0.00/0.04	% Problem    : theBenchmark.p : TPTP v0.0.0. Released v0.0.0.
0.00/0.04	% Command    : tptp2X_and_run_prover9 %d %s
0.03/0.24	% Computer   : n059.star.cs.uiowa.edu
0.03/0.24	% Model      : x86_64 x86_64
0.03/0.24	% CPU        : Intel(R) Xeon(R) CPU E5-2609 0 @ 2.40GHz
0.03/0.24	% Memory     : 32218.625MB
0.03/0.24	% OS         : Linux 3.10.0-693.2.2.el7.x86_64
0.03/0.24	% CPULimit   : 300
0.03/0.24	% DateTime   : Sat Jul 14 06:24:54 CDT 2018
0.03/0.24	% CPUTime    : 
0.43/0.72	============================== Prover9 ===============================
0.43/0.72	Prover9 (32) version 2009-11A, November 2009.
0.43/0.72	Process 54568 was started by sandbox on n059.star.cs.uiowa.edu,
0.43/0.72	Sat Jul 14 06:24:55 2018
0.43/0.72	The command was "/export/starexec/sandbox/solver/bin/prover9 -t 300 -f /tmp/Prover9_54536_n059.star.cs.uiowa.edu".
0.43/0.72	============================== end of head ===========================
0.43/0.72	
0.43/0.72	============================== INPUT =================================
0.43/0.72	
0.43/0.72	% Reading from file /tmp/Prover9_54536_n059.star.cs.uiowa.edu
0.43/0.72	
0.43/0.72	set(prolog_style_variables).
0.43/0.72	set(auto2).
0.43/0.72	    % set(auto2) -> set(auto).
0.43/0.72	    % set(auto) -> set(auto_inference).
0.43/0.72	    % set(auto) -> set(auto_setup).
0.43/0.72	    % set(auto_setup) -> set(predicate_elim).
0.43/0.72	    % set(auto_setup) -> assign(eq_defs, unfold).
0.43/0.72	    % set(auto) -> set(auto_limits).
0.43/0.72	    % set(auto_limits) -> assign(max_weight, "100.000").
0.43/0.72	    % set(auto_limits) -> assign(sos_limit, 20000).
0.43/0.72	    % set(auto) -> set(auto_denials).
0.43/0.72	    % set(auto) -> set(auto_process).
0.43/0.72	    % set(auto2) -> assign(new_constants, 1).
0.43/0.72	    % set(auto2) -> assign(fold_denial_max, 3).
0.43/0.72	    % set(auto2) -> assign(max_weight, "200.000").
0.43/0.72	    % set(auto2) -> assign(max_hours, 1).
0.43/0.72	    % assign(max_hours, 1) -> assign(max_seconds, 3600).
0.43/0.72	    % set(auto2) -> assign(max_seconds, 0).
0.43/0.72	    % set(auto2) -> assign(max_minutes, 5).
0.43/0.72	    % assign(max_minutes, 5) -> assign(max_seconds, 300).
0.43/0.72	    % set(auto2) -> set(sort_initial_sos).
0.43/0.72	    % set(auto2) -> assign(sos_limit, -1).
0.43/0.72	    % set(auto2) -> assign(lrs_ticks, 3000).
0.43/0.72	    % set(auto2) -> assign(max_megs, 400).
0.43/0.72	    % set(auto2) -> assign(stats, some).
0.43/0.72	    % set(auto2) -> clear(echo_input).
0.43/0.72	    % set(auto2) -> set(quiet).
0.43/0.72	    % set(auto2) -> clear(print_initial_clauses).
0.43/0.72	    % set(auto2) -> clear(print_given).
0.43/0.72	assign(lrs_ticks,-1).
0.43/0.72	assign(sos_limit,10000).
0.43/0.72	assign(order,kbo).
0.43/0.72	set(lex_order_vars).
0.43/0.72	clear(print_given).
0.43/0.72	
0.43/0.72	% formulas(sos).  % not echoed (322 formulas)
0.43/0.72	
0.43/0.72	============================== end of input ==========================
0.43/0.72	
0.43/0.72	% From the command line: assign(max_seconds, 300).
0.43/0.72	
0.43/0.72	============================== PROCESS NON-CLAUSAL FORMULAS ==========
0.43/0.72	
0.43/0.72	% Formulas that are not ordinary clauses:
0.43/0.72	1 (all A all B (function(A) & relation(A) -> relation(relation_dom_restriction(A,B)) & function(relation_dom_restriction(A,B)))) # label(fc4_funct_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	2 (all A all B all C (element(B,powerset(C)) & in(A,B) -> element(A,C))) # label(t4_subset) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	3 (all A all B all C all D (subset(C,D) & subset(A,B) -> subset(cartesian_product2(A,C),cartesian_product2(B,D)))) # label(t119_zfmisc_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	4 (all A all B (-in(A,B) -> disjoint(singleton(A),B))) # label(l28_zfmisc_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	5 (all A all B (A = singleton(B) | empty_set = A <-> subset(A,singleton(B)))) # label(t39_zfmisc_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	6 (all A all B unordered_pair(B,A) = unordered_pair(A,B)) # label(commutativity_k2_tarski) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	7 (all A (relation(A) & function(A) -> (one_to_one(A) -> one_to_one(function_inverse(A))))) # label(t62_funct_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	8 (all A (empty(A) -> A = empty_set)) # label(t6_boole) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	9 (all A all B (relation(B) -> subset(relation_rng_restriction(A,B),B))) # label(t117_relat_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	10 (all A all B all C (cartesian_product2(A,B) = C <-> (all D (in(D,C) <-> (exists E exists F (in(F,B) & ordered_pair(E,F) = D & in(E,A))))))) # label(d2_zfmisc_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	11 (all A (epsilon_transitive(A) -> (all B (ordinal(B) -> (proper_subset(A,B) -> in(A,B)))))) # label(t21_ordinal1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	12 (all A (relation(A) -> (is_connected_in(A,relation_field(A)) <-> connected(A)))) # label(d14_relat_2) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	13 (all A all B (element(B,powerset(powerset(A))) -> element(meet_of_subsets(A,B),powerset(A)))) # label(dt_k6_setfam_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	14 $T # label(dt_k3_xboole_0) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	15 (all A (relation(A) -> (all B (relation(B) -> (all C (relation(C) -> ((all D all E (in(ordered_pair(D,E),C) <-> (exists F (in(ordered_pair(D,F),A) & in(ordered_pair(F,E),B))))) <-> C = relation_composition(A,B)))))))) # label(d8_relat_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	16 (all A (relation(A) -> (is_antisymmetric_in(A,relation_field(A)) <-> antisymmetric(A)))) # label(d12_relat_2) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	17 (all A (relation(A) & empty(A) & function(A) -> function(A) & one_to_one(A) & relation(A))) # label(cc2_funct_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	18 (all A all B (relation(B) -> relation_rng(relation_rng_restriction(A,B)) = set_intersection2(relation_rng(B),A))) # label(t119_relat_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	19 (all A all B -(proper_subset(B,A) & subset(A,B))) # label(t60_xboole_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	20 (all A (relation(A) & function(A) -> (one_to_one(A) <-> (all B all C (in(B,relation_dom(A)) & in(C,relation_dom(A)) & apply(A,C) = apply(A,B) -> C = B))))) # label(d8_funct_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	21 (all A all B (-empty(A) -> -empty(set_union2(A,B)))) # label(fc2_xboole_0) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	22 (all A (relation(A) -> (all B (relation(B) -> ((all C all D (in(ordered_pair(C,D),A) <-> in(ordered_pair(C,D),B))) <-> B = A))))) # label(d2_relat_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	23 (all A (function(A) & relation(A) -> (one_to_one(A) -> function_inverse(A) = relation_inverse(A)))) # label(d9_funct_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	24 (all A all B all C all D (in(ordered_pair(A,B),cartesian_product2(C,D)) <-> in(A,C) & in(B,D))) # label(t106_zfmisc_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	25 (all A all B all C (function(C) & relation(C) -> (in(B,A) & in(B,relation_dom(C)) <-> in(B,relation_dom(relation_dom_restriction(C,A)))))) # label(l82_funct_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	26 (all A all B all C (element(B,powerset(A)) & element(C,powerset(A)) -> element(subset_difference(A,B,C),powerset(A)))) # label(dt_k6_subset_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	27 (all A all B (proper_subset(A,B) -> -proper_subset(B,A))) # label(antisymmetry_r2_xboole_0) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	28 (all A (relation(A) -> (all B (relation(B) -> ((all C all D (in(ordered_pair(C,D),B) <-> in(ordered_pair(D,C),A))) <-> B = relation_inverse(A)))))) # label(d7_relat_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	29 (all A all B (element(A,powerset(B)) <-> subset(A,B))) # label(t3_subset) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	30 (all A all B all C (set_difference(A,B) = C <-> (all D (in(D,A) & -in(D,B) <-> in(D,C))))) # label(d4_xboole_0) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	31 (all A (function(A) & relation(A) -> (all B ((all C ((exists D (in(D,relation_dom(A)) & C = apply(A,D))) <-> in(C,B))) <-> relation_rng(A) = B)))) # label(d5_funct_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	32 (all A (relation(A) -> (reflexive(A) <-> is_reflexive_in(A,relation_field(A))))) # label(d9_relat_2) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	33 (all A all B (element(B,powerset(powerset(A))) -> union(B) = union_of_subsets(A,B))) # label(redefinition_k5_setfam_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	34 (all A all B (element(B,powerset(powerset(A))) -> (empty_set != B -> subset_difference(A,cast_to_subset(A),union_of_subsets(A,B)) = meet_of_subsets(A,complements_of_subsets(A,B))))) # label(t47_setfam_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	35 (all A (empty_set != A -> (all B (element(B,powerset(A)) -> (all C (element(C,A) -> (-in(C,B) -> in(C,subset_complement(A,B))))))))) # label(t50_subset_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	36 (all A all B (element(B,powerset(A)) -> (all C (in(C,B) -> in(C,A))))) # label(l3_subset_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	37 (all A all B (in(A,B) -> set_union2(singleton(A),B) = B)) # label(l23_zfmisc_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	38 (all A ((all B (in(B,A) -> subset(B,A))) <-> epsilon_transitive(A))) # label(d2_ordinal1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	39 (all A all B (set_difference(A,B) = A <-> disjoint(A,B))) # label(t83_xboole_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	40 (all A all B all C (relation(C) -> (in(A,relation_dom(C)) & in(A,B) <-> in(A,relation_dom(relation_dom_restriction(C,B)))))) # label(t86_relat_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	41 (all A (ordinal(A) -> (all B (ordinal(B) -> (in(A,B) <-> ordinal_subset(succ(A),B)))))) # label(t33_ordinal1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	42 (all A all B subset(set_difference(A,B),A)) # label(t36_xboole_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	43 (all A (relation(A) & function(A) -> (one_to_one(A) -> (all B (function(B) & relation(B) -> (relation_dom(B) = relation_rng(A) & (all C all D ((apply(B,C) = D & in(C,relation_rng(A)) -> in(D,relation_dom(A)) & apply(A,D) = C) & (in(D,relation_dom(A)) & apply(A,D) = C -> apply(B,C) = D & in(C,relation_rng(A))))) <-> B = function_inverse(A))))))) # label(t54_funct_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	44 (all A (empty(A) -> empty(relation_dom(A)) & relation(relation_dom(A)))) # label(fc7_relat_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	45 (all A cast_to_subset(A) = A) # label(d4_subset_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	46 (all A all B all C (subset(B,C) & subset(A,B) -> subset(A,C))) # label(t1_xboole_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	47 (exists A (epsilon_transitive(A) & ordinal(A) & epsilon_connected(A))) # label(rc1_ordinal1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	48 (all A all B (in(A,B) -> subset(A,union(B)))) # label(l50_zfmisc_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	49 (all A all B all C (subset(A,B) -> subset(set_difference(A,C),set_difference(B,C)))) # label(t33_xboole_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	50 (all A all B all C -(element(B,powerset(C)) & empty(C) & in(A,B))) # label(t5_subset) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	51 (all A (empty(A) -> relation(relation_rng(A)) & empty(relation_rng(A)))) # label(fc8_relat_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	52 (all A all B all C (unordered_pair(B,C) = singleton(A) -> B = A)) # label(t8_zfmisc_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	53 $T # label(dt_k1_xboole_0) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	54 (exists A (one_to_one(A) & function(A) & relation(A))) # label(rc3_funct_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	55 (all A all B (relation(B) -> relation_restriction(B,A) = relation_dom_restriction(relation_rng_restriction(A,B),A))) # label(t17_wellord1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	56 (all A (ordinal(A) -> -((all B (ordinal(B) -> succ(B) != A)) & -being_limit_ordinal(A)) & -((exists B (A = succ(B) & ordinal(B))) & being_limit_ordinal(A)))) # label(t42_ordinal1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	57 (all A all B ordered_pair(A,B) = unordered_pair(unordered_pair(A,B),singleton(A))) # label(d5_tarski) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	58 (all A (empty(A) -> function(A))) # label(cc1_funct_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	59 (all A all B (relation(B) & function(B) -> (one_to_one(B) & in(A,relation_rng(B)) -> A = apply(relation_composition(function_inverse(B),B),A) & apply(B,apply(function_inverse(B),A)) = A))) # label(t57_funct_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	60 (all A all B (relation(A) -> relation(relation_dom_restriction(A,B)))) # label(dt_k7_relat_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	61 (all A all B (subset(singleton(A),B) <-> in(A,B))) # label(l2_zfmisc_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	62 (all A all B (empty_set = set_difference(A,B) <-> subset(A,B))) # label(t37_xboole_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	63 (all A (relation(A) -> (all B all C (C = fiber(A,B) <-> (all D (B != D & in(ordered_pair(D,B),A) <-> in(D,C))))))) # label(d1_wellord1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	64 (all A all B (relation(B) & function(B) -> (all C (function(C) & relation(C) -> (in(A,relation_dom(relation_composition(C,B))) -> apply(relation_composition(C,B),A) = apply(B,apply(C,A))))))) # label(t22_funct_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	65 (all A all B (element(B,powerset(A)) -> subset_complement(A,B) = set_difference(A,B))) # label(d5_subset_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	66 (all A all B (relation(B) & function(B) -> (all C (relation(C) & function(C) -> (relation_dom(B) = set_intersection2(relation_dom(C),A) & (all D (in(D,relation_dom(B)) -> apply(C,D) = apply(B,D))) <-> relation_dom_restriction(C,A) = B))))) # label(t68_funct_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	67 (all A (relation(A) -> (reflexive(A) <-> (all B (in(B,relation_field(A)) -> in(ordered_pair(B,B),A)))))) # label(l1_wellord1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	68 (all A (function(A) & relation(A) -> (all B all C (C = relation_inverse_image(A,B) <-> (all D (in(apply(A,D),B) & in(D,relation_dom(A)) <-> in(D,C))))))) # label(d13_funct_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	69 (all A all B all C (relation(C) -> (in(ordered_pair(A,B),C) -> in(B,relation_rng(C)) & in(A,relation_dom(C))))) # label(t20_relat_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	70 $T # label(dt_k1_tarski) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	71 (all A all B (relation(A) -> relation(relation_restriction(A,B)))) # label(dt_k2_wellord1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	72 $T # label(dt_k2_xboole_0) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	73 (all A (ordinal(A) -> (all B (ordinal(B) -> -(A != B & -in(B,A) & -in(A,B)))))) # label(t24_ordinal1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	74 (all A all B (relation(B) -> (subset(A,relation_dom(B)) -> subset(A,relation_inverse_image(B,relation_image(B,A)))))) # label(t146_funct_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	75 (all A subset(empty_set,A)) # label(t2_xboole_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	76 (all A all B ((empty(A) -> (element(B,A) <-> empty(B))) & (-empty(A) -> (element(B,A) <-> in(B,A))))) # label(d2_subset_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	77 (all A -empty(singleton(A))) # label(fc2_subset_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	78 (all A set_union2(A,singleton(A)) = succ(A)) # label(d1_ordinal1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	79 (all A all B set_union2(B,A) = set_union2(A,B)) # label(commutativity_k2_xboole_0) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	80 (exists A (-empty(A) & epsilon_connected(A) & ordinal(A) & epsilon_transitive(A))) # label(rc3_ordinal1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	81 (all A (relation(A) -> relation_inverse(relation_inverse(A)) = A)) # label(involutiveness_k4_relat_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	82 (all A (relation(A) -> (connected(A) & well_founded_relation(A) & antisymmetric(A) & transitive(A) & reflexive(A) <-> well_ordering(A)))) # label(d4_wellord1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	83 (all A all B (subset(A,B) <-> (all C (in(C,A) -> in(C,B))))) # label(d3_tarski) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	84 (all A all B (relation(B) -> subset(relation_rng(relation_rng_restriction(A,B)),relation_rng(B)))) # label(t118_relat_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	85 (all A (relation(A) -> (all B (relation(B) -> (subset(relation_dom(A),relation_rng(B)) -> relation_rng(relation_composition(B,A)) = relation_rng(A)))))) # label(t47_relat_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	86 (all A (relation(A) -> ((all B -(B != empty_set & (all C -(disjoint(fiber(A,C),B) & in(C,B))) & subset(B,relation_field(A)))) <-> well_founded_relation(A)))) # label(d2_wellord1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	