174,1539,1563,1571,1581,1585,1593,1597,1775,2146,2246,1315,1697,2897,2900,2934,1703,2719,2925,1358,1360,1424,2292,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599,598,414,361,359,617,518,499,823,822,691,686,683,661,633,484,360,798,791,636,588,510,452,398,487,1063,969,1111,1110,1087,1018,1017,1016,802,1127,1123,1106,804,803,619,363,968,1007,1006,768,767,765,651,648,611,974,958,955,814,875,874,873,862,856,853,846,671,762,1027,1026,718,1115,1029,967,966,1003,999,997,900,899,897,870,869,1120,942])).
% 14.48/14.41 cnf(2991,plain,
% 14.48/14.41 (~P9(x29911,x29911,a1)),
% 14.48/14.41 inference(rename_variables,[],[265])).
% 14.48/14.41 cnf(2994,plain,
% 14.48/14.41 (~P9(x29941,x29941,a1)),
% 14.48/14.41 inference(rename_variables,[],[265])).
% 14.48/14.41 cnf(2995,plain,
% 14.48/14.41 (~P8(f11(f34(x29951,x29952),f11(x29953,f3(a1),a1),a1),x29953,a1)),
% 14.48/14.41 inference(rename_variables,[],[1391])).
% 14.48/14.41 cnf(2998,plain,
% 14.48/14.41 (P8(x29981,x29981,a1)),
% 14.48/14.41 inference(rename_variables,[],[243])).
% 14.48/14.41 cnf(2999,plain,
% 14.48/14.41 (~P9(x29991,x29991,a1)),
% 14.48/14.41 inference(rename_variables,[],[265])).
% 14.48/14.41 cnf(3003,plain,
% 14.48/14.41 (~P8(f11(f11(f3(a1),f11(f34(x30031,x30032),x30033,a1),a1),f3(a1),a1),x30033,a1)),
% 14.48/14.41 inference(scs_inference,[],[269,167,226,264,259,243,2738,2744,2748,2773,2778,2785,2894,2909,2912,2938,2941,2981,2985,2777,265,2741,2991,2994,145,153,175,209,224,266,268,261,2745,2749,2937,262,222,183,251,161,184,205,206,178,158,169,202,170,147,163,190,193,160,199,267,187,177,176,152,159,154,150,146,179,151,247,263,144,143,1695,2206,2194,1220,1733,1292,2704,2326,1819,1294,2855,2055,2188,1895,2244,1481,2097,2101,2104,2120,2126,1257,1483,1296,1388,2832,1344,2772,1347,1397,2160,1391,2824,1394,1342,1701,2710,2727,2731,2735,2753,2767,2827,2734,2730,2933,2944,2232,1174,1539,1563,1571,1581,1585,1593,1597,1775,2146,2246,1315,1697,2897,2900,2934,1703,2719,2925,1358,1360,1424,2292,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599,598,414,361,359,617,518,499,823,822,691,686,683,661,633,484,360,798,791,636,588,510,452,398,487,1063,969,1111,1110,1087,1018,1017,1016,802,1127,1123,1106,804,803,619,363,968,1007,1006,768,767,765,651,648,611,974,958,955,814,875,874,873,862,856,853,846,671,762,1027,1026,718,1115,1029,967,966,1003,999,997,900,899,897,870,869,1120,942,881,1043,471,809])).
% 14.48/14.41 cnf(3004,plain,
% 14.48/14.41 (~P8(f11(f34(x30041,x30042),f11(f11(f3(a1),x30043,a1),f3(a1),a1),a1),x30043,a1)),
% 14.48/14.41 inference(rename_variables,[],[1394])).
% 14.48/14.41 cnf(3008,plain,
% 14.48/14.41 (~P8(f11(f4(a1),f5(x30081,a1),a1),f3(a1),a1)),
% 14.48/14.41 inference(scs_inference,[],[269,167,226,264,259,243,2738,2744,2748,2773,2778,2785,2894,2909,2912,2938,2941,2981,2985,2777,265,2741,2991,2994,145,153,175,209,224,266,268,261,2745,2749,2937,262,222,183,251,161,184,205,206,178,158,169,202,170,147,163,190,193,156,160,199,267,187,177,176,152,159,154,150,146,179,151,247,263,144,143,1695,2206,2194,1220,1733,1292,2704,2326,1819,1294,2855,2055,2188,1895,2244,1481,2097,2101,2104,2120,2126,1257,1483,1296,1388,2832,1344,2772,1347,1397,2160,1391,2824,1394,1342,1701,2710,2727,2731,2735,2753,2767,2827,2734,2730,2933,2944,2232,1174,1539,1563,1571,1581,1585,1593,1597,1775,2146,2246,1315,1697,2897,2900,2934,1703,2719,2925,1358,1360,1424,2292,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599,598,414,361,359,617,518,499,823,822,691,686,683,661,633,484,360,798,791,636,588,510,452,398,487,1063,969,1111,1110,1087,1018,1017,1016,802,1127,1123,1106,804,803,619,363,968,1007,1006,768,767,765,651,648,611,974,958,955,814,875,874,873,862,856,853,846,671,762,1027,1026,718,1115,1029,967,966,1003,999,997,900,899,897,870,869,1120,942,881,1043,471,809,561,590])).
% 14.48/14.41 cnf(3010,plain,
% 14.48/14.41 (~P8(f10(f4(a1),f4(a1),a1),f3(a1),a1)),
% 14.48/14.41 inference(scs_inference,[],[269,167,226,264,259,243,2738,2744,2748,2773,2778,2785,2894,2909,2912,2938,2941,2981,2985,2777,265,2741,2991,2994,145,153,175,209,224,266,268,261,2745,2749,2937,262,222,183,251,161,184,205,206,178,158,169,202,170,147,163,190,193,156,160,199,267,187,177,176,152,159,154,150,146,179,151,247,263,144,143,1695,2206,2194,1220,1733,1292,2704,2326,1819,1294,2855,1370,2055,2188,1895,2244,1481,2097,2101,2104,2120,2126,1257,1483,1296,1388,2832,1344,2772,1347,1397,2160,1391,2824,1394,1342,1701,2710,2727,2731,2735,2753,2767,2827,2734,2730,2933,2944,2232,1174,1539,1563,1571,1581,1585,1593,1597,1775,2146,2246,1315,1697,2897,2900,2934,1703,2719,2925,2928,1358,1360,1424,2292,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599,598,414,361,359,617,518,499,823,822,691,686,683,661,633,484,360,798,791,636,588,510,452,398,487,1063,969,1111,1110,1087,1018,1017,1016,802,1127,1123,1106,804,803,619,363,968,1007,1006,768,767,765,651,648,611,974,958,955,814,875,874,873,862,856,853,846,671,762,1027,1026,718,1115,1029,967,966,1003,999,997,900,899,897,870,869,1120,942,881,1043,471,809,561,590,574])).
% 14.48/14.41 cnf(3011,plain,
% 14.48/14.41 (P8(f3(a1),f10(x30111,x30111,a1),a1)),
% 14.48/14.41 inference(rename_variables,[],[1703])).
% 14.48/14.41 cnf(3023,plain,
% 14.48/14.41 (~P9(f11(f10(f7(x30231,x30231,a1),x30232,a1),x30233,a1),x30233,a1)),
% 14.48/14.41 inference(scs_inference,[],[269,167,226,264,259,243,2738,2744,2748,2773,2778,2785,2894,2909,2912,2938,2941,2981,2985,2777,265,2741,2991,2994,145,153,175,209,224,266,268,261,2745,2749,2937,262,222,183,251,161,184,205,206,178,158,169,202,162,170,186,147,163,190,193,156,172,160,199,267,187,177,176,152,159,154,150,146,179,151,247,263,144,143,1695,2206,2194,1220,1733,1292,2704,2326,1819,1294,2855,1370,2055,2188,1895,2244,1481,2097,2101,2104,2120,2126,1257,1483,1296,1388,2832,1344,2772,1347,1397,2160,1391,2824,1394,1342,1701,2710,2727,2731,2735,2753,2767,2827,2734,2730,2933,2944,2232,1270,1174,1539,1563,1571,1581,1585,1593,1597,1775,2146,2246,1315,1697,2897,2900,2934,1703,2719,2925,2928,1358,1360,1424,2292,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599,598,414,361,359,617,518,499,823,822,691,686,683,661,633,484,360,798,791,636,588,510,452,398,487,1063,969,1111,1110,1087,1018,1017,1016,802,1127,1123,1106,804,803,619,363,968,1007,1006,768,767,765,651,648,611,974,958,955,814,875,874,873,862,856,853,846,671,762,1027,1026,718,1115,1029,967,966,1003,999,997,900,899,897,870,869,1120,942,881,1043,471,809,561,590,574,527,622,637,970,827,826])).
% 14.48/14.41 cnf(3026,plain,
% 14.48/14.41 (~P8(f13(f3(a1),a1),f13(f5(f4(a1),a1),a1),a1)),
% 14.48/14.41 inference(scs_inference,[],[269,167,226,264,259,243,2738,2744,2748,2773,2778,2785,2894,2909,2912,2938,2941,2981,2985,2777,265,2741,2991,2994,145,153,175,209,224,266,268,261,2745,2749,2937,262,222,183,251,161,184,205,206,178,158,169,202,162,170,186,147,163,190,193,156,172,160,199,267,187,177,176,152,159,154,150,146,179,151,247,263,144,143,1695,2206,2194,1220,1733,1292,2704,2326,1819,1294,2855,1370,2055,2188,1895,2244,1481,2097,2101,2104,2120,2126,1257,1483,1296,1388,2832,1344,2772,1347,1397,2160,1391,2824,1394,1342,1701,2710,2727,2731,2735,2753,2767,2827,2734,2730,2933,2944,2232,1270,1174,1539,1563,1571,1581,1585,1593,1597,1775,2146,2246,1315,1697,2897,2900,2934,1703,2719,2925,2928,1358,1360,1424,2292,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599,598,414,361,359,617,518,499,823,822,691,686,683,661,633,484,360,798,791,636,588,510,452,398,487,1063,969,1111,1110,1087,1018,1017,1016,802,1127,1123,1106,804,803,619,363,968,1007,1006,768,767,765,651,648,611,974,958,955,814,875,874,873,862,856,853,846,671,762,1027,1026,718,1115,1029,967,966,1003,999,997,900,899,897,870,869,1120,942,881,1043,471,809,561,590,574,527,622,637,970,827,826,696])).
% 14.48/14.41 cnf(3034,plain,
% 14.48/14.41 (P9(f3(f27(a1)),f11(f10(x30341,x30341,f27(a1)),f10(f11(f3(f27(a1)),f4(a1),a1),f11(f3(f27(a1)),f4(a1),a1),f27(a1)),f27(a1)),f27(a1))),
% 14.48/14.41 inference(scs_inference,[],[269,167,226,264,259,243,2738,2744,2748,2773,2778,2785,2894,2909,2912,2938,2941,2981,2985,2777,265,2741,2991,2994,145,153,175,209,224,266,268,261,2745,2749,2937,262,222,183,251,161,184,205,206,178,158,169,202,162,170,186,147,163,190,193,156,172,160,199,267,187,177,176,152,159,154,150,146,179,151,247,263,144,143,1695,2206,2194,1220,1733,1292,2704,2326,1819,1294,2855,1370,2055,2188,1895,2244,1481,2097,2101,2104,2120,2126,1257,1483,1296,1388,2832,1344,2772,1347,1397,2160,1391,2824,1394,1342,1701,2710,2727,2731,2735,2753,2767,2827,2734,2730,2933,2944,2232,1270,1174,1539,1563,1571,1581,1585,1593,1597,1775,2146,2246,1315,1697,2897,2900,2934,1703,2719,2925,2928,1358,1360,1424,2292,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599,598,414,361,359,617,518,499,823,822,691,686,683,661,633,484,360,798,791,636,588,510,452,398,487,1063,969,1111,1110,1087,1018,1017,1016,802,1127,1123,1106,804,803,619,363,968,1007,1006,768,767,765,651,648,611,974,958,955,814,875,874,873,862,856,853,846,671,762,1027,1026,718,1115,1029,967,966,1003,999,997,900,899,897,870,869,1120,942,881,1043,471,809,561,590,574,527,622,637,970,827,826,696,688,627,811,1060])).
% 14.48/14.41 cnf(3037,plain,
% 14.48/14.41 (~P8(f11(x30371,f11(a29,f15(a30,a2),a1),a1),f11(x30371,f10(f4(a1),f15(f17(f16(a31,a32,a2),a33,a2),a2),a1),a1),a1)),
% 14.48/14.41 inference(rename_variables,[],[2226])).
% 14.48/14.41 cnf(3045,plain,
% 14.48/14.41 (P8(f3(a1),f10(x30451,x30451,a1),a1)),
% 14.48/14.41 inference(rename_variables,[],[1703])).
% 14.48/14.41 cnf(3051,plain,
% 14.48/14.41 (P9(f9(f3(a1),f11(f4(a1),f5(x30511,a1),a1),a1),f9(f11(f4(a1),f5(x30511,a1),a1),f11(f4(a1),f5(x30511,a1),a1),a1),a1)),
% 14.48/14.41 inference(scs_inference,[],[269,167,226,264,259,243,2738,2744,2748,2773,2778,2785,2894,2909,2912,2938,2941,2981,2985,2777,265,2741,2991,2994,145,153,175,209,224,266,268,261,2745,2749,2937,262,222,183,251,161,184,205,206,178,158,169,202,162,170,186,147,163,190,193,156,172,160,199,267,187,177,176,152,159,154,150,146,179,151,247,263,144,143,1695,2206,2194,1220,1733,1292,2704,2326,1819,1294,2855,1370,2055,2188,1895,2244,1372,1481,2097,2101,2104,2120,2126,1257,1483,1296,1388,2832,1344,2772,1347,1397,2160,1391,2824,2995,1394,1342,1701,2710,2727,2731,2735,2753,2767,2827,2734,2730,2933,2944,2226,3037,2232,1270,1174,1539,1563,1569,1571,1581,1585,1593,1597,1775,2146,2246,1315,1697,2897,2900,2934,1703,2719,2925,2928,3011,1358,1360,1424,2292,1273,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599,598,414,361,359,617,518,499,823,822,691,686,683,661,633,484,360,798,791,636,588,510,452,398,487,1063,969,1111,1110,1087,1018,1017,1016,802,1127,1123,1106,804,803,619,363,968,1007,1006,768,767,765,651,648,611,974,958,955,814,875,874,873,862,856,853,846,671,762,1027,1026,718,1115,1029,967,966,1003,999,997,900,899,897,870,869,1120,942,881,1043,471,809,561,590,574,527,622,637,970,827,826,696,688,627,811,1060,1128,1126,711,607,987,1012,959])).
% 14.48/14.41 cnf(3054,plain,
% 14.48/14.41 (P9(f3(a1),f34(x30541,x30542),a1)),
% 14.48/14.41 inference(rename_variables,[],[247])).
% 14.48/14.41 cnf(3058,plain,
% 14.48/14.41 (P8(x30581,x30581,a1)),
% 14.48/14.41 inference(rename_variables,[],[243])).
% 14.48/14.41 cnf(3061,plain,
% 14.48/14.41 (P9(f3(a1),f11(f4(a1),f5(x30611,a1),a1),a1)),
% 14.48/14.41 inference(rename_variables,[],[251])).
% 14.48/14.41 cnf(3062,plain,
% 14.48/14.41 (P8(x30621,x30621,a1)),
% 14.48/14.41 inference(rename_variables,[],[243])).
% 14.48/14.41 cnf(3065,plain,
% 14.48/14.41 (P9(x30651,f11(x30651,f4(a1),a1),a1)),
% 14.48/14.41 inference(rename_variables,[],[1701])).
% 14.48/14.41 cnf(3066,plain,
% 14.48/14.41 (~P9(f5(x30661,a1),f3(a1),a1)),
% 14.48/14.41 inference(rename_variables,[],[1715])).
% 14.48/14.41 cnf(3077,plain,
% 14.48/14.41 (P9(f3(a1),f34(x30771,x30772),a1)),
% 14.48/14.41 inference(rename_variables,[],[247])).
% 14.48/14.41 cnf(3079,plain,
% 14.48/14.41 (~P9(f3(a1),f10(f11(f4(a1),f5(x30791,a1),a1),f3(a1),a1),a1)),
% 14.48/14.41 inference(scs_inference,[],[269,167,226,264,259,243,2738,2744,2748,2773,2778,2785,2894,2909,2912,2938,2941,2981,2985,2998,3058,2777,265,2741,2991,2994,2999,145,153,175,209,224,266,268,261,2745,2749,2937,262,222,183,251,3061,161,184,205,206,178,158,169,202,162,170,186,147,163,190,193,156,172,160,199,267,187,177,176,152,159,154,150,146,179,151,247,3054,263,144,143,1695,2206,2194,1220,1733,1292,2704,2326,1819,1294,2855,1370,2055,2188,1895,2244,1372,1481,2097,2101,2104,2120,2126,1257,1483,1296,1388,2832,1344,2772,1347,1397,1402,2160,1391,2824,2995,1394,3004,1342,1701,2710,2727,2731,2735,2753,2767,2827,2734,2730,2933,2944,2968,2226,3037,2232,1270,1174,1539,1563,1569,1571,1581,1585,1593,1597,1775,2146,2246,1315,1697,2897,2900,2934,1703,2719,2925,2928,3011,2152,1358,1360,1424,2292,1715,1273,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599,598,414,361,359,617,518,499,823,822,691,686,683,661,633,484,360,798,791,636,588,510,452,398,487,1063,969,1111,1110,1087,1018,1017,1016,802,1127,1123,1106,804,803,619,363,968,1007,1006,768,767,765,651,648,611,974,958,955,814,875,874,873,862,856,853,846,671,762,1027,1026,718,1115,1029,967,966,1003,999,997,900,899,897,870,869,1120,942,881,1043,471,809,561,590,574,527,622,637,970,827,826,696,688,627,811,1060,1128,1126,711,607,987,1012,959,861,852,836,1099,913,912,824,758,995,909])).
% 14.48/14.41 cnf(3080,plain,
% 14.48/14.41 (~P9(x30801,x30801,a1)),
% 14.48/14.41 inference(rename_variables,[],[265])).
% 14.48/14.41 cnf(3083,plain,
% 14.48/14.41 (P8(x30831,x30831,a1)),
% 14.48/14.41 inference(rename_variables,[],[243])).
% 14.48/14.41 cnf(3085,plain,
% 14.48/14.41 (~P9(f3(a1),f9(f10(f3(a1),f3(a1),a1),x30851,a1),a1)),
% 14.48/14.41 inference(scs_inference,[],[269,167,226,264,259,243,2738,2744,2748,2773,2778,2785,2894,2909,2912,2938,2941,2981,2985,2998,3058,3062,2777,265,2741,2991,2994,2999,145,153,175,209,224,266,268,261,2745,2749,2937,262,222,183,251,3061,161,184,205,206,178,158,169,202,162,170,186,147,163,190,193,156,172,160,199,192,267,187,177,176,152,159,154,150,146,179,151,247,3054,263,144,143,1695,2206,2194,1220,1733,1292,2704,2326,1819,1294,2855,1370,2055,2188,1895,2244,1372,1481,2097,2101,2104,2120,2126,1257,1483,1296,1388,2832,1344,2772,1347,1397,1402,2160,1391,2824,2995,1394,3004,1342,1701,2710,2727,2731,2735,2753,2767,2827,2734,2730,2933,2944,2968,2226,3037,2232,1270,1174,1539,1563,1569,1571,1581,1585,1593,1597,1775,2146,2246,1315,1697,2897,2900,2934,2978,1703,2719,2925,2928,3011,2152,1358,1360,1424,2292,1715,1273,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599,598,414,361,359,617,518,499,823,822,691,686,683,661,633,484,360,798,791,636,588,510,452,398,487,1063,969,1111,1110,1087,1018,1017,1016,802,1127,1123,1106,804,803,619,363,968,1007,1006,768,767,765,651,648,611,974,958,955,814,875,874,873,862,856,853,846,671,762,1027,1026,718,1115,1029,967,966,1003,999,997,900,899,897,870,869,1120,942,881,1043,471,809,561,590,574,527,622,637,970,827,826,696,688,627,811,1060,1128,1126,711,607,987,1012,959,861,852,836,1099,913,912,824,758,995,909,843,894])).
% 14.48/14.41 cnf(3086,plain,
% 14.48/14.41 (~P9(f10(x30861,x30861,a1),f3(a1),a1)),
% 14.48/14.41 inference(rename_variables,[],[1697])).
% 14.48/14.41 cnf(3089,plain,
% 14.48/14.41 (~P9(f10(x30891,x30891,a1),f3(a1),a1)),
% 14.48/14.41 inference(rename_variables,[],[1697])).
% 14.48/14.41 cnf(3092,plain,
% 14.48/14.41 (~P9(x30921,x30921,a1)),
% 14.48/14.41 inference(rename_variables,[],[265])).
% 14.48/14.41 cnf(3094,plain,
% 14.48/14.41 (P8(f11(x30941,f5(x30942,a1),a1),f11(f34(x30943,x30944),f11(x30941,f5(x30942,a1),a1),a1),a1)),
% 14.48/14.41 inference(scs_inference,[],[269,167,226,264,259,243,2738,2744,2748,2773,2778,2785,2894,2909,2912,2938,2941,2981,2985,2998,3058,3062,2777,265,2741,2991,2994,2999,3080,145,153,175,209,224,266,268,261,2745,2749,2937,262,222,183,251,3061,161,184,205,206,178,158,169,202,162,170,186,147,163,190,193,156,172,160,199,192,267,187,177,176,152,159,154,150,146,179,151,247,3054,263,144,143,1695,2206,2194,1185,1220,1733,1292,2704,2326,1819,1294,2855,1370,2055,1206,2188,1895,2244,1372,1481,2097,2101,2104,2120,2126,1257,1483,1296,1388,2832,1344,2772,1347,1397,1402,2160,1391,2824,2995,1394,3004,1342,1701,2710,2727,2731,2735,2753,2767,2827,2734,2730,2933,2944,2968,2226,3037,2232,1270,1174,1539,1563,1569,1571,1581,1585,1593,1597,1775,2146,2246,1315,1697,2897,2900,2934,2978,3086,1703,2719,2925,2928,3011,2152,1358,1360,1424,2292,1715,1273,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599,598,414,361,359,617,518,499,823,822,691,686,683,661,633,484,360,798,791,636,588,510,452,398,487,1063,969,1111,1110,1087,1018,1017,1016,802,1127,1123,1106,804,803,619,363,968,1007,1006,768,767,765,651,648,611,974,958,955,814,875,874,873,862,856,853,846,671,762,1027,1026,718,1115,1029,967,966,1003,999,997,900,899,897,870,869,1120,942,881,1043,471,809,561,590,574,527,622,637,970,827,826,696,688,627,811,1060,1128,1126,711,607,987,1012,959,861,852,836,1099,913,912,824,758,995,909,843,894,893,884,494])).
% 14.48/14.41 cnf(3095,plain,
% 14.48/14.41 (~P8(f11(f34(x30951,x30952),x30953,a1),x30953,a1)),
% 14.48/14.41 inference(rename_variables,[],[1388])).
% 14.48/14.41 cnf(3097,plain,
% 14.48/14.41 (P9(f3(a1),f10(f5(f4(a1),a1),f5(f4(a1),a1),a1),a1)),
% 14.48/14.41 inference(scs_inference,[],[269,167,226,264,259,243,2738,2744,2748,2773,2778,2785,2894,2909,2912,2938,2941,2981,2985,2998,3058,3062,2777,265,2741,2991,2994,2999,3080,145,153,175,209,224,266,268,261,2745,2749,2937,262,222,183,251,3061,161,184,205,206,178,158,169,202,162,170,186,147,163,190,193,156,172,160,199,192,267,187,177,176,152,159,154,150,146,179,151,247,3054,263,144,143,1695,2206,1224,2194,1185,1220,1733,1292,2704,2326,1819,1294,2855,1370,2055,1206,2188,1895,2244,1372,1481,2097,2101,2104,2120,2126,1257,1483,1296,1388,2832,1344,2772,1347,1397,1402,2160,1391,2824,2995,1394,3004,1342,1701,2710,2727,2731,2735,2753,2767,2827,2734,2730,2933,2944,2968,2226,3037,2232,1270,1174,1539,1563,1569,1571,1581,1585,1593,1597,1775,2146,2246,1315,1697,2897,2900,2934,2978,3086,1703,2719,2925,2928,3011,2152,1358,1360,1424,2292,1715,1273,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599,598,414,361,359,617,518,499,823,822,691,686,683,661,633,484,360,798,791,636,588,510,452,398,487,1063,969,1111,1110,1087,1018,1017,1016,802,1127,1123,1106,804,803,619,363,968,1007,1006,768,767,765,651,648,611,974,958,955,814,875,874,873,862,856,853,846,671,762,1027,1026,718,1115,1029,967,966,1003,999,997,900,899,897,870,869,1120,942,881,1043,471,809,561,590,574,527,622,637,970,827,826,696,688,627,811,1060,1128,1126,711,607,987,1012,959,861,852,836,1099,913,912,824,758,995,909,843,894,893,884,494,799])).
% 14.48/14.41 cnf(3108,plain,
% 14.48/14.41 (P8(x31081,f14(f11(f10(x31081,x31081,a1),f10(x31082,x31082,a1),a1)),a1)),
% 14.48/14.41 inference(rename_variables,[],[261])).
% 14.48/14.41 cnf(3109,plain,
% 14.48/14.41 (P8(x31091,x31091,a1)),
% 14.48/14.41 inference(rename_variables,[],[243])).
% 14.48/14.41 cnf(3117,plain,
% 14.48/14.41 (~P9(f13(f3(a1),a1),f9(x31171,f13(f3(a1),a1),a1),a1)),
% 14.48/14.41 inference(scs_inference,[],[269,167,226,264,259,243,2738,2744,2748,2773,2778,2785,2894,2909,2912,2938,2941,2981,2985,2998,3058,3062,3083,2777,265,2741,2991,2994,2999,3080,145,153,175,209,224,266,268,261,2745,2749,2937,2984,262,222,183,251,3061,161,184,205,206,178,158,169,202,162,170,186,147,163,190,193,156,172,160,199,192,267,187,177,176,152,159,154,150,146,179,151,247,3054,263,144,143,1695,2206,1224,2194,1185,1220,1733,1292,2704,2326,1819,1294,2855,1370,2055,1206,2188,1895,2244,1372,1481,2097,2101,2104,2120,2126,1257,1483,1296,1388,2832,1344,2772,1347,1397,1402,2160,1391,2824,2995,1394,3004,1342,1701,2710,2727,2731,2735,2753,2767,2827,2734,2730,2933,2944,2968,2226,3037,2232,1270,1174,1539,1563,1569,1571,1581,1585,1593,1597,1775,2146,2246,1315,1697,2897,2900,2934,2978,3086,1703,2719,2925,2928,3011,2152,1358,1360,1424,2292,1715,1273,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599,598,414,361,359,617,518,499,823,822,691,686,683,661,633,484,360,798,791,636,588,510,452,398,487,1063,969,1111,1110,1087,1018,1017,1016,802,1127,1123,1106,804,803,619,363,968,1007,1006,768,767,765,651,648,611,974,958,955,814,875,874,873,862,856,853,846,671,762,1027,1026,718,1115,1029,967,966,1003,999,997,900,899,897,870,869,1120,942,881,1043,471,809,561,590,574,527,622,637,970,827,826,696,688,627,811,1060,1128,1126,711,607,987,1012,959,861,852,836,1099,913,912,824,758,995,909,843,894,893,884,494,799,655,1061,505,739,859,845,842,835,941])).
% 14.48/14.41 cnf(3119,plain,
% 14.48/14.41 (P8(f3(a1),f11(f4(a1),f5(x31191,a1),a1),a1)),
% 14.48/14.41 inference(scs_inference,[],[269,167,226,264,259,243,2738,2744,2748,2773,2778,2785,2894,2909,2912,2938,2941,2981,2985,2998,3058,3062,3083,2777,265,2741,2991,2994,2999,3080,145,153,175,209,224,266,268,261,2745,2749,2937,2984,262,222,183,251,3061,161,184,205,206,178,158,169,202,162,170,186,147,163,190,193,156,173,172,160,199,192,267,187,177,176,152,159,154,150,146,179,151,247,3054,263,144,143,1695,2206,1224,2194,1185,1220,1733,1292,2704,2326,1819,1294,2855,1370,2055,1206,2188,1895,2244,1372,1481,2097,2101,2104,2120,2126,1257,1483,1296,1388,2832,1344,2772,1347,1397,1402,2160,1391,2824,2995,1394,3004,1342,1701,2710,2727,2731,2735,2753,2767,2827,2734,2730,2933,2944,2968,2226,3037,2232,1270,1174,1539,1563,1569,1571,1581,1585,1593,1597,1775,2146,2246,1315,1697,2897,2900,2934,2978,3086,1703,2719,2925,2928,3011,2152,1358,1360,1424,2292,1715,1273,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599,598,414,361,359,617,518,499,823,822,691,686,683,661,633,484,360,798,791,636,588,510,452,398,487,1063,969,1111,1110,1087,1018,1017,1016,802,1127,1123,1106,804,803,619,363,968,1007,1006,768,767,765,651,648,611,974,958,955,814,875,874,873,862,856,853,846,671,762,1027,1026,718,1115,1029,967,966,1003,999,997,900,899,897,870,869,1120,942,881,1043,471,809,561,590,574,527,622,637,970,827,826,696,688,627,811,1060,1128,1126,711,607,987,1012,959,861,852,836,1099,913,912,824,758,995,909,843,894,893,884,494,799,655,1061,505,739,859,845,842,835,941,528])).
% 14.48/14.41 cnf(3121,plain,
% 14.48/14.41 (P9(f7(f3(a1),f11(f4(a1),f5(x31211,a1),a1),a1),f3(a1),a1)),
% 14.48/14.41 inference(scs_inference,[],[269,167,226,264,259,243,2738,2744,2748,2773,2778,2785,2894,2909,2912,2938,2941,2981,2985,2998,3058,3062,3083,2777,265,2741,2991,2994,2999,3080,145,153,175,209,224,266,268,261,2745,2749,2937,2984,262,222,183,251,3061,161,184,205,206,178,158,169,202,162,170,186,147,163,190,193,156,173,172,160,199,192,267,187,177,176,152,159,154,150,146,179,151,247,3054,263,144,143,1695,2206,1224,2194,1185,1220,1733,1292,2704,2326,1819,1294,2855,1370,2055,1206,2188,1895,2244,1372,1481,2097,2101,2104,2120,2126,1257,1483,1296,1388,2832,1344,2772,1347,1397,1402,2160,1391,2824,2995,1394,3004,1342,1701,2710,2727,2731,2735,2753,2767,2827,2734,2730,2933,2944,2968,2226,3037,2232,1270,1174,1539,1563,1569,1571,1581,1585,1593,1597,1775,2146,2246,1315,1697,2897,2900,2934,2978,3086,1703,2719,2925,2928,3011,2152,1358,1360,1424,2292,1715,1273,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599,598,414,361,359,617,518,499,823,822,691,686,683,661,633,484,360,798,791,636,588,510,452,398,487,1063,969,1111,1110,1087,1018,1017,1016,802,1127,1123,1106,804,803,619,363,968,1007,1006,768,767,765,651,648,611,974,958,955,814,875,874,873,862,856,853,846,671,762,1027,1026,718,1115,1029,967,966,1003,999,997,900,899,897,870,869,1120,942,881,1043,471,809,561,590,574,527,622,637,970,827,826,696,688,627,811,1060,1128,1126,711,607,987,1012,959,861,852,836,1099,913,912,824,758,995,909,843,894,893,884,494,799,655,1061,505,739,859,845,842,835,941,528,727])).
% 14.48/14.41 cnf(3132,plain,
% 14.48/14.41 (E(f10(x31321,x31322,a1),f10(x31322,x31321,a1))),
% 14.48/14.41 inference(rename_variables,[],[248])).
% 14.48/14.41 cnf(3134,plain,
% 14.48/14.41 (P10(x31341,f10(x31341,x31342,a1),a1)),
% 14.48/14.41 inference(rename_variables,[],[1483])).
% 14.48/14.41 cnf(3136,plain,
% 14.48/14.41 (E(f10(x31361,x31362,a1),f10(x31362,x31361,a1))),
% 14.48/14.41 inference(rename_variables,[],[248])).
% 14.48/14.41 cnf(3138,plain,
% 14.48/14.41 (E(x31381,f11(f10(f7(x31382,x31382,a1),x31383,a1),x31381,a1))),
% 14.48/14.41 inference(rename_variables,[],[1292])).
% 14.48/14.41 cnf(3140,plain,
% 14.48/14.41 (~P8(f11(f34(x31401,x31402),x31403,a1),x31403,a1)),
% 14.48/14.41 inference(rename_variables,[],[1388])).
% 14.48/14.41 cnf(3150,plain,
% 14.48/14.41 (~P10(f5(f10(f4(a1),f3(a1),a1),a1),f10(f4(a1),f4(a1),a1),a1)),
% 14.48/14.41 inference(scs_inference,[],[269,167,226,264,249,259,243,2738,2744,2748,2773,2778,2785,2894,2909,2912,2938,2941,2981,2985,2998,3058,3062,3083,2777,265,2741,2991,2994,2999,3080,145,153,175,209,224,266,253,248,3132,268,261,2745,2749,2937,2984,262,222,183,251,3061,161,184,205,206,178,158,169,202,162,170,186,147,163,190,193,156,173,172,160,199,192,267,187,177,176,157,152,159,154,150,146,179,151,247,3054,263,144,143,1695,2206,1224,2194,1185,1220,1733,1292,2704,2713,2326,1819,1294,2855,1370,2129,2055,1206,2180,2188,1895,2244,1372,1481,2097,2101,2104,2120,2126,1257,1483,3134,1296,1388,2832,3095,1344,2772,1347,1397,1402,2160,1391,2824,2995,2354,1394,3004,1342,1701,2710,2727,2731,2735,2753,2767,2827,2734,2730,2933,2944,2968,2226,3037,2121,2232,1270,1174,1539,1563,1569,1571,1581,1585,1593,1597,1775,2146,2246,1315,1697,2897,2900,2934,2978,3086,1703,2719,2925,2928,3011,2152,1358,1360,1424,2292,1715,1273,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599,598,414,361,359,617,518,499,823,822,691,686,683,661,633,484,360,798,791,636,588,510,452,398,487,1063,969,1111,1110,1087,1018,1017,1016,802,1127,1123,1106,804,803,619,363,968,1007,1006,768,767,765,651,648,611,974,958,955,814,875,874,873,862,856,853,846,671,762,1027,1026,718,1115,1029,967,966,1003,999,997,900,899,897,870,869,1120,942,881,1043,471,809,561,590,574,527,622,637,970,827,826,696,688,627,811,1060,1128,1126,711,607,987,1012,959,861,852,836,1099,913,912,824,758,995,909,843,894,893,884,494,799,655,1061,505,739,859,845,842,835,941,528,727,344,488,2,14,7,83,81,75,3,693,596,763,723,625,624])).
% 14.48/14.41 cnf(3176,plain,
% 14.48/14.41 (~P8(f11(f34(x31761,x31762),f11(f11(x31763,x31764,a1),f5(x31764,a1),a1),a1),x31763,a1)),
% 14.48/14.41 inference(scs_inference,[],[269,167,226,264,249,259,243,2738,2744,2748,2773,2778,2785,2894,2909,2912,2938,2941,2981,2985,2998,3058,3062,3083,2777,265,2741,2991,2994,2999,3080,145,153,175,209,224,266,253,248,3132,268,261,2745,2749,2937,2984,262,222,183,251,3061,161,184,205,206,178,158,169,202,162,170,186,147,163,190,193,155,156,173,172,160,199,192,267,187,177,176,157,152,159,154,150,146,179,151,247,3054,263,144,143,1695,2206,1224,2194,1185,1220,1733,1292,2704,2713,2326,1819,1294,2855,1370,2129,2055,1206,2180,2188,1895,2244,1372,1481,2097,2101,2104,2120,2126,1257,1483,3134,1296,1388,2832,3095,1344,2772,1347,1397,1402,2158,2160,1391,2824,2995,2354,1394,3004,1342,1701,2710,2727,2731,2735,2753,2767,2827,2734,2730,2933,2944,2968,2226,3037,2121,2232,1270,1174,1539,1563,1569,1571,1581,1585,1593,1597,1775,2146,2246,1315,1697,2897,2900,2934,2978,3086,1703,2719,2925,2928,3011,2152,1358,1360,1424,2292,1715,1273,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599,598,414,361,359,617,518,499,823,822,691,686,683,661,633,484,360,798,791,636,588,510,452,398,487,1063,969,1111,1110,1087,1018,1017,1016,802,1127,1123,1106,804,803,619,363,968,1007,1006,768,767,765,651,648,611,974,958,955,814,875,874,873,862,856,853,846,671,762,1027,1026,718,1115,1029,967,966,1003,999,997,900,899,897,870,869,1120,942,881,1043,471,809,561,590,574,527,622,637,970,827,826,696,688,627,811,1060,1128,1126,711,607,987,1012,959,861,852,836,1099,913,912,824,758,995,909,843,894,893,884,494,799,655,1061,505,739,859,845,842,835,941,528,727,344,488,2,14,7,83,81,75,3,693,596,763,723,625,624,582,580,579,601,597,475,641,640,500,829,828,821,820])).
% 14.48/14.41 cnf(3180,plain,
% 14.48/14.41 (P9(x31801,f11(f13(f9(f10(f13(x31801,a1),f11(f4(a1),f5(x31802,a1),a1),a1),f11(f4(a1),f5(x31802,a1),a1),a1),a1),f4(a1),a1),a1)),
% 14.48/14.41 inference(scs_inference,[],[269,167,226,264,249,259,243,2738,2744,2748,2773,2778,2785,2894,2909,2912,2938,2941,2981,2985,2998,3058,3062,3083,2777,265,2741,2991,2994,2999,3080,145,153,175,209,224,266,253,248,3132,268,261,2745,2749,2937,2984,262,222,183,251,3061,161,184,205,206,178,158,169,202,162,170,186,147,163,190,193,155,156,173,172,160,199,192,267,187,177,176,157,152,159,154,150,146,179,151,247,3054,263,144,143,1695,2206,1224,2194,1185,1220,1733,1292,2704,2713,2326,1819,1294,2855,1370,2129,2055,1206,2180,2188,1895,2244,1372,1481,2097,2101,2104,2120,2126,1257,1483,3134,1296,1388,2832,3095,1344,2772,1347,1397,1402,2158,2160,1391,2824,2995,2354,1394,3004,1342,1701,2710,2727,2731,2735,2753,2767,2827,2734,2730,2933,2944,2968,2226,3037,2121,2232,1270,1174,1539,1563,1569,1571,1581,1585,1593,1597,1775,2146,2246,1315,1697,2897,2900,2934,2978,3086,1703,2719,2925,2928,3011,2152,1358,1360,1424,2292,1715,1273,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599,598,414,361,359,617,518,499,823,822,691,686,683,661,633,484,360,798,791,636,588,510,452,398,487,1063,969,1111,1110,1087,1018,1017,1016,802,1127,1123,1106,804,803,619,363,968,1007,1006,768,767,765,651,648,611,974,958,955,814,875,874,873,862,856,853,846,671,762,1027,1026,718,1115,1029,967,966,1003,999,997,900,899,897,870,869,1120,942,881,1043,471,809,561,590,574,527,622,637,970,827,826,696,688,627,811,1060,1128,1126,711,607,987,1012,959,861,852,836,1099,913,912,824,758,995,909,843,894,893,884,494,799,655,1061,505,739,859,845,842,835,941,528,727,344,488,2,14,7,83,81,75,3,693,596,763,723,625,624,582,580,579,601,597,475,641,640,500,829,828,821,820,770,697])).
% 14.48/14.41 cnf(3183,plain,
% 14.48/14.41 (P9(x31831,f11(x31831,f4(a1),a1),a1)),
% 14.48/14.41 inference(rename_variables,[],[1701])).
% 14.48/14.41 cnf(3203,plain,
% 14.48/14.41 (P9(f7(x32031,f11(f5(f7(x32032,x32031,a1),a1),f4(a1),a1),a1),x32032,a1)),
% 14.48/14.41 inference(scs_inference,[],[269,167,226,264,249,259,243,2738,2744,2748,2773,2778,2785,2894,2909,2912,2938,2941,2981,2985,2998,3058,3062,3083,2777,265,2741,2991,2994,2999,3080,145,153,175,209,224,266,253,248,3132,268,261,2745,2749,2937,2984,262,222,183,251,3061,161,184,205,206,178,158,169,202,162,170,186,147,163,190,193,155,156,173,172,160,199,192,267,187,177,176,157,152,159,154,150,146,179,151,247,3054,263,144,143,1695,2206,1224,2194,1185,1220,1733,1292,2704,2713,2326,1819,1294,2855,1370,2129,2055,1206,2180,2188,1895,2244,1372,1481,1827,2097,2101,2104,2120,2126,1257,1483,3134,1296,1388,2832,3095,1344,2772,1347,1397,1402,2158,2160,1391,2824,2995,2354,1394,3004,1342,1701,2710,2727,2731,2735,2753,2767,2827,3183,2734,2730,2933,2944,2968,2252,2226,3037,2121,2232,1270,1174,1539,1563,1569,1571,1581,1585,1593,1595,1597,1775,2146,2246,1315,1697,2897,2900,2934,2978,3086,1703,2719,2925,2928,3011,2152,1358,1360,1424,2292,1715,1273,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599,598,414,361,359,617,518,499,823,822,691,686,683,661,633,484,360,798,791,636,588,510,452,398,487,1063,969,1111,1110,1087,1018,1017,1016,802,1127,1123,1106,804,803,619,363,968,1007,1006,768,767,765,651,648,611,974,958,955,814,875,874,873,862,856,853,846,671,762,1027,1026,718,1115,1029,967,966,1003,999,997,900,899,897,870,869,1120,942,881,1043,471,809,561,590,574,527,622,637,970,827,826,696,688,627,811,1060,1128,1126,711,607,987,1012,959,861,852,836,1099,913,912,824,758,995,909,843,894,893,884,494,799,655,1061,505,739,859,845,842,835,941,528,727,344,488,2,14,7,83,81,75,3,693,596,763,723,625,624,582,580,579,601,597,475,641,640,500,829,828,821,820,770,697,689,685,654,626,470,422,507,692,736,486,1064])).
% 14.48/14.41 cnf(3211,plain,
% 14.48/14.41 (P9(f11(f10(x32111,x32112,a1),x32113,a1),f11(f10(x32114,x32112,a1),f11(f11(f10(f7(x32111,x32114,a1),x32112,a1),x32113,a1),f4(a1),a1),a1),a1)),
% 14.48/14.41 inference(scs_inference,[],[269,167,226,264,249,259,243,2738,2744,2748,2773,2778,2785,2894,2909,2912,2938,2941,2981,2985,2998,3058,3062,3083,2777,265,2741,2991,2994,2999,3080,145,153,175,209,224,266,253,248,3132,268,261,2745,2749,2937,2984,262,222,183,251,3061,161,184,205,206,178,158,169,202,162,170,186,147,163,190,193,155,156,173,172,160,199,192,267,187,177,176,157,152,159,154,150,146,179,151,247,3054,263,144,143,1695,2206,1224,2194,1185,1220,1733,1292,2704,2713,2326,1819,1294,2855,1370,2129,2055,1206,2180,2188,1895,2244,1372,1481,1827,2097,2101,2104,2120,2126,1257,1483,3134,1296,1388,2832,3095,1344,2772,1347,1397,1402,2158,2160,1391,2824,2995,2354,1394,3004,1342,1701,2710,2727,2731,2735,2753,2767,2827,3183,2734,2730,2933,2944,2968,3065,2252,2226,3037,2121,2232,1270,1174,1539,1563,1569,1571,1581,1585,1593,1595,1597,1775,2146,2246,1315,1697,2897,2900,2934,2978,3086,1703,2719,2925,2928,3011,2152,1358,1360,1424,2292,1715,1273,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599,598,414,361,359,617,518,499,823,822,691,686,683,661,633,484,360,798,791,636,588,510,452,398,487,1063,969,1111,1110,1087,1018,1017,1016,802,1127,1123,1106,804,803,619,363,968,1007,1006,768,767,765,651,648,611,974,958,955,814,875,874,873,862,856,853,846,671,762,1027,1026,718,1115,1029,967,966,1003,999,997,900,899,897,870,869,1120,942,881,1043,471,809,561,590,574,527,622,637,970,827,826,696,688,627,811,1060,1128,1126,711,607,987,1012,959,861,852,836,1099,913,912,824,758,995,909,843,894,893,884,494,799,655,1061,505,739,859,845,842,835,941,528,727,344,488,2,14,7,83,81,75,3,693,596,763,723,625,624,582,580,579,601,597,475,641,640,500,829,828,821,820,770,697,689,685,654,626,470,422,507,692,736,486,1064,715,760,801,1129])).
% 14.48/14.41 cnf(3213,plain,
% 14.48/14.41 (~P8(f11(f10(x32131,f7(x32131,x32132,f27(a1)),f27(a1)),f10(f11(f3(f27(a1)),f4(a1),a1),f11(f3(f27(a1)),f4(a1),a1),f27(a1)),f27(a1)),f11(f10(x32132,f7(x32131,x32132,f27(a1)),f27(a1)),f3(f27(a1)),f27(a1)),f27(a1))),
% 14.48/14.41 inference(scs_inference,[],[269,167,226,264,249,259,243,2738,2744,2748,2773,2778,2785,2894,2909,2912,2938,2941,2981,2985,2998,3058,3062,3083,2777,265,2741,2991,2994,2999,3080,145,153,175,209,224,266,253,248,3132,268,261,2745,2749,2937,2984,262,222,183,251,3061,161,184,205,206,178,158,169,202,162,170,186,147,163,190,193,155,156,173,172,160,199,192,267,187,177,176,157,152,159,154,150,146,179,151,247,3054,263,144,143,1695,2206,1224,2194,1185,1220,1733,1292,2704,2713,2326,1819,1294,2855,1370,2129,2055,1206,2180,2188,1895,2244,1372,1481,1827,2097,2101,2104,2120,2126,1257,1483,3134,1296,1388,2832,3095,1344,2772,1347,1397,1402,2158,2160,1391,2824,2995,2354,1394,3004,1342,1701,2710,2727,2731,2735,2753,2767,2827,3183,2734,2730,2933,2944,2968,3065,2252,2226,3037,2121,2232,1270,1174,1539,1563,1569,1571,1581,1585,1593,1595,1597,1775,2146,2246,1315,1697,2897,2900,2934,2978,3086,1703,2719,2925,2928,3011,2152,1358,1360,1424,2292,1715,1273,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599,598,414,361,359,617,518,499,823,822,691,686,683,661,633,484,360,798,791,636,588,510,452,398,487,1063,969,1111,1110,1087,1018,1017,1016,802,1127,1123,1106,804,803,619,363,968,1007,1006,768,767,765,651,648,611,974,958,955,814,875,874,873,862,856,853,846,671,762,1027,1026,718,1115,1029,967,966,1003,999,997,900,899,897,870,869,1120,942,881,1043,471,809,561,590,574,527,622,637,970,827,826,696,688,627,811,1060,1128,1126,711,607,987,1012,959,861,852,836,1099,913,912,824,758,995,909,843,894,893,884,494,799,655,1061,505,739,859,845,842,835,941,528,727,344,488,2,14,7,83,81,75,3,693,596,763,723,625,624,582,580,579,601,597,475,641,640,500,829,828,821,820,770,697,689,685,654,626,470,422,507,692,736,486,1064,715,760,801,1129,1124])).