87 (all A all B all C (subset(C,B) & subset(A,B) -> subset(set_union2(A,C),B))) # label(t8_xboole_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	88 (all A (-empty(A) -> (exists B (element(B,powerset(A)) & -empty(B))))) # label(rc1_subset_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	89 (all A all B (relation(B) & function(B) -> relation(relation_rng_restriction(A,B)) & function(relation_rng_restriction(A,B)))) # label(fc5_funct_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	90 (all A exists B element(B,A)) # label(existence_m1_subset_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	91 (all A all B all C ((all D (in(D,C) <-> in(D,A) & in(D,B))) <-> set_intersection2(A,B) = C)) # label(d3_xboole_0) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	92 (all A all B (element(B,powerset(powerset(A))) -> (all C (element(C,powerset(powerset(A))) -> (complements_of_subsets(A,B) = C <-> (all D (element(D,powerset(A)) -> (in(subset_complement(A,D),B) <-> in(D,C))))))))) # label(d8_setfam_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	93 (all A all B all C -(in(B,C) & in(C,A) & in(A,B))) # label(t3_ordinal1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	94 (all A all B (relation(B) & function(B) & function(A) & relation(A) -> function(relation_composition(A,B)) & relation(relation_composition(A,B)))) # label(fc1_funct_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	95 (all A all B all C (subset(A,B) -> subset(A,set_difference(B,singleton(C))) | in(C,A))) # label(l3_zfmisc_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	96 (all A all B (function(B) & relation(B) -> (all C (relation(C) & function(C) -> (in(A,relation_dom(relation_composition(C,B))) <-> in(A,relation_dom(C)) & in(apply(C,A),relation_dom(B))))))) # label(t21_funct_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	97 (all A (relation(A) -> (all B (is_well_founded_in(A,B) <-> (all C -(subset(C,B) & C != empty_set & (all D -(in(D,C) & disjoint(fiber(A,D),C))))))))) # label(d3_wellord1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	98 (all A all B (relation(B) -> subset(relation_dom(relation_rng_restriction(A,B)),relation_dom(B)))) # label(l29_wellord1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	99 (all A all B (relation(B) -> relation(relation_rng_restriction(A,B)))) # label(dt_k8_relat_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	100 (all A all B (B = A <-> subset(A,B) & subset(B,A))) # label(d10_xboole_0) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	101 (all A all B (subset(A,B) -> set_intersection2(A,B) = A)) # label(t28_xboole_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	102 (all A (empty(A) -> empty(relation_inverse(A)) & relation(relation_inverse(A)))) # label(fc11_relat_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	103 (all A exists B ((all C (in(C,B) -> in(powerset(C),B))) & (all C -(-are_equipotent(C,B) & -in(C,B) & subset(C,B))) & (all C all D (in(C,B) & subset(D,C) -> in(D,B))) & in(A,B))) # label(t136_zfmisc_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	104 (all A (empty(A) -> epsilon_transitive(A) & ordinal(A) & epsilon_connected(A))) # label(cc3_ordinal1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	105 (exists A (relation_empty_yielding(A) & relation(A))) # label(rc3_relat_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	106 (all A all B (relation(B) -> relation_rng_restriction(A,relation_dom_restriction(B,A)) = relation_restriction(B,A))) # label(t18_wellord1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	107 $T # label(dt_k2_relat_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	108 (all A (relation(A) -> (all B (relation(B) -> (subset(A,B) -> subset(relation_rng(A),relation_rng(B)) & subset(relation_dom(A),relation_dom(B))))))) # label(t25_relat_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	109 (all A all B all C all D (unordered_triple(A,B,C) = D <-> (all E (in(E,D) <-> -(E != A & B != E & C != E))))) # label(d1_enumset1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	110 (all A (relation(A) -> ((all B all C all D (in(ordered_pair(B,C),A) & in(ordered_pair(C,D),A) -> in(ordered_pair(B,D),A))) <-> transitive(A)))) # label(l2_wellord1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	111 (all A all B (relation(A) & relation(B) -> relation(set_intersection2(A,B)))) # label(fc1_relat_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	112 (all A ((all B (in(B,A) -> subset(B,A) & ordinal(B))) -> ordinal(A))) # label(t31_ordinal1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	113 (all A all B all C (C = set_union2(A,B) <-> (all D (in(D,C) <-> in(D,B) | in(D,A))))) # label(d2_xboole_0) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	114 (all A all B -(empty(B) & in(A,B))) # label(t7_boole) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	115 (all A in(A,succ(A))) # label(t10_ordinal1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	116 (all A union(powerset(A)) = A) # label(t99_zfmisc_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	117 (all A (function(A) & relation(A) -> (all B all C ((-in(B,relation_dom(A)) -> (C = apply(A,B) <-> C = empty_set)) & (in(B,relation_dom(A)) -> (in(ordered_pair(B,C),A) <-> C = apply(A,B))))))) # label(d4_funct_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	118 (all A (relation(A) -> (all B all C ((all D ((exists E (in(E,B) & in(ordered_pair(E,D),A))) <-> in(D,C))) <-> relation_image(A,B) = C)))) # label(d13_relat_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	119 $T # label(dt_k1_ordinal1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	120 (all A all B (-((all C -in(C,set_intersection2(A,B))) & -disjoint(A,B)) & -(disjoint(A,B) & (exists C in(C,set_intersection2(A,B)))))) # label(t4_xboole_0) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	121 (all A all B (element(B,powerset(powerset(A))) -> element(union_of_subsets(A,B),powerset(A)))) # label(dt_k5_setfam_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	122 (all A all B (relation(B) & relation(A) -> relation(set_difference(A,B)))) # label(fc3_relat_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	123 (all A (relation(A) & -empty(A) -> -empty(relation_rng(A)))) # label(fc6_relat_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	124 (exists A (-empty(A) & relation(A))) # label(rc2_relat_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	125 (all A empty_set = set_intersection2(A,empty_set)) # label(t2_boole) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	126 (all A (ordinal(A) -> ordinal(union(A)) & epsilon_connected(union(A)) & epsilon_transitive(union(A)))) # label(fc4_ordinal1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	127 (all A all B -((all C -(in(C,B) & (all D -(in(D,B) & in(D,C))))) & in(A,B))) # label(t7_tarski) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	128 (all A all B (relation(B) -> ((all C all D (in(ordered_pair(C,D),B) <-> C = D & in(C,A))) <-> identity_relation(A) = B))) # label(d10_relat_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	129 (all A -empty(succ(A))) # label(fc1_ordinal1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	130 (all A all B (ordinal(B) -> (in(A,B) -> ordinal(A)))) # label(t23_ordinal1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	131 (all A all B all C all D (in(ordered_pair(A,B),cartesian_product2(C,D)) <-> in(B,D) & in(A,C))) # label(l55_zfmisc_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	132 $T # label(dt_k9_relat_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	133 (all A all B (relation(B) -> -(A != empty_set & relation_inverse_image(B,A) = empty_set & subset(A,relation_rng(B))))) # label(t174_relat_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	134 (all A all B (relation(B) -> relation_composition(identity_relation(A),B) = relation_dom_restriction(B,A))) # label(t94_relat_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	135 (all A all B all C (relation(C) -> (in(A,relation_inverse_image(C,B)) <-> (exists D (in(ordered_pair(A,D),C) & in(D,B) & in(D,relation_rng(C))))))) # label(t166_relat_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	136 (all A (relation(A) -> (well_orders(A,relation_field(A)) <-> well_ordering(A)))) # label(t8_wellord1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	137 (all A all B all C (subset(A,B) -> subset(cartesian_product2(C,A),cartesian_product2(C,B)) & subset(cartesian_product2(A,C),cartesian_product2(B,C)))) # label(t118_zfmisc_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	138 (all A all B ((all C (A = C <-> in(C,B))) <-> B = singleton(A))) # label(d1_tarski) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	139 (all A (relation(A) -> (all B (relation(B) -> (subset(A,B) <-> (all C all D (in(ordered_pair(C,D),A) -> in(ordered_pair(C,D),B)))))))) # label(d3_relat_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	140 (all A (function(A) & relation(A) -> (all B all C (relation_image(A,B) = C <-> (all D ((exists E (in(E,relation_dom(A)) & D = apply(A,E) & in(E,B))) <-> in(D,C))))))) # label(d12_funct_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	141 (all A (relation(A) -> (all B (is_reflexive_in(A,B) <-> (all C (in(C,B) -> in(ordered_pair(C,C),A))))))) # label(d1_relat_2) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	142 (all A (ordinal(A) <-> epsilon_connected(A) & epsilon_transitive(A))) # label(d4_ordinal1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	143 (all A (relation(A) -> (all B (is_antisymmetric_in(A,B) <-> (all C all D (in(C,B) & in(ordered_pair(D,C),A) & in(ordered_pair(C,D),A) & in(D,B) -> D = C)))))) # label(d4_relat_2) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	144 $T # label(dt_m1_subset_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	145 (all A all B (subset(singleton(A),singleton(B)) -> A = B)) # label(t6_zfmisc_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	146 (all A all B (relation(B) & relation(A) -> relation(relation_composition(A,B)))) # label(dt_k5_relat_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	147 (all A (relation(A) -> set_union2(relation_dom(A),relation_rng(A)) = relation_field(A))) # label(d6_relat_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	148 (exists A -empty(A)) # label(rc2_xboole_0) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	149 (all A all B all C all D (ordered_pair(A,B) = ordered_pair(C,D) -> A = C & B = D)) # label(t33_zfmisc_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	150 (all A A = set_difference(A,empty_set)) # label(t3_boole) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	151 $T # label(dt_k1_enumset1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	152 (all A all B all C (element(C,powerset(A)) & element(B,powerset(A)) -> subset_difference(A,B,C) = set_difference(B,C))) # label(redefinition_k6_subset_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	153 (all A ((all B -in(B,A)) <-> A = empty_set)) # label(d1_xboole_0) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	154 (all A (relation(A) -> relation_rng(A) = relation_dom(relation_inverse(A)) & relation_rng(relation_inverse(A)) = relation_dom(A))) # label(t37_relat_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	155 (all A (ordinal(A) -> ((all B (ordinal(B) -> (in(B,A) -> in(succ(B),A)))) <-> being_limit_ordinal(A)))) # label(t41_ordinal1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	156 (all A relation(identity_relation(A))) # label(dt_k6_relat_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	157 (all A all B (B = union(A) <-> (all C (in(C,B) <-> (exists D (in(D,A) & in(C,D))))))) # label(d4_tarski) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	158 (all A all B subset(A,set_union2(A,B))) # label(t7_xboole_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	159 (all A all B all C (relation(C) -> (in(A,C) & in(A,cartesian_product2(B,B)) <-> in(A,relation_restriction(C,B))))) # label(t16_wellord1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	160 (all A all B (-empty(A) & -empty(B) -> -empty(cartesian_product2(A,B)))) # label(fc4_subset_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	161 (all A all B (element(A,B) -> in(A,B) | empty(B))) # label(t2_subset) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	162 (all A all B (ordinal(B) -> -((all C (ordinal(C) -> -((all D (ordinal(D) -> (in(D,A) -> ordinal_subset(C,D)))) & in(C,A)))) & empty_set != A & subset(A,B)))) # label(t32_ordinal1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	163 $T # label(dt_k1_zfmisc_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	164 (all A all B (subset(A,B) -> set_union2(A,set_difference(B,A)) = B)) # label(t45_xboole_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	165 (all A all B (in(A,B) -> subset(A,union(B)))) # label(t92_zfmisc_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	166 (all A element(cast_to_subset(A),powerset(A))) # label(dt_k2_subset_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	167 (all A ((all B all C -(in(C,A) & -in(B,C) & B != C & -in(C,B) & in(B,A))) <-> epsilon_connected(A))) # label(d3_ordinal1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	168 (all A (being_limit_ordinal(A) <-> union(A) = A)) # label(d6_ordinal1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	169 (all A all B (relation(B) -> subset(relation_field(relation_restriction(B,A)),relation_field(B)) & subset(relation_field(relation_restriction(B,A)),A))) # label(t20_wellord1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	170 (all A (relation(A) -> (all B (is_transitive_in(A,B) <-> (all C all D all E (in(E,B) & in(ordered_pair(D,E),A) & in(ordered_pair(C,D),A) & in(D,B) & in(C,B) -> in(ordered_pair(C,E),A))))))) # label(d8_relat_2) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	171 $T # label(dt_k4_xboole_0) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	172 (all A (relation(A) -> relation(relation_inverse(A)))) # label(dt_k4_relat_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	173 (all A all B all C (unordered_pair(B,C) = singleton(A) -> C = B)) # label(t9_zfmisc_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	174 (all A all B -(empty(A) & A != B & empty(B))) # label(t8_boole) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	175 (all A all B (in(B,A) -> B = apply(identity_relation(A),B))) # label(t35_funct_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	176 (all A all B (function(B) & relation(B) -> subset(relation_image(B,relation_inverse_image(B,A)),A))) # label(t145_funct_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	177 (all A all B set_intersection2(A,A) = A) # label(idempotence_k3_xboole_0) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	178 (exists A (function(A) & relation(A))) # label(rc1_funct_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	179 $T # label(dt_k3_relat_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	180 $T # label(dt_k10_relat_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	181 (all A all B (relation(B) -> (all C (relation(C) -> (C = relation_rng_restriction(A,B) <-> (all D all E (in(ordered_pair(D,E),C) <-> in(ordered_pair(D,E),B) & in(E,A)))))))) # label(d12_relat_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	182 (all A all B set_union2(A,set_difference(B,A)) = set_union2(A,B)) # label(t39_xboole_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	183 (all A all B (subset(singleton(A),B) <-> in(A,B))) # label(t37_zfmisc_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	184 (all A all B all C (relation(C) -> (in(A,B) & in(A,relation_rng(C)) <-> in(A,relation_rng(relation_rng_restriction(B,C)))))) # label(t115_relat_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	185 (all A all B (in(A,B) -> -in(B,A))) # label(antisymmetry_r2_hidden) # label(axiom) # label(non_clause).  [assumption].
0.43/0.72	186 (all A all B (element(B,powerset(A)) -> (all C (element(C,powerset(A)) -> (subset(B,subset_complement(A,C)) <-> disjoint(B,C)))))) # label(t43_subset_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.72	187 (all A all B (-empty(A) -> -empty(set_union2(B,A)))) # label(fc3_xboole_0) # label(axiom) # label(non_clause).  [assumption].
0.43/0.73	188 (all A (relation(A) -> (all B (relation(B) -> subset(relation_rng(relation_composition(A,B)),relation_rng(B)))))) # label(t45_relat_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.73	189 (all A all B subset(A,A)) # label(reflexivity_r1_tarski) # label(axiom) # label(non_clause).  [assumption].
0.43/0.73	190 (all A all B all C (relation(C) -> relation_rng_restriction(A,relation_dom_restriction(C,B)) = relation_dom_restriction(relation_rng_restriction(A,C),B))) # label(t140_relat_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.73	191 $T # label(dt_k1_setfam_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.73	192 (all A (ordinal(A) -> epsilon_transitive(succ(A)) & ordinal(succ(A)) & epsilon_connected(succ(A)) & -empty(succ(A)))) # label(fc3_ordinal1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.73	193 (all A all B all C (subset(A,B) & subset(A,C) -> subset(A,set_intersection2(B,C)))) # label(t19_xboole_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.73	194 (all A all B all C (element(C,powerset(A)) -> -(in(B,C) & in(B,subset_complement(A,C))))) # label(t54_subset_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.73	195 (all A (relation(A) -> (all B ((all C all D -(in(D,B) & -in(ordered_pair(C,D),A) & -in(ordered_pair(D,C),A) & D != C & in(C,B))) <-> is_connected_in(A,B))))) # label(d6_relat_2) # label(axiom) # label(non_clause).  [assumption].