% 14.48/14.41 cnf(3225,plain,
% 14.48/14.41 (~E(f7(f3(f27(a2)),a32,a2),f3(a2))),
% 14.48/14.41 inference(scs_inference,[],[269,167,226,264,249,259,243,2738,2744,2748,2773,2778,2785,2894,2909,2912,2938,2941,2981,2985,2998,3058,3062,3083,2777,265,2741,2991,2994,2999,3080,145,153,171,175,209,224,266,253,248,3132,268,261,2745,2749,2937,2984,262,222,183,251,3061,161,184,205,206,178,158,169,202,162,170,186,147,163,190,193,155,156,173,172,160,199,192,267,187,177,176,157,152,159,154,150,146,179,151,247,3054,263,144,143,1695,2206,1224,2194,1185,1220,1733,1292,2704,2713,2326,1819,1294,2855,1370,2129,2055,1206,2180,2188,1895,2244,1372,1481,1827,2097,2101,2104,2120,2126,1257,1483,3134,1296,1388,2832,3095,3140,1344,2772,1347,1397,1402,2158,2160,1391,2824,2995,2354,1394,3004,1342,1701,2710,2727,2731,2735,2753,2767,2827,3183,2734,2730,2933,2944,2968,3065,2172,2252,2226,3037,2121,2232,1270,1174,1539,1563,1569,1571,1581,1585,1593,1595,1597,1775,2146,2164,2246,1315,1697,2897,2900,2934,2978,3086,1703,2719,2925,2928,3011,2152,1358,1360,1424,2292,1715,1273,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599,598,414,361,359,617,518,499,823,822,691,686,683,661,633,484,360,798,791,636,588,510,452,398,487,1063,969,1111,1110,1087,1018,1017,1016,802,1127,1123,1106,804,803,619,363,968,1007,1006,768,767,765,651,648,611,974,958,955,814,875,874,873,862,856,853,846,671,762,1027,1026,718,1115,1029,967,966,1003,999,997,900,899,897,870,869,1120,942,881,1043,471,809,561,590,574,527,622,637,970,827,826,696,688,627,811,1060,1128,1126,711,607,987,1012,959,861,852,836,1099,913,912,824,758,995,909,843,894,893,884,494,799,655,1061,505,739,859,845,842,835,941,528,727,344,488,2,14,7,83,81,75,3,693,596,763,723,625,624,582,580,579,601,597,475,641,640,500,829,828,821,820,770,697,689,685,654,626,470,422,507,692,736,486,1064,715,760,801,1129,1124,1122,1107,713,706,705,476])).
% 14.48/14.41 cnf(3255,plain,
% 14.48/14.41 (P8(f3(f27(a1)),f10(f3(f27(a1)),f3(f27(a1)),f27(a1)),f27(a1))),
% 14.48/14.41 inference(scs_inference,[],[269,167,226,264,249,259,243,2738,2744,2748,2773,2778,2785,2894,2909,2912,2938,2941,2981,2985,2998,3058,3062,3083,3109,2777,265,2741,2991,2994,2999,3080,145,153,171,175,209,224,266,253,248,3132,268,261,2745,2749,2937,2984,262,222,183,251,3061,161,184,205,206,178,158,169,202,162,170,186,147,163,190,193,155,156,173,172,160,199,192,267,187,177,176,157,152,159,154,150,146,179,151,247,3054,263,144,143,1695,2206,1224,2194,1185,1220,1733,1292,2704,2713,2326,1819,1294,2855,1370,2129,2055,1206,1279,2180,2188,1895,2244,1372,1481,1827,2097,2101,2104,2120,2126,1257,1483,3134,1485,1296,1388,2832,3095,3140,1344,2772,1347,1397,1402,2158,2160,1391,2824,2995,2354,1394,3004,1342,1701,2710,2727,2731,2735,2753,2767,2827,3183,2734,2730,2933,2944,2968,3065,2172,2252,2226,3037,2121,2232,1270,1174,1531,1539,1563,1569,1571,1581,1585,1593,1595,1597,1775,2146,2164,1909,2246,1315,1697,2897,2900,2934,2978,3086,1703,2719,2925,2928,3011,2152,1358,1360,1424,2292,1609,1715,1273,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599,598,414,361,359,617,518,499,823,822,691,686,683,661,633,484,360,798,791,636,588,510,452,398,487,1063,969,1111,1110,1087,1018,1017,1016,802,1127,1123,1106,804,803,619,363,968,1007,1006,768,767,765,651,648,611,974,958,955,814,875,874,873,862,856,853,846,671,762,1027,1026,718,1115,1029,967,966,1003,999,997,900,899,897,870,869,1120,942,881,1043,471,809,561,590,574,527,622,637,970,827,826,696,688,627,811,1060,1128,1126,711,607,987,1012,959,861,852,836,1099,913,912,824,758,995,909,843,894,893,884,494,799,655,1061,505,739,859,845,842,835,941,528,727,344,488,2,14,7,83,81,75,3,693,596,763,723,625,624,582,580,579,601,597,475,641,640,500,829,828,821,820,770,697,689,685,654,626,470,422,507,692,736,486,1064,715,760,801,1129,1124,1122,1107,713,706,705,476,810,939,938,935,766,673,948,946,994,993,992,880,864,839])).
% 14.48/14.41 cnf(3272,plain,
% 14.48/14.41 (P8(x32721,x32721,a1)),
% 14.48/14.41 inference(rename_variables,[],[243])).
% 14.48/14.41 cnf(3275,plain,
% 14.48/14.41 (P8(f7(f15(f11(x32751,x32752,a2),a2),f15(x32751,a2),a1),f15(x32752,a2),a1)),
% 14.48/14.41 inference(rename_variables,[],[259])).
% 14.48/14.41 cnf(3281,plain,
% 14.48/14.41 (P8(f10(f9(x32811,f11(f4(a1),f5(x32812,a1),a1),a1),f11(f4(a1),f5(x32812,a1),a1),a1),x32811,a1)),
% 14.48/14.41 inference(scs_inference,[],[269,167,226,264,249,259,243,2738,2744,2748,2773,2778,2785,2894,2909,2912,2938,2941,2981,2985,2998,3058,3062,3083,3109,3272,2777,265,2741,2991,2994,2999,3080,145,153,171,175,209,224,266,253,248,3132,268,261,2745,2749,2937,2984,262,222,183,251,3061,161,165,184,205,206,178,158,169,202,162,170,186,147,163,190,193,155,156,173,172,197,160,199,192,267,187,177,176,157,152,159,154,150,146,179,151,247,3054,263,144,143,1695,2206,1224,2194,1185,1220,1733,1292,2704,2713,2326,1819,1294,2855,1370,2129,2055,1206,1279,2180,2188,1895,1232,2244,1372,1481,1827,2097,2101,2104,2120,2126,1257,1483,3134,1485,1296,1388,2832,3095,3140,1344,2772,1347,1397,1402,2158,2160,1391,2824,2995,2354,1394,3004,1342,1701,2710,2727,2731,2735,2753,2767,2827,3183,2734,2730,2933,2944,2968,3065,2172,2252,2226,3037,2121,2232,1270,1174,1531,1539,1563,1565,1569,1571,1573,1581,1585,1593,1595,1597,1775,2146,2164,1909,2246,1315,1697,2897,2900,2934,2978,3086,1703,2719,2925,2928,3011,2152,1358,1360,1424,2292,1609,1715,1273,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599,598,414,361,359,617,518,499,823,822,691,686,683,661,633,484,360,798,791,636,588,510,452,398,487,1063,969,1111,1110,1087,1018,1017,1016,802,1127,1123,1106,804,803,619,363,968,1007,1006,768,767,765,651,648,611,974,958,955,814,875,874,873,862,856,853,846,671,762,1027,1026,718,1115,1029,967,966,1003,999,997,900,899,897,870,869,1120,942,881,1043,471,809,561,590,574,527,622,637,970,827,826,696,688,627,811,1060,1128,1126,711,607,987,1012,959,861,852,836,1099,913,912,824,758,995,909,843,894,893,884,494,799,655,1061,505,739,859,845,842,835,941,528,727,344,488,2,14,7,83,81,75,3,693,596,763,723,625,624,582,580,579,601,597,475,641,640,500,829,828,821,820,770,697,689,685,654,626,470,422,507,692,736,486,1064,715,760,801,1129,1124,1122,1107,713,706,705,476,810,939,938,935,766,673,948,946,994,993,992,880,864,839,833,509,808,807,1114,1030,1028,819,818,1101,1004,1001])).
% 14.48/14.41 cnf(3282,plain,
% 14.48/14.41 (P8(x32821,x32821,a1)),
% 14.48/14.41 inference(rename_variables,[],[243])).
% 14.48/14.41 cnf(3285,plain,
% 14.48/14.41 (~P9(f10(x32851,x32851,a1),f3(a1),a1)),
% 14.48/14.41 inference(rename_variables,[],[1697])).
% 14.48/14.41 cnf(3287,plain,
% 14.48/14.41 (P8(f3(a1),f9(f3(a1),f3(a1),a1),a1)),
% 14.48/14.41 inference(scs_inference,[],[269,167,226,264,249,259,243,2738,2744,2748,2773,2778,2785,2894,2909,2912,2938,2941,2981,2985,2998,3058,3062,3083,3109,3272,3282,2777,265,2741,2991,2994,2999,3080,145,153,171,175,209,224,266,253,248,3132,268,261,2745,2749,2937,2984,262,222,183,251,3061,161,165,184,205,206,178,158,169,202,162,170,186,147,163,190,193,155,156,173,172,197,160,199,192,267,187,177,176,157,152,159,154,150,146,179,151,247,3054,263,144,143,1695,2206,1224,2194,1185,1220,1733,1292,2704,2713,2326,1819,1294,2855,1370,2129,2055,1206,1279,2180,2188,1895,1232,2244,1372,1481,1827,2097,2101,2104,2120,2126,1257,1483,3134,1485,1296,1388,2832,3095,3140,1344,2772,1347,1397,1402,2158,2160,1391,2824,2995,2354,1394,3004,1342,1701,2710,2727,2731,2735,2753,2767,2827,3183,2734,2730,2933,2944,2968,3065,2172,2252,2226,3037,2121,2232,1270,1174,1531,1539,1563,1565,1569,1571,1573,1581,1585,1593,1595,1597,1775,2146,2164,1909,2246,1315,1697,2897,2900,2934,2978,3086,3089,1703,2719,2925,2928,3011,2152,1358,1360,1424,2292,1609,1715,1273,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599,598,414,361,359,617,518,499,823,822,691,686,683,661,633,484,360,798,791,636,588,510,452,398,487,1063,969,1111,1110,1087,1018,1017,1016,802,1127,1123,1106,804,803,619,363,968,1007,1006,768,767,765,651,648,611,974,958,955,814,875,874,873,862,856,853,846,671,762,1027,1026,718,1115,1029,967,966,1003,999,997,900,899,897,870,869,1120,942,881,1043,471,809,561,590,574,527,622,637,970,827,826,696,688,627,811,1060,1128,1126,711,607,987,1012,959,861,852,836,1099,913,912,824,758,995,909,843,894,893,884,494,799,655,1061,505,739,859,845,842,835,941,528,727,344,488,2,14,7,83,81,75,3,693,596,763,723,625,624,582,580,579,601,597,475,641,640,500,829,828,821,820,770,697,689,685,654,626,470,422,507,692,736,486,1064,715,760,801,1129,1124,1122,1107,713,706,705,476,810,939,938,935,766,673,948,946,994,993,992,880,864,839,833,509,808,807,1114,1030,1028,819,818,1101,1004,1001,898,867])).
% 14.48/14.41 cnf(3288,plain,
% 14.48/14.41 (P8(x32881,x32881,a1)),
% 14.48/14.41 inference(rename_variables,[],[243])).
% 14.48/14.41 cnf(3298,plain,
% 14.48/14.41 (~P9(x32981,x32981,a1)),
% 14.48/14.41 inference(rename_variables,[],[265])).
% 14.48/14.41 cnf(3301,plain,
% 14.48/14.41 (~P9(x33011,x33011,a1)),
% 14.48/14.41 inference(rename_variables,[],[265])).
% 14.48/14.41 cnf(3304,plain,
% 14.48/14.41 (P8(x33041,f14(f11(f10(x33041,x33041,a1),f10(x33042,x33042,a1),a1)),a1)),
% 14.48/14.41 inference(rename_variables,[],[261])).
% 14.48/14.41 cnf(3305,plain,
% 14.48/14.41 (P8(x33051,x33051,a1)),
% 14.48/14.41 inference(rename_variables,[],[243])).
% 14.48/14.41 cnf(3306,plain,
% 14.48/14.41 (~P9(x33061,x33061,a1)),
% 14.48/14.41 inference(rename_variables,[],[265])).
% 14.48/14.41 cnf(3308,plain,
% 14.48/14.41 (P8(f3(a1),f15(a33,a2),a1)),
% 14.48/14.41 inference(scs_inference,[],[269,167,226,264,249,254,259,243,2738,2744,2748,2773,2778,2785,2894,2909,2912,2938,2941,2981,2985,2998,3058,3062,3083,3109,3272,3282,3288,2777,265,2741,2991,2994,2999,3080,3092,3298,3301,145,153,171,175,209,224,266,253,248,3132,268,261,2745,2749,2937,2984,3108,262,222,183,251,3061,161,165,184,205,206,178,158,169,202,162,170,186,147,163,190,193,155,156,173,172,197,160,199,192,267,187,177,176,157,152,159,154,150,146,179,151,247,3054,263,144,143,1695,2206,1224,2194,1185,1220,1733,1292,2704,2713,2326,1819,1294,2855,1370,2129,2055,1206,1279,1149,2180,2188,1895,1232,2244,1372,1481,1827,2097,2101,2104,2120,2126,1257,1483,3134,1485,1296,1388,2832,3095,3140,1344,2772,1347,1397,1402,2158,2160,1391,2824,2995,2354,1394,3004,1342,1701,2710,2727,2731,2735,2753,2767,2827,3183,2734,2730,2933,2944,2968,3065,2172,2252,2226,3037,2121,2232,1270,1174,1531,1539,1563,1565,1569,1571,1573,1581,1585,1593,1595,1597,1775,2146,2164,1909,2246,1315,1697,2897,2900,2934,2978,3086,3089,1703,2719,2925,2928,3011,2152,1358,1360,1424,2292,1609,1715,1273,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599,598,414,361,359,617,518,499,823,822,691,686,683,661,633,484,360,798,791,636,588,510,452,398,487,1063,969,1111,1110,1087,1018,1017,1016,802,1127,1123,1106,804,803,619,363,968,1007,1006,768,767,765,651,648,611,974,958,955,814,875,874,873,862,856,853,846,671,762,1027,1026,718,1115,1029,967,966,1003,999,997,900,899,897,870,869,1120,942,881,1043,471,809,561,590,574,527,622,637,970,827,826,696,688,627,811,1060,1128,1126,711,607,987,1012,959,861,852,836,1099,913,912,824,758,995,909,843,894,893,884,494,799,655,1061,505,739,859,845,842,835,941,528,727,344,488,2,14,7,83,81,75,3,693,596,763,723,625,624,582,580,579,601,597,475,641,640,500,829,828,821,820,770,697,689,685,654,626,470,422,507,692,736,486,1064,715,760,801,1129,1124,1122,1107,713,706,705,476,810,939,938,935,766,673,948,946,994,993,992,880,864,839,833,509,808,807,1114,1030,1028,819,818,1101,1004,1001,898,867,865,751,940,882,1045,514])).
% 14.48/14.41 cnf(3310,plain,
% 14.48/14.41 (~P9(f11(f10(f14(x33101),f14(x33101),a1),f10(x33102,x33102,a1),a1),x33101,a1)),
% 14.48/14.41 inference(scs_inference,[],[269,167,226,264,249,254,259,243,2738,2744,2748,2773,2778,2785,2894,2909,2912,2938,2941,2981,2985,2998,3058,3062,3083,3109,3272,3282,3288,2777,265,2741,2991,2994,2999,3080,3092,3298,3301,145,153,171,175,209,224,266,253,248,3132,268,261,2745,2749,2937,2984,3108,262,222,183,251,3061,161,165,184,205,206,178,158,169,202,162,170,186,147,163,190,193,155,156,173,172,197,160,199,192,267,187,177,176,157,152,159,154,150,146,179,151,247,3054,263,144,143,1695,2206,1224,2194,1185,1220,1733,1292,2704,2713,2326,1819,1294,2855,1370,2129,2055,1206,1279,1149,2180,2188,1895,1232,2244,1372,1481,1827,2097,2101,2104,2120,2126,2142,1257,1483,3134,1485,1296,1388,2832,3095,3140,1344,2772,1347,1397,1402,2158,2160,1391,2824,2995,2354,1394,3004,1342,1701,2710,2727,2731,2735,2753,2767,2827,3183,2734,2730,2933,2944,2968,3065,2172,2252,2226,3037,2121,2232,1270,1174,1531,1539,1563,1565,1569,1571,1573,1581,1585,1593,1595,1597,1775,2146,2164,1909,2246,1315,1697,2897,2900,2934,2978,3086,3089,1703,2719,2925,2928,3011,2152,1358,1360,1424,2292,1609,1715,1273,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599,598,414,361,359,617,518,499,823,822,691,686,683,661,633,484,360,798,791,636,588,510,452,398,487,1063,969,1111,1110,1087,1018,1017,1016,802,1127,1123,1106,804,803,619,363,968,1007,1006,768,767,765,651,648,611,974,958,955,814,875,874,873,862,856,853,846,671,762,1027,1026,718,1115,1029,967,966,1003,999,997,900,899,897,870,869,1120,942,881,1043,471,809,561,590,574,527,622,637,970,827,826,696,688,627,811,1060,1128,1126,711,607,987,1012,959,861,852,836,1099,913,912,824,758,995,909,843,894,893,884,494,799,655,1061,505,739,859,845,842,835,941,528,727,344,488,2,14,7,83,81,75,3,693,596,763,723,625,624,582,580,579,601,597,475,641,640,500,829,828,821,820,770,697,689,685,654,626,470,422,507,692,736,486,1064,715,760,801,1129,1124,1122,1107,713,706,705,476,810,939,938,935,766,673,948,946,994,993,992,880,864,839,833,509,808,807,1114,1030,1028,819,818,1101,1004,1001,898,867,865,751,940,882,1045,514,532])).
% 14.48/14.41 cnf(3316,plain,
% 14.48/14.41 (P9(x33161,f11(x33161,f4(a1),a1),a1)),
% 14.48/14.41 inference(rename_variables,[],[1701])).
% 14.48/14.41 cnf(3324,plain,
% 14.48/14.41 (P9(f11(f3(f27(a1)),x33241,f27(a1)),f11(f11(f10(x33242,x33242,f27(a1)),f10(f11(f3(f27(a1)),f4(a1),a1),f11(f3(f27(a1)),f4(a1),a1),f27(a1)),f27(a1)),x33241,f27(a1)),f27(a1))),
% 14.48/14.41 inference(scs_inference,[],[269,167,226,264,249,254,259,243,2738,2744,2748,2773,2778,2785,2894,2909,2912,2938,2941,2981,2985,2998,3058,3062,3083,3109,3272,3282,3288,2777,265,2741,2991,2994,2999,3080,3092,3298,3301,145,153,171,175,209,224,266,253,248,3132,268,261,2745,2749,2937,2984,3108,262,222,183,251,3061,161,165,184,205,206,178,158,169,202,162,170,186,147,163,190,193,155,156,173,172,197,160,199,192,267,187,177,176,157,152,159,154,150,146,179,151,247,3054,263,144,143,1695,2206,1224,2194,1185,1220,1733,1292,2704,2713,2326,1819,1294,2855,1370,2129,2055,1206,1279,1149,2180,2188,1895,1232,2244,1372,1481,1827,2097,2101,2104,2120,2126,2142,1257,1483,3134,1485,1296,1388,2832,3095,3140,1344,2772,1347,1397,1402,2158,2160,1391,2824,2995,2354,1394,3004,1342,1701,2710,2727,2731,2735,2753,2767,2827,3183,3316,2734,2730,2933,2944,2968,3065,2172,2252,2226,3037,2121,2232,1270,1174,1531,1539,1555,1563,1565,1569,1571,1573,1581,1585,1593,1595,1597,1775,2146,2164,1909,2246,1315,1697,2897,2900,2934,2978,3086,3089,1703,2719,2925,2928,3011,2152,1358,1360,1424,2292,1609,1715,1273,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599,598,414,361,359,617,518,499,823,822,691,686,683,661,633,484,360,798,791,636,588,510,452,398,487,1063,969,1111,1110,1087,1018,1017,1016,802,1127,1123,1106,804,803,619,363,968,1007,1006,768,767,765,651,648,611,974,958,955,814,875,874,873,862,856,853,846,671,762,1027,1026,718,1115,1029,967,966,1003,999,997,900,899,897,870,869,1120,942,881,1043,471,809,561,590,574,527,622,637,970,827,826,696,688,627,811,1060,1128,1126,711,607,987,1012,959,861,852,836,1099,913,912,824,758,995,909,843,894,893,884,494,799,655,1061,505,739,859,845,842,835,941,528,727,344,488,2,14,7,83,81,75,3,693,596,763,723,625,624,582,580,579,601,597,475,641,640,500,829,828,821,820,770,697,689,685,654,626,470,422,507,692,736,486,1064,715,760,801,1129,1124,1122,1107,713,706,705,476,810,939,938,935,766,673,948,946,994,993,992,880,864,839,833,509,808,807,1114,1030,1028,819,818,1101,1004,1001,898,867,865,751,940,882,1045,514,532,594,593,592,614,971,825])).
% 14.48/14.41 cnf(3334,plain,
% 14.48/14.41 (P8(x33341,x33341,a1)),
% 14.48/14.41 inference(rename_variables,[],[243])).
% 14.48/14.41 cnf(3337,plain,
% 14.48/14.41 (P8(x33371,x33371,a1)),
% 14.48/14.41 inference(rename_variables,[],[243])).
% 14.48/14.41 cnf(3340,plain,
% 14.48/14.41 (P8(x33401,f14(f11(f10(x33401,x33401,a1),f10(x33402,x33402,a1),a1)),a1)),
% 14.48/14.41 inference(rename_variables,[],[261])).