0.43/0.73	196 $T # label(dt_k1_wellord1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.73	197 (all A all B -empty(unordered_pair(A,B))) # label(fc3_subset_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.73	198 (all A all B all C (relation(C) -> (subset(A,B) -> subset(relation_inverse_image(C,A),relation_inverse_image(C,B))))) # label(t178_relat_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.73	199 (all A all B all C (relation(C) & function(C) -> (in(B,A) -> apply(relation_dom_restriction(C,A),B) = apply(C,B)))) # label(t72_funct_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.73	200 (all A all B (relation(B) -> set_intersection2(relation_dom(B),A) = relation_dom(relation_dom_restriction(B,A)))) # label(t90_relat_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.73	201 (all A all B (subset(A,B) -> set_union2(A,B) = B)) # label(t12_xboole_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.73	202 (exists A (relation(A) & relation_empty_yielding(A) & function(A))) # label(rc4_funct_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.73	203 (all A all B (in(A,B) -> B = set_union2(singleton(A),B))) # label(t46_zfmisc_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.73	204 (all A all B all C (subset(unordered_pair(A,B),C) <-> in(B,C) & in(A,C))) # label(t38_zfmisc_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.73	205 (all A all B ((all C (subset(C,A) <-> in(C,B))) <-> powerset(A) = B)) # label(d1_zfmisc_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.73	206 (all A all B (element(B,powerset(powerset(A))) -> element(complements_of_subsets(A,B),powerset(powerset(A))))) # label(dt_k7_setfam_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.73	207 (all A A = set_union2(A,empty_set)) # label(t1_boole) # label(axiom) # label(non_clause).  [assumption].
0.43/0.73	208 (all A (-empty(A) & relation(A) -> -empty(relation_dom(A)))) # label(fc5_relat_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.73	209 (all A all B (element(B,powerset(A)) -> element(subset_complement(A,B),powerset(A)))) # label(dt_k3_subset_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.73	210 (all A (relation(A) -> (antisymmetric(A) <-> (all B all C (in(ordered_pair(B,C),A) & in(ordered_pair(C,B),A) -> B = C))))) # label(l3_wellord1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.73	211 $T # label(dt_k3_tarski) # label(axiom) # label(non_clause).  [assumption].
0.43/0.73	212 (all A all B (A = singleton(B) | empty_set = A <-> subset(A,singleton(B)))) # label(l4_zfmisc_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.73	213 (all A all B all C (subset(A,B) -> subset(set_intersection2(A,C),set_intersection2(B,C)))) # label(t26_xboole_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.73	214 (all A (function(A) & relation(A) -> (one_to_one(A) -> relation_dom(function_inverse(A)) = relation_rng(A) & relation_dom(A) = relation_rng(function_inverse(A))))) # label(t55_funct_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.73	215 $T # label(dt_k1_funct_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.73	216 (all A (epsilon_connected(A) & epsilon_transitive(A) -> ordinal(A))) # label(cc2_ordinal1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.73	217 (all A all B all C (subset(A,B) & disjoint(B,C) -> disjoint(A,C))) # label(t63_xboole_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.73	218 (all A all B (relation_empty_yielding(A) & relation(A) -> relation_empty_yielding(relation_dom_restriction(A,B)) & relation(relation_dom_restriction(A,B)))) # label(fc13_relat_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.73	219 (all A all B (ordinal(B) & ordinal(A) -> ordinal_subset(A,B) | ordinal_subset(B,A))) # label(connectedness_r1_ordinal1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.73	220 (all A all B -(disjoint(singleton(A),B) & in(A,B))) # label(l25_zfmisc_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.73	221 (all A (relation(A) -> (all B (relation_dom(A) = B <-> (all C (in(C,B) <-> (exists D in(ordered_pair(C,D),A)))))))) # label(d4_relat_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.73	222 (all A (relation(identity_relation(A)) & function(identity_relation(A)))) # label(fc2_funct_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.73	223 (all A all B all C all D -(unordered_pair(C,D) = unordered_pair(A,B) & C != A & A != D)) # label(t10_zfmisc_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.73	224 (all A all B (element(B,powerset(powerset(A))) -> -(empty_set = complements_of_subsets(A,B) & B != empty_set))) # label(t46_setfam_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.73	225 (all A all B set_intersection2(A,B) = set_intersection2(B,A)) # label(commutativity_k3_xboole_0) # label(axiom) # label(non_clause).  [assumption].
0.43/0.73	226 (all A all B subset(set_intersection2(A,B),A)) # label(t17_xboole_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.73	227 (all A (relation(A) -> (relation_dom(A) = empty_set <-> relation_rng(A) = empty_set))) # label(t65_relat_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.73	228 (all A all B set_difference(A,B) = set_difference(set_union2(A,B),B)) # label(t40_xboole_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.73	229 (all A (relation(A) -> (all B (relation(B) -> (subset(relation_rng(A),relation_dom(B)) -> relation_dom(A) = relation_dom(relation_composition(A,B))))))) # label(t46_relat_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.73	230 (all A all B (subset(A,B) <-> empty_set = set_difference(A,B))) # label(l32_xboole_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.73	231 (all A (relation(A) -> (is_well_founded_in(A,relation_field(A)) <-> well_founded_relation(A)))) # label(t5_wellord1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.73	232 $T # label(dt_k4_tarski) # label(axiom) # label(non_clause).  [assumption].
0.43/0.73	233 (all A (relation(A) -> (is_transitive_in(A,relation_field(A)) <-> transitive(A)))) # label(d16_relat_2) # label(axiom) # label(non_clause).  [assumption].
0.43/0.73	234 (all A all B ((all C (in(C,A) -> in(C,B))) -> element(A,powerset(B)))) # label(l71_subset_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.73	235 (all A (relation(A) -> (all B (relation(B) -> relation_image(B,relation_rng(A)) = relation_rng(relation_composition(A,B)))))) # label(t160_relat_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.73	236 (all A all B all C (relation(C) -> (in(ordered_pair(A,B),C) -> in(B,relation_field(C)) & in(A,relation_field(C))))) # label(t30_relat_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.73	237 (all A (relation(A) -> (relation_rng(A) = empty_set | empty_set = relation_dom(A) -> empty_set = A))) # label(t64_relat_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.73	238 (all A all B (relation(B) & relation(A) -> relation(set_union2(A,B)))) # label(fc2_relat_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.73	239 (all A all B (A = set_difference(A,singleton(B)) <-> -in(B,A))) # label(t65_zfmisc_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.73	240 (all A exists B (empty(B) & element(B,powerset(A)))) # label(rc2_subset_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.73	241 (all A (relation(A) -> relation_image(A,relation_dom(A)) = relation_rng(A))) # label(t146_relat_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.73	242 (all A all B (empty(A) & relation(B) -> empty(relation_composition(B,A)) & relation(relation_composition(B,A)))) # label(fc10_relat_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.73	243 (all A all B (ordinal(A) & ordinal(B) -> ordinal_subset(A,A))) # label(reflexivity_r1_ordinal1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.73	244 $T # label(dt_k1_relat_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.73	245 (all A all B set_intersection2(A,B) = set_difference(A,set_difference(A,B))) # label(t48_xboole_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.73	246 (all A (relation(A) -> subset(A,cartesian_product2(relation_dom(A),relation_rng(A))))) # label(t21_relat_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.73	247 (all A all B (relation(B) -> subset(relation_inverse_image(B,A),relation_dom(B)))) # label(t167_relat_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.73	248 (all A all B ((all C (in(C,B) <-> in(C,A))) -> A = B)) # label(t2_tarski) # label(axiom) # label(non_clause).  [assumption].
0.43/0.73	249 (all A all B (ordinal(A) & ordinal(B) -> (subset(A,B) <-> ordinal_subset(A,B)))) # label(redefinition_r1_ordinal1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.73	250 (all A empty_set = set_difference(empty_set,A)) # label(t4_boole) # label(axiom) # label(non_clause).  [assumption].
0.43/0.73	251 (all A (subset(A,empty_set) -> A = empty_set)) # label(t3_xboole_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.73	252 (all A all B (empty_set = set_intersection2(A,B) <-> disjoint(A,B))) # label(d7_xboole_0) # label(axiom) # label(non_clause).  [assumption].
0.43/0.73	253 (all A all B (in(A,B) -> element(A,B))) # label(t1_subset) # label(axiom) # label(non_clause).  [assumption].
0.43/0.73	254 (all A all B all C all D (relation(D) -> (in(ordered_pair(A,B),relation_composition(identity_relation(C),D)) <-> in(A,C) & in(ordered_pair(A,B),D)))) # label(t74_relat_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.73	255 (all A all B (relation(B) -> relation_image(B,set_intersection2(relation_dom(B),A)) = relation_image(B,A))) # label(t145_relat_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.73	256 (all A all B all C (relation(C) -> (in(A,relation_field(relation_restriction(C,B))) -> in(A,relation_field(C)) & in(A,B)))) # label(t19_wellord1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.73	257 (all A all B (element(B,powerset(powerset(A))) -> (empty_set != B -> union_of_subsets(A,complements_of_subsets(A,B)) = subset_difference(A,cast_to_subset(A),meet_of_subsets(A,B))))) # label(t48_setfam_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.73	258 (all A exists B (in(A,B) & (all C all D (in(C,B) & subset(D,C) -> in(D,B))) & (all C -((all D -((all E (subset(E,C) -> in(E,D))) & in(D,B))) & in(C,B))) & (all C -(-in(C,B) & -are_equipotent(C,B) & subset(C,B))))) # label(t9_tarski) # label(axiom) # label(non_clause).  [assumption].
0.43/0.73	259 (all A all B (-((all C -(in(C,A) & in(C,B))) & -disjoint(A,B)) & -(disjoint(A,B) & (exists C (in(C,B) & in(C,A)))))) # label(t3_xboole_0) # label(lemma) # label(non_clause).  [assumption].
0.43/0.73	260 (all A (relation(A) -> (all B (is_antisymmetric_in(A,B) & is_well_founded_in(A,B) & is_connected_in(A,B) & is_transitive_in(A,B) & is_reflexive_in(A,B) <-> well_orders(A,B))))) # label(d5_wellord1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.73	261 $T # label(dt_k2_tarski) # label(axiom) # label(non_clause).  [assumption].
0.43/0.73	262 (all A all B (disjoint(A,B) -> disjoint(B,A))) # label(symmetry_r1_xboole_0) # label(axiom) # label(non_clause).  [assumption].
0.43/0.73	263 (all A (relation(A) -> (all B relation_restriction(A,B) = set_intersection2(A,cartesian_product2(B,B))))) # label(d6_wellord1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.73	264 (all A (relation(A) -> ((all B all C -in(ordered_pair(B,C),A)) -> empty_set = A))) # label(t56_relat_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.73	265 (all A all B (relation(B) -> subset(relation_image(B,A),relation_rng(B)))) # label(t144_relat_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.73	266 (all A all B all C (relation(C) & function(C) -> (in(ordered_pair(A,B),C) <-> apply(C,A) = B & in(A,relation_dom(C))))) # label(t8_funct_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.73	267 (all A -empty(powerset(A))) # label(fc1_subset_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.73	268 (all A singleton(A) = unordered_pair(A,A)) # label(t69_enumset1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.73	269 (all A empty_set != singleton(A)) # label(l1_zfmisc_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.73	270 (all A all B ((empty_set = A -> (B = set_meet(A) <-> B = empty_set)) & (empty_set != A -> (B = set_meet(A) <-> (all C ((all D (in(D,A) -> in(C,D))) <-> in(C,B))))))) # label(d1_setfam_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.73	271 (all A all B all C (function(C) & relation(C) -> (in(B,relation_dom(relation_dom_restriction(C,A))) -> apply(C,B) = apply(relation_dom_restriction(C,A),B)))) # label(t70_funct_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.73	272 (all A (relation(A) -> (all B (relation(B) -> subset(relation_dom(relation_composition(A,B)),relation_dom(A)))))) # label(t44_relat_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.73	273 (all A (A = relation_rng(identity_relation(A)) & relation_dom(identity_relation(A)) = A)) # label(t71_relat_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.73	274 (all A all B (element(B,powerset(A)) -> subset_complement(A,subset_complement(A,B)) = B)) # label(involutiveness_k3_subset_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.73	275 (all A (ordinal(A) -> epsilon_transitive(A) & epsilon_connected(A))) # label(cc1_ordinal1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.73	276 (all A (relation(A) <-> (all B -((all C all D B != ordered_pair(C,D)) & in(B,A))))) # label(d1_relat_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.73	277 $T # label(dt_k2_zfmisc_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.73	278 (all A all B (element(B,powerset(powerset(A))) -> set_meet(B) = meet_of_subsets(A,B))) # label(redefinition_k6_setfam_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.73	279 (all A all B (relation(B) -> subset(relation_rng(relation_rng_restriction(A,B)),A))) # label(t116_relat_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.73	280 (exists A empty(A)) # label(rc1_xboole_0) # label(axiom) # label(non_clause).  [assumption].
0.43/0.73	281 (all A all B (relation(B) & function(B) -> (all C (relation(C) & function(C) -> (in(A,relation_dom(B)) -> apply(relation_composition(B,C),A) = apply(C,apply(B,A))))))) # label(t23_funct_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.73	282 (all A (relation(A) -> ((all B all C -(in(C,relation_field(A)) & C != B & -in(ordered_pair(C,B),A) & -in(ordered_pair(B,C),A) & in(B,relation_field(A)))) <-> connected(A)))) # label(l4_wellord1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.73	283 (all A (relation(A) -> (all B all C (relation(C) -> (C = relation_dom_restriction(A,B) <-> (all D all E (in(D,B) & in(ordered_pair(D,E),A) <-> in(ordered_pair(D,E),C)))))))) # label(d11_relat_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.73	284 (all A (relation(A) & one_to_one(A) & function(A) -> function(relation_inverse(A)) & relation(relation_inverse(A)))) # label(fc3_funct_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.73	285 (exists A (empty(A) & relation(A))) # label(rc1_relat_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.73	286 (all A all B (relation(B) -> subset(relation_dom_restriction(B,A),B))) # label(t88_relat_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.73	287 (all A (function(A) & relation(A) -> function(function_inverse(A)) & relation(function_inverse(A)))) # label(dt_k2_funct_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.73	288 (exists A (empty(A) & function(A) & relation(A))) # label(rc2_funct_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.73	289 (all A all B all C (relation(C) -> subset(fiber(relation_restriction(C,A),B),fiber(C,B)))) # label(t21_wellord1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.73	290 (all A all B A = set_union2(A,A)) # label(idempotence_k2_xboole_0) # label(axiom) # label(non_clause).  [assumption].
0.43/0.73	291 (all A all B (element(B,powerset(powerset(A))) -> complements_of_subsets(A,complements_of_subsets(A,B)) = B)) # label(involutiveness_k7_setfam_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.73	292 (all A all B (relation(B) -> subset(relation_rng(relation_dom_restriction(B,A)),relation_rng(B)))) # label(t99_relat_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.73	293 (all A all B all C (unordered_pair(A,B) = C <-> (all D (in(D,C) <-> D = A | D = B)))) # label(d2_tarski) # label(axiom) # label(non_clause).  [assumption].
0.43/0.73	294 (all A all B (relation(B) & empty(A) -> empty(relation_composition(A,B)) & relation(relation_composition(A,B)))) # label(fc9_relat_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.73	295 (all A all B -empty(ordered_pair(A,B))) # label(fc1_zfmisc_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.73	296 (all A all B -proper_subset(A,A)) # label(irreflexivity_r2_xboole_0) # label(axiom) # label(non_clause).  [assumption].
0.43/0.73	297 (all A (relation(A) -> (all B all C ((all D (in(D,C) <-> (exists E (in(ordered_pair(D,E),A) & in(E,B))))) <-> relation_inverse_image(A,B) = C)))) # label(d14_relat_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.73	298 (all A (relation(A) -> (all B (relation_rng(A) = B <-> (all C ((exists D in(ordered_pair(D,C),A)) <-> in(C,B))))))) # label(d5_relat_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.73	299 (all A all B (relation(B) & function(B) -> (subset(A,relation_rng(B)) -> relation_image(B,relation_inverse_image(B,A)) = A))) # label(t147_funct_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.73	300 (all A all B (relation(B) & function(B) -> ((all C (in(C,A) -> C = apply(B,C))) & relation_dom(B) = A <-> B = identity_relation(A)))) # label(t34_funct_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.73	301 (all A (empty(A) -> relation(A))) # label(cc1_relat_1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.73	302 (all A all B all C (relation(C) -> (in(A,relation_image(C,B)) <-> (exists D (in(D,relation_dom(C)) & in(ordered_pair(D,A),C) & in(D,B)))))) # label(t143_relat_1) # label(lemma) # label(non_clause).  [assumption].