% 14.48/14.41 cnf(3342,plain,
% 14.48/14.41 (P8(f3(a1),f9(f3(a1),f11(f7(f3(a1),f34(x33421,x33422),a1),f7(f3(a1),f34(x33421,x33422),a1),a1),a1),a1)),
% 14.48/14.41 inference(scs_inference,[],[269,167,226,264,249,254,259,3275,243,2738,2744,2748,2773,2778,2785,2894,2909,2912,2938,2941,2981,2985,2998,3058,3062,3083,3109,3272,3282,3288,3305,3334,3337,2777,265,2741,2991,2994,2999,3080,3092,3298,3301,145,153,171,175,209,224,266,253,248,3132,268,261,2745,2749,2937,2984,3108,3304,262,222,183,251,3061,161,165,184,205,206,178,158,169,202,162,170,186,147,163,190,193,155,156,173,172,197,160,199,192,267,187,177,176,157,152,159,154,150,146,179,151,247,3054,263,144,143,1695,2206,1224,2194,1185,1220,1733,1292,2704,2713,2326,1819,1294,2855,1370,2129,2055,1206,1279,1149,2180,2188,1895,1232,2244,1372,1481,1827,2097,2101,2104,2120,2126,2142,1257,1483,3134,1485,1296,1388,2832,3095,3140,1344,2772,1347,1397,1402,2158,2160,1391,2824,2995,2354,1394,3004,1342,1701,2710,2727,2731,2735,2753,2767,2827,3183,3316,2734,2730,2933,2944,2968,3065,2172,2252,2226,3037,2121,2232,2881,1270,1174,1531,1539,1555,1563,1565,1569,1571,1573,1581,1585,1593,1595,1597,1775,2146,2164,1909,2246,1315,1697,2897,2900,2934,2978,3086,3089,1703,2719,2925,2928,3011,2152,1358,1360,1424,2292,1609,1715,1273,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599,598,414,361,359,617,518,499,823,822,691,686,683,661,633,484,360,798,791,636,588,510,452,398,487,1063,969,1111,1110,1087,1018,1017,1016,802,1127,1123,1106,804,803,619,363,968,1007,1006,768,767,765,651,648,611,974,958,955,814,875,874,873,862,856,853,846,671,762,1027,1026,718,1115,1029,967,966,1003,999,997,900,899,897,870,869,1120,942,881,1043,471,809,561,590,574,527,622,637,970,827,826,696,688,627,811,1060,1128,1126,711,607,987,1012,959,861,852,836,1099,913,912,824,758,995,909,843,894,893,884,494,799,655,1061,505,739,859,845,842,835,941,528,727,344,488,2,14,7,83,81,75,3,693,596,763,723,625,624,582,580,579,601,597,475,641,640,500,829,828,821,820,770,697,689,685,654,626,470,422,507,692,736,486,1064,715,760,801,1129,1124,1122,1107,713,706,705,476,810,939,938,935,766,673,948,946,994,993,992,880,864,839,833,509,808,807,1114,1030,1028,819,818,1101,1004,1001,898,867,865,751,940,882,1045,514,532,594,593,592,614,971,825,726,1125,937,854,849,840,830])).
% 14.48/14.41 cnf(3343,plain,
% 14.48/14.41 (P8(x33431,x33431,a1)),
% 14.48/14.41 inference(rename_variables,[],[243])).
% 14.48/14.41 cnf(3350,plain,
% 14.48/14.41 (P8(f3(a1),f11(f10(x33501,x33501,a1),f10(x33502,x33502,a1),a1),a1)),
% 14.48/14.41 inference(rename_variables,[],[257])).
% 14.48/14.41 cnf(3357,plain,
% 14.48/14.41 (~P9(x33571,x33571,a1)),
% 14.48/14.41 inference(rename_variables,[],[265])).
% 14.48/14.41 cnf(3359,plain,
% 14.48/14.41 (P8(f10(f3(a1),f13(f3(a1),a1),a1),f10(f13(f3(a1),a1),f13(f3(a1),a1),a1),a1)),
% 14.48/14.41 inference(scs_inference,[],[269,167,226,264,249,254,259,3275,243,2738,2744,2748,2773,2778,2785,2894,2909,2912,2938,2941,2981,2985,2998,3058,3062,3083,3109,3272,3282,3288,3305,3334,3337,3343,2777,265,2741,2991,2994,2999,3080,3092,3298,3301,3306,145,153,171,175,209,224,266,253,248,3132,268,261,2745,2749,2937,2984,3108,3304,262,222,183,207,251,3061,161,165,184,205,206,178,158,169,202,162,170,186,147,257,163,190,193,155,156,173,172,197,160,199,192,267,187,177,176,157,152,159,154,150,146,179,151,247,3054,263,144,143,1695,2210,2206,1224,2194,1185,1220,1733,1292,2704,2713,2326,1819,1294,2855,1370,2129,2055,1206,1279,2138,1149,1169,2180,2188,1895,1232,2244,1372,1481,1781,1827,2097,2101,2104,2120,2126,2142,1257,1483,3134,1485,1296,1388,2832,3095,3140,1344,2772,1347,1397,1402,2158,2160,1391,2824,2995,2354,1394,3004,1342,1701,2710,2727,2731,2735,2753,2767,2827,3183,3316,2734,2730,2933,2944,2968,3065,2172,2252,2226,3037,2121,2232,2881,1270,1174,1531,1539,1555,1563,1565,1569,1571,1573,1581,1585,1593,1595,1597,1775,2146,2164,1909,2246,1315,1697,2897,2900,2934,2978,3086,3089,1703,2719,2925,2928,3011,2152,1358,1360,1424,2292,1609,1715,1273,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599,598,414,361,359,617,518,499,823,822,691,686,683,661,633,484,360,798,791,636,588,510,452,398,487,1063,969,1111,1110,1087,1018,1017,1016,802,1127,1123,1106,804,803,619,363,968,1007,1006,768,767,765,651,648,611,974,958,955,814,875,874,873,862,856,853,846,671,762,1027,1026,718,1115,1029,967,966,1003,999,997,900,899,897,870,869,1120,942,881,1043,471,809,561,590,574,527,622,637,970,827,826,696,688,627,811,1060,1128,1126,711,607,987,1012,959,861,852,836,1099,913,912,824,758,995,909,843,894,893,884,494,799,655,1061,505,739,859,845,842,835,941,528,727,344,488,2,14,7,83,81,75,3,693,596,763,723,625,624,582,580,579,601,597,475,641,640,500,829,828,821,820,770,697,689,685,654,626,470,422,507,692,736,486,1064,715,760,801,1129,1124,1122,1107,713,706,705,476,810,939,938,935,766,673,948,946,994,993,992,880,864,839,833,509,808,807,1114,1030,1028,819,818,1101,1004,1001,898,867,865,751,940,882,1045,514,532,594,593,592,614,971,825,726,1125,937,854,849,840,830,817,886,750,749,943,1067])).
% 14.48/14.41 cnf(3360,plain,
% 14.48/14.41 (P8(x33601,x33601,a1)),
% 14.48/14.41 inference(rename_variables,[],[243])).
% 14.48/14.41 cnf(3363,plain,
% 14.48/14.41 (E(f10(x33631,x33632,a1),f10(x33632,x33631,a1))),
% 14.48/14.41 inference(rename_variables,[],[248])).
% 14.48/14.41 cnf(3364,plain,
% 14.48/14.41 (~P8(f10(f4(a1),f11(a29,f15(a30,a2),a1),a1),f10(f4(a1),f15(f17(f16(a31,a32,a2),a33,a2),a2),a1),a1)),
% 14.48/14.41 inference(scs_inference,[],[269,167,226,264,249,254,259,3275,243,2738,2744,2748,2773,2778,2785,2894,2909,2912,2938,2941,2981,2985,2998,3058,3062,3083,3109,3272,3282,3288,3305,3334,3337,3343,2777,265,2741,2991,2994,2999,3080,3092,3298,3301,3306,145,153,171,175,209,224,266,253,248,3132,3136,268,261,2745,2749,2937,2984,3108,3304,262,222,183,207,251,3061,161,165,184,205,206,244,178,158,169,202,162,170,186,147,257,163,190,193,155,156,173,172,197,160,199,192,267,187,177,176,157,152,159,154,150,146,179,151,247,3054,263,144,143,1695,2210,2206,1224,2194,1185,1220,1733,1292,2704,2713,2326,1819,1294,2855,1370,2129,2055,1206,1279,2138,1149,1169,2180,2188,1895,1232,2244,1372,1481,1781,1827,2097,2101,2104,2120,2126,2142,1257,1483,3134,1485,1296,1388,2832,3095,3140,1344,2772,1347,1397,1402,2158,2160,1391,2824,2995,2354,1394,3004,1342,1701,2710,2727,2731,2735,2753,2767,2827,3183,3316,2734,2730,2933,2944,2968,3065,2172,2252,2226,3037,2121,2232,2881,1270,1174,1531,1539,1555,1563,1565,1569,1571,1573,1581,1585,1593,1595,1597,1775,2146,2164,1909,2246,1315,1697,2897,2900,2934,2978,3086,3089,1703,2719,2925,2928,3011,2152,1358,1360,1424,2292,1609,1715,1273,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599,598,414,361,359,617,518,499,823,822,691,686,683,661,633,484,360,798,791,636,588,510,452,398,487,1063,969,1111,1110,1087,1018,1017,1016,802,1127,1123,1106,804,803,619,363,968,1007,1006,768,767,765,651,648,611,974,958,955,814,875,874,873,862,856,853,846,671,762,1027,1026,718,1115,1029,967,966,1003,999,997,900,899,897,870,869,1120,942,881,1043,471,809,561,590,574,527,622,637,970,827,826,696,688,627,811,1060,1128,1126,711,607,987,1012,959,861,852,836,1099,913,912,824,758,995,909,843,894,893,884,494,799,655,1061,505,739,859,845,842,835,941,528,727,344,488,2,14,7,83,81,75,3,693,596,763,723,625,624,582,580,579,601,597,475,641,640,500,829,828,821,820,770,697,689,685,654,626,470,422,507,692,736,486,1064,715,760,801,1129,1124,1122,1107,713,706,705,476,810,939,938,935,766,673,948,946,994,993,992,880,864,839,833,509,808,807,1114,1030,1028,819,818,1101,1004,1001,898,867,865,751,940,882,1045,514,532,594,593,592,614,971,825,726,1125,937,854,849,840,830,817,886,750,749,943,1067,74,73])).
% 14.48/14.41 cnf(3378,plain,
% 14.48/14.41 (P9(f3(a1),f11(f4(a1),f5(x33781,a1),a1),a1)),
% 14.48/14.41 inference(rename_variables,[],[251])).
% 14.48/14.41 cnf(3383,plain,
% 14.48/14.41 (P8(x33831,x33831,a1)),
% 14.48/14.41 inference(rename_variables,[],[243])).
% 14.48/14.41 cnf(3386,plain,
% 14.48/14.41 (~P9(f10(x33861,x33861,a1),f3(a1),a1)),
% 14.48/14.41 inference(rename_variables,[],[1697])).
% 14.48/14.41 cnf(3408,plain,
% 14.48/14.41 (P8(x34081,x34081,a1)),
% 14.48/14.41 inference(rename_variables,[],[243])).
% 14.48/14.41 cnf(3413,plain,
% 14.48/14.41 (P8(x34131,x34131,a1)),
% 14.48/14.41 inference(rename_variables,[],[243])).
% 14.48/14.41 cnf(3417,plain,
% 14.48/14.41 (P9(f13(f11(f10(x34171,x34171,f27(a1)),f10(f11(f3(f27(a1)),f4(a1),a1),f11(f3(f27(a1)),f4(a1),a1),f27(a1)),f27(a1)),f27(a1)),f3(f27(a1)),f27(a1))),
% 14.48/14.41 inference(scs_inference,[],[269,167,226,264,249,254,259,3275,243,2738,2744,2748,2773,2778,2785,2894,2909,2912,2938,2941,2981,2985,2998,3058,3062,3083,3109,3272,3282,3288,3305,3334,3337,3343,3360,3383,3408,2777,265,2741,2991,2994,2999,3080,3092,3298,3301,3306,145,153,171,175,209,224,266,253,248,3132,3136,268,261,2745,2749,2937,2984,3108,3304,262,222,183,207,251,3061,3378,161,165,184,205,206,244,178,158,169,202,162,170,186,147,257,3350,163,190,193,155,156,173,172,197,160,199,192,267,187,177,176,157,152,159,154,150,146,179,151,247,3054,3077,263,144,143,2258,1695,2210,2206,1224,2194,1185,1220,1733,1292,2704,2713,2326,1819,1294,2855,1370,2129,2300,2055,1206,1279,2138,1149,1169,2180,2188,1895,1232,2244,1372,1481,1781,1827,2097,2101,2104,2120,2126,2142,1257,1483,3134,1485,1296,1388,2832,3095,3140,1344,2772,2776,1347,2752,1397,1402,2158,2160,1391,2824,2995,2354,1394,3004,1342,1188,1701,2710,2727,2731,2735,2753,2767,2827,3183,3316,2734,2730,2933,2944,2968,3065,2148,2172,2252,2226,3037,2121,2232,2881,1270,1174,1531,1539,1555,1563,1565,1569,1571,1573,1581,1585,1593,1595,1597,1775,2146,2164,1909,2246,1315,1697,2897,2900,2934,2978,3086,3089,3285,3386,1703,2719,2925,2928,3011,2152,1358,1360,1424,2292,2358,1609,1715,1273,1238,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599,598,414,361,359,617,518,499,823,822,691,686,683,661,633,484,360,798,791,636,588,510,452,398,487,1063,969,1111,1110,1087,1018,1017,1016,802,1127,1123,1106,804,803,619,363,968,1007,1006,768,767,765,651,648,611,974,958,955,814,875,874,873,862,856,853,846,671,762,1027,1026,718,1115,1029,967,966,1003,999,997,900,899,897,870,869,1120,942,881,1043,471,809,561,590,574,527,622,637,970,827,826,696,688,627,811,1060,1128,1126,711,607,987,1012,959,861,852,836,1099,913,912,824,758,995,909,843,894,893,884,494,799,655,1061,505,739,859,845,842,835,941,528,727,344,488,2,14,7,83,81,75,3,693,596,763,723,625,624,582,580,579,601,597,475,641,640,500,829,828,821,820,770,697,689,685,654,626,470,422,507,692,736,486,1064,715,760,801,1129,1124,1122,1107,713,706,705,476,810,939,938,935,766,673,948,946,994,993,992,880,864,839,833,509,808,807,1114,1030,1028,819,818,1101,1004,1001,898,867,865,751,940,882,1045,514,532,594,593,592,614,971,825,726,1125,937,854,849,840,830,817,886,750,749,943,1067,74,73,517,497,465,795,936,910,850,848,1022,1021,816,466,343,454,1086,656,501,851,847,844,630,634])).
% 14.48/14.41 cnf(3419,plain,
% 14.48/14.41 (P9(f3(f27(a1)),f13(f13(f11(f10(x34191,x34191,f27(a1)),f10(f11(f3(f27(a1)),f4(a1),a1),f11(f3(f27(a1)),f4(a1),a1),f27(a1)),f27(a1)),f27(a1)),f27(a1)),f27(a1))),
% 14.48/14.41 inference(scs_inference,[],[269,167,226,264,249,254,259,3275,243,2738,2744,2748,2773,2778,2785,2894,2909,2912,2938,2941,2981,2985,2998,3058,3062,3083,3109,3272,3282,3288,3305,3334,3337,3343,3360,3383,3408,2777,265,2741,2991,2994,2999,3080,3092,3298,3301,3306,145,153,171,175,209,224,266,253,248,3132,3136,268,261,2745,2749,2937,2984,3108,3304,262,222,183,207,251,3061,3378,161,165,184,205,206,244,178,158,169,202,162,170,186,147,257,3350,163,190,193,155,156,173,172,197,160,199,192,267,187,177,176,157,152,159,154,150,146,179,151,247,3054,3077,263,144,143,2258,1695,2210,2206,1224,2194,1185,1220,1733,1292,2704,2713,2326,1819,1294,2855,1370,2129,2300,2055,1206,1279,2138,1149,1169,2180,2188,1895,1232,2244,1372,1481,1781,1827,2097,2101,2104,2120,2126,2142,1257,1483,3134,1485,1296,1388,2832,3095,3140,1344,2772,2776,1347,2752,1397,1402,2158,2160,1391,2824,2995,2354,1394,3004,1342,1188,1701,2710,2727,2731,2735,2753,2767,2827,3183,3316,2734,2730,2933,2944,2968,3065,2148,2172,2252,2226,3037,2121,2232,2881,1270,1174,1531,1539,1555,1563,1565,1569,1571,1573,1581,1585,1593,1595,1597,1775,2146,2164,1909,2246,1315,1697,2897,2900,2934,2978,3086,3089,3285,3386,1703,2719,2925,2928,3011,2152,1358,1360,1424,2292,2358,1609,1715,1273,1238,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599,598,414,361,359,617,518,499,823,822,691,686,683,661,633,484,360,798,791,636,588,510,452,398,487,1063,969,1111,1110,1087,1018,1017,1016,802,1127,1123,1106,804,803,619,363,968,1007,1006,768,767,765,651,648,611,974,958,955,814,875,874,873,862,856,853,846,671,762,1027,1026,718,1115,1029,967,966,1003,999,997,900,899,897,870,869,1120,942,881,1043,471,809,561,590,574,527,622,637,970,827,826,696,688,627,811,1060,1128,1126,711,607,987,1012,959,861,852,836,1099,913,912,824,758,995,909,843,894,893,884,494,799,655,1061,505,739,859,845,842,835,941,528,727,344,488,2,14,7,83,81,75,3,693,596,763,723,625,624,582,580,579,601,597,475,641,640,500,829,828,821,820,770,697,689,685,654,626,470,422,507,692,736,486,1064,715,760,801,1129,1124,1122,1107,713,706,705,476,810,939,938,935,766,673,948,946,994,993,992,880,864,839,833,509,808,807,1114,1030,1028,819,818,1101,1004,1001,898,867,865,751,940,882,1045,514,532,594,593,592,614,971,825,726,1125,937,854,849,840,830,817,886,750,749,943,1067,74,73,517,497,465,795,936,910,850,848,1022,1021,816,466,343,454,1086,656,501,851,847,844,630,634,628])).
% 14.48/14.41 cnf(3421,plain,
% 14.48/14.41 (~E(f10(f4(a1),f3(a1),a1),f10(f4(a1),f4(a1),a1))),
% 14.48/14.41 inference(scs_inference,[],[269,167,226,264,249,254,259,3275,243,2738,2744,2748,2773,2778,2785,2894,2909,2912,2938,2941,2981,2985,2998,3058,3062,3083,3109,3272,3282,3288,3305,3334,3337,3343,3360,3383,3408,2777,265,2741,2991,2994,2999,3080,3092,3298,3301,3306,145,153,171,175,209,224,266,253,248,3132,3136,268,261,2745,2749,2937,2984,3108,3304,262,222,183,207,251,3061,3378,161,165,184,205,206,244,178,158,169,202,162,170,186,147,257,3350,163,190,193,155,156,173,172,197,160,199,192,267,187,177,176,157,152,159,154,150,146,179,151,247,3054,3077,263,144,143,2258,1695,2210,2206,1224,2194,1185,1220,1733,1292,2704,2713,2326,1819,1294,2855,1370,2129,2300,2055,1206,1279,2138,1149,1169,2180,2188,1895,1232,2244,1372,1481,1781,1827,2097,2101,2104,2120,2126,2142,1257,1483,3134,1485,1296,1388,2832,3095,3140,1344,2772,2776,1347,2752,1397,1402,2158,2160,1391,2824,2995,2354,1394,3004,1342,1188,1701,2710,2727,2731,2735,2753,2767,2827,3183,3316,2734,2730,2933,2944,2968,3065,2148,2172,2252,2226,3037,2121,2232,2881,1270,1174,1531,1539,1555,1563,1565,1569,1571,1573,1581,1585,1593,1595,1597,1775,2146,2164,1909,2246,1315,1697,2897,2900,2934,2978,3086,3089,3285,3386,1703,2719,2925,2928,3011,2152,1358,1360,1424,2292,2358,1609,1715,1273,1238,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599,598,414,361,359,617,518,499,823,822,691,686,683,661,633,484,360,798,791,636,588,510,452,398,487,1063,969,1111,1110,1087,1018,1017,1016,802,1127,1123,1106,804,803,619,363,968,1007,1006,768,767,765,651,648,611,974,958,955,814,875,874,873,862,856,853,846,671,762,1027,1026,718,1115,1029,967,966,1003,999,997,900,899,897,870,869,1120,942,881,1043,471,809,561,590,574,527,622,637,970,827,826,696,688,627,811,1060,1128,1126,711,607,987,1012,959,861,852,836,1099,913,912,824,758,995,909,843,894,893,884,494,799,655,1061,505,739,859,845,842,835,941,528,727,344,488,2,14,7,83,81,75,3,693,596,763,723,625,624,582,580,579,601,597,475,641,640,500,829,828,821,820,770,697,689,685,654,626,470,422,507,692,736,486,1064,715,760,801,1129,1124,1122,1107,713,706,705,476,810,939,938,935,766,673,948,946,994,993,992,880,864,839,833,509,808,807,1114,1030,1028,819,818,1101,1004,1001,898,867,865,751,940,882,1045,514,532,594,593,592,614,971,825,726,1125,937,854,849,840,830,817,886,750,749,943,1067,74,73,517,497,465,795,936,910,850,848,1022,1021,816,466,343,454,1086,656,501,851,847,844,630,634,628,19])).
% 14.48/14.41 cnf(3422,plain,
% 14.48/14.41 (P10(f13(f14(f10(x34221,x34221,a1)),a1),f5(x34221,a1),a1)),
% 14.48/14.41 inference(scs_inference,[],[269,167,226,264,249,254,259,3275,243,2738,2744,2748,2773,2778,2785,2894,2909,2912,2938,2941,2981,2985,2998,3058,3062,3083,3109,3272,3282,3288,3305,3334,3337,3343,3360,3383,3408,2777,265,2741,2991,2994,2999,3080,3092,3298,3301,3306,145,153,171,175,209,224,266,253,248,3132,3136,268,261,2745,2749,2937,2984,3108,3304,262,222,183,207,251,3061,3378,161,165,184,205,206,244,178,158,169,202,162,170,186,147,257,3350,163,190,193,155,156,173,172,197,160,199,192,267,187,177,176,157,152,159,154,150,146,179,151,247,3054,3077,263,144,143,2258,1695,2210,2206,1224,2194,1185,1220,1733,1292,2704,2713,2326,1819,1294,2855,1370,2129,2300,2055,1206,1279,2138,1149,1169,2180,2188,1895,1232,2244,1372,1481,1781,1827,2097,2101,2104,2120,2126,2142,1257,1483,3134,1485,1296,1388,2832,3095,3140,1344,2772,2776,1347,2752,1397,1402,2158,2160,1391,2824,2995,2354,1394,3004,1342,1188,1701,2710,2727,2731,2735,2753,2767,2827,3183,3316,2734,2730,2933,2944,2968,3065,2148,2172,2174,2252,2226,3037,2121,2232,2881,1270,1174,1531,1539,1555,1563,1565,1569,1571,1573,1581,1585,1593,1595,1597,1775,2146,2164,1909,2246,1315,1697,2897,2900,2934,2978,3086,3089,3285,3386,1703,2719,2925,2928,3011,2152,1358,1360,1424,2292,2358,1609,1715,1273,1238,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599,598,414,361,359,617,518,499,823,822,691,686,683,661,633,484,360,798,791,636,588,510,452,398,487,1063,969,1111,1110,1087,1018,1017,1016,802,1127,1123,1106,804,803,619,363,968,1007,1006,768,767,765,651,648,611,974,958,955,814,875,874,873,862,856,853,846,671,762,1027,1026,718,1115,1029,967,966,1003,999,997,900,899,897,870,869,1120,942,881,1043,471,809,561,590,574,527,622,637,970,827,826,696,688,627,811,1060,1128,1126,711,607,987,1012,959,861,852,836,1099,913,912,824,758,995,909,843,894,893,884,494,799,655,1061,505,739,859,845,842,835,941,528,727,344,488,2,14,7,83,81,75,3,693,596,763,723,625,624,582,580,579,601,597,475,641,640,500,829,828,821,820,770,697,689,685,654,626,470,422,507,692,736,486,1064,715,760,801,1129,1124,1122,1107,713,706,705,476,810,939,938,935,766,673,948,946,994,993,992,880,864,839,833,509,808,807,1114,1030,1028,819,818,1101,1004,1001,898,867,865,751,940,882,1045,514,532,594,593,592,614,971,825,726,1125,937,854,849,840,830,817,886,750,749,943,1067,74,73,517,497,465,795,936,910,850,848,1022,1021,816,466,343,454,1086,656,501,851,847,844,630,634,628,19,82])).
% 14.48/14.41 cnf(3426,plain,
% 14.48/14.41 (~P9(f14(f10(x34261,x34261,a1)),f5(x34261,a1),a1)),
% 14.48/14.41 inference(scs_inference,[],[269,167,226,264,249,254,259,3275,243,2738,2744,2748,2773,2778,2785,2894,2909,2912,2938,2941,2981,2985,2998,3058,3062,3083,3109,3272,3282,3288,3305,3334,3337,3343,3360,3383,3408,2777,265,2741,2991,2994,2999,3080,3092,3298,3301,3306,3357,145,153,171,175,209,224,266,253,248,3132,3136,3363,268,261,2745,2749,2937,2984,3108,3304,262,222,183,207,251,3061,3378,161,165,184,205,206,244,178,158,169,202,162,170,186,147,257,3350,163,190,193,155,156,173,172,197,160,199,192,267,187,177,176,157,152,159,154,150,146,179,151,247,3054,3077,263,144,143,2258,2131,1695,2210,2206,1224,2194,1185,1220,1733,1292,2704,2713,2326,1819,1294,2855,1370,2129,2300,2055,1206,1279,2138,1149,1169,2180,2188,1895,1232,2244,1372,1481,1781,1827,2097,2101,2104,2120,2126,2142,1257,1483,3134,1485,1296,1388,2832,3095,3140,1344,2772,2776,1347,2752,1397,1402,2158,2160,1391,2824,2995,2354,1394,3004,1342,1188,1701,2710,2727,2731,2735,2753,2767,2827,3183,3316,2734,2730,2933,2944,2968,3065,2148,2172,2174,2252,2226,3037,2121,2232,2881,1270,1174,1531,1539,1555,1563,1565,1569,1571,1573,1581,1585,1593,1595,1597,1775,2146,2164,1909,2246,1315,1697,2897,2900,2934,2978,3086,3089,3285,3386,1703,2719,2925,2928,3011,2152,1358,1360,1424,2292,2358,1609,1715,1273,1238,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599,598,414,361,359,617,518,499,823,822,691,686,683,661,633,484,360,798,791,636,588,510,452,398,487,1063,969,1111,1110,1087,1018,1017,1016,802,1127,1123,1106,804,803,619,363,968,1007,1006,768,767,765,651,648,611,974,958,955,814,875,874,873,862,856,853,846,671,762,1027,1026,718,1115,1029,967,966,1003,999,997,900,899,897,870,869,1120,942,881,1043,471,809,561,590,574,527,622,637,970,827,826,696,688,627,811,1060,1128,1126,711,607,987,1012,959,861,852,836,1099,913,912,824,758,995,909,843,894,893,884,494,799,655,1061,505,739,859,845,842,835,941,528,727,344,488,2,14,7,83,81,75,3,693,596,763,723,625,624,582,580,579,601,597,475,641,640,500,829,828,821,820,770,697,689,685,654,626,470,422,507,692,736,486,1064,715,760,801,1129,1124,1122,1107,713,706,705,476,810,939,938,935,766,673,948,946,994,993,992,880,864,839,833,509,808,807,1114,1030,1028,819,818,1101,1004,1001,898,867,865,751,940,882,1045,514,532,594,593,592,614,971,825,726,1125,937,854,849,840,830,817,886,750,749,943,1067,74,73,517,497,465,795,936,910,850,848,1022,1021,816,466,343,454,1086,656,501,851,847,844,630,634,628,19,82,71,69])).
% 14.48/14.41 cnf(3427,plain,
% 14.48/14.41 (~P9(x34271,x34271,a1)),
% 14.48/14.41 inference(rename_variables,[],[265])).
% 14.48/14.41 cnf(3428,plain,
% 14.48/14.41 (~P9(f5(x34281,a1),f14(f10(x34281,x34281,a1)),a1)),
% 14.48/14.41 inference(scs_inference,[],[269,167,226,264,249,254,259,3275,243,2738,2744,2748,2773,2778,2785,2894,2909,2912,2938,2941,2981,2985,2998,3058,3062,3083,3109,3272,3282,3288,3305,3334,3337,3343,3360,3383,3408,2777,265,2741,2991,2994,2999,3080,3092,3298,3301,3306,3357,3427,145,153,171,175,209,224,266,253,248,3132,3136,3363,268,261,2745,2749,2937,2984,3108,3304,262,222,183,207,251,3061,3378,161,165,184,205,206,244,178,158,169,202,162,170,186,147,257,3350,163,190,193,155,156,173,172,197,160,199,192,267,187,177,176,157,152,159,154,150,146,179,151,247,3054,3077,263,144,143,2258,2131,1695,2210,2206,1224,2194,1185,1220,1733,1292,2704,2713,2326,1819,1294,2855,1370,2129,2300,2055,1206,1279,2138,1149,1169,2180,2188,1895,1232,2244,1372,1481,1781,1827,2097,2101,2104,2120,2126,2142,1257,1483,3134,1485,1296,1388,2832,3095,3140,1344,2772,2776,1347,2752,1397,1402,2158,2160,1391,2824,2995,2354,1394,3004,1342,1188,1701,2710,2727,2731,2735,2753,2767,2827,3183,3316,2734,2730,2933,2944,2968,3065,2148,2172,2174,2252,2226,3037,2121,2232,2881,1270,1174,1531,1539,1555,1563,1565,1569,1571,1573,1581,1585,1593,1595,1597,1775,2146,2164,1909,2246,1315,1697,2897,2900,2934,2978,3086,3089,3285,3386,1703,2719,2925,2928,3011,2152,1358,1360,1424,2292,2358,1609,1715,1273,1238,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599,598,414,361,359,617,518,499,823,822,691,686,683,661,633,484,360,798,791,636,588,510,452,398,487,1063,969,1111,1110,1087,1018,1017,1016,802,1127,1123,1106,804,803,619,363,968,1007,1006,768,767,765,651,648,611,974,958,955,814,875,874,873,862,856,853,846,671,762,1027,1026,718,1115,1029,967,966,1003,999,997,900,899,897,870,869,1120,942,881,1043,471,809,561,590,574,527,622,637,970,827,826,696,688,627,811,1060,1128,1126,711,607,987,1012,959,861,852,836,1099,913,912,824,758,995,909,843,894,893,884,494,799,655,1061,505,739,859,845,842,835,941,528,727,344,488,2,14,7,83,81,75,3,693,596,763,723,625,624,582,580,579,601,597,475,641,640,500,829,828,821,820,770,697,689,685,654,626,470,422,507,692,736,486,1064,715,760,801,1129,1124,1122,1107,713,706,705,476,810,939,938,935,766,673,948,946,994,993,992,880,864,839,833,509,808,807,1114,1030,1028,819,818,1101,1004,1001,898,867,865,751,940,882,1045,514,532,594,593,592,614,971,825,726,1125,937,854,849,840,830,817,886,750,749,943,1067,74,73,517,497,465,795,936,910,850,848,1022,1021,816,466,343,454,1086,656,501,851,847,844,630,634,628,19,82,71,69,70])).
% 14.48/14.41 cnf(3429,plain,
% 14.48/14.41 (~P9(x34291,x34291,a1)),
% 14.48/14.41 inference(rename_variables,[],[265])).
% 14.48/14.41 cnf(3440,plain,
% 14.48/14.41 (~P8(f10(f11(f7(f3(a1),f34(x34401,x34402),a1),f7(f3(a1),f34(x34401,x34402),a1),a1),f3(a1),a1),f10(f11(f7(f3(a1),f34(x34401,x34402),a1),f7(f3(a1),f34(x34401,x34402),a1),a1),f5(f4(a1),a1),a1),a1)),
% 14.48/14.41 inference(scs_inference,[],[269,167,226,264,249,254,259,3275,243,2738,2744,2748,2773,2778,2785,2894,2909,2912,2938,2941,2981,2985,2998,3058,3062,3083,3109,3272,3282,3288,3305,3334,3337,3343,3360,3383,3408,2777,265,2741,2991,2994,2999,3080,3092,3298,3301,3306,3357,3427,145,153,171,175,209,224,266,253,248,3132,3136,3363,268,261,2745,2749,2937,2984,3108,3304,262,222,183,207,251,3061,3378,161,165,184,205,206,244,178,158,169,202,162,170,186,147,257,3350,163,190,193,155,156,173,172,197,160,199,192,267,187,177,176,157,152,159,154,150,146,179,151,247,3054,3077,263,144,143,2258,1276,2131,1695,2210,2206,1224,2194,1185,1220,1733,1292,2704,2713,2326,1819,1294,2855,1370,2129,2300,2055,1206,1279,2138,1149,1169,2180,2188,1895,1232,2244,1372,1481,1781,1827,2097,2101,2104,2120,2126,2142,1257,1483,3134,1485,1296,1388,2832,3095,3140,1344,2772,2776,1347,2752,1397,1402,2158,2160,1391,2824,2995,2354,1394,3004,1342,1188,1701,2710,2727,2731,2735,2753,2767,2827,3183,3316,2734,2730,2933,2944,2968,3065,2148,2172,2174,2252,2226,3037,2121,2232,2881,1270,1174,1531,1539,1555,1563,1565,1569,1571,1573,1581,1585,1593,1595,1597,1775,2146,2164,1909,2246,1315,1697,2897,2900,2934,2978,3086,3089,3285,3386,1703,2719,2925,2928,3011,2152,1358,1360,1424,2292,2358,1609,1715,1273,1238,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599,598,414,361,359,617,518,499,823,822,691,686,683,661,633,484,360,798,791,636,588,510,452,398,487,1063,969,1111,1110,1087,1018,1017,1016,802,1127,1123,1106,804,803,619,363,968,1007,1006,768,767,765,651,648,611,974,958,955,814,875,874,873,862,856,853,846,671,762,1027,1026,718,1115,1029,967,966,1003,999,997,900,899,897,870,869,1120,942,881,1043,471,809,561,590,574,527,622,637,970,827,826,696,688,627,811,1060,1128,1126,711,607,987,1012,959,861,852,836,1099,913,912,824,758,995,909,843,894,893,884,494,799,655,1061,505,739,859,845,842,835,941,528,727,344,488,2,14,7,83,81,75,3,693,596,763,723,625,624,582,580,579,601,597,475,641,640,500,829,828,821,820,770,697,689,685,654,626,470,422,507,692,736,486,1064,715,760,801,1129,1124,1122,1107,713,706,705,476,810,939,938,935,766,673,948,946,994,993,992,880,864,839,833,509,808,807,1114,1030,1028,819,818,1101,1004,1001,898,867,865,751,940,882,1045,514,532,594,593,592,614,971,825,726,1125,937,854,849,840,830,817,886,750,749,943,1067,74,73,517,497,465,795,936,910,850,848,1022,1021,816,466,343,454,1086,656,501,851,847,844,630,634,628,19,82,71,69,70,2702,2701,553,447,1034,1033])).
% 14.48/14.41 cnf(3447,plain,
% 14.48/14.41 (~P9(x34471,x34471,f11(f10(f7(x34472,x34472,a1),x34473,a1),a1,a1))),
% 14.48/14.41 inference(scs_inference,[],[269,167,226,264,249,254,259,3275,243,2738,2744,2748,2773,2778,2785,2894,2909,2912,2938,2941,2981,2985,2998,3058,3062,3083,3109,3272,3282,3288,3305,3334,3337,3343,3360,3383,3408,2777,265,2741,2991,2994,2999,3080,3092,3298,3301,3306,3357,3427,145,153,171,175,209,224,266,253,248,3132,3136,3363,268,261,2745,2749,2937,2984,3108,3304,262,222,183,207,251,3061,3378,161,165,184,205,206,244,178,158,169,202,162,170,186,147,257,3350,163,190,193,155,156,173,172,197,160,199,192,267,187,177,176,157,152,159,154,150,146,179,151,247,3054,3077,263,144,143,2258,1276,2131,1695,2210,2206,1224,2194,1185,1220,1733,1292,2704,2713,2326,1819,1294,2855,1761,1370,2129,2300,2055,1206,1279,2138,1149,1169,2180,2188,1895,1232,2244,1372,1481,1781,1827,2097,2101,2104,2118,2120,2126,2142,1257,1483,3134,1485,1296,1388,2832,3095,3140,1344,2772,2776,1347,2752,1397,1402,2158,2160,1391,2824,2995,2354,1394,3004,1342,1188,1701,2710,2727,2731,2735,2753,2767,2827,3183,3316,2734,2730,2933,2944,2968,3065,2148,2172,2174,2252,2226,3037,2121,2232,2881,1270,1174,1531,1539,1555,1563,1565,1569,1571,1573,1581,1585,1593,1595,1597,1775,2146,2164,1909,2246,1315,1697,2897,2900,2934,2978,3086,3089,3285,3386,1703,2719,2925,2928,3011,2152,1358,1360,1424,2292,2358,1609,1715,1273,1238,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599,598,414,361,359,617,518,499,823,822,691,686,683,661,633,484,360,798,791,636,588,510,452,398,487,1063,969,1111,1110,1087,1018,1017,1016,802,1127,1123,1106,804,803,619,363,968,1007,1006,768,767,765,651,648,611,974,958,955,814,875,874,873,862,856,853,846,671,762,1027,1026,718,1115,1029,967,966,1003,999,997,900,899,897,870,869,1120,942,881,1043,471,809,561,590,574,527,622,637,970,827,826,696,688,627,811,1060,1128,1126,711,607,987,1012,959,861,852,836,1099,913,912,824,758,995,909,843,894,893,884,494,799,655,1061,505,739,859,845,842,835,941,528,727,344,488,2,14,7,83,81,75,3,693,596,763,723,625,624,582,580,579,601,597,475,641,640,500,829,828,821,820,770,697,689,685,654,626,470,422,507,692,736,486,1064,715,760,801,1129,1124,1122,1107,713,706,705,476,810,939,938,935,766,673,948,946,994,993,992,880,864,839,833,509,808,807,1114,1030,1028,819,818,1101,1004,1001,898,867,865,751,940,882,1045,514,532,594,593,592,614,971,825,726,1125,937,854,849,840,830,817,886,750,749,943,1067,74,73,517,497,465,795,936,910,850,848,1022,1021,816,466,343,454,1086,656,501,851,847,844,630,634,628,19,82,71,69,70,2702,2701,553,447,1034,1033,752,1044,448])).
% 14.48/14.41 cnf(3450,plain,
% 14.48/14.41 (P8(x34501,x34501,a1)),
% 14.48/14.41 inference(rename_variables,[],[243])).
% 14.48/14.41 cnf(3455,plain,
% 14.48/14.41 (P9(f9(f11(f3(a1),f34(x34551,x34552),a1),f11(f4(a1),f4(a1),a1),a1),f34(x34551,x34552),a1)),
% 14.48/14.41 inference(rename_variables,[],[2354])).
% 14.48/14.41 cnf(3458,plain,
% 14.48/14.41 (~P9(f11(f5(x34581,a1),f4(a1),a1),x34581,a1)),
% 14.48/14.41 inference(rename_variables,[],[268])).
% 14.48/14.41 cnf(3461,plain,
% 14.48/14.41 (P8(x34611,f14(f11(f10(x34611,x34611,a1),f10(x34612,x34612,a1),a1)),a1)),
% 14.48/14.41 inference(rename_variables,[],[261])).
% 14.48/14.41 cnf(3486,plain,
% 14.48/14.41 (~P9(x34861,x34861,a1)),
% 14.48/14.41 inference(rename_variables,[],[265])).
% 14.48/14.41 cnf(3489,plain,
% 14.48/14.41 (P8(x34891,x34891,a1)),
% 14.48/14.41 inference(rename_variables,[],[243])).
% 14.48/14.41 cnf(3494,plain,
% 14.48/14.41 (~P9(x34941,x34941,a1)),
% 14.48/14.41 inference(rename_variables,[],[265])).
% 14.48/14.41 cnf(3500,plain,
% 14.48/14.41 (E(x35001,f11(f10(f7(x35002,x35002,a1),x35003,a1),x35001,a1))),
% 14.48/14.41 inference(rename_variables,[],[1292])).
% 14.48/14.41 cnf(3502,plain,
% 14.48/14.41 (E(f11(x35021,x35022,a1),f11(x35022,x35021,a1))),
% 14.48/14.41 inference(rename_variables,[],[1717])).
% 14.48/14.41 cnf(3504,plain,
% 14.48/14.41 (E(x35041,f11(f10(f7(x35042,x35042,a1),x35043,a1),x35041,a1))),
% 14.48/14.41 inference(rename_variables,[],[1292])).
% 14.48/14.41 cnf(3506,plain,
% 14.48/14.41 (E(x35061,f11(f10(f7(x35062,x35062,a1),x35063,a1),x35061,a1))),
% 14.48/14.41 inference(rename_variables,[],[1292])).
% 14.48/14.41 cnf(3508,plain,
% 14.48/14.41 (E(x35081,f11(f10(f7(x35082,x35082,a1),x35083,a1),x35081,a1))),
% 14.48/14.41 inference(rename_variables,[],[1292])).
% 14.48/14.41 cnf(3510,plain,
% 14.48/14.41 (E(f11(x35101,x35102,a1),f11(x35102,x35101,a1))),
% 14.48/14.41 inference(rename_variables,[],[1717])).
% 14.48/14.41 cnf(3512,plain,
% 14.48/14.41 (E(x35121,f11(f10(f7(x35122,x35122,a1),x35123,a1),x35121,a1))),
% 14.48/14.41 inference(rename_variables,[],[1292])).
% 14.48/14.41 cnf(3514,plain,
% 14.48/14.41 (E(f11(x35141,x35142,a1),f11(x35142,x35141,a1))),
% 14.48/14.41 inference(rename_variables,[],[1717])).
% 14.48/14.41 cnf(3516,plain,
% 14.48/14.41 (E(x35161,f11(f10(f7(x35162,x35162,a1),x35163,a1),x35161,a1))),
% 14.48/14.41 inference(rename_variables,[],[1292])).
% 14.48/14.41 cnf(3518,plain,
% 14.48/14.41 (E(f11(x35181,x35182,a1),f11(x35182,x35181,a1))),
% 14.48/14.41 inference(rename_variables,[],[1717])).
% 14.48/14.41 cnf(3520,plain,
% 14.48/14.41 (E(x35201,f11(f10(f7(x35202,x35202,a1),x35203,a1),x35201,a1))),
% 14.48/14.41 inference(rename_variables,[],[1292])).
% 14.48/14.41 cnf(3522,plain,
% 14.48/14.41 (E(x35221,f11(f10(f7(x35222,x35222,a1),x35223,a1),x35221,a1))),
% 14.48/14.41 inference(rename_variables,[],[1292])).
% 14.48/14.41 cnf(3524,plain,
% 14.48/14.41 (E(f11(x35241,x35242,a1),f11(x35242,x35241,a1))),
% 14.48/14.41 inference(rename_variables,[],[1717])).
% 14.48/14.41 cnf(3526,plain,
% 14.48/14.41 (E(f11(x35261,x35262,a1),f11(x35262,x35261,a1))),
% 14.48/14.41 inference(rename_variables,[],[1717])).
% 14.48/14.41 cnf(3528,plain,
% 14.48/14.41 (E(f11(x35281,x35282,a1),f11(x35282,x35281,a1))),
% 14.48/14.41 inference(rename_variables,[],[1717])).
% 14.48/14.41 cnf(3530,plain,
% 14.48/14.41 (E(f11(x35301,x35302,a1),f11(x35302,x35301,a1))),
% 14.48/14.41 inference(rename_variables,[],[1717])).
% 14.48/14.41 cnf(3531,plain,
% 14.48/14.41 (P6(f11(f10(f7(x35311,x35311,a1),x35312,a1),a2,a1))),
% 14.48/14.41 inference(scs_inference,[],[269,167,189,201,203,213,226,236,264,249,254,259,3275,243,2738,2744,2748,2773,2778,2785,2894,2909,2912,2938,2941,2981,2985,2998,3058,3062,3083,3109,3272,3282,3288,3305,3334,3337,3343,3360,3383,3408,3413,3450,2777,265,2741,2991,2994,2999,3080,3092,3298,3301,3306,3357,3427,3429,3486,145,153,171,175,209,224,266,253,248,3132,3136,3363,268,3458,261,2745,2749,2937,2984,3108,3304,3340,262,222,183,207,251,3061,3378,161,165,184,198,205,206,244,178,158,169,202,162,170,186,147,257,3350,163,190,193,155,156,173,172,197,160,199,192,267,187,177,176,157,152,159,154,150,146,179,151,247,3054,3077,263,144,143,2258,1276,2131,1695,2210,2206,1224,2194,1185,1220,1733,1292,2704,2713,3138,3500,3504,3506,3508,3512,3516,3520,3522,2326,1819,1294,2855,1761,1370,2129,1717,3502,3510,3514,3518,3524,3526,3528,2300,2055,1206,1279,2138,1149,1169,2180,2188,1895,1232,2244,1372,1481,1781,1827,2070,2079,2085,2090,2096,2097,2098,2101,2102,2103,2104,2118,2120,2126,2142,1257,1483,3134,1485,1296,1388,2832,3095,3140,1344,2772,2776,1347,2752,1397,1402,2158,2160,1391,2824,2995,2354,3455,1394,3004,1342,1140,1188,1701,2710,2727,2731,2735,2753,2767,2827,3183,3316,2734,2730,2933,2944,2968,3065,2148,2172,2174,1711,2252,2226,3037,2121,2232,2881,1270,1174,1176,1531,1539,1555,1563,1565,1569,1571,1573,1581,1585,1593,1595,1597,1775,1805,2146,2164,1909,2246,1315,1697,2897,2900,2934,2978,3086,3089,3285,3386,1703,2719,2925,2928,3011,2152,1358,1360,1424,2356,2292,2358,1609,1715,3066,1273,1238,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599,598,414,361,359,617,518,499,823,822,691,686,683,661,633,484,360,798,791,636,588,510,452,398,487,1063,969,1111,1110,1087,1018,1017,1016,802,1127,1123,1106,804,803,619,363,968,1007,1006,768,767,765,651,648,611,974,958,955,814,875,874,873,862,856,853,846,671,762,1027,1026,718,1115,1029,967,966,1003,999,997,900,899,897,870,869,1120,942,881,1043,471,809,561,590,574,527,622,637,970,827,826,696,688,627,811,1060,1128,1126,711,607,987,1012,959,861,852,836,1099,913,912,824,758,995,909,843,894,893,884,494,799,655,1061,505,739,859,845,842,835,941,528,727,344,488,2,14,7,83,81,75,3,693,596,763,723,625,624,582,580,579,601,597,475,641,640,500,829,828,821,820,770,697,689,685,654,626,470,422,507,692,736,486,1064,715,760,801,1129,1124,1122,1107,713,706,705,476,810,939,938,935,766,673,948,946,994,993,992,880,864,839,833,509,808,807,1114,1030,1028,819,818,1101,1004,1001,898,867,865,751,940,882,1045,514,532,594,593,592,614,971,825,726,1125,937,854,849,840,830,817,886,750,749,943,1067,74,73,517,497,465,795,936,910,850,848,1022,1021,816,466,343,454,1086,656,501,851,847,844,630,634,628,19,82,71,69,70,2702,2701,553,447,1034,1033,752,1044,448,1091,773,748,774,747,1038,1036,1035,576,340,397,757,677,885,616,712,1097,1024,707,534,138,137,135,131,130,127,123,121,118,115,112,111,108,106,102,101,100])).