0.43/0.73	303 (exists A (function(A) & ordinal(A) & epsilon_connected(A) & epsilon_transitive(A) & empty(A) & one_to_one(A) & relation(A))) # label(rc2_ordinal1) # label(axiom) # label(non_clause).  [assumption].
0.43/0.73	304 (all A all B (proper_subset(A,B) <-> subset(A,B) & B != A)) # label(d8_xboole_0) # label(axiom) # label(non_clause).  [assumption].
0.43/0.73	305 -(all A all B (relation(B) -> (reflexive(B) -> reflexive(relation_restriction(B,A))))) # label(t22_wellord1) # label(negated_conjecture) # label(non_clause).  [assumption].
0.43/0.73	
0.43/0.73	============================== end of process non-clausal formulas ===
0.43/0.73	
0.43/0.73	============================== PROCESS INITIAL CLAUSES ===============
0.43/0.73	
0.43/0.73	============================== PREDICATE ELIMINATION =================
0.43/0.73	306 in(f20(A),A) | epsilon_transitive(A) # label(d2_ordinal1) # label(axiom).  [clausify(38)].
0.43/0.73	307 -epsilon_transitive(A) | -ordinal(B) | -proper_subset(A,B) | in(A,B) # label(t21_ordinal1) # label(lemma).  [clausify(11)].
0.43/0.73	Derived: in(f20(A),A) | -ordinal(B) | -proper_subset(A,B) | in(A,B).  [resolve(306,b,307,a)].
0.43/0.73	308 -subset(f20(A),A) | epsilon_transitive(A) # label(d2_ordinal1) # label(axiom).  [clausify(38)].
0.43/0.73	Derived: -subset(f20(A),A) | -ordinal(B) | -proper_subset(A,B) | in(A,B).  [resolve(308,b,307,a)].
0.43/0.73	309 -in(A,B) | subset(A,B) | -epsilon_transitive(B) # label(d2_ordinal1) # label(axiom).  [clausify(38)].
0.43/0.73	Derived: -in(A,B) | subset(A,B) | in(f20(B),B).  [resolve(309,c,306,b)].
0.43/0.73	Derived: -in(A,B) | subset(A,B) | -subset(f20(B),B).  [resolve(309,c,308,b)].
0.43/0.73	310 epsilon_transitive(c1) # label(rc1_ordinal1) # label(axiom).  [clausify(47)].
0.43/0.73	Derived: -ordinal(A) | -proper_subset(c1,A) | in(c1,A).  [resolve(310,a,307,a)].
0.52/0.77	Derived: -in(A,c1) | subset(A,c1).  [resolve(310,a,309,c)].
0.52/0.77	311 epsilon_transitive(c3) # label(rc3_ordinal1) # label(axiom).  [clausify(80)].
0.52/0.77	Derived: -ordinal(A) | -proper_subset(c3,A) | in(c3,A).  [resolve(311,a,307,a)].
0.52/0.77	Derived: -in(A,c3) | subset(A,c3).  [resolve(311,a,309,c)].
0.52/0.77	312 epsilon_transitive(empty_set) # label(fc2_ordinal1_AndRHS_AndRHS_AndRHS_AndLHS) # label(axiom).  [assumption].
0.52/0.77	Derived: -ordinal(A) | -proper_subset(empty_set,A) | in(empty_set,A).  [resolve(312,a,307,a)].
0.52/0.77	Derived: -in(A,empty_set) | subset(A,empty_set).  [resolve(312,a,309,c)].
0.52/0.77	313 -empty(A) | epsilon_transitive(A) # label(cc3_ordinal1) # label(axiom).  [clausify(104)].
0.52/0.77	Derived: -empty(A) | -ordinal(B) | -proper_subset(A,B) | in(A,B).  [resolve(313,b,307,a)].
0.52/0.77	314 -ordinal(A) | epsilon_transitive(union(A)) # label(fc4_ordinal1) # label(axiom).  [clausify(126)].
0.52/0.77	Derived: -ordinal(A) | -ordinal(B) | -proper_subset(union(A),B) | in(union(A),B).  [resolve(314,b,307,a)].
0.52/0.77	Derived: -ordinal(A) | -in(B,union(A)) | subset(B,union(A)).  [resolve(314,b,309,c)].
0.52/0.77	315 -ordinal(A) | epsilon_transitive(A) # label(d4_ordinal1) # label(axiom).  [clausify(142)].
0.52/0.77	Derived: -ordinal(A) | -ordinal(B) | -proper_subset(A,B) | in(A,B).  [resolve(315,b,307,a)].
0.52/0.77	Derived: -ordinal(A) | -in(B,A) | subset(B,A).  [resolve(315,b,309,c)].
0.52/0.77	316 ordinal(A) | -epsilon_connected(A) | -epsilon_transitive(A) # label(d4_ordinal1) # label(axiom).  [clausify(142)].
0.52/0.77	Derived: ordinal(A) | -epsilon_connected(A) | in(f20(A),A).  [resolve(316,c,306,b)].
0.52/0.77	Derived: ordinal(A) | -epsilon_connected(A) | -subset(f20(A),A).  [resolve(316,c,308,b)].
0.52/0.77	Derived: ordinal(c1) | -epsilon_connected(c1).  [resolve(316,c,310,a)].
0.52/0.77	Derived: ordinal(c3) | -epsilon_connected(c3).  [resolve(316,c,311,a)].
0.52/0.77	Derived: ordinal(empty_set) | -epsilon_connected(empty_set).  [resolve(316,c,312,a)].
0.52/0.77	Derived: ordinal(A) | -epsilon_connected(A) | -empty(A).  [resolve(316,c,313,b)].
0.52/0.77	Derived: ordinal(union(A)) | -epsilon_connected(union(A)) | -ordinal(A).  [resolve(316,c,314,b)].
0.52/0.77	317 -ordinal(A) | epsilon_transitive(succ(A)) # label(fc3_ordinal1) # label(axiom).  [clausify(192)].
0.52/0.77	Derived: -ordinal(A) | -ordinal(B) | -proper_subset(succ(A),B) | in(succ(A),B).  [resolve(317,b,307,a)].
0.52/0.77	Derived: -ordinal(A) | -in(B,succ(A)) | subset(B,succ(A)).  [resolve(317,b,309,c)].
0.52/0.77	318 -epsilon_connected(A) | -epsilon_transitive(A) | ordinal(A) # label(cc2_ordinal1) # label(axiom).  [clausify(216)].
0.52/0.77	Derived: -epsilon_connected(succ(A)) | ordinal(succ(A)) | -ordinal(A).  [resolve(318,b,317,b)].
0.52/0.77	319 -ordinal(A) | epsilon_transitive(A) # label(cc1_ordinal1) # label(axiom).  [clausify(275)].
0.52/0.77	320 epsilon_transitive(c12) # label(rc2_ordinal1) # label(axiom).  [clausify(303)].
0.52/0.77	Derived: -ordinal(A) | -proper_subset(c12,A) | in(c12,A).  [resolve(320,a,307,a)].
0.52/0.77	Derived: -in(A,c12) | subset(A,c12).  [resolve(320,a,309,c)].
0.52/0.77	Derived: ordinal(c12) | -epsilon_connected(c12).  [resolve(320,a,316,c)].
0.52/0.77	321 -relation(A) | is_connected_in(A,relation_field(A)) | -connected(A) # label(d14_relat_2) # label(axiom).  [clausify(12)].
0.52/0.77	322 -relation(A) | -is_connected_in(A,relation_field(A)) | connected(A) # label(d14_relat_2) # label(axiom).  [clausify(12)].
0.52/0.77	323 -relation(A) | -connected(A) | -well_founded_relation(A) | -antisymmetric(A) | -transitive(A) | -reflexive(A) | well_ordering(A) # label(d4_wellord1) # label(axiom).  [clausify(82)].
0.52/0.77	Derived: -relation(A) | -well_founded_relation(A) | -antisymmetric(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)).  [resolve(323,b,322,c)].
0.52/0.77	324 -relation(A) | connected(A) | -well_ordering(A) # label(d4_wellord1) # label(axiom).  [clausify(82)].
0.52/0.77	Derived: -relation(A) | -well_ordering(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(324,b,321,c)].
0.52/0.77	325 -relation(A) | in(f97(A),relation_field(A)) | connected(A) # label(l4_wellord1) # label(lemma).  [clausify(282)].
0.52/0.77	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(325,c,321,c)].
0.52/0.79	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -well_founded_relation(A) | -antisymmetric(A) | -transitive(A) | -reflexive(A) | well_ordering(A).  [resolve(325,c,323,b)].
0.52/0.79	326 -relation(A) | f97(A) != f96(A) | connected(A) # label(l4_wellord1) # label(lemma).  [clausify(282)].
0.52/0.79	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(326,c,321,c)].
0.52/0.79	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -well_founded_relation(A) | -antisymmetric(A) | -transitive(A) | -reflexive(A) | well_ordering(A).  [resolve(326,c,323,b)].
0.52/0.79	327 -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | connected(A) # label(l4_wellord1) # label(lemma).  [clausify(282)].
0.52/0.79	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(327,c,321,c)].
0.52/0.79	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -well_founded_relation(A) | -antisymmetric(A) | -transitive(A) | -reflexive(A) | well_ordering(A).  [resolve(327,c,323,b)].
0.52/0.79	328 -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | connected(A) # label(l4_wellord1) # label(lemma).  [clausify(282)].
0.52/0.79	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(328,c,321,c)].
0.52/0.79	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -well_founded_relation(A) | -antisymmetric(A) | -transitive(A) | -reflexive(A) | well_ordering(A).  [resolve(328,c,323,b)].
0.52/0.79	329 -relation(A) | in(f96(A),relation_field(A)) | connected(A) # label(l4_wellord1) # label(lemma).  [clausify(282)].
0.52/0.79	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(329,c,321,c)].
0.52/0.79	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -well_founded_relation(A) | -antisymmetric(A) | -transitive(A) | -reflexive(A) | well_ordering(A).  [resolve(329,c,323,b)].
0.52/0.79	330 -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -connected(A) # label(l4_wellord1) # label(lemma).  [clausify(282)].
0.52/0.79	Derived: -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A) | -is_connected_in(A,relation_field(A)).  [resolve(330,g,322,c)].
0.52/0.79	Derived: -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A) | -well_ordering(A).  [resolve(330,g,324,b)].
0.52/0.79	Derived: -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A) | in(f97(A),relation_field(A)).  [resolve(330,g,325,c)].
0.52/0.79	Derived: -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A) | f97(A) != f96(A).  [resolve(330,g,326,c)].
0.52/0.79	Derived: -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A) | -in(ordered_pair(f97(A),f96(A)),A).  [resolve(330,g,327,c)].
0.52/0.79	Derived: -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A) | -in(ordered_pair(f96(A),f97(A)),A).  [resolve(330,g,328,c)].
0.52/0.79	Derived: -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A) | in(f96(A),relation_field(A)).  [resolve(330,g,329,c)].
0.52/0.79	331 -relation(A) | is_antisymmetric_in(A,relation_field(A)) | -antisymmetric(A) # label(d12_relat_2) # label(axiom).  [clausify(16)].
0.52/0.79	332 -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | antisymmetric(A) # label(d12_relat_2) # label(axiom).  [clausify(16)].
0.52/0.79	333 -relation(A) | antisymmetric(A) | -well_ordering(A) # label(d4_wellord1) # label(axiom).  [clausify(82)].
0.52/0.79	Derived: -relation(A) | -well_ordering(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(333,b,331,c)].
0.52/0.80	334 -relation(A) | -antisymmetric(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B # label(l3_wellord1) # label(lemma).  [clausify(210)].
0.52/0.80	Derived: -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A) | -is_antisymmetric_in(A,relation_field(A)).  [resolve(334,b,332,c)].
0.52/0.80	Derived: -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A) | -well_ordering(A).  [resolve(334,b,333,b)].
0.52/0.80	335 -relation(A) | antisymmetric(A) | in(ordered_pair(f77(A),f78(A)),A) # label(l3_wellord1) # label(lemma).  [clausify(210)].
0.52/0.80	Derived: -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(335,b,331,c)].
0.52/0.80	Derived: -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B.  [resolve(335,b,334,b)].
0.52/0.80	336 -relation(A) | antisymmetric(A) | in(ordered_pair(f78(A),f77(A)),A) # label(l3_wellord1) # label(lemma).  [clausify(210)].
0.52/0.80	Derived: -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(336,b,331,c)].
0.52/0.80	Derived: -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B.  [resolve(336,b,334,b)].
0.52/0.80	337 -relation(A) | antisymmetric(A) | f78(A) != f77(A) # label(l3_wellord1) # label(lemma).  [clausify(210)].
0.52/0.80	Derived: -relation(A) | f78(A) != f77(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(337,b,331,c)].
0.52/0.80	Derived: -relation(A) | f78(A) != f77(A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B.  [resolve(337,b,334,b)].
0.52/0.80	338 -relation(A) | -well_founded_relation(A) | -antisymmetric(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)).  [resolve(323,b,322,c)].
0.52/0.80	Derived: -relation(A) | -well_founded_relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)).  [resolve(338,c,332,c)].
0.52/0.80	Derived: -relation(A) | -well_founded_relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A).  [resolve(338,c,335,b)].
0.52/0.80	Derived: -relation(A) | -well_founded_relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A).  [resolve(338,c,336,b)].
0.52/0.80	Derived: -relation(A) | -well_founded_relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A).  [resolve(338,c,337,b)].
0.52/0.80	339 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -well_founded_relation(A) | -antisymmetric(A) | -transitive(A) | -reflexive(A) | well_ordering(A).  [resolve(325,c,323,b)].
0.52/0.80	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -well_founded_relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)).  [resolve(339,e,332,c)].
0.52/0.80	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -well_founded_relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A).  [resolve(339,e,335,b)].
0.52/0.80	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -well_founded_relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A).  [resolve(339,e,336,b)].
0.52/0.80	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -well_founded_relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A).  [resolve(339,e,337,b)].
0.52/0.80	340 -relation(A) | f97(A) != f96(A) | -relation(A) | -well_founded_relation(A) | -antisymmetric(A) | -transitive(A) | -reflexive(A) | well_ordering(A).  [resolve(326,c,323,b)].
0.52/0.81	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -well_founded_relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)).  [resolve(340,e,332,c)].
0.52/0.81	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -well_founded_relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A).  [resolve(340,e,335,b)].
0.52/0.81	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -well_founded_relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A).  [resolve(340,e,336,b)].
0.52/0.81	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -well_founded_relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A).  [resolve(340,e,337,b)].
0.52/0.81	341 -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -well_founded_relation(A) | -antisymmetric(A) | -transitive(A) | -reflexive(A) | well_ordering(A).  [resolve(327,c,323,b)].
0.52/0.81	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -well_founded_relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)).  [resolve(341,e,332,c)].
0.52/0.81	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -well_founded_relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A).  [resolve(341,e,335,b)].
0.52/0.81	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -well_founded_relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A).  [resolve(341,e,336,b)].
0.52/0.81	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -well_founded_relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A).  [resolve(341,e,337,b)].
0.52/0.81	342 -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -well_founded_relation(A) | -antisymmetric(A) | -transitive(A) | -reflexive(A) | well_ordering(A).  [resolve(328,c,323,b)].
0.52/0.81	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -well_founded_relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)).  [resolve(342,e,332,c)].
0.52/0.81	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -well_founded_relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A).  [resolve(342,e,335,b)].
0.52/0.81	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -well_founded_relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A).  [resolve(342,e,336,b)].
0.52/0.81	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -well_founded_relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A).  [resolve(342,e,337,b)].
0.52/0.81	343 -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -well_founded_relation(A) | -antisymmetric(A) | -transitive(A) | -reflexive(A) | well_ordering(A).  [resolve(329,c,323,b)].
0.52/0.81	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -well_founded_relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)).  [resolve(343,e,332,c)].
0.52/0.81	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -well_founded_relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A).  [resolve(343,e,335,b)].
0.52/0.81	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -well_founded_relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A).  [resolve(343,e,336,b)].
0.52/0.81	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -well_founded_relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A).  [resolve(343,e,337,b)].
0.52/0.85	344 -ordinal(A) | succ(B) != A | -ordinal(B) | -being_limit_ordinal(A) # label(t42_ordinal1) # label(lemma).  [clausify(56)].
0.52/0.85	345 -ordinal(A) | ordinal(f23(A)) | being_limit_ordinal(A) # label(t42_ordinal1) # label(lemma).  [clausify(56)].
0.52/0.85	346 -ordinal(A) | succ(f23(A)) = A | being_limit_ordinal(A) # label(t42_ordinal1) # label(lemma).  [clausify(56)].
0.52/0.85	Derived: -ordinal(A) | succ(B) != A | -ordinal(B) | -ordinal(A) | ordinal(f23(A)).  [resolve(344,d,345,c)].
0.52/0.85	Derived: -ordinal(A) | succ(B) != A | -ordinal(B) | -ordinal(A) | succ(f23(A)) = A.  [resolve(344,d,346,c)].
0.52/0.85	347 -ordinal(A) | ordinal(f62(A)) | being_limit_ordinal(A) # label(t41_ordinal1) # label(lemma).  [clausify(155)].
0.52/0.85	Derived: -ordinal(A) | ordinal(f62(A)) | -ordinal(A) | succ(B) != A | -ordinal(B).  [resolve(347,c,344,d)].
0.52/0.85	348 -ordinal(A) | in(f62(A),A) | being_limit_ordinal(A) # label(t41_ordinal1) # label(lemma).  [clausify(155)].
0.52/0.85	Derived: -ordinal(A) | in(f62(A),A) | -ordinal(A) | succ(B) != A | -ordinal(B).  [resolve(348,c,344,d)].
0.52/0.85	349 -ordinal(A) | -in(succ(f62(A)),A) | being_limit_ordinal(A) # label(t41_ordinal1) # label(lemma).  [clausify(155)].
0.52/0.85	Derived: -ordinal(A) | -in(succ(f62(A)),A) | -ordinal(A) | succ(B) != A | -ordinal(B).  [resolve(349,c,344,d)].
0.52/0.85	350 -ordinal(A) | -ordinal(B) | -in(B,A) | in(succ(B),A) | -being_limit_ordinal(A) # label(t41_ordinal1) # label(lemma).  [clausify(155)].
0.52/0.85	Derived: -ordinal(A) | -ordinal(B) | -in(B,A) | in(succ(B),A) | -ordinal(A) | ordinal(f23(A)).  [resolve(350,e,345,c)].
0.52/0.85	Derived: -ordinal(A) | -ordinal(B) | -in(B,A) | in(succ(B),A) | -ordinal(A) | succ(f23(A)) = A.  [resolve(350,e,346,c)].
0.52/0.85	Derived: -ordinal(A) | -ordinal(B) | -in(B,A) | in(succ(B),A) | -ordinal(A) | ordinal(f62(A)).  [resolve(350,e,347,c)].
0.52/0.85	Derived: -ordinal(A) | -ordinal(B) | -in(B,A) | in(succ(B),A) | -ordinal(A) | in(f62(A),A).  [resolve(350,e,348,c)].
0.52/0.85	Derived: -ordinal(A) | -ordinal(B) | -in(B,A) | in(succ(B),A) | -ordinal(A) | -in(succ(f62(A)),A).  [resolve(350,e,349,c)].
0.52/0.85	351 -being_limit_ordinal(A) | union(A) = A # label(d6_ordinal1) # label(axiom).  [clausify(168)].
0.52/0.85	Derived: union(A) = A | -ordinal(A) | ordinal(f23(A)).  [resolve(351,a,345,c)].
0.52/0.85	Derived: union(A) = A | -ordinal(A) | succ(f23(A)) = A.  [resolve(351,a,346,c)].
0.52/0.85	Derived: union(A) = A | -ordinal(A) | ordinal(f62(A)).  [resolve(351,a,347,c)].
0.52/0.85	Derived: union(A) = A | -ordinal(A) | in(f62(A),A).  [resolve(351,a,348,c)].
0.52/0.85	Derived: union(A) = A | -ordinal(A) | -in(succ(f62(A)),A).  [resolve(351,a,349,c)].
0.52/0.85	352 being_limit_ordinal(A) | union(A) != A # label(d6_ordinal1) # label(axiom).  [clausify(168)].
0.52/0.85	Derived: union(A) != A | -ordinal(A) | succ(B) != A | -ordinal(B).  [resolve(352,a,344,d)].
0.52/0.85	Derived: union(A) != A | -ordinal(A) | -ordinal(B) | -in(B,A) | in(succ(B),A).  [resolve(352,a,350,e)].
0.52/0.85	353 -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -well_founded_relation(A) # label(d2_wellord1) # label(axiom).  [clausify(86)].
0.52/0.85	354 -relation(A) | well_founded_relation(A) | -well_ordering(A) # label(d4_wellord1) # label(axiom).  [clausify(82)].
0.52/0.85	355 -relation(A) | empty_set != f29(A) | well_founded_relation(A) # label(d2_wellord1) # label(axiom).  [clausify(86)].
0.52/0.85	356 -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | well_founded_relation(A) # label(d2_wellord1) # label(axiom).  [clausify(86)].
0.52/0.85	357 -relation(A) | subset(f29(A),relation_field(A)) | well_founded_relation(A) # label(d2_wellord1) # label(axiom).  [clausify(86)].
0.52/0.85	Derived: -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A) | -well_ordering(A).  [resolve(353,e,354,b)].
0.52/0.85	Derived: -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A) | empty_set != f29(A).  [resolve(353,e,355,c)].
0.52/0.85	Derived: -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A) | -disjoint(fiber(A,C),f29(A)) | -in(C,f29(A)).  [resolve(353,e,356,d)].
0.52/0.85	Derived: -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)).  [resolve(353,e,357,c)].
0.52/0.87	358 -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -well_founded_relation(A) # label(d2_wellord1) # label(axiom).  [clausify(86)].
0.52/0.87	Derived: -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A) | -well_ordering(A).  [resolve(358,e,354,b)].
0.52/0.87	Derived: -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A) | empty_set != f29(A).  [resolve(358,e,355,c)].
0.52/0.87	Derived: -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A) | -disjoint(fiber(A,C),f29(A)) | -in(C,f29(A)).  [resolve(358,e,356,d)].
0.52/0.87	Derived: -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)).  [resolve(358,e,357,c)].
0.52/0.87	359 -relation(A) | -is_well_founded_in(A,relation_field(A)) | well_founded_relation(A) # label(t5_wellord1) # label(lemma).  [clausify(231)].
0.52/0.87	Derived: -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)).  [resolve(359,c,353,e)].
0.52/0.87	Derived: -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)).  [resolve(359,c,358,e)].
0.52/0.87	360 -relation(A) | is_well_founded_in(A,relation_field(A)) | -well_founded_relation(A) # label(t5_wellord1) # label(lemma).  [clausify(231)].
0.52/0.87	Derived: -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A) | -well_ordering(A).  [resolve(360,c,354,b)].
0.52/0.87	Derived: -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A).  [resolve(360,c,355,c)].
0.52/0.87	Derived: -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)).  [resolve(360,c,356,d)].
0.52/0.87	Derived: -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)).  [resolve(360,c,357,c)].
0.52/0.87	361 -relation(A) | -well_founded_relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)).  [resolve(338,c,332,c)].
0.52/0.87	Derived: -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A).  [resolve(361,b,355,c)].
0.52/0.87	Derived: -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)).  [resolve(361,b,356,d)].
0.52/0.87	Derived: -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)).  [resolve(361,b,357,c)].
0.52/0.87	Derived: -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)).  [resolve(361,b,359,c)].
0.52/0.87	362 -relation(A) | -well_founded_relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A).  [resolve(338,c,335,b)].
0.52/0.87	Derived: -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A).  [resolve(362,b,355,c)].
0.52/0.87	Derived: -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)).  [resolve(362,b,356,d)].
0.52/0.87	Derived: -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)).  [resolve(362,b,357,c)].
0.52/0.87	Derived: -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)).  [resolve(362,b,359,c)].
0.52/0.87	363 -relation(A) | -well_founded_relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A).  [resolve(338,c,336,b)].
0.52/0.87	Derived: -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A).  [resolve(363,b,355,c)].
0.52/0.87	Derived: -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)).  [resolve(363,b,356,d)].
0.52/0.87	Derived: -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)).  [resolve(363,b,357,c)].
0.52/0.87	Derived: -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)).  [resolve(363,b,359,c)].
0.52/0.87	364 -relation(A) | -well_founded_relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A).  [resolve(338,c,337,b)].
0.52/0.87	Derived: -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A).  [resolve(364,b,355,c)].
0.52/0.87	Derived: -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)).  [resolve(364,b,356,d)].
0.52/0.87	Derived: -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)).  [resolve(364,b,357,c)].
0.52/0.87	Derived: -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)).  [resolve(364,b,359,c)].
0.52/0.87	365 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -well_founded_relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)).  [resolve(339,e,332,c)].
0.52/0.87	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A).  [resolve(365,d,355,c)].
0.52/0.87	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)).  [resolve(365,d,356,d)].
0.52/0.87	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)).  [resolve(365,d,357,c)].
0.52/0.87	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)).  [resolve(365,d,359,c)].
0.52/0.87	366 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -well_founded_relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A).  [resolve(339,e,335,b)].
0.52/0.87	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A).  [resolve(366,d,355,c)].
0.52/0.87	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)).  [resolve(366,d,356,d)].
0.52/0.87	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)).  [resolve(366,d,357,c)].
0.52/0.87	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)).  [resolve(366,d,359,c)].
0.52/0.87	367 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -well_founded_relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A).  [resolve(339,e,336,b)].
0.52/0.87	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A).  [resolve(367,d,355,c)].
0.52/0.87	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)).  [resolve(367,d,356,d)].
0.52/0.87	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)).  [resolve(367,d,357,c)].
0.52/0.87	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)).  [resolve(367,d,359,c)].
0.52/0.87	368 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -well_founded_relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A).  [resolve(339,e,337,b)].
0.52/0.87	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A).  [resolve(368,d,355,c)].
0.52/0.87	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)).  [resolve(368,d,356,d)].
0.52/0.87	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)).  [resolve(368,d,357,c)].
0.52/0.87	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)).  [resolve(368,d,359,c)].
0.52/0.87	369 -relation(A) | f97(A) != f96(A) | -relation(A) | -well_founded_relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)).  [resolve(340,e,332,c)].
0.52/0.87	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A).  [resolve(369,d,355,c)].
0.52/0.88	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)).  [resolve(369,d,356,d)].
0.52/0.88	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)).  [resolve(369,d,357,c)].
0.52/0.88	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)).  [resolve(369,d,359,c)].
0.52/0.88	370 -relation(A) | f97(A) != f96(A) | -relation(A) | -well_founded_relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A).  [resolve(340,e,335,b)].
0.52/0.88	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A).  [resolve(370,d,355,c)].
0.52/0.88	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)).  [resolve(370,d,356,d)].
0.52/0.88	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)).  [resolve(370,d,357,c)].
0.52/0.88	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)).  [resolve(370,d,359,c)].
0.52/0.88	371 -relation(A) | f97(A) != f96(A) | -relation(A) | -well_founded_relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A).  [resolve(340,e,336,b)].
0.52/0.88	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A).  [resolve(371,d,355,c)].
0.52/0.88	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)).  [resolve(371,d,356,d)].
0.52/0.88	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)).  [resolve(371,d,357,c)].
0.52/0.88	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)).  [resolve(371,d,359,c)].
0.52/0.88	372 -relation(A) | f97(A) != f96(A) | -relation(A) | -well_founded_relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A).  [resolve(340,e,337,b)].
0.52/0.88	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A).  [resolve(372,d,355,c)].
0.52/0.88	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)).  [resolve(372,d,356,d)].
0.52/0.88	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)).  [resolve(372,d,357,c)].
0.52/0.88	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)).  [resolve(372,d,359,c)].
0.52/0.88	373 -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -well_founded_relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)).  [resolve(341,e,332,c)].
0.52/0.88	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A).  [resolve(373,d,355,c)].
0.52/0.88	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)).  [resolve(373,d,356,d)].
0.52/0.88	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)).  [resolve(373,d,357,c)].
0.52/0.88	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)).  [resolve(373,d,359,c)].
0.52/0.88	374 -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -well_founded_relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A).  [resolve(341,e,335,b)].
0.52/0.88	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A).  [resolve(374,d,355,c)].
0.52/0.88	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)).  [resolve(374,d,356,d)].
0.52/0.88	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)).  [resolve(374,d,357,c)].
0.52/0.88	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)).  [resolve(374,d,359,c)].
0.52/0.88	375 -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -well_founded_relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A).  [resolve(341,e,336,b)].
0.52/0.88	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A).  [resolve(375,d,355,c)].
0.52/0.88	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)).  [resolve(375,d,356,d)].
0.52/0.88	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)).  [resolve(375,d,357,c)].
0.52/0.88	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)).  [resolve(375,d,359,c)].
0.52/0.88	376 -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -well_founded_relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A).  [resolve(341,e,337,b)].
0.52/0.89	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A).  [resolve(376,d,355,c)].
0.52/0.89	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)).  [resolve(376,d,356,d)].
0.52/0.89	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)).  [resolve(376,d,357,c)].
0.52/0.89	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)).  [resolve(376,d,359,c)].
0.52/0.89	377 -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -well_founded_relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)).  [resolve(342,e,332,c)].
0.52/0.89	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A).  [resolve(377,d,355,c)].
0.52/0.89	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)).  [resolve(377,d,356,d)].
0.52/0.89	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)).  [resolve(377,d,357,c)].
0.52/0.89	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)).  [resolve(377,d,359,c)].
0.52/0.89	378 -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -well_founded_relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A).  [resolve(342,e,335,b)].
0.52/0.89	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A).  [resolve(378,d,355,c)].
0.52/0.89	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)).  [resolve(378,d,356,d)].
0.52/0.89	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)).  [resolve(378,d,357,c)].
0.52/0.89	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)).  [resolve(378,d,359,c)].
0.52/0.89	379 -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -well_founded_relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A).  [resolve(342,e,336,b)].
0.52/0.89	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A).  [resolve(379,d,355,c)].
0.52/0.89	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)).  [resolve(379,d,356,d)].
0.52/0.89	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)).  [resolve(379,d,357,c)].
0.52/0.89	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)).  [resolve(379,d,359,c)].
0.52/0.89	380 -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -well_founded_relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A).  [resolve(342,e,337,b)].
0.52/0.89	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A).  [resolve(380,d,355,c)].
0.52/0.89	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)).  [resolve(380,d,356,d)].
0.52/0.89	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)).  [resolve(380,d,357,c)].
0.52/0.89	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)).  [resolve(380,d,359,c)].
0.52/0.89	381 -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -well_founded_relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)).  [resolve(343,e,332,c)].
0.52/0.89	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A).  [resolve(381,d,355,c)].
0.52/0.89	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)).  [resolve(381,d,356,d)].
0.52/0.89	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)).  [resolve(381,d,357,c)].
0.52/0.89	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)).  [resolve(381,d,359,c)].
0.52/0.89	382 -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -well_founded_relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A).  [resolve(343,e,335,b)].
0.52/0.89	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A).  [resolve(382,d,355,c)].
0.52/0.89	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)).  [resolve(382,d,356,d)].
0.52/0.89	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)).  [resolve(382,d,357,c)].
0.52/0.89	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)).  [resolve(382,d,359,c)].
0.52/0.93	383 -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -well_founded_relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A).  [resolve(343,e,336,b)].
0.52/0.93	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A).  [resolve(383,d,355,c)].
0.52/0.93	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)).  [resolve(383,d,356,d)].
0.52/0.93	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)).  [resolve(383,d,357,c)].
0.52/0.93	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)).  [resolve(383,d,359,c)].
0.52/0.93	384 -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -well_founded_relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A).  [resolve(343,e,337,b)].
0.52/0.93	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A).  [resolve(384,d,355,c)].
0.52/0.93	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)).  [resolve(384,d,356,d)].