% 14.48/14.41 cnf(3532,plain,
% 14.48/14.41 (E(x35321,f11(f10(f7(x35322,x35322,a1),x35323,a1),x35321,a1))),
% 14.48/14.41 inference(rename_variables,[],[1292])).
% 14.48/14.41 cnf(3534,plain,
% 14.48/14.41 (E(f11(x35341,x35342,a1),f11(x35342,x35341,a1))),
% 14.48/14.41 inference(rename_variables,[],[1717])).
% 14.48/14.41 cnf(3536,plain,
% 14.48/14.41 (E(f11(x35361,x35362,a1),f11(x35362,x35361,a1))),
% 14.48/14.41 inference(rename_variables,[],[1717])).
% 14.48/14.41 cnf(3538,plain,
% 14.48/14.41 (E(x35381,f11(f10(f7(x35382,x35382,a1),x35383,a1),x35381,a1))),
% 14.48/14.41 inference(rename_variables,[],[1292])).
% 14.48/14.41 cnf(3540,plain,
% 14.48/14.41 (E(f11(x35401,x35402,a1),f11(x35402,x35401,a1))),
% 14.48/14.41 inference(rename_variables,[],[1717])).
% 14.48/14.41 cnf(3542,plain,
% 14.48/14.41 (E(x35421,f11(f10(f7(x35422,x35422,a1),x35423,a1),x35421,a1))),
% 14.48/14.41 inference(rename_variables,[],[1292])).
% 14.48/14.41 cnf(3544,plain,
% 14.48/14.41 (E(f11(x35441,x35442,a1),f11(x35442,x35441,a1))),
% 14.48/14.41 inference(rename_variables,[],[1717])).
% 14.48/14.41 cnf(3546,plain,
% 14.48/14.41 (E(x35461,f11(f10(f7(x35462,x35462,a1),x35463,a1),x35461,a1))),
% 14.48/14.41 inference(rename_variables,[],[1292])).
% 14.48/14.41 cnf(3548,plain,
% 14.48/14.41 (E(f11(x35481,x35482,a1),f11(x35482,x35481,a1))),
% 14.48/14.41 inference(rename_variables,[],[1717])).
% 14.48/14.41 cnf(3550,plain,
% 14.48/14.41 (E(x35501,f11(f10(f7(x35502,x35502,a1),x35503,a1),x35501,a1))),
% 14.48/14.41 inference(rename_variables,[],[1292])).
% 14.48/14.41 cnf(3552,plain,
% 14.48/14.41 (E(f11(x35521,x35522,a1),f11(x35522,x35521,a1))),
% 14.48/14.41 inference(rename_variables,[],[1717])).
% 14.48/14.41 cnf(3554,plain,
% 14.48/14.41 (E(f11(x35541,x35542,a1),f11(x35542,x35541,a1))),
% 14.48/14.41 inference(rename_variables,[],[1717])).
% 14.48/14.41 cnf(3556,plain,
% 14.48/14.41 (E(x35561,f11(f10(f7(x35562,x35562,a1),x35563,a1),x35561,a1))),
% 14.48/14.41 inference(rename_variables,[],[1292])).
% 14.48/14.41 cnf(3559,plain,
% 14.48/14.41 (E(f11(f7(f11(x35591,x35592,a1),f11(x35591,x35593,a1),a1),x35593,a1),x35592)),
% 14.48/14.41 inference(scs_inference,[],[269,164,167,189,201,203,213,226,236,264,249,254,259,3275,243,2738,2744,2748,2773,2778,2785,2894,2909,2912,2938,2941,2981,2985,2998,3058,3062,3083,3109,3272,3282,3288,3305,3334,3337,3343,3360,3383,3408,3413,3450,2777,265,2741,2991,2994,2999,3080,3092,3298,3301,3306,3357,3427,3429,3486,145,153,171,175,209,224,266,253,248,3132,3136,3363,268,3458,261,2745,2749,2937,2984,3108,3304,3340,262,222,183,207,251,3061,3378,161,165,184,198,205,206,244,178,158,169,202,162,170,186,147,257,3350,163,190,193,155,156,173,172,197,160,199,192,267,187,177,174,176,157,152,159,154,150,146,179,151,247,3054,3077,263,144,143,2258,1276,2131,1695,2210,2206,1224,2194,1185,1220,1733,1705,1292,2704,2713,3138,3500,3504,3506,3508,3512,3516,3520,3522,3532,3538,3542,3546,3550,2326,1819,1294,2855,1761,1370,2129,1717,3502,3510,3514,3518,3524,3526,3528,3530,3534,3536,3540,3544,3548,3552,2300,2055,1206,1279,2138,1149,1169,2180,2188,1895,1232,2244,1372,1481,1781,1827,2070,2079,2085,2090,2096,2097,2098,2101,2102,2103,2104,2105,2106,2110,2112,2116,2118,2119,2120,2125,2126,2142,1257,1483,3134,1485,1296,1388,2832,3095,3140,1344,2772,2776,1347,2752,1397,1402,2158,2160,1391,2824,2995,2354,3455,1394,3004,1342,1140,1188,1701,2710,2727,2731,2735,2753,2767,2827,3183,3316,2734,2730,2933,2944,2968,3065,2148,2172,2174,1711,2252,2226,3037,2121,2232,2881,1270,1174,1176,1531,1539,1555,1563,1565,1569,1571,1573,1581,1585,1593,1595,1597,1775,1805,2146,2164,1909,2246,1315,1697,2897,2900,2934,2978,3086,3089,3285,3386,1703,2719,2925,2928,3011,2152,1358,1360,1424,2356,2292,2358,1609,1715,3066,1273,1238,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599,598,414,361,359,617,518,499,823,822,691,686,683,661,633,484,360,798,791,636,588,510,452,398,487,1063,969,1111,1110,1087,1018,1017,1016,802,1127,1123,1106,804,803,619,363,968,1007,1006,768,767,765,651,648,611,974,958,955,814,875,874,873,862,856,853,846,671,762,1027,1026,718,1115,1029,967,966,1003,999,997,900,899,897,870,869,1120,942,881,1043,471,809,561,590,574,527,622,637,970,827,826,696,688,627,811,1060,1128,1126,711,607,987,1012,959,861,852,836,1099,913,912,824,758,995,909,843,894,893,884,494,799,655,1061,505,739,859,845,842,835,941,528,727,344,488,2,14,7,83,81,75,3,693,596,763,723,625,624,582,580,579,601,597,475,641,640,500,829,828,821,820,770,697,689,685,654,626,470,422,507,692,736,486,1064,715,760,801,1129,1124,1122,1107,713,706,705,476,810,939,938,935,766,673,948,946,994,993,992,880,864,839,833,509,808,807,1114,1030,1028,819,818,1101,1004,1001,898,867,865,751,940,882,1045,514,532,594,593,592,614,971,825,726,1125,937,854,849,840,830,817,886,750,749,943,1067,74,73,517,497,465,795,936,910,850,848,1022,1021,816,466,343,454,1086,656,501,851,847,844,630,634,628,19,82,71,69,70,2702,2701,553,447,1034,1033,752,1044,448,1091,773,748,774,747,1038,1036,1035,576,340,397,757,677,885,616,712,1097,1024,707,534,138,137,135,131,130,127,123,121,118,115,112,111,108,106,102,101,100,99,98,97,94,93,92,90,88,87,85,79,72,529,901])).
% 14.48/14.41 cnf(3570,plain,
% 14.48/14.41 (E(f11(x35701,x35702,a1),f11(x35702,x35701,a1))),
% 14.48/14.41 inference(rename_variables,[],[1717])).
% 14.48/14.41 cnf(3571,plain,
% 14.48/14.41 (~P8(f11(x35711,f4(a1),a1),x35711,a1)),
% 14.48/14.41 inference(scs_inference,[],[269,164,167,189,201,203,213,226,236,264,249,254,259,3275,243,2738,2744,2748,2773,2778,2785,2894,2909,2912,2938,2941,2981,2985,2998,3058,3062,3083,3109,3272,3282,3288,3305,3334,3337,3343,3360,3383,3408,3413,3450,3489,2777,265,2741,2991,2994,2999,3080,3092,3298,3301,3306,3357,3427,3429,3486,3494,145,153,171,175,209,224,266,253,248,3132,3136,3363,268,3458,261,2745,2749,2937,2984,3108,3304,3340,3461,262,222,183,204,207,251,3061,3378,161,165,184,198,205,206,244,178,158,169,202,162,170,186,147,257,3350,163,190,193,155,156,173,172,197,160,199,192,267,187,177,174,176,157,152,159,154,150,146,179,151,247,3054,3077,263,144,143,2258,1276,2131,1695,2210,2206,1224,2194,1185,1220,1733,1705,1292,2704,2713,3138,3500,3504,3506,3508,3512,3516,3520,3522,3532,3538,3542,3546,3550,2326,1819,1294,2855,1761,1370,2129,1717,3502,3510,3514,3518,3524,3526,3528,3530,3534,3536,3540,3544,3548,3552,3554,2300,2055,1206,1279,2138,1149,1169,2180,2188,1895,1232,2244,1372,1481,1781,1827,2070,2079,2085,2090,2096,2097,2098,2101,2102,2103,2104,2105,2106,2110,2112,2116,2118,2119,2120,2125,2126,2142,1257,1483,3134,1485,1296,1388,2832,3095,3140,1344,2772,2776,1347,2752,1397,1402,2158,2160,1391,2824,2995,2354,3455,1394,3004,1342,1140,1188,1701,2710,2727,2731,2735,2753,2767,2827,3183,3316,2734,2730,2933,2944,2968,3065,2148,2172,2174,1711,2252,2226,3037,2121,2232,2881,1270,1174,1176,1531,1539,1555,1563,1565,1569,1571,1573,1581,1585,1593,1595,1597,1775,1805,2146,2164,1909,2246,1315,1697,2897,2900,2934,2978,3086,3089,3285,3386,1703,2719,2925,2928,3011,2152,1358,1360,1424,2356,2292,2358,1609,1715,3066,2242,1273,1238,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599,598,414,361,359,617,518,499,823,822,691,686,683,661,633,484,360,798,791,636,588,510,452,398,487,1063,969,1111,1110,1087,1018,1017,1016,802,1127,1123,1106,804,803,619,363,968,1007,1006,768,767,765,651,648,611,974,958,955,814,875,874,873,862,856,853,846,671,762,1027,1026,718,1115,1029,967,966,1003,999,997,900,899,897,870,869,1120,942,881,1043,471,809,561,590,574,527,622,637,970,827,826,696,688,627,811,1060,1128,1126,711,607,987,1012,959,861,852,836,1099,913,912,824,758,995,909,843,894,893,884,494,799,655,1061,505,739,859,845,842,835,941,528,727,344,488,2,14,7,83,81,75,3,693,596,763,723,625,624,582,580,579,601,597,475,641,640,500,829,828,821,820,770,697,689,685,654,626,470,422,507,692,736,486,1064,715,760,801,1129,1124,1122,1107,713,706,705,476,810,939,938,935,766,673,948,946,994,993,992,880,864,839,833,509,808,807,1114,1030,1028,819,818,1101,1004,1001,898,867,865,751,940,882,1045,514,532,594,593,592,614,971,825,726,1125,937,854,849,840,830,817,886,750,749,943,1067,74,73,517,497,465,795,936,910,850,848,1022,1021,816,466,343,454,1086,656,501,851,847,844,630,634,628,19,82,71,69,70,2702,2701,553,447,1034,1033,752,1044,448,1091,773,748,774,747,1038,1036,1035,576,340,397,757,677,885,616,712,1097,1024,707,534,138,137,135,131,130,127,123,121,118,115,112,111,108,106,102,101,100,99,98,97,94,93,92,90,88,87,85,79,72,529,901,472,957,949,86,708])).
% 14.48/14.41 cnf(3572,plain,
% 14.48/14.41 (~P9(x35721,x35721,a1)),
% 14.48/14.41 inference(rename_variables,[],[265])).
% 14.48/14.41 cnf(3575,plain,
% 14.48/14.41 (~P9(x35751,x35751,a1)),
% 14.48/14.41 inference(rename_variables,[],[265])).
% 14.48/14.41 cnf(3580,plain,
% 14.48/14.41 (P9(f3(f27(a1)),f5(f11(f3(f27(a1)),f4(a1),a1),f27(a1)),f27(a1))),
% 14.48/14.41 inference(scs_inference,[],[269,164,167,189,201,203,213,226,236,264,249,254,259,3275,243,2738,2744,2748,2773,2778,2785,2894,2909,2912,2938,2941,2981,2985,2998,3058,3062,3083,3109,3272,3282,3288,3305,3334,3337,3343,3360,3383,3408,3413,3450,3489,2777,265,2741,2991,2994,2999,3080,3092,3298,3301,3306,3357,3427,3429,3486,3494,3572,145,153,171,175,209,224,266,253,248,3132,3136,3363,268,3458,261,2745,2749,2937,2984,3108,3304,3340,3461,262,222,183,204,207,251,3061,3378,161,165,184,198,205,206,244,178,158,169,202,162,170,186,147,257,3350,163,190,193,155,156,173,172,197,160,199,192,267,187,177,174,176,157,152,159,154,150,146,179,151,247,3054,3077,263,144,143,2258,1276,2131,1695,2210,2206,1224,2194,1185,1220,1733,1705,1292,2704,2713,3138,3500,3504,3506,3508,3512,3516,3520,3522,3532,3538,3542,3546,3550,2326,1819,1294,2855,1761,1370,2129,1717,3502,3510,3514,3518,3524,3526,3528,3530,3534,3536,3540,3544,3548,3552,3554,2300,2055,1206,1279,2138,1149,1169,2180,2188,1895,1232,2244,1372,1481,1781,1827,2070,2079,2085,2090,2096,2097,2098,2101,2102,2103,2104,2105,2106,2110,2112,2116,2118,2119,2120,2125,2126,2142,1257,1483,3134,1485,1296,1388,2832,3095,3140,1344,2772,2776,1347,2752,1397,1402,2158,2160,1391,2824,2995,2354,3455,1394,3004,1342,1140,1188,1701,2710,2727,2731,2735,2753,2767,2827,3183,3316,2734,2730,2933,2944,2968,3065,2148,2172,2174,1711,2252,2226,3037,2121,2232,2881,1270,1174,1176,1531,1539,1555,1563,1565,1569,1571,1573,1581,1585,1593,1595,1597,1775,1805,2146,2164,1909,2246,1315,1697,2897,2900,2934,2978,3086,3089,3285,3386,1703,2719,2925,2928,3011,3045,2152,1358,1360,1424,2356,2292,2358,1609,1715,3066,2242,1273,1238,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599,598,414,361,359,617,518,499,823,822,691,686,683,661,633,484,360,798,791,636,588,510,452,398,487,1063,969,1111,1110,1087,1018,1017,1016,802,1127,1123,1106,804,803,619,363,968,1007,1006,768,767,765,651,648,611,974,958,955,814,875,874,873,862,856,853,846,671,762,1027,1026,718,1115,1029,967,966,1003,999,997,900,899,897,870,869,1120,942,881,1043,471,809,561,590,574,527,622,637,970,827,826,696,688,627,811,1060,1128,1126,711,607,987,1012,959,861,852,836,1099,913,912,824,758,995,909,843,894,893,884,494,799,655,1061,505,739,859,845,842,835,941,528,727,344,488,2,14,7,83,81,75,3,693,596,763,723,625,624,582,580,579,601,597,475,641,640,500,829,828,821,820,770,697,689,685,654,626,470,422,507,692,736,486,1064,715,760,801,1129,1124,1122,1107,713,706,705,476,810,939,938,935,766,673,948,946,994,993,992,880,864,839,833,509,808,807,1114,1030,1028,819,818,1101,1004,1001,898,867,865,751,940,882,1045,514,532,594,593,592,614,971,825,726,1125,937,854,849,840,830,817,886,750,749,943,1067,74,73,517,497,465,795,936,910,850,848,1022,1021,816,466,343,454,1086,656,501,851,847,844,630,634,628,19,82,71,69,70,2702,2701,553,447,1034,1033,752,1044,448,1091,773,748,774,747,1038,1036,1035,576,340,397,757,677,885,616,712,1097,1024,707,534,138,137,135,131,130,127,123,121,118,115,112,111,108,106,102,101,100,99,98,97,94,93,92,90,88,87,85,79,72,529,901,472,957,949,86,708,709,540,461])).
% 14.48/14.41 cnf(3584,plain,
% 14.48/14.41 (~P9(x35841,x35841,a1)),
% 14.48/14.41 inference(rename_variables,[],[265])).
% 14.48/14.41 cnf(3589,plain,
% 14.48/14.41 (~E(f13(f11(f3(f27(a1)),f4(a1),a1),f27(a1)),f3(f27(a1)))),
% 14.48/14.41 inference(scs_inference,[],[269,164,167,189,201,203,213,226,236,264,249,254,259,3275,243,2738,2744,2748,2773,2778,2785,2894,2909,2912,2938,2941,2981,2985,2998,3058,3062,3083,3109,3272,3282,3288,3305,3334,3337,3343,3360,3383,3408,3413,3450,3489,2777,265,2741,2991,2994,2999,3080,3092,3298,3301,3306,3357,3427,3429,3486,3494,3572,3575,3584,145,153,171,175,209,224,266,253,248,3132,3136,3363,268,3458,261,2745,2749,2937,2984,3108,3304,3340,3461,262,222,183,204,207,251,3061,3378,161,165,184,198,205,206,244,178,158,169,202,162,170,186,147,257,3350,163,190,193,155,156,173,172,197,160,199,192,267,187,177,174,176,157,152,159,154,150,146,179,151,247,3054,3077,263,144,143,2258,1276,2131,1695,2210,2206,1224,2194,1185,1220,1733,1705,1292,2704,2713,3138,3500,3504,3506,3508,3512,3516,3520,3522,3532,3538,3542,3546,3550,2326,1819,1294,2855,1761,1370,2129,1717,3502,3510,3514,3518,3524,3526,3528,3530,3534,3536,3540,3544,3548,3552,3554,2300,2055,1206,1279,2138,1149,1169,2180,2188,1895,1232,2244,1372,1481,1781,1827,2070,2079,2085,2090,2096,2097,2098,2101,2102,2103,2104,2105,2106,2110,2112,2116,2118,2119,2120,2125,2126,2142,1257,1483,3134,1485,1296,1388,2832,3095,3140,1344,2772,2776,1347,2752,1397,1402,2158,2160,1391,2824,2995,2354,3455,1394,3004,1342,1140,1188,1701,2710,2727,2731,2735,2753,2767,2827,3183,3316,2734,2730,2933,2944,2968,3065,2148,2172,2174,1711,2252,2226,3037,2121,2232,2881,1270,1174,1176,1531,1539,1555,1563,1565,1569,1571,1573,1581,1585,1587,1593,1595,1597,1775,1805,2146,2164,1909,2246,1315,1697,2897,2900,2934,2978,3086,3089,3285,3386,1703,2719,2925,2928,3011,3045,2152,1358,1360,1424,2356,2292,2358,1609,1715,3066,2242,1273,1238,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599,598,414,361,359,617,518,499,823,822,691,686,683,661,633,484,360,798,791,636,588,510,452,398,487,1063,969,1111,1110,1087,1018,1017,1016,802,1127,1123,1106,804,803,619,363,968,1007,1006,768,767,765,651,648,611,974,958,955,814,875,874,873,862,856,853,846,671,762,1027,1026,718,1115,1029,967,966,1003,999,997,900,899,897,870,869,1120,942,881,1043,471,809,561,590,574,527,622,637,970,827,826,696,688,627,811,1060,1128,1126,711,607,987,1012,959,861,852,836,1099,913,912,824,758,995,909,843,894,893,884,494,799,655,1061,505,739,859,845,842,835,941,528,727,344,488,2,14,7,83,81,75,3,693,596,763,723,625,624,582,580,579,601,597,475,641,640,500,829,828,821,820,770,697,689,685,654,626,470,422,507,692,736,486,1064,715,760,801,1129,1124,1122,1107,713,706,705,476,810,939,938,935,766,673,948,946,994,993,992,880,864,839,833,509,808,807,1114,1030,1028,819,818,1101,1004,1001,898,867,865,751,940,882,1045,514,532,594,593,592,614,971,825,726,1125,937,854,849,840,830,817,886,750,749,943,1067,74,73,517,497,465,795,936,910,850,848,1022,1021,816,466,343,454,1086,656,501,851,847,844,630,634,628,19,82,71,69,70,2702,2701,553,447,1034,1033,752,1044,448,1091,773,748,774,747,1038,1036,1035,576,340,397,757,677,885,616,712,1097,1024,707,534,138,137,135,131,130,127,123,121,118,115,112,111,108,106,102,101,100,99,98,97,94,93,92,90,88,87,85,79,72,529,901,472,957,949,86,708,709,540,461,883,710,345])).
% 14.48/14.41 cnf(3592,plain,
% 14.48/14.41 (E(x35921,f11(f10(f7(x35922,x35922,a1),x35923,a1),x35921,a1))),
% 14.48/14.41 inference(rename_variables,[],[1292])).
% 14.48/14.41 cnf(3594,plain,
% 14.48/14.41 (E(x35941,f11(f10(f7(x35942,x35942,a1),x35943,a1),x35941,a1))),
% 14.48/14.41 inference(rename_variables,[],[1292])).
% 14.48/14.41 cnf(3596,plain,
% 14.48/14.41 (E(x35961,f11(f10(f7(x35962,x35962,a1),x35963,a1),x35961,a1))),
% 14.48/14.41 inference(rename_variables,[],[1292])).
% 14.48/14.41 cnf(3598,plain,
% 14.48/14.41 (E(x35981,f11(f10(f7(x35982,x35982,a1),x35983,a1),x35981,a1))),
% 14.48/14.41 inference(rename_variables,[],[1292])).
% 14.48/14.41 cnf(3600,plain,
% 14.48/14.41 (E(x36001,f11(f10(f7(x36002,x36002,a1),x36003,a1),x36001,a1))),
% 14.48/14.41 inference(rename_variables,[],[1292])).
% 14.48/14.41 cnf(3602,plain,
% 14.48/14.41 (E(f11(x36021,x36022,a1),f11(x36022,x36021,a1))),
% 14.48/14.41 inference(rename_variables,[],[1717])).