0.52/0.93	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)).  [resolve(384,d,357,c)].
0.52/0.93	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)).  [resolve(384,d,359,c)].
0.52/0.93	385 -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -transitive(A) # label(l2_wellord1) # label(lemma).  [clausify(110)].
0.52/0.93	386 -relation(A) | transitive(A) | -well_ordering(A) # label(d4_wellord1) # label(axiom).  [clausify(82)].
0.52/0.93	387 -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | transitive(A) # label(l2_wellord1) # label(lemma).  [clausify(110)].
0.52/0.93	388 -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | transitive(A) # label(l2_wellord1) # label(lemma).  [clausify(110)].
0.52/0.93	389 -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | transitive(A) # label(l2_wellord1) # label(lemma).  [clausify(110)].
0.52/0.93	Derived: -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A) | -well_ordering(A).  [resolve(385,e,386,b)].
0.52/0.93	Derived: -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(385,e,387,c)].
0.52/0.93	Derived: -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(385,e,388,c)].
0.52/0.93	Derived: -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(385,e,389,c)].
0.52/0.93	390 -relation(A) | -is_transitive_in(A,relation_field(A)) | transitive(A) # label(d16_relat_2) # label(axiom).  [clausify(233)].
0.52/0.93	Derived: -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A).  [resolve(390,c,385,e)].
0.52/0.95	391 -relation(A) | is_transitive_in(A,relation_field(A)) | -transitive(A) # label(d16_relat_2) # label(axiom).  [clausify(233)].
0.52/0.95	Derived: -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A) | -well_ordering(A).  [resolve(391,c,386,b)].
0.52/0.95	Derived: -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(391,c,387,c)].
0.52/0.95	Derived: -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(391,c,388,c)].
0.52/0.95	Derived: -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(391,c,389,c)].
0.52/0.95	392 -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A).  [resolve(361,b,355,c)].
0.52/0.95	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(392,b,387,c)].
0.52/0.95	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(392,b,388,c)].
0.52/0.95	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(392,b,389,c)].
0.52/0.95	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(392,b,390,c)].
0.52/0.95	393 -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)).  [resolve(361,b,356,d)].
0.52/0.95	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(393,b,387,c)].
0.52/0.95	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(393,b,388,c)].
0.52/0.95	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(393,b,389,c)].
0.52/0.95	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(393,b,390,c)].
0.52/0.95	394 -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)).  [resolve(361,b,357,c)].
0.52/0.95	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(394,b,387,c)].
0.52/0.96	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(394,b,388,c)].
0.52/0.96	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(394,b,389,c)].
0.52/0.96	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(394,b,390,c)].
0.52/0.96	395 -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)).  [resolve(361,b,359,c)].
0.52/0.96	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(395,b,387,c)].
0.52/0.96	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(395,b,388,c)].
0.52/0.96	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(395,b,389,c)].
0.52/0.96	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(395,b,390,c)].
0.52/0.96	396 -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A).  [resolve(362,b,355,c)].
0.52/0.96	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(396,b,387,c)].
0.52/0.96	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(396,b,388,c)].
0.52/0.96	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(396,b,389,c)].
0.52/0.96	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(396,b,390,c)].
0.52/0.96	397 -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)).  [resolve(362,b,356,d)].
0.52/0.99	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(397,b,387,c)].
0.52/0.99	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(397,b,388,c)].
0.52/0.99	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(397,b,389,c)].
0.52/0.99	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(397,b,390,c)].
0.52/0.99	398 -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)).  [resolve(362,b,357,c)].
0.52/0.99	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(398,b,387,c)].
0.52/0.99	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(398,b,388,c)].
0.52/0.99	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(398,b,389,c)].
0.52/0.99	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(398,b,390,c)].
0.52/0.99	399 -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)).  [resolve(362,b,359,c)].
0.52/0.99	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(399,b,387,c)].
0.52/0.99	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(399,b,388,c)].
0.52/0.99	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(399,b,389,c)].
0.52/0.99	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(399,b,390,c)].
0.52/1.01	400 -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A).  [resolve(363,b,355,c)].
0.52/1.01	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(400,b,387,c)].
0.52/1.01	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(400,b,388,c)].
0.52/1.01	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(400,b,389,c)].
0.52/1.01	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(400,b,390,c)].
0.52/1.01	401 -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)).  [resolve(363,b,356,d)].
0.52/1.01	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(401,b,387,c)].
0.52/1.01	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(401,b,388,c)].
0.52/1.01	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(401,b,389,c)].
0.52/1.01	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(401,b,390,c)].
0.52/1.01	402 -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)).  [resolve(363,b,357,c)].
0.52/1.01	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(402,b,387,c)].
0.52/1.01	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(402,b,388,c)].
0.52/1.01	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(402,b,389,c)].
0.52/1.01	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(402,b,390,c)].
0.52/1.03	403 -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)).  [resolve(363,b,359,c)].
0.52/1.03	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(403,b,387,c)].
0.52/1.03	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(403,b,388,c)].
0.52/1.03	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(403,b,389,c)].
0.52/1.03	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(403,b,390,c)].
0.52/1.03	404 -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A).  [resolve(364,b,355,c)].
0.52/1.03	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(404,b,387,c)].
0.52/1.03	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(404,b,388,c)].
0.52/1.03	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(404,b,389,c)].
0.52/1.03	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(404,b,390,c)].
0.52/1.03	405 -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)).  [resolve(364,b,356,d)].
0.52/1.03	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(405,b,387,c)].
0.52/1.03	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(405,b,388,c)].
0.52/1.03	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(405,b,389,c)].
0.52/1.03	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(405,b,390,c)].
0.52/1.05	406 -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)).  [resolve(364,b,357,c)].
0.52/1.05	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(406,b,387,c)].
0.52/1.05	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(406,b,388,c)].
0.52/1.05	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(406,b,389,c)].
0.52/1.05	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(406,b,390,c)].
0.52/1.05	407 -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)).  [resolve(364,b,359,c)].
0.52/1.05	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(407,b,387,c)].
0.52/1.05	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(407,b,388,c)].
0.52/1.05	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(407,b,389,c)].
0.52/1.05	Derived: -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(407,b,390,c)].
0.52/1.05	408 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A).  [resolve(365,d,355,c)].
0.52/1.05	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(408,d,387,c)].
0.52/1.05	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(408,d,388,c)].
0.52/1.05	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(408,d,389,c)].
0.52/1.05	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(408,d,390,c)].
0.52/1.07	409 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)).  [resolve(365,d,356,d)].
0.52/1.07	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(409,d,387,c)].
0.52/1.07	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(409,d,388,c)].
0.52/1.07	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(409,d,389,c)].
0.52/1.07	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(409,d,390,c)].
0.52/1.07	410 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)).  [resolve(365,d,357,c)].
0.52/1.07	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(410,d,387,c)].
0.52/1.07	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(410,d,388,c)].
0.52/1.07	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(410,d,389,c)].
0.52/1.07	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(410,d,390,c)].
0.52/1.07	411 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)).  [resolve(365,d,359,c)].
0.52/1.07	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(411,d,387,c)].
0.52/1.07	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(411,d,388,c)].
0.52/1.07	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(411,d,389,c)].
0.90/1.09	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(411,d,390,c)].
0.90/1.09	412 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A).  [resolve(366,d,355,c)].
0.90/1.09	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(412,d,387,c)].
0.90/1.09	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(412,d,388,c)].
0.90/1.09	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(412,d,389,c)].
0.90/1.09	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(412,d,390,c)].
0.90/1.09	413 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)).  [resolve(366,d,356,d)].
0.90/1.09	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(413,d,387,c)].
0.90/1.09	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(413,d,388,c)].
0.90/1.09	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(413,d,389,c)].
0.90/1.09	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(413,d,390,c)].
0.90/1.09	414 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)).  [resolve(366,d,357,c)].
0.90/1.09	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(414,d,387,c)].
0.90/1.09	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(414,d,388,c)].
0.90/1.09	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(414,d,389,c)].
0.90/1.12	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(414,d,390,c)].
0.90/1.12	415 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)).  [resolve(366,d,359,c)].
0.90/1.12	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(415,d,387,c)].
0.90/1.12	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(415,d,388,c)].
0.90/1.12	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(415,d,389,c)].
0.90/1.12	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(415,d,390,c)].
0.90/1.12	416 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A).  [resolve(367,d,355,c)].
0.90/1.12	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(416,d,387,c)].
0.90/1.12	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(416,d,388,c)].
0.90/1.12	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(416,d,389,c)].
0.90/1.12	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(416,d,390,c)].
0.90/1.12	417 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)).  [resolve(367,d,356,d)].
0.90/1.12	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(417,d,387,c)].
0.90/1.12	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(417,d,388,c)].
0.90/1.12	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(417,d,389,c)].
0.90/1.15	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(417,d,390,c)].
0.90/1.15	418 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)).  [resolve(367,d,357,c)].
0.90/1.15	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(418,d,387,c)].
0.90/1.15	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(418,d,388,c)].
0.90/1.15	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(418,d,389,c)].
0.90/1.15	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(418,d,390,c)].
0.90/1.15	419 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)).  [resolve(367,d,359,c)].
0.90/1.15	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(419,d,387,c)].
0.90/1.15	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(419,d,388,c)].
0.90/1.15	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(419,d,389,c)].
0.90/1.15	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(419,d,390,c)].
0.90/1.15	420 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A).  [resolve(368,d,355,c)].
0.90/1.15	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(420,d,387,c)].
0.90/1.15	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(420,d,388,c)].
0.90/1.15	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(420,d,389,c)].
0.98/1.18	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(420,d,390,c)].
0.98/1.18	421 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)).  [resolve(368,d,356,d)].
0.98/1.18	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(421,d,387,c)].
0.98/1.18	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(421,d,388,c)].
0.98/1.18	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(421,d,389,c)].
0.98/1.18	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(421,d,390,c)].
0.98/1.18	422 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)).  [resolve(368,d,357,c)].
0.98/1.18	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(422,d,387,c)].
0.98/1.18	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(422,d,388,c)].
0.98/1.18	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(422,d,389,c)].
0.98/1.18	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(422,d,390,c)].
0.98/1.18	423 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)).  [resolve(368,d,359,c)].
0.98/1.18	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(423,d,387,c)].
0.98/1.18	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(423,d,388,c)].
0.98/1.18	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(423,d,389,c)].
0.98/1.18	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(423,d,390,c)].
0.98/1.20	424 -relation(A) | f97(A) != f96(A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A).  [resolve(369,d,355,c)].
0.98/1.20	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(424,d,387,c)].
0.98/1.20	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(424,d,388,c)].
0.98/1.20	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(424,d,389,c)].
0.98/1.20	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(424,d,390,c)].
0.98/1.20	425 -relation(A) | f97(A) != f96(A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)).  [resolve(369,d,356,d)].
0.98/1.20	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(425,d,387,c)].
0.98/1.20	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(425,d,388,c)].
0.98/1.20	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(425,d,389,c)].
0.98/1.20	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(425,d,390,c)].
0.98/1.20	426 -relation(A) | f97(A) != f96(A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)).  [resolve(369,d,357,c)].
0.98/1.20	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(426,d,387,c)].
0.98/1.20	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(426,d,388,c)].
0.98/1.20	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(426,d,389,c)].
0.98/1.20	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(426,d,390,c)].
1.03/1.22	427 -relation(A) | f97(A) != f96(A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)).  [resolve(369,d,359,c)].
1.03/1.22	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(427,d,387,c)].
1.03/1.22	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(427,d,388,c)].
1.03/1.22	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(427,d,389,c)].
1.03/1.22	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(427,d,390,c)].
1.03/1.22	428 -relation(A) | f97(A) != f96(A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A).  [resolve(370,d,355,c)].
1.03/1.22	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(428,d,387,c)].
1.03/1.22	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(428,d,388,c)].
1.03/1.22	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(428,d,389,c)].
1.03/1.22	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(428,d,390,c)].
1.03/1.22	429 -relation(A) | f97(A) != f96(A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)).  [resolve(370,d,356,d)].
1.03/1.22	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(429,d,387,c)].
1.03/1.22	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(429,d,388,c)].
1.03/1.22	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(429,d,389,c)].
1.03/1.22	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(429,d,390,c)].
1.06/1.25	430 -relation(A) | f97(A) != f96(A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)).  [resolve(370,d,357,c)].
1.06/1.25	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(430,d,387,c)].
1.06/1.25	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(430,d,388,c)].
1.06/1.25	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(430,d,389,c)].
1.06/1.25	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(430,d,390,c)].
1.06/1.25	431 -relation(A) | f97(A) != f96(A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)).  [resolve(370,d,359,c)].
1.06/1.25	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(431,d,387,c)].
1.06/1.25	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(431,d,388,c)].
1.06/1.25	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(431,d,389,c)].
1.06/1.25	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(431,d,390,c)].
1.06/1.25	432 -relation(A) | f97(A) != f96(A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A).  [resolve(371,d,355,c)].
1.06/1.25	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(432,d,387,c)].
1.06/1.25	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(432,d,388,c)].
1.06/1.25	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(432,d,389,c)].
1.06/1.25	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(432,d,390,c)].
1.06/1.25	433 -relation(A) | f97(A) != f96(A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)).  [resolve(371,d,356,d)].
1.06/1.28	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(433,d,387,c)].
1.06/1.28	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(433,d,388,c)].
1.06/1.28	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(433,d,389,c)].
1.06/1.28	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(433,d,390,c)].
1.06/1.28	434 -relation(A) | f97(A) != f96(A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)).  [resolve(371,d,357,c)].
1.06/1.28	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(434,d,387,c)].
1.06/1.28	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(434,d,388,c)].
1.06/1.28	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(434,d,389,c)].
1.06/1.28	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(434,d,390,c)].
1.06/1.28	435 -relation(A) | f97(A) != f96(A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)).  [resolve(371,d,359,c)].
1.06/1.28	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(435,d,387,c)].
1.06/1.28	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(435,d,388,c)].
1.06/1.28	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(435,d,389,c)].
1.06/1.28	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(435,d,390,c)].
1.06/1.28	436 -relation(A) | f97(A) != f96(A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A).  [resolve(372,d,355,c)].
1.06/1.31	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(436,d,387,c)].
1.06/1.31	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(436,d,388,c)].
1.06/1.31	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(436,d,389,c)].
1.06/1.31	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(436,d,390,c)].
1.06/1.31	437 -relation(A) | f97(A) != f96(A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)).  [resolve(372,d,356,d)].
1.06/1.31	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(437,d,387,c)].
1.06/1.31	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(437,d,388,c)].
1.06/1.31	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(437,d,389,c)].
1.06/1.31	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(437,d,390,c)].
1.06/1.31	438 -relation(A) | f97(A) != f96(A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)).  [resolve(372,d,357,c)].
1.06/1.31	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(438,d,387,c)].
1.06/1.31	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(438,d,388,c)].
1.06/1.31	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(438,d,389,c)].
1.06/1.31	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(438,d,390,c)].
1.06/1.31	439 -relation(A) | f97(A) != f96(A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)).  [resolve(372,d,359,c)].
1.06/1.31	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(439,d,387,c)].
1.06/1.31	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(439,d,388,c)].
1.14/1.33	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(439,d,389,c)].
1.14/1.33	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(439,d,390,c)].
1.14/1.33	440 -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A).  [resolve(373,d,355,c)].
1.14/1.33	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(440,d,387,c)].
1.14/1.33	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(440,d,388,c)].
1.14/1.33	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(440,d,389,c)].
1.14/1.33	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(440,d,390,c)].
1.14/1.33	441 -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)).  [resolve(373,d,356,d)].
1.14/1.33	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(441,d,387,c)].
1.14/1.33	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(441,d,388,c)].
1.14/1.33	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(441,d,389,c)].
1.14/1.33	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(441,d,390,c)].
1.14/1.33	442 -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)).  [resolve(373,d,357,c)].
1.14/1.33	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(442,d,387,c)].
1.14/1.35	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(442,d,388,c)].
1.14/1.35	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(442,d,389,c)].
1.14/1.35	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(442,d,390,c)].
1.14/1.35	443 -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)).  [resolve(373,d,359,c)].
1.14/1.35	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(443,d,387,c)].
1.14/1.35	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(443,d,388,c)].
1.14/1.35	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(443,d,389,c)].
1.14/1.35	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(443,d,390,c)].
1.14/1.35	444 -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A).  [resolve(374,d,355,c)].
1.14/1.35	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(444,d,387,c)].
1.14/1.35	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(444,d,388,c)].
1.14/1.35	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(444,d,389,c)].
1.14/1.35	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(444,d,390,c)].
1.14/1.35	445 -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)).  [resolve(374,d,356,d)].
1.14/1.35	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(445,d,387,c)].
1.14/1.37	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(445,d,388,c)].
1.14/1.37	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(445,d,389,c)].
1.14/1.37	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(445,d,390,c)].
1.14/1.37	446 -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)).  [resolve(374,d,357,c)].
1.14/1.37	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(446,d,387,c)].
1.14/1.37	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(446,d,388,c)].
1.14/1.37	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(446,d,389,c)].
1.14/1.37	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(446,d,390,c)].
1.14/1.37	447 -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)).  [resolve(374,d,359,c)].
1.14/1.37	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(447,d,387,c)].
1.14/1.37	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(447,d,388,c)].
1.14/1.37	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(447,d,389,c)].
1.14/1.37	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(447,d,390,c)].
1.14/1.37	448 -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A).  [resolve(375,d,355,c)].
1.19/1.40	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(448,d,387,c)].
1.19/1.40	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(448,d,388,c)].
1.19/1.40	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(448,d,389,c)].
1.19/1.40	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(448,d,390,c)].
1.19/1.40	449 -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)).  [resolve(375,d,356,d)].
1.19/1.40	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(449,d,387,c)].
1.19/1.40	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(449,d,388,c)].
1.19/1.40	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(449,d,389,c)].
1.19/1.40	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(449,d,390,c)].
1.19/1.40	450 -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)).  [resolve(375,d,357,c)].
1.19/1.40	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(450,d,387,c)].
1.19/1.40	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(450,d,388,c)].
1.19/1.40	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(450,d,389,c)].
1.19/1.40	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(450,d,390,c)].
1.19/1.43	451 -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)).  [resolve(375,d,359,c)].
1.19/1.43	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(451,d,387,c)].
1.19/1.43	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(451,d,388,c)].
1.19/1.43	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(451,d,389,c)].
1.19/1.43	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(451,d,390,c)].
1.19/1.43	452 -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A).  [resolve(376,d,355,c)].
1.19/1.43	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(452,d,387,c)].
1.19/1.43	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(452,d,388,c)].
1.19/1.43	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(452,d,389,c)].
1.19/1.43	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(452,d,390,c)].
1.19/1.43	453 -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)).  [resolve(376,d,356,d)].
1.19/1.43	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(453,d,387,c)].
1.19/1.43	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(453,d,388,c)].
1.19/1.43	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(453,d,389,c)].
1.19/1.43	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(453,d,390,c)].
1.19/1.43	454 -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)).  [resolve(376,d,357,c)].
1.26/1.46	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(454,d,387,c)].
1.26/1.46	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(454,d,388,c)].
1.26/1.46	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(454,d,389,c)].
1.26/1.46	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(454,d,390,c)].
1.26/1.46	455 -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)).  [resolve(376,d,359,c)].
1.26/1.46	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(455,d,387,c)].
1.26/1.46	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(455,d,388,c)].
1.26/1.46	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(455,d,389,c)].
1.26/1.46	Derived: -relation(A) | -in(ordered_pair(f97(A),f96(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(455,d,390,c)].
1.26/1.46	456 -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A).  [resolve(377,d,355,c)].
1.26/1.46	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(456,d,387,c)].
1.26/1.46	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(456,d,388,c)].
1.26/1.46	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(456,d,389,c)].
1.26/1.46	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(456,d,390,c)].
1.26/1.46	457 -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)).  [resolve(377,d,356,d)].
1.28/1.48	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(457,d,387,c)].
1.28/1.48	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(457,d,388,c)].
1.28/1.48	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(457,d,389,c)].
1.28/1.48	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(457,d,390,c)].
1.28/1.48	458 -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)).  [resolve(377,d,357,c)].
1.28/1.48	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(458,d,387,c)].
1.28/1.48	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(458,d,388,c)].
1.28/1.48	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(458,d,389,c)].
1.28/1.48	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(458,d,390,c)].
1.28/1.48	459 -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)).  [resolve(377,d,359,c)].
1.28/1.48	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(459,d,387,c)].
1.28/1.48	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(459,d,388,c)].
1.28/1.48	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(459,d,389,c)].
1.28/1.48	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(459,d,390,c)].
1.28/1.50	460 -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A).  [resolve(378,d,355,c)].
1.28/1.50	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(460,d,387,c)].
1.28/1.50	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(460,d,388,c)].
1.28/1.50	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(460,d,389,c)].
1.28/1.50	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(460,d,390,c)].
1.28/1.50	461 -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)).  [resolve(378,d,356,d)].
1.28/1.50	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(461,d,387,c)].
1.28/1.50	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(461,d,388,c)].
1.28/1.50	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(461,d,389,c)].
1.28/1.50	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(461,d,390,c)].
1.28/1.50	462 -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)).  [resolve(378,d,357,c)].
1.28/1.50	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(462,d,387,c)].
1.28/1.50	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(462,d,388,c)].
1.28/1.50	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(462,d,389,c)].
1.33/1.53	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(462,d,390,c)].
1.33/1.53	463 -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)).  [resolve(378,d,359,c)].
1.33/1.53	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(463,d,387,c)].
1.33/1.53	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(463,d,388,c)].
1.33/1.53	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(463,d,389,c)].
1.33/1.53	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(463,d,390,c)].
1.33/1.53	464 -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A).  [resolve(379,d,355,c)].
1.33/1.53	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(464,d,387,c)].
1.33/1.53	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(464,d,388,c)].
1.33/1.53	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(464,d,389,c)].
1.33/1.53	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(464,d,390,c)].
1.33/1.53	465 -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)).  [resolve(379,d,356,d)].
1.33/1.53	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(465,d,387,c)].
1.33/1.53	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(465,d,388,c)].
1.33/1.53	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(465,d,389,c)].
1.37/1.55	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(465,d,390,c)].
1.37/1.55	466 -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)).  [resolve(379,d,357,c)].
1.37/1.55	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(466,d,387,c)].
1.37/1.55	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(466,d,388,c)].
1.37/1.55	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(466,d,389,c)].
1.37/1.55	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(466,d,390,c)].
1.37/1.55	467 -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)).  [resolve(379,d,359,c)].
1.37/1.55	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(467,d,387,c)].
1.37/1.55	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(467,d,388,c)].
1.37/1.55	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(467,d,389,c)].
1.37/1.55	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(467,d,390,c)].
1.37/1.55	468 -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A).  [resolve(380,d,355,c)].
1.37/1.55	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(468,d,387,c)].
1.37/1.55	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(468,d,388,c)].
1.37/1.55	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(468,d,389,c)].
1.37/1.59	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(468,d,390,c)].
1.37/1.59	469 -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)).  [resolve(380,d,356,d)].
1.37/1.59	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(469,d,387,c)].
1.37/1.59	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(469,d,388,c)].
1.37/1.59	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(469,d,389,c)].
1.37/1.59	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(469,d,390,c)].
1.37/1.59	470 -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)).  [resolve(380,d,357,c)].
1.37/1.59	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(470,d,387,c)].
1.37/1.59	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(470,d,388,c)].
1.37/1.59	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(470,d,389,c)].
1.37/1.59	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(470,d,390,c)].
1.37/1.59	471 -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)).  [resolve(380,d,359,c)].
1.37/1.59	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(471,d,387,c)].
1.37/1.59	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(471,d,388,c)].
1.37/1.59	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(471,d,389,c)].
1.37/1.60	Derived: -relation(A) | -in(ordered_pair(f96(A),f97(A)),A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(471,d,390,c)].
1.37/1.60	472 -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A).  [resolve(381,d,355,c)].
1.37/1.60	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(472,d,387,c)].
1.37/1.60	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(472,d,388,c)].
1.37/1.60	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(472,d,389,c)].
1.37/1.60	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(472,d,390,c)].
1.37/1.60	473 -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)).  [resolve(381,d,356,d)].
1.37/1.60	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(473,d,387,c)].
1.37/1.60	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(473,d,388,c)].
1.37/1.60	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(473,d,389,c)].
1.37/1.60	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(473,d,390,c)].
1.37/1.60	474 -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)).  [resolve(381,d,357,c)].
1.37/1.60	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(474,d,387,c)].
1.37/1.60	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(474,d,388,c)].
1.37/1.63	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(474,d,389,c)].
1.37/1.63	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(474,d,390,c)].
1.37/1.63	475 -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)).  [resolve(381,d,359,c)].
1.37/1.63	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(475,d,387,c)].
1.37/1.63	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(475,d,388,c)].
1.37/1.63	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(475,d,389,c)].
1.37/1.63	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(475,d,390,c)].
1.37/1.63	476 -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A).  [resolve(382,d,355,c)].
1.37/1.63	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(476,d,387,c)].
1.37/1.63	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(476,d,388,c)].
1.37/1.63	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(476,d,389,c)].
1.37/1.63	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(476,d,390,c)].
1.37/1.63	477 -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)).  [resolve(382,d,356,d)].
1.37/1.63	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(477,d,387,c)].
1.37/1.63	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(477,d,388,c)].
1.46/1.65	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(477,d,389,c)].
1.46/1.65	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(477,d,390,c)].
1.46/1.65	478 -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)).  [resolve(382,d,357,c)].
1.46/1.65	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(478,d,387,c)].
1.46/1.65	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(478,d,388,c)].
1.46/1.65	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(478,d,389,c)].
1.46/1.65	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(478,d,390,c)].
1.46/1.65	479 -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)).  [resolve(382,d,359,c)].
1.46/1.65	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(479,d,387,c)].
1.46/1.65	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(479,d,388,c)].
1.46/1.65	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(479,d,389,c)].
1.46/1.65	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(479,d,390,c)].
1.46/1.65	480 -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A).  [resolve(383,d,355,c)].
1.46/1.65	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(480,d,387,c)].
1.46/1.65	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(480,d,388,c)].
1.46/1.68	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(480,d,389,c)].
1.46/1.68	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(480,d,390,c)].
1.46/1.68	481 -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)).  [resolve(383,d,356,d)].
1.46/1.68	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(481,d,387,c)].
1.46/1.68	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(481,d,388,c)].
1.46/1.68	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(481,d,389,c)].
1.46/1.68	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(481,d,390,c)].
1.46/1.68	482 -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)).  [resolve(383,d,357,c)].
1.46/1.68	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(482,d,387,c)].
1.46/1.68	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(482,d,388,c)].
1.46/1.68	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(482,d,389,c)].
1.46/1.68	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(482,d,390,c)].
1.46/1.68	483 -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)).  [resolve(383,d,359,c)].
1.46/1.68	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(483,d,387,c)].
1.46/1.68	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(483,d,388,c)].
1.51/1.71	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(483,d,389,c)].
1.51/1.71	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(483,d,390,c)].
1.51/1.71	484 -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A).  [resolve(384,d,355,c)].
1.51/1.71	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(484,d,387,c)].
1.51/1.71	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(484,d,388,c)].
1.51/1.71	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(484,d,389,c)].
1.51/1.71	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(484,d,390,c)].
1.51/1.71	485 -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)).  [resolve(384,d,356,d)].
1.51/1.71	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(485,d,387,c)].
1.51/1.71	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(485,d,388,c)].
1.51/1.71	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(485,d,389,c)].
1.51/1.71	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(485,d,390,c)].
1.51/1.71	486 -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)).  [resolve(384,d,357,c)].
1.51/1.71	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(486,d,387,c)].
1.51/1.71	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(486,d,388,c)].
1.66/1.87	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(486,d,389,c)].
1.66/1.87	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(486,d,390,c)].
1.66/1.87	487 -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -transitive(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)).  [resolve(384,d,359,c)].
1.66/1.87	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(487,d,387,c)].
1.66/1.87	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(487,d,388,c)].
1.66/1.87	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(487,d,389,c)].
1.66/1.87	Derived: -relation(A) | in(f96(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(487,d,390,c)].
1.66/1.87	488 -relation(A) | -well_orders(A,relation_field(A)) | well_ordering(A) # label(t8_wellord1) # label(lemma).  [clausify(136)].
1.66/1.87	489 -relation(A) | reflexive(A) | -well_ordering(A) # label(d4_wellord1) # label(axiom).  [clausify(82)].
1.66/1.87	Derived: -relation(A) | -well_orders(A,relation_field(A)) | -relation(A) | reflexive(A).  [resolve(488,c,489,c)].
1.66/1.87	490 -relation(A) | well_orders(A,relation_field(A)) | -well_ordering(A) # label(t8_wellord1) # label(lemma).  [clausify(136)].
1.66/1.87	491 -relation(A) | -well_ordering(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(324,b,321,c)].
1.66/1.87	Derived: -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)) | -relation(A) | -well_orders(A,relation_field(A)).  [resolve(491,b,488,c)].
1.66/1.87	492 -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A) | -well_ordering(A).  [resolve(330,g,324,b)].
1.66/1.87	Derived: -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A) | -relation(A) | -well_orders(A,relation_field(A)).  [resolve(492,h,488,c)].
1.66/1.87	493 -relation(A) | -well_ordering(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(333,b,331,c)].
1.66/1.87	Derived: -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -well_orders(A,relation_field(A)).  [resolve(493,b,488,c)].
1.66/1.87	494 -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A) | -well_ordering(A).  [resolve(334,b,333,b)].
1.66/1.87	Derived: -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A) | -relation(A) | -well_orders(A,relation_field(A)).  [resolve(494,f,488,c)].
1.66/1.87	495 -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A) | -well_ordering(A).  [resolve(353,e,354,b)].
1.66/1.87	Derived: -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A) | -relation(A) | -well_orders(A,relation_field(A)).  [resolve(495,f,488,c)].
1.66/1.87	496 -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A) | -well_ordering(A).  [resolve(358,e,354,b)].
2.18/2.36	Derived: -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A) | -relation(A) | -well_orders(A,relation_field(A)).  [resolve(496,f,488,c)].
2.18/2.36	497 -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A) | -well_ordering(A).  [resolve(360,c,354,b)].
2.18/2.36	Derived: -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A) | -relation(A) | -well_orders(A,relation_field(A)).  [resolve(497,d,488,c)].
2.18/2.36	498 -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A) | -well_ordering(A).  [resolve(385,e,386,b)].
2.18/2.36	Derived: -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A) | -relation(A) | -well_orders(A,relation_field(A)).  [resolve(498,f,488,c)].
2.18/2.36	499 -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A) | -well_ordering(A).  [resolve(391,c,386,b)].
2.18/2.36	Derived: -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A) | -relation(A) | -well_orders(A,relation_field(A)).  [resolve(499,d,488,c)].
2.18/2.36	500 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(392,b,387,c)].
2.18/2.36	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(500,c,490,c)].
2.18/2.36	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(500,c,492,h)].
2.18/2.36	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(500,c,494,f)].
2.18/2.36	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(500,c,495,f)].
2.18/2.36	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(500,c,496,f)].
2.18/2.36	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(500,c,497,d)].
2.18/2.36	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(500,c,498,f)].
2.18/2.36	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(500,c,499,d)].
2.87/3.05	501 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(392,b,388,c)].
2.87/3.05	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(501,c,490,c)].
2.87/3.05	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(501,c,492,h)].
2.87/3.05	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(501,c,494,f)].
2.87/3.05	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(501,c,495,f)].
2.87/3.05	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(501,c,496,f)].
2.87/3.05	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(501,c,497,d)].
2.87/3.05	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(501,c,498,f)].
2.87/3.05	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(501,c,499,d)].
2.87/3.05	502 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(392,b,389,c)].
2.87/3.05	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(502,c,490,c)].
2.87/3.05	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(502,c,492,h)].
3.98/4.20	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(502,c,494,f)].
3.98/4.20	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(502,c,495,f)].
3.98/4.20	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(502,c,496,f)].
3.98/4.20	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(502,c,497,d)].
3.98/4.20	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(502,c,498,f)].
3.98/4.20	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(502,c,499,d)].
3.98/4.20	503 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(392,b,390,c)].
3.98/4.20	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(503,c,490,c)].
3.98/4.20	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(503,c,492,h)].
3.98/4.20	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(503,c,494,f)].
3.98/4.20	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(503,c,495,f)].
4.96/5.20	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(503,c,496,f)].
4.96/5.20	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(503,c,497,d)].
4.96/5.20	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(503,c,498,f)].
4.96/5.20	504 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(393,b,387,c)].