% 14.48/14.41 cnf(3604,plain,
% 14.48/14.41 (E(f11(x36041,x36042,a1),f11(x36042,x36041,a1))),
% 14.48/14.41 inference(rename_variables,[],[1717])).
% 14.48/14.41 cnf(3606,plain,
% 14.48/14.41 (E(f11(x36061,x36062,a1),f11(x36062,x36061,a1))),
% 14.48/14.41 inference(rename_variables,[],[1717])).
% 14.48/14.41 cnf(3608,plain,
% 14.48/14.41 (E(x36081,f11(f10(f7(x36082,x36082,a1),x36083,a1),x36081,a1))),
% 14.48/14.41 inference(rename_variables,[],[1292])).
% 14.48/14.41 cnf(3610,plain,
% 14.48/14.41 (E(f11(x36101,x36102,a1),f11(x36102,x36101,a1))),
% 14.48/14.41 inference(rename_variables,[],[1717])).
% 14.48/14.41 cnf(3612,plain,
% 14.48/14.41 (E(x36121,f11(f10(f7(x36122,x36122,a1),x36123,a1),x36121,a1))),
% 14.48/14.41 inference(rename_variables,[],[1292])).
% 14.48/14.41 cnf(3614,plain,
% 14.48/14.41 (E(f11(x36141,x36142,a1),f11(x36142,x36141,a1))),
% 14.48/14.41 inference(rename_variables,[],[1717])).
% 14.48/14.41 cnf(3616,plain,
% 14.48/14.41 (E(f11(x36161,x36162,a1),f11(x36162,x36161,a1))),
% 14.48/14.41 inference(rename_variables,[],[1717])).
% 14.48/14.41 cnf(3618,plain,
% 14.48/14.41 (E(f11(x36181,x36182,a1),f11(x36182,x36181,a1))),
% 14.48/14.41 inference(rename_variables,[],[1717])).
% 14.48/14.41 cnf(3620,plain,
% 14.48/14.41 (E(f11(x36201,x36202,a1),f11(x36202,x36201,a1))),
% 14.48/14.41 inference(rename_variables,[],[1717])).
% 14.48/14.41 cnf(3622,plain,
% 14.48/14.41 (E(f11(x36221,x36222,a1),f11(x36222,x36221,a1))),
% 14.48/14.41 inference(rename_variables,[],[1717])).
% 14.48/14.41 cnf(3624,plain,
% 14.48/14.41 (E(x36241,f11(f10(f7(x36242,x36242,a1),x36243,a1),x36241,a1))),
% 14.48/14.41 inference(rename_variables,[],[1292])).
% 14.48/14.41 cnf(3626,plain,
% 14.48/14.41 (E(x36261,f11(f10(f7(x36262,x36262,a1),x36263,a1),x36261,a1))),
% 14.48/14.41 inference(rename_variables,[],[1292])).
% 14.48/14.41 cnf(3629,plain,
% 14.48/14.41 (P50(f11(f10(f7(x36291,x36291,a1),x36292,a1),a2,a1))),
% 14.48/14.41 inference(scs_inference,[],[269,164,167,181,185,189,201,203,213,219,221,226,228,232,236,238,240,264,249,254,259,3275,243,2738,2744,2748,2773,2778,2785,2894,2909,2912,2938,2941,2981,2985,2998,3058,3062,3083,3109,3272,3282,3288,3305,3334,3337,3343,3360,3383,3408,3413,3450,3489,2777,265,2741,2991,2994,2999,3080,3092,3298,3301,3306,3357,3427,3429,3486,3494,3572,3575,3584,145,153,171,175,209,224,266,253,248,3132,3136,3363,268,3458,261,2745,2749,2937,2984,3108,3304,3340,3461,262,222,183,204,207,251,3061,3378,161,165,184,198,205,206,244,178,158,169,202,162,170,186,147,257,3350,163,190,193,155,156,173,172,197,160,199,192,267,187,177,174,176,157,152,159,154,150,146,179,151,247,3054,3077,263,144,143,2258,1276,2131,1695,2210,2206,1224,2194,1185,1220,1733,1705,1292,2704,2713,3138,3500,3504,3506,3508,3512,3516,3520,3522,3532,3538,3542,3546,3550,3556,3592,3594,3596,3598,3600,3608,3612,3624,3626,2326,1819,1294,2855,1761,1370,2129,1717,3502,3510,3514,3518,3524,3526,3528,3530,3534,3536,3540,3544,3548,3552,3554,3570,3602,3604,3606,3610,3614,3616,3618,3620,3622,2300,2055,1206,1279,2138,1149,1169,2180,2188,1895,1232,2244,1372,1481,1781,1827,2070,2073,2077,2079,2080,2082,2084,2085,2086,2087,2089,2090,2095,2096,2097,2098,2101,2102,2103,2104,2105,2106,2110,2112,2116,2118,2119,2120,2125,2126,2142,1257,1483,3134,1485,1296,1388,2832,3095,3140,1344,2772,2776,1347,2752,1397,1402,2158,2160,1391,2824,2995,2354,3455,1394,3004,1342,1140,1188,1701,2710,2727,2731,2735,2753,2767,2827,3183,3316,2734,2730,2933,2944,2968,3065,2148,2172,2174,1711,2252,2226,3037,2121,2232,2881,1270,1174,1176,1531,1539,1555,1563,1565,1569,1571,1573,1581,1585,1587,1593,1595,1597,1775,1805,2146,2164,1909,2246,1315,1697,2897,2900,2934,2978,3086,3089,3285,3386,1703,2719,2925,2928,3011,3045,2152,1358,1360,1424,2356,2292,2358,1609,1715,3066,2242,1273,1238,1727,1735,2074,544,543,551,116,956,947,877,838,831,1078,1077,1065,741,735,945,944,1074,369,368,432,1046,388,1070,1037,1072,1073,577,557,934,764,722,623,621,620,581,603,602,600,599,598,414,361,359,617,518,499,823,822,691,686,683,661,633,484,360,798,791,636,588,510,452,398,487,1063,969,1111,1110,1087,1018,1017,1016,802,1127,1123,1106,804,803,619,363,968,1007,1006,768,767,765,651,648,611,974,958,955,814,875,874,873,862,856,853,846,671,762,1027,1026,718,1115,1029,967,966,1003,999,997,900,899,897,870,869,1120,942,881,1043,471,809,561,590,574,527,622,637,970,827,826,696,688,627,811,1060,1128,1126,711,607,987,1012,959,861,852,836,1099,913,912,824,758,995,909,843,894,893,884,494,799,655,1061,505,739,859,845,842,835,941,528,727,344,488,2,14,7,83,81,75,3,693,596,763,723,625,624,582,580,579,601,597,475,641,640,500,829,828,821,820,770,697,689,685,654,626,470,422,507,692,736,486,1064,715,760,801,1129,1124,1122,1107,713,706,705,476,810,939,938,935,766,673,948,946,994,993,992,880,864,839,833,509,808,807,1114,1030,1028,819,818,1101,1004,1001,898,867,865,751,940,882,1045,514,532,594,593,592,614,971,825,726,1125,937,854,849,840,830,817,886,750,749,943,1067,74,73,517,497,465,795,936,910,850,848,1022,1021,816,466,343,454,1086,656,501,851,847,844,630,634,628,19,82,71,69,70,2702,2701,553,447,1034,1033,752,1044,448,1091,773,748,774,747,1038,1036,1035,576,340,397,757,677,885,616,712,1097,1024,707,534,138,137,135,131,130,127,123,121,118,115,112,111,108,106,102,101,100,99,98,97,94,93,92,90,88,87,85,79,72,529,901,472,957,949,86,708,709,540,461,883,710,345,142,141,140,139,136,134,133,129,128,126,125,124,122,120,119,117,114,110,109,107])).
% 14.48/14.41 cnf(3681,plain,
% 14.48/14.41 (~P8(x36811,f13(f11(f34(x36812,x36813),f13(x36811,a1),a1),a1),a1)),
% 14.48/14.41 inference(rename_variables,[],[2831])).
% 14.48/14.41 cnf(3685,plain,
% 14.48/14.41 (P8(x36851,x36851,f27(a1))),
% 14.48/14.41 inference(rename_variables,[],[2757])).
% 14.48/14.41 cnf(3688,plain,
% 14.48/14.41 (P8(f15(x36881,a2),f11(f15(f11(x36881,x36882,a2),a2),f15(x36882,a2),a1),a1)),
% 14.48/14.41 inference(rename_variables,[],[258])).
% 14.48/14.41 cnf(3696,plain,
% 14.48/14.41 (P9(f3(a1),f11(f4(a1),f5(x36961,a1),a1),a1)),
% 14.48/14.41 inference(rename_variables,[],[251])).
% 14.48/14.41 cnf(3697,plain,
% 14.48/14.41 (P8(x36971,x36971,a1)),
% 14.48/14.41 inference(rename_variables,[],[243])).
% 14.48/14.41 cnf(3701,plain,
% 14.48/14.41 (P9(f3(a1),f11(f4(a1),f5(x37011,a1),a1),a1)),
% 14.48/14.41 inference(rename_variables,[],[251])).
% 14.48/14.41 cnf(3702,plain,
% 14.48/14.41 (P8(x37021,x37021,a1)),
% 14.48/14.41 inference(rename_variables,[],[243])).
% 14.48/14.41 cnf(3707,plain,
% 14.48/14.41 (P8(x37071,x37071,a1)),
% 14.48/14.41 inference(rename_variables,[],[243])).
% 14.48/14.41 cnf(3710,plain,
% 14.48/14.41 (~P8(x37101,f13(f11(f34(x37102,x37103),f13(x37101,a1),a1),a1),a1)),
% 14.48/14.41 inference(rename_variables,[],[2831])).
% 14.48/14.41 cnf(3713,plain,
% 14.48/14.41 (~P8(x37131,f13(f11(f34(x37132,x37133),f13(x37131,a1),a1),a1),a1)),
% 14.48/14.41 inference(rename_variables,[],[2831])).
% 14.48/14.41 cnf(3716,plain,
% 14.48/14.41 (P8(x37161,x37161,a1)),
% 14.48/14.41 inference(rename_variables,[],[243])).
% 14.48/14.41 cnf(3719,plain,
% 14.48/14.41 (P8(f3(a1),f10(x37191,x37191,a1),a1)),
% 14.48/14.41 inference(rename_variables,[],[1703])).
% 14.48/14.41 cnf(3722,plain,
% 14.48/14.41 (P9(x37221,f11(x37222,f11(f5(f7(x37221,x37222,a1),a1),f4(a1),a1),a1),a1)),
% 14.48/14.41 inference(rename_variables,[],[2860])).
% 14.48/14.41 cnf(3745,plain,
% 14.48/14.41 (~P8(f11(f11(f34(x37451,x37452),f11(x37453,f5(x37454,a1),a1),a1),x37454,a1),x37453,a1)),
% 14.48/14.41 inference(rename_variables,[],[2862])).
% 14.48/14.41 cnf(3746,plain,
% 14.48/14.41 (P8(f3(a1),f10(x37461,x37461,a1),a1)),
% 14.48/14.41 inference(rename_variables,[],[1703])).
% 14.48/14.41 cnf(3749,plain,
% 14.48/14.41 (P10(x37491,f11(x37491,x37491,a1),a1)),
% 14.48/14.41 inference(rename_variables,[],[2885])).
% 14.48/14.41 cnf(3759,plain,
% 14.48/14.41 (P9(f7(x37591,f11(f5(f7(x37592,x37591,a1),a1),f4(a1),a1),a1),x37592,a1)),
% 14.48/14.41 inference(rename_variables,[],[3203])).
% 14.48/14.41 cnf(3760,plain,
% 14.48/14.41 (~P9(x37601,x37601,a1)),
% 14.48/14.41 inference(rename_variables,[],[265])).
% 14.48/14.41 cnf(3770,plain,
% 14.48/14.41 (P8(x37701,f10(f9(x37701,f11(f4(a1),f5(x37702,a1),a1),a1),f11(f4(a1),f5(x37702,a1),a1),a1),a1)),
% 14.48/14.41 inference(rename_variables,[],[2970])).
% 14.48/14.41 cnf(3776,plain,
% 14.48/14.41 (~E(f11(x37761,f16(a31,a32,a2),a2),f11(x37761,f3(f27(a2)),a2))),
% 14.48/14.41 inference(rename_variables,[],[2805])).
% 14.48/14.41 cnf(3779,plain,
% 14.48/14.41 (~P9(f11(f5(x37791,a1),f4(a1),a1),x37791,a1)),
% 14.48/14.41 inference(rename_variables,[],[268])).
% 14.48/14.41 cnf(3780,plain,
% 14.48/14.41 (E(f7(x37801,f14(f3(a1)),x37802),f7(x37801,f3(a1),x37802))),
% 14.48/14.41 inference(rename_variables,[],[1689])).
% 14.48/14.41 cnf(3785,plain,
% 14.48/14.41 (P8(x37851,x37851,a1)),
% 14.48/14.41 inference(rename_variables,[],[243])).
% 14.48/14.41 cnf(3788,plain,
% 14.48/14.41 (P8(x37881,x37881,a1)),
% 14.48/14.41 inference(rename_variables,[],[243])).
% 14.48/14.41 cnf(3791,plain,
% 14.48/14.41 (P8(x37911,x37911,a1)),
% 14.48/14.41 inference(rename_variables,[],[243])).
% 14.48/14.41 cnf(3794,plain,
% 14.48/14.41 (P8(x37941,x37941,a1)),
% 14.48/14.41 inference(rename_variables,[],[243])).
% 14.48/14.41 cnf(3799,plain,
% 14.48/14.41 (~P8(f11(f11(f34(x37991,x37992),f11(x37993,f5(x37994,a1),a1),a1),x37994,a1),x37993,a1)),
% 14.48/14.41 inference(rename_variables,[],[2862])).
% 14.48/14.41 cnf(3801,plain,
% 14.48/14.41 (~P9(x38011,x38011,a1)),
% 14.48/14.41 inference(rename_variables,[],[265])).
% 14.48/14.41 cnf(3814,plain,
% 14.48/14.41 (P9(f13(f11(f13(x38141,a1),f4(a1),a1),a1),x38141,a1)),
% 14.48/14.41 inference(rename_variables,[],[2826])).
% 14.48/14.41 cnf(3821,plain,
% 14.48/14.41 (~P8(f11(f11(f34(x38211,x38212),f11(x38213,f5(x38214,a1),a1),a1),x38214,a1),x38213,a1)),
% 14.48/14.41 inference(rename_variables,[],[2862])).
% 14.48/14.41 cnf(3830,plain,
% 14.48/14.41 (P8(x38301,f14(f11(f10(f5(x38301,a1),f5(x38301,a1),a1),f10(x38302,x38302,a1),a1)),a1)),
% 14.48/14.41 inference(rename_variables,[],[1180])).
% 14.48/14.41 cnf(3834,plain,
% 14.48/14.41 (~P9(f3(a1),f10(f34(x38341,x38342),f13(f34(x38341,x38342),a1),a1),a1)),
% 14.48/14.41 inference(scs_inference,[],[143,196,258,3688,243,3697,3702,3707,3716,3785,3788,3791,265,3760,223,207,268,184,183,202,205,252,161,174,190,147,251,3696,3701,176,187,150,154,159,179,151,263,144,3010,2780,1689,3225,3255,1707,1801,3589,2757,3685,2805,2017,2712,3417,3026,3531,3629,3150,2885,3749,2862,3745,3799,2860,3203,2970,2967,2208,2831,3681,3710,2826,1545,3097,3308,3422,2977,3085,2922,3119,3079,1180,1447,2142,1493,1703,3719,1735,1539,1595,1563,1593,896,905,1068,1042,1069,1071,837,756,888,887,945,944,972,587,586,585,515,459,458,797,796,1013,956,876,1121,632,417,1037,1046,544,1073,1023,577,116,576,1106,768,675,958,955,967,966,1120,881,722,620,603,599,662,1128,1126,987,1015,1014,471,561,811,836])).
% 14.48/14.41 cnf(3846,plain,
% 14.48/14.41 (P8(x38461,x38461,a1)),
% 14.48/14.41 inference(rename_variables,[],[243])).
% 14.48/14.41 cnf(3855,plain,
% 14.48/14.41 (P8(f3(a1),f5(x38551,a1),a1)),
% 14.48/14.41 inference(rename_variables,[],[1731])).
% 14.48/14.41 cnf(3869,plain,
% 14.48/14.41 (P9(f7(x38691,f11(f5(f7(x38692,x38691,a1),a1),f4(a1),a1),a1),x38692,a1)),
% 14.48/14.41 inference(rename_variables,[],[3203])).
% 14.48/14.41 cnf(3870,plain,
% 14.48/14.41 (~P9(f5(x38701,a1),f3(a1),a1)),
% 14.48/14.41 inference(rename_variables,[],[1715])).
% 14.48/14.41 cnf(3873,plain,
% 14.48/14.41 (~P9(f11(f10(f7(x38731,x38731,a1),x38732,a1),x38733,a1),x38733,a1)),
% 14.48/14.41 inference(rename_variables,[],[3023])).
% 14.48/14.41 cnf(3883,plain,
% 14.48/14.41 (~P9(f11(f10(f14(x38831),f14(x38831),a1),f10(x38832,x38832,a1),a1),x38831,a1)),
% 14.48/14.41 inference(rename_variables,[],[3310])).
% 14.48/14.41 cnf(3890,plain,
% 14.48/14.41 (~P9(x38901,x38901,a1)),
% 14.48/14.41 inference(rename_variables,[],[265])).
% 14.48/14.41 cnf(3891,plain,
% 14.48/14.41 (P9(f7(x38911,f11(f5(f7(x38912,x38911,a1),a1),f4(a1),a1),a1),x38912,a1)),
% 14.48/14.41 inference(rename_variables,[],[3203])).
% 14.48/14.41 cnf(3900,plain,
% 14.48/14.41 (P9(x39001,f11(x39002,f11(f5(f7(x39001,x39002,a1),a1),f4(a1),a1),a1),a1)),
% 14.48/14.41 inference(rename_variables,[],[2860])).
% 14.48/14.41 cnf(3905,plain,
% 14.48/14.41 (P8(x39051,f14(f11(f10(x39051,x39051,a1),f10(x39052,x39052,a1),a1)),a1)),
% 14.48/14.41 inference(rename_variables,[],[261])).
% 14.48/14.41 cnf(3908,plain,
% 14.48/14.41 (~P8(f11(f10(x39081,f7(x39081,x39082,f27(a1)),f27(a1)),f10(f11(f3(f27(a1)),f4(a1),a1),f11(f3(f27(a1)),f4(a1),a1),f27(a1)),f27(a1)),f11(f10(x39082,f7(x39081,x39082,f27(a1)),f27(a1)),f3(f27(a1)),f27(a1)),f27(a1))),
% 14.48/14.41 inference(rename_variables,[],[3213])).
% 14.48/14.41 cnf(3913,plain,
% 14.48/14.41 (P8(x39131,x39131,a1)),
% 14.48/14.41 inference(rename_variables,[],[243])).
% 14.48/14.41 cnf(3916,plain,
% 14.48/14.41 (~P8(x39161,f13(f11(f34(x39162,x39163),f13(x39161,a1),a1),a1),a1)),
% 14.48/14.41 inference(rename_variables,[],[2831])).
% 14.48/14.41 cnf(3921,plain,
% 14.48/14.41 (E(f11(x39211,f11(f13(x39211,a1),x39212,a1),a1),x39212)),
% 14.48/14.41 inference(rename_variables,[],[1797])).
% 14.48/14.41 cnf(3925,plain,
% 14.48/14.41 (~P8(f11(f11(f11(f34(x39251,x39252),f11(f11(x39253,f5(x39254,a1),a1),f5(x39255,a1),a1),a1),x39255,a1),x39254,a1),x39253,a1)),
% 14.48/14.41 inference(scs_inference,[],[143,196,258,3688,243,3697,3702,3707,3716,3785,3788,3791,3794,3846,265,3760,3801,261,223,207,268,184,169,183,202,205,252,158,161,186,145,156,173,174,157,190,147,251,3696,3701,176,187,150,154,159,179,247,151,263,144,3010,2780,1689,3225,3255,1707,1797,1801,3589,2757,3685,2943,2805,2017,2902,3324,3213,3580,2712,3417,2836,3026,3359,2366,3531,3629,3150,2885,3749,3023,2862,3745,3799,3821,2860,3722,3203,3759,3869,2813,2970,3770,3310,2967,2208,3180,2831,3681,3710,3713,2826,3440,3051,1513,1545,1553,1557,3097,3308,3422,2977,3085,1731,2922,3119,3079,2330,1180,1447,1299,1891,1963,2142,1493,1531,1703,3719,1715,1735,1539,1595,2206,1185,1585,1563,1593,896,905,1068,1042,1069,1071,837,756,888,887,945,944,972,587,586,585,515,459,458,797,796,1013,956,876,1121,632,417,1037,1046,544,1073,1023,577,116,576,1106,768,675,958,955,967,966,1120,881,722,620,603,599,662,1128,1126,987,1015,1014,471,561,811,836,809,622,611,997,1057,1047,6,528,913,973,534,658,859,1099,505,691,344,1003,824,488,995,941,862,842,826,1063,1024,693,823,686,683,654,661,736,486,969])).
% 14.48/14.41 cnf(3926,plain,
% 14.48/14.41 (~P8(f11(f11(f34(x39261,x39262),f11(x39263,f5(x39264,a1),a1),a1),x39264,a1),x39263,a1)),
% 14.48/14.41 inference(rename_variables,[],[2862])).
% 14.48/14.41 cnf(3929,plain,
% 14.48/14.41 (~P8(f11(f34(x39291,x39292),f11(f11(x39293,x39294,a1),f5(x39294,a1),a1),a1),x39293,a1)),
% 14.48/14.41 inference(rename_variables,[],[3176])).
% 14.48/14.41 cnf(3932,plain,
% 14.48/14.41 (~E(f11(x39321,f16(a31,a32,a2),a2),f11(x39321,f3(f27(a2)),a2))),
% 14.48/14.41 inference(rename_variables,[],[2805])).
% 14.48/14.41 cnf(3943,plain,
% 14.48/14.41 (~P9(f11(f5(x39431,a1),f4(a1),a1),x39431,a1)),
% 14.48/14.41 inference(rename_variables,[],[268])).
% 14.48/14.41 cnf(3958,plain,
% 14.48/14.41 (~P8(f11(f11(f34(x39581,x39582),f11(x39583,f5(x39584,a1),a1),a1),x39584,a1),x39583,a1)),
% 14.48/14.41 inference(rename_variables,[],[2862])).
% 14.48/14.41 cnf(3963,plain,
% 14.48/14.41 (P8(x39631,x39631,a1)),
% 14.48/14.41 inference(rename_variables,[],[243])).
% 14.48/14.41 cnf(3971,plain,
% 14.48/14.41 (P8(x39711,x39711,a1)),
% 14.48/14.41 inference(rename_variables,[],[243])).
% 14.48/14.41 cnf(3999,plain,
% 14.48/14.41 (~P9(x39991,x39991,a1)),
% 14.48/14.41 inference(rename_variables,[],[265])).
% 14.48/14.41 cnf(4000,plain,
% 14.48/14.41 (P8(x40001,x40001,a1)),
% 14.48/14.41 inference(rename_variables,[],[243])).
% 14.48/14.41 cnf(4002,plain,
% 14.48/14.41 (P8(f9(x40021,f3(a1),a1),f3(a1),a1)),
% 14.48/14.41 inference(scs_inference,[],[143,196,258,3688,243,3697,3702,3707,3716,3785,3788,3791,3794,3846,3913,3963,3971,4000,265,3760,3801,3890,3999,261,3905,223,207,268,3779,184,266,222,169,183,202,205,252,153,158,170,161,186,145,163,156,173,174,157,190,147,177,199,251,3696,3701,176,187,150,154,159,179,247,151,263,144,3010,2780,1689,3780,1690,3225,3255,1707,1797,1801,3589,2757,3685,2943,2805,3776,2017,2902,3324,3213,3580,2712,3417,2836,3026,3359,2366,3531,3629,3150,2885,3749,2787,3023,2862,3745,3799,3821,3926,3176,2860,3722,3203,3759,3869,2813,2891,2970,3770,3310,2967,2208,3180,2831,3681,3710,3713,3916,2826,3814,3440,3051,1513,1545,1553,1557,3097,3308,3422,2977,3085,1731,2922,3119,3079,2330,1180,3830,1447,1299,1891,1963,2142,2174,1493,1531,1703,3719,1715,3870,1555,1174,1735,1571,1539,1426,1595,2206,1185,1585,1563,1593,896,905,1068,1042,1069,1071,837,756,888,887,945,944,972,587,586,585,515,459,458,797,796,1013,956,876,1121,632,417,1037,1046,544,1073,1023,577,116,576,1106,768,675,958,955,967,966,1120,881,722,620,603,599,662,1128,1126,987,1015,1014,471,561,811,836,809,622,611,997,1057,1047,6,528,913,973,534,658,859,1099,505,691,344,1003,824,488,995,941,862,842,826,1063,1024,693,823,686,683,654,661,736,486,969,1122,1107,804,803,968,935,767,766,765,757,677,673,651,948,814,1004,1043,557,590,764,723,621,822,820,688,487,705,619,363,942,940])).
% 14.48/14.41 cnf(4003,plain,
% 14.48/14.41 (P8(x40031,x40031,a1)),
% 14.48/14.41 inference(rename_variables,[],[243])).
% 14.48/14.41 cnf(4005,plain,
% 14.48/14.41 (~P9(x40051,x40051,a1)),
% 14.48/14.41 inference(rename_variables,[],[265])).
% 14.48/14.41 cnf(4019,plain,
% 14.48/14.41 (~P8(f11(f11(f34(x40191,x40192),f11(x40193,f5(x40194,a1),a1),a1),x40194,a1),x40193,a1)),
% 14.48/14.41 inference(rename_variables,[],[2862])).
% 14.48/14.41 cnf(4022,plain,
% 14.48/14.41 (~P9(f11(f5(x40221,a1),f4(a1),a1),x40221,a1)),
% 14.48/14.41 inference(rename_variables,[],[268])).
% 14.48/14.41 cnf(4025,plain,
% 14.48/14.41 (~P9(x40251,x40251,a1)),
% 14.48/14.41 inference(rename_variables,[],[265])).
% 14.48/14.41 cnf(4038,plain,
% 14.48/14.41 (P9(x40381,f11(x40382,f11(f5(f7(x40381,x40382,a1),a1),f4(a1),a1),a1),a1)),
% 14.48/14.41 inference(rename_variables,[],[2860])).
% 14.48/14.41 cnf(4041,plain,
% 14.48/14.41 (~P9(f11(f5(x40411,a1),f4(a1),a1),x40411,a1)),
% 14.48/14.41 inference(rename_variables,[],[268])).
% 14.48/14.41 cnf(4054,plain,
% 14.48/14.41 (P8(f10(f9(x40541,f11(f4(a1),f5(x40542,a1),a1),a1),f11(f4(a1),f5(x40542,a1),a1),a1),x40541,a1)),
% 14.48/14.41 inference(rename_variables,[],[3281])).
% 14.48/14.41 cnf(4069,plain,
% 14.48/14.41 (~P9(x40691,x40691,a1)),
% 14.48/14.41 inference(rename_variables,[],[265])).
% 14.48/14.41 cnf(4076,plain,
% 14.48/14.41 (~P9(x40761,x40761,a1)),
% 14.48/14.41 inference(rename_variables,[],[265])).
% 14.48/14.41 cnf(4077,plain,
% 14.48/14.41 (P9(x40771,f11(x40772,f11(f5(f7(x40771,x40772,a1),a1),f4(a1),a1),a1),a1)),
% 14.48/14.41 inference(rename_variables,[],[2860])).
% 14.48/14.41 cnf(4080,plain,
% 14.48/14.41 (~P9(x40801,f11(f10(f7(x40802,x40802,a1),x40803,a1),x40801,a1),a1)),
% 14.48/14.41 inference(rename_variables,[],[1299])).
% 14.48/14.41 cnf(4082,plain,
% 14.48/14.41 (~P9(x40821,x40821,a1)),
% 14.48/14.41 inference(rename_variables,[],[265])).
% 14.48/14.41 cnf(4094,plain,
% 14.48/14.41 (~P9(f3(a1),f13(f34(x40941,x40942),a1),a1)),
% 14.48/14.41 inference(scs_inference,[],[143,196,258,3688,243,3697,3702,3707,3716,3785,3788,3791,3794,3846,3913,3963,3971,4000,4003,265,3760,3801,3890,3999,4005,4025,4069,4076,261,3905,223,207,268,3779,3943,4022,184,266,222,169,183,202,205,252,153,158,170,161,186,145,163,197,156,173,172,174,157,190,147,177,199,251,3696,3701,192,176,187,267,150,154,159,179,247,151,263,144,3010,2980,3287,2170,2780,1689,3780,1690,3225,2759,3255,1707,1797,1801,3447,3589,2757,3685,2943,2805,3776,2017,2902,3324,3213,3908,3580,2712,3034,3417,2836,3026,3359,2366,3531,3629,3150,2885,3749,2787,3023,3873,2862,3745,3799,3821,3926,3958,3176,2860,3722,3900,4038,3203,3759,3869,2813,2891,2970,3770,3281,3310,2967,2208,3180,2831,3681,3710,3713,3916,2868,2826,3814,3426,3428,3094,3211,3440,3051,1513,1545,1553,1557,1589,3097,3308,3422,2977,3085,1731,2922,3008,3119,3079,2248,1549,2330,1180,3830,1447,1299,4080,1384,1891,1963,2119,2142,2174,1493,1531,1703,3719,1715,3870,1555,1174,1735,1571,1539,1426,1595,2206,1185,1585,1563,1593,896,905,1068,1042,1069,1071,837,756,888,887,945,944,972,587,586,585,515,459,458,797,796,1013,956,876,1121,632,417,1037,1046,544,1073,1023,577,116,576,1106,768,675,958,955,967,966,1120,881,722,620,603,599,662,1128,1126,987,1015,1014,471,561,811,836,809,622,611,997,1057,1047,6,528,913,973,534,658,859,1099,505,691,344,1003,824,488,995,941,862,842,826,1063,1024,693,823,686,683,654,661,736,486,969,1122,1107,804,803,968,935,767,766,765,757,677,673,651,948,814,1004,1043,557,590,764,723,621,822,820,688,487,705,619,363,942,940,574,970,696,627,758,712,711,974,874,708,817,623,707,494,1129,1127,1123,710,501,938,864,999,882,937,959,943,884,596,936,843,532,845,799])).
% 14.48/14.41 cnf(4108,plain,
% 14.48/14.41 (E(x41081,f11(f10(f7(x41082,x41082,a1),x41083,a1),x41081,a1))),
% 14.48/14.41 inference(rename_variables,[],[1292])).
% 14.48/14.41 cnf(4110,plain,
% 14.48/14.41 (E(f10(f14(x41101),f14(x41102),a1),f14(f10(x41101,x41102,a1)))),
% 14.48/14.41 inference(rename_variables,[],[250])).
% 14.48/14.41 cnf(4115,plain,
% 14.48/14.41 (~P8(f11(x41151,f4(a1),a1),x41151,a1)),
% 14.48/14.41 inference(rename_variables,[],[3571])).
% 14.48/14.41 cnf(4118,plain,
% 14.48/14.41 (P8(f15(x41181,a2),f11(f15(f11(x41181,x41182,a2),a2),f15(x41182,a2),a1),a1)),
% 14.48/14.41 inference(rename_variables,[],[258])).
% 14.48/14.41 cnf(4123,plain,
% 14.48/14.41 (P8(x41231,x41231,a1)),
% 14.48/14.41 inference(rename_variables,[],[243])).
% 14.48/14.41 cnf(4143,plain,
% 14.48/14.41 (~P8(f3(a1),f11(f7(f3(a1),f34(x41431,x41432),a1),f7(f3(a1),f34(x41431,x41432),a1),a1),a1)),
% 14.48/14.41 inference(scs_inference,[],[143,1135,250,164,196,258,3688,4118,243,3697,3702,3707,3716,3785,3788,3791,3794,3846,3913,3963,3971,4000,4003,265,3760,3801,3890,3999,4005,4025,4069,4076,261,3905,223,171,204,207,260,268,3779,3943,4022,249,184,266,222,169,183,202,205,252,178,153,158,170,161,186,145,163,197,156,173,172,174,157,190,147,177,199,251,3696,3701,192,176,187,267,150,154,159,179,247,151,263,144,3421,3010,2980,3287,2170,2780,1689,3780,1690,3225,2759,3255,1707,1797,3559,1801,3447,3589,2757,3685,2943,2805,3776,2017,2902,3324,3213,3908,3580,2712,3034,1947,3417,2836,3026,3359,2366,3531,3629,3150,2885,3749,2887,2787,2916,2789,3023,3873,2862,3745,3799,3821,3926,3958,3176,2860,3722,3900,4038,3203,3759,3869,2813,2891,2970,3770,3281,3310,2967,3571,2208,3003,3180,2831,3681,3710,3713,3916,2868,2826,3814,3426,3428,3094,2797,3211,3440,3051,1513,1545,1553,1557,1589,3097,3308,3422,2977,3085,1731,3855,2922,3008,3119,3079,2248,1549,2330,1180,3830,1447,1299,4080,1380,1384,1891,1963,1292,2119,2142,2174,1493,1531,1703,3719,1715,3870,1555,1174,1735,1571,1539,1426,1595,2206,1185,1585,1563,1593,896,905,1068,1042,1069,1071,837,756,888,887,945,944,972,587,586,585,515,459,458,797,796,1013,956,876,1121,632,417,1037,1046,544,1073,1023,577,116,576,1106,768,675,958,955,967,966,1120,881,722,620,603,599,662,1128,1126,987,1015,1014,471,561,811,836,809,622,611,997,1057,1047,6,528,913,973,534,658,859,1099,505,691,344,1003,824,488,995,941,862,842,826,1063,1024,693,823,686,683,654,661,736,486,969,1122,1107,804,803,968,935,767,766,765,757,677,673,651,948,814,1004,1043,557,590,764,723,621,822,820,688,487,705,619,363,942,940,574,970,696,627,758,712,711,974,874,708,817,623,707,494,1129,1127,1123,710,501,938,864,999,882,937,959,943,884,596,936,843,532,845,799,844,592,727,885,2,83,81,75,3,821,1124,706,476,946,1101,7,763,625,624,601,971,470,713,957])).
% 14.48/14.41 cnf(4154,plain,
% 14.48/14.41 (P8(x41541,x41541,a1)),
% 14.48/14.41 inference(rename_variables,[],[243])).
% 14.48/14.41 cnf(4155,plain,
% 14.48/14.41 (P9(f11(f4(a1),x41551,a1),f11(f10(f11(f4(a1),f4(a1),a1),f11(f4(a1),f4(a1),a1),a1),x41551,a1),a1)),
% 14.48/14.41 inference(scs_inference,[],[143,1135,250,4110,164,196,258,3688,4118,243,3697,3702,3707,3716,3785,3788,3791,3794,3846,3913,3963,3971,4000,4003,4123,265,3760,3801,3890,3999,4005,4025,4069,4076,261,3905,223,171,204,207,260,268,3779,3943,4022,249,184,266,222,169,183,202,205,252,178,153,158,170,257,161,186,145,163,197,156,173,172,174,157,190,147,177,199,251,3696,3701,192,176,187,267,150,154,159,179,247,151,263,144,3421,3010,2980,3287,2170,2780,1689,3780,1690,3225,2759,3255,1707,1797,3921,3559,1801,3447,3589,2757,3685,2943,2805,3776,2017,2902,3324,3213,3908,3580,2712,3034,1947,3417,2836,3026,3359,1779,2366,3531,3629,3150,2885,3749,2887,2787,2916,2789,3023,3873,2862,3745,3799,3821,3926,3958,3176,2860,3722,3900,4038,3203,3759,3869,2813,2891,2970,3770,3281,4054,3310,2967,3571,2208,3003,3180,2831,3681,3710,3713,3916,2868,2826,3814,3426,3428,3094,2797,3211,3440,3051,1513,1545,1553,1557,1589,3097,3308,3422,2977,3085,1731,3855,2922,3008,3119,3079,2248,1549,2330,1180,3830,1447,1299,4080,1380,1384,1891,1963,1292,2119,2142,2174,1493,1531,1703,3719,1715,3870,1555,1174,1735,1571,1539,1426,1595,2206,1185,1585,1563,1593,896,905,1068,1042,1069,1071,837,756,888,887,945,944,972,587,586,585,515,459,458,797,796,1013,956,876,1121,632,417,1037,1046,544,1073,1023,577,116,576,1106,768,675,958,955,967,966,1120,881,722,620,603,599,662,1128,1126,987,1015,1014,471,561,811,836,809,622,611,997,1057,1047,6,528,913,973,534,658,859,1099,505,691,344,1003,824,488,995,941,862,842,826,1063,1024,693,823,686,683,654,661,736,486,969,1122,1107,804,803,968,935,767,766,765,757,677,673,651,948,814,1004,1043,557,590,764,723,621,822,820,688,487,705,619,363,942,940,574,970,696,627,758,712,711,974,874,708,817,623,707,494,1129,1127,1123,710,501,938,864,999,882,937,959,943,884,596,936,843,532,845,799,844,592,727,885,2,83,81,75,3,821,1124,706,476,946,1101,7,763,625,624,601,971,470,713,957,1001,750,73,825])).
% 14.48/14.41 cnf(4163,plain,
% 14.48/14.41 (P8(x41631,x41631,a1)),
% 14.48/14.41 inference(rename_variables,[],[243])).
% 14.48/14.41 cnf(4169,plain,
% 14.48/14.41 (P9(f7(x41691,f11(f5(f7(x41692,x41691,a1),a1),f4(a1),a1),a1),x41692,a1)),
% 14.48/14.41 inference(rename_variables,[],[3203])).
% 14.48/14.41 cnf(4180,plain,
% 14.48/14.41 (P9(f7(x41801,f11(f5(f7(x41802,x41801,a1),a1),f4(a1),a1),a1),x41802,a1)),
% 14.48/14.41 inference(rename_variables,[],[3203])).
% 14.48/14.41 cnf(4188,plain,
% 14.48/14.41 (~P9(f10(f3(f27(a1)),f3(f27(a1)),f27(a1)),f3(f27(a1)),f27(a1))),
% 14.48/14.41 inference(scs_inference,[],[143,1135,250,4110,164,196,258,3688,4118,243,3697,3702,3707,3716,3785,3788,3791,3794,3846,3913,3963,3971,4000,4003,4123,4154,4163,265,3760,3801,3890,3999,4005,4025,4069,4076,261,3905,223,171,204,207,260,244,268,3779,3943,4022,249,184,266,222,169,183,202,205,252,175,178,153,158,170,257,161,186,155,145,163,197,156,173,172,174,157,190,147,177,199,251,3696,3701,192,176,187,267,150,154,146,159,179,247,151,263,144,3421,3010,2980,3287,2170,2780,1689,3780,1690,3225,2759,3255,1707,1797,3921,3559,1801,3447,3589,2757,3685,2943,2805,3776,3932,2017,2902,3324,3213,3908,3580,2712,3034,1947,3417,2836,3026,3359,1779,2366,2368,3531,3629,3150,2885,3749,2887,2787,2916,2789,3023,3873,2862,3745,3799,3821,3926,3958,4019,3176,3929,2860,3722,3900,4038,3203,3759,3869,3891,4169,2813,2891,2970,3770,3281,4054,3310,3883,2967,3571,2208,3003,3180,2831,3681,3710,3713,3916,2868,2826,3814,3426,3428,3094,2797,3211,3440,3051,1513,1545,1553,1557,1589,3097,3308,3422,2977,3085,1731,3855,2922,3008,3119,3079,2248,1549,2330,1180,3830,1447,1299,4080,1380,1384,1891,1963,1292,2119,2142,2174,1493,1531,1569,1697,1703,3719,1715,3870,1370,1555,1174,1735,1571,1539,1426,1595,2206,1185,1585,1563,1593,896,905,1068,1042,1069,1071,837,756,888,887,945,944,972,587,586,585,515,459,458,797,796,1013,956,876,1121,632,417,1037,1046,544,1073,1023,577,116,576,1106,768,675,958,955,967,966,1120,881,722,620,603,599,662,1128,1126,987,1015,1014,471,561,811,836,809,622,611,997,1057,1047,6,528,913,973,534,658,859,1099,505,691,344,1003,824,488,995,941,862,842,826,1063,1024,693,823,686,683,654,661,736,486,969,1122,1107,804,803,968,935,767,766,765,757,677,673,651,948,814,1004,1043,557,590,764,723,621,822,820,688,487,705,619,363,942,940,574,970,696,627,758,712,711,974,874,708,817,623,707,494,1129,1127,1123,710,501,938,864,999,882,937,959,943,884,596,936,843,532,845,799,844,592,727,885,2,83,81,75,3,821,1124,706,476,946,1101,7,763,625,624,601,971,470,713,957,1001,750,73,825,939,751,1045,901,709,540,475,847,770,992,816,514,594])).
% 14.48/14.41 cnf(4230,plain,
% 14.48/14.41 (~P8(f11(x42301,f4(a1),a1),x42301,a1)),
% 14.48/14.41 inference(rename_variables,[],[3571])).
% 14.48/14.41 cnf(4237,plain,
% 14.48/14.41 (P8(x42371,f14(f11(f10(x42371,x42371,a1),f10(x42372,x42372,a1),a1)),a1)),
% 14.48/14.41 inference(rename_variables,[],[261])).
% 14.48/14.41 cnf(4260,plain,
% 14.48/14.41 (~P8(f11(f34(x42601,x42602),f11(f11(f9(f10(x42603,f11(f4(a1),f5(x42604,a1),a1),a1),f11(f4(a1),f5(x42604,a1),a1),a1),x42605,a1),f5(x42605,a1),a1),a1),x42603,a1)),
% 14.48/14.41 inference(scs_inference,[],[143,1135,250,4110,255,164,196,258,3688,4118,243,3697,3702,3707,3716,3785,3788,3791,3794,3846,3913,3963,3971,4000,4003,4123,4154,4163,265,3760,3801,3890,3999,4005,4025,4069,4076,4082,261,3905,4237,223,171,204,207,260,165,244,268,3779,3943,4022,4041,249,184,266,262,222,169,183,202,205,252,175,178,153,158,170,257,161,186,155,145,163,197,156,173,172,174,157,190,147,177,199,251,3696,3701,192,176,187,267,150,154,146,159,179,247,151,263,144,3421,3010,2980,3287,2170,2780,1689,3780,1690,3225,2759,3255,1707,1797,3921,3559,1801,2755,3447,3589,2757,3685,2943,2805,3776,3932,2017,2902,3324,3213,3908,3580,2712,3034,1947,3417,2836,3419,3026,3359,1779,2366,2368,3531,3629,3150,2885,3749,2887,3117,2787,2916,2789,3023,3873,2862,3745,3799,3821,3926,3958,4019,3176,3929,2860,3722,3900,4038,4077,3203,3759,3869,3891,4169,4180,2813,2891,2970,3770,3281,4054,3310,3883,2967,3571,4115,4230,2208,3003,3180,2831,3681,3710,3713,3916,2868,2826,3814,3426,3428,3094,2797,3211,2733,3440,3051,1513,1527,1545,1553,1557,1589,3097,3308,3422,2977,3085,1731,3855,2922,3008,3119,3079,1226,2248,1549,2330,1180,3830,1447,1299,4080,1380,1444,1384,1891,1963,1292,4108,1294,2119,2142,2174,1493,1531,1569,1697,1703,3719,3746,1715,3870,1370,1555,1174,1735,1571,1273,1733,1539,1426,1595,2206,1185,1585,1224,1563,1593,896,905,1068,1042,1069,1071,837,756,888,887,945,944,972,587,586,585,515,459,458,797,796,1013,956,876,1121,632,417,1037,1046,544,1073,1023,577,116,576,1106,768,675,958,955,967,966,1120,881,722,620,603,599,662,1128,1126,987,1015,1014,471,561,811,836,809,622,611,997,1057,1047,6,528,913,973,534,658,859,1099,505,691,344,1003,824,488,995,941,862,842,826,1063,1024,693,823,686,683,654,661,736,486,969,1122,1107,804,803,968,935,767,766,765,757,677,673,651,948,814,1004,1043,557,590,764,723,621,822,820,688,487,705,619,363,942,940,574,970,696,627,758,712,711,974,874,708,817,623,707,494,1129,1127,1123,710,501,938,864,999,882,937,959,943,884,596,936,843,532,845,799,844,592,727,885,2,83,81,75,3,821,1124,706,476,946,1101,7,763,625,624,601,971,470,713,957,1001,750,73,825,939,751,1045,901,709,540,475,847,770,992,816,514,594,685,628,993,818,1125,883,497,1064,886,656,71,74,14,69,70,82,19,714,474,890,877,1066,964,773,729,1072,752,506,633,639,961,912])).
% 14.48/14.41 cnf(4320,plain,
% 14.48/14.41 (~P9(f3(a1),f13(f34(x43201,x43202),a1),a1)),
% 14.48/14.41 inference(rename_variables,[],[4094])).
% 14.48/14.41 cnf(4324,plain,
% 14.48/14.41 (~P9(f3(a1),f13(f34(x43241,x43242),a1),a1)),
% 14.48/14.41 inference(rename_variables,[],[4094])).
% 14.48/14.41 cnf(4331,plain,
% 14.48/14.41 (~P9(f3(a1),f13(f34(x43311,x43312),a1),a1)),
% 14.48/14.41 inference(rename_variables,[],[4094])).
% 14.48/14.41 cnf(4335,plain,
% 14.48/14.41 (~P9(f3(a1),f13(f34(x43351,x43352),a1),a1)),
% 14.48/14.41 inference(rename_variables,[],[4094])).
% 14.48/14.41 cnf(4345,plain,
% 14.48/14.41 (P8(x43451,x43451,a1)),
% 14.48/14.41 inference(rename_variables,[],[243])).
% 14.48/14.41 cnf(4348,plain,
% 14.48/14.41 (P8(x43481,x43481,a1)),
% 14.48/14.41 inference(rename_variables,[],[243])).
% 14.48/14.41 cnf(4363,plain,
% 14.48/14.41 ($false),
% 14.48/14.41 inference(scs_inference,[],[143,258,243,4345,4348,261,260,161,251,179,247,144,4188,2196,3925,4260,4155,1575,3364,3834,4143,4002,4094,4320,4324,4331,4335,3342,2989,1410,3121,2264,1424,1703,1733,1052,1049,889,1053,1048,947,896,1070,1069,1054,425,877,460,956]),
% 14.48/14.41 ['proof']).
% 14.48/14.42 % SZS output end Proof
% 14.48/14.42 % Total time :13.400000s
%------------------------------------------------------------------------------