4.96/5.20	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(504,c,490,c)].
4.96/5.20	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(C,relation_field(A)) | C = D | in(ordered_pair(C,D),A) | in(ordered_pair(D,C),A) | -in(D,relation_field(A)) | -relation(A).  [resolve(504,c,492,h)].
4.96/5.20	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,C),A) | D = C | -relation(A).  [resolve(504,c,494,f)].
4.96/5.20	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = C | disjoint(fiber(A,f30(A,C)),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(504,c,495,f)].
4.96/5.20	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = C | in(f30(A,C),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(504,c,496,f)].
4.96/5.20	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(504,c,497,d)].
4.96/5.20	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,E),A) | in(ordered_pair(C,E),A) | -relation(A).  [resolve(504,c,498,f)].
5.96/6.15	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(504,c,499,d)].
5.96/6.15	505 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(393,b,388,c)].
5.96/6.15	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(505,c,490,c)].
5.96/6.15	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(C,relation_field(A)) | C = D | in(ordered_pair(C,D),A) | in(ordered_pair(D,C),A) | -in(D,relation_field(A)) | -relation(A).  [resolve(505,c,492,h)].
5.96/6.15	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,C),A) | D = C | -relation(A).  [resolve(505,c,494,f)].
5.96/6.15	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = C | disjoint(fiber(A,f30(A,C)),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(505,c,495,f)].
5.96/6.15	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = C | in(f30(A,C),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(505,c,496,f)].
5.96/6.15	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(505,c,497,d)].
5.96/6.15	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,E),A) | in(ordered_pair(C,E),A) | -relation(A).  [resolve(505,c,498,f)].
5.96/6.15	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(505,c,499,d)].
5.96/6.15	506 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(393,b,389,c)].
7.28/7.50	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(506,c,490,c)].
7.28/7.50	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(C,relation_field(A)) | C = D | in(ordered_pair(C,D),A) | in(ordered_pair(D,C),A) | -in(D,relation_field(A)) | -relation(A).  [resolve(506,c,492,h)].
7.28/7.50	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,C),A) | D = C | -relation(A).  [resolve(506,c,494,f)].
7.28/7.50	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = C | disjoint(fiber(A,f30(A,C)),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(506,c,495,f)].
7.28/7.50	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = C | in(f30(A,C),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(506,c,496,f)].
7.28/7.50	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(506,c,497,d)].
7.28/7.50	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,E),A) | in(ordered_pair(C,E),A) | -relation(A).  [resolve(506,c,498,f)].
7.28/7.50	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(506,c,499,d)].
7.28/7.50	507 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(393,b,390,c)].
7.28/7.50	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(507,c,490,c)].
7.28/7.50	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(C,relation_field(A)) | C = D | in(ordered_pair(C,D),A) | in(ordered_pair(D,C),A) | -in(D,relation_field(A)) | -relation(A).  [resolve(507,c,492,h)].
8.48/8.66	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,C),A) | D = C | -relation(A).  [resolve(507,c,494,f)].
8.48/8.66	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = C | disjoint(fiber(A,f30(A,C)),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(507,c,495,f)].
8.48/8.66	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = C | in(f30(A,C),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(507,c,496,f)].
8.48/8.66	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(507,c,497,d)].
8.48/8.66	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,E),A) | in(ordered_pair(C,E),A) | -relation(A).  [resolve(507,c,498,f)].
8.48/8.66	508 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(394,b,387,c)].
8.48/8.66	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(508,c,490,c)].
8.48/8.66	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(508,c,492,h)].
8.48/8.66	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(508,c,494,f)].
8.48/8.66	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(508,c,495,f)].
8.48/8.66	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(508,c,496,f)].
9.47/9.72	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(508,c,497,d)].
9.47/9.72	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(508,c,498,f)].
9.47/9.72	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(508,c,499,d)].
9.47/9.72	509 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(394,b,388,c)].
9.47/9.72	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(509,c,490,c)].
9.47/9.72	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(509,c,492,h)].
9.47/9.72	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(509,c,494,f)].
9.47/9.72	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(509,c,495,f)].
9.47/9.72	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(509,c,496,f)].
9.47/9.72	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(509,c,497,d)].
9.47/9.72	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(509,c,498,f)].
10.76/10.98	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(509,c,499,d)].
10.76/10.98	510 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(394,b,389,c)].
10.76/10.98	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(510,c,490,c)].
10.76/10.98	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(510,c,492,h)].
10.76/10.98	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(510,c,494,f)].
10.76/10.98	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(510,c,495,f)].
10.76/10.98	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(510,c,496,f)].
10.76/10.98	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(510,c,497,d)].
10.76/10.98	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(510,c,498,f)].
10.76/10.98	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(510,c,499,d)].
10.76/10.98	511 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(394,b,390,c)].
10.76/10.98	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(511,c,490,c)].
11.87/12.07	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(511,c,492,h)].
11.87/12.07	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(511,c,494,f)].
11.87/12.07	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(511,c,495,f)].
11.87/12.07	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(511,c,496,f)].
11.87/12.07	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(511,c,497,d)].
11.87/12.07	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(511,c,498,f)].
11.87/12.07	512 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(395,b,387,c)].
11.87/12.07	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(512,c,490,c)].
11.87/12.07	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(512,c,492,h)].
11.87/12.07	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(512,c,494,f)].
11.87/12.07	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(512,c,495,f)].
12.98/13.17	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(512,c,496,f)].
12.98/13.17	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(512,c,498,f)].
12.98/13.17	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(512,c,499,d)].
12.98/13.17	513 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(395,b,388,c)].
12.98/13.17	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(513,c,490,c)].
12.98/13.17	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(513,c,492,h)].
12.98/13.17	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(513,c,494,f)].
12.98/13.17	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(513,c,495,f)].
12.98/13.17	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(513,c,496,f)].
12.98/13.17	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(513,c,498,f)].
12.98/13.17	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(513,c,499,d)].
14.06/14.28	514 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(395,b,389,c)].
14.06/14.28	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(514,c,490,c)].
14.06/14.28	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(514,c,492,h)].
14.06/14.28	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(514,c,494,f)].
14.06/14.28	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(514,c,495,f)].
14.06/14.28	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(514,c,496,f)].
14.06/14.28	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(514,c,498,f)].
14.06/14.28	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(514,c,499,d)].
14.06/14.28	515 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(395,b,390,c)].
14.06/14.28	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(515,c,490,c)].
14.06/14.28	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(515,c,492,h)].
15.16/15.39	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(515,c,494,f)].
15.16/15.39	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(515,c,495,f)].
15.16/15.39	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(515,c,496,f)].
15.16/15.39	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(515,c,498,f)].
15.16/15.39	516 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(396,b,387,c)].
15.16/15.39	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(516,c,490,c)].
15.16/15.39	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(516,c,492,h)].
15.16/15.39	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(516,c,493,b)].
15.16/15.39	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(516,c,494,f)].
15.16/15.39	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(516,c,495,f)].
15.16/15.39	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(516,c,496,f)].
16.76/16.97	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(516,c,497,d)].
16.76/16.97	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(516,c,498,f)].
16.76/16.97	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(516,c,499,d)].
16.76/16.97	517 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(396,b,388,c)].
16.76/16.97	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(517,c,490,c)].
16.76/16.97	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(517,c,492,h)].
16.76/16.97	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(517,c,493,b)].
16.76/16.97	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(517,c,494,f)].
16.76/16.97	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(517,c,495,f)].
16.76/16.97	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(517,c,496,f)].
16.76/16.97	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(517,c,497,d)].
16.76/16.97	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(517,c,498,f)].
18.46/18.69	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(517,c,499,d)].
18.46/18.69	518 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(396,b,389,c)].
18.46/18.69	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(518,c,490,c)].
18.46/18.69	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(518,c,492,h)].
18.46/18.69	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(518,c,493,b)].
18.46/18.69	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(518,c,494,f)].
18.46/18.69	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(518,c,495,f)].
18.46/18.69	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(518,c,496,f)].
18.46/18.69	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(518,c,497,d)].
18.46/18.69	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(518,c,498,f)].
18.46/18.69	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(518,c,499,d)].
18.46/18.69	519 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(396,b,390,c)].
19.93/20.12	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(519,c,490,c)].
19.93/20.12	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(519,c,492,h)].
19.93/20.12	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(519,c,493,b)].
19.93/20.12	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(519,c,494,f)].
19.93/20.12	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(519,c,495,f)].
19.93/20.12	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(519,c,496,f)].
19.93/20.12	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(519,c,497,d)].
19.93/20.12	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(519,c,498,f)].
19.93/20.12	520 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(397,b,387,c)].
19.93/20.12	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(520,c,490,c)].
19.93/20.12	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(C,relation_field(A)) | C = D | in(ordered_pair(C,D),A) | in(ordered_pair(D,C),A) | -in(D,relation_field(A)) | -relation(A).  [resolve(520,c,492,h)].
19.93/20.12	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(520,c,493,b)].
21.43/21.61	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,C),A) | D = C | -relation(A).  [resolve(520,c,494,f)].
21.43/21.61	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = C | disjoint(fiber(A,f30(A,C)),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(520,c,495,f)].
21.43/21.61	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = C | in(f30(A,C),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(520,c,496,f)].
21.43/21.61	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(520,c,497,d)].
21.43/21.61	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,E),A) | in(ordered_pair(C,E),A) | -relation(A).  [resolve(520,c,498,f)].
21.43/21.61	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(520,c,499,d)].
21.43/21.61	521 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(397,b,388,c)].
21.43/21.61	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(521,c,490,c)].
21.43/21.61	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(C,relation_field(A)) | C = D | in(ordered_pair(C,D),A) | in(ordered_pair(D,C),A) | -in(D,relation_field(A)) | -relation(A).  [resolve(521,c,492,h)].
21.43/21.61	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(521,c,493,b)].
21.43/21.61	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,C),A) | D = C | -relation(A).  [resolve(521,c,494,f)].
23.23/23.43	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = C | disjoint(fiber(A,f30(A,C)),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(521,c,495,f)].
23.23/23.43	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = C | in(f30(A,C),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(521,c,496,f)].
23.23/23.43	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(521,c,497,d)].
23.23/23.43	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,E),A) | in(ordered_pair(C,E),A) | -relation(A).  [resolve(521,c,498,f)].
23.23/23.43	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(521,c,499,d)].
23.23/23.43	522 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(397,b,389,c)].
23.23/23.43	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(522,c,490,c)].
23.23/23.43	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(C,relation_field(A)) | C = D | in(ordered_pair(C,D),A) | in(ordered_pair(D,C),A) | -in(D,relation_field(A)) | -relation(A).  [resolve(522,c,492,h)].
23.23/23.43	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(522,c,493,b)].
23.23/23.43	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,C),A) | D = C | -relation(A).  [resolve(522,c,494,f)].
23.23/23.43	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = C | disjoint(fiber(A,f30(A,C)),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(522,c,495,f)].
25.45/25.66	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = C | in(f30(A,C),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(522,c,496,f)].
25.45/25.66	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(522,c,497,d)].
25.45/25.66	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,E),A) | in(ordered_pair(C,E),A) | -relation(A).  [resolve(522,c,498,f)].
25.45/25.66	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(522,c,499,d)].
25.45/25.66	523 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(397,b,390,c)].
25.45/25.66	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(523,c,490,c)].
25.45/25.66	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(C,relation_field(A)) | C = D | in(ordered_pair(C,D),A) | in(ordered_pair(D,C),A) | -in(D,relation_field(A)) | -relation(A).  [resolve(523,c,492,h)].
25.45/25.66	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(523,c,493,b)].
25.45/25.66	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,C),A) | D = C | -relation(A).  [resolve(523,c,494,f)].
25.45/25.66	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = C | disjoint(fiber(A,f30(A,C)),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(523,c,495,f)].
25.45/25.66	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = C | in(f30(A,C),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(523,c,496,f)].
27.31/27.51	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(523,c,497,d)].
27.31/27.51	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,E),A) | in(ordered_pair(C,E),A) | -relation(A).  [resolve(523,c,498,f)].
27.31/27.51	524 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(398,b,387,c)].
27.31/27.51	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(524,c,490,c)].
27.31/27.51	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(524,c,492,h)].
27.31/27.51	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(524,c,493,b)].
27.31/27.51	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(524,c,494,f)].
27.31/27.51	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(524,c,495,f)].
27.31/27.51	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(524,c,496,f)].
27.31/27.51	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(524,c,497,d)].
27.31/27.51	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(524,c,498,f)].
27.31/27.51	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(524,c,499,d)].
28.75/28.96	525 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(398,b,388,c)].
28.75/28.96	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(525,c,490,c)].
28.75/28.96	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(525,c,492,h)].
28.75/28.96	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(525,c,493,b)].
28.75/28.96	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(525,c,494,f)].
28.75/28.96	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(525,c,495,f)].
28.75/28.96	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(525,c,496,f)].
28.75/28.96	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(525,c,497,d)].
28.75/28.96	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(525,c,498,f)].
28.75/28.96	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(525,c,499,d)].
28.75/28.96	526 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(398,b,389,c)].
30.73/30.92	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(526,c,490,c)].
30.73/30.92	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(526,c,492,h)].
30.73/30.92	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(526,c,493,b)].
30.73/30.92	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(526,c,494,f)].
30.73/30.92	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(526,c,495,f)].
30.73/30.92	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(526,c,496,f)].
30.73/30.92	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(526,c,497,d)].
30.73/30.92	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(526,c,498,f)].
30.73/30.92	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(526,c,499,d)].
30.73/30.92	527 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(398,b,390,c)].
30.73/30.92	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(527,c,490,c)].
30.73/30.92	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(527,c,492,h)].
32.36/32.58	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(527,c,493,b)].
32.36/32.58	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(527,c,494,f)].
32.36/32.58	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(527,c,495,f)].
32.36/32.58	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(527,c,496,f)].
32.36/32.58	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(527,c,497,d)].
32.36/32.58	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(527,c,498,f)].
32.36/32.58	528 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(399,b,387,c)].
32.36/32.58	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(528,c,490,c)].
32.36/32.58	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(528,c,492,h)].
32.36/32.58	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(528,c,493,b)].
32.36/32.58	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(528,c,494,f)].
33.98/34.19	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(528,c,495,f)].
33.98/34.19	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(528,c,496,f)].
33.98/34.19	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(528,c,498,f)].
33.98/34.19	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(528,c,499,d)].
33.98/34.19	529 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(399,b,388,c)].
33.98/34.19	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(529,c,490,c)].
33.98/34.19	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(529,c,492,h)].
33.98/34.19	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(529,c,493,b)].
33.98/34.19	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(529,c,494,f)].
33.98/34.19	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(529,c,495,f)].
33.98/34.19	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(529,c,496,f)].
36.01/36.23	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(529,c,498,f)].
36.01/36.23	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(529,c,499,d)].
36.01/36.23	530 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(399,b,389,c)].
36.01/36.23	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(530,c,490,c)].
36.01/36.23	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(530,c,492,h)].
36.01/36.23	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(530,c,493,b)].
36.01/36.23	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(530,c,494,f)].
36.01/36.23	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(530,c,495,f)].
36.01/36.23	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(530,c,496,f)].
36.01/36.23	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(530,c,498,f)].
36.01/36.23	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(530,c,499,d)].
36.01/36.23	531 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(399,b,390,c)].
37.36/37.61	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(531,c,490,c)].
37.36/37.61	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(531,c,492,h)].
37.36/37.61	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(531,c,493,b)].
37.36/37.61	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(531,c,494,f)].
37.36/37.61	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(531,c,495,f)].
37.36/37.61	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(531,c,496,f)].
37.36/37.61	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(531,c,498,f)].
37.36/37.61	532 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(400,b,387,c)].
37.36/37.61	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(532,c,490,c)].
37.36/37.61	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(532,c,492,h)].
37.36/37.61	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(532,c,493,b)].
38.86/39.07	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(532,c,494,f)].
38.86/39.07	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(532,c,495,f)].
38.86/39.07	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(532,c,496,f)].
38.86/39.07	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(532,c,497,d)].
38.86/39.07	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(532,c,498,f)].
38.86/39.07	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(532,c,499,d)].
38.86/39.07	533 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(400,b,388,c)].
38.86/39.07	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(533,c,490,c)].
38.86/39.07	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(533,c,492,h)].
38.86/39.07	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(533,c,493,b)].
38.86/39.07	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(533,c,494,f)].
38.86/39.07	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(533,c,495,f)].
40.66/40.90	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(533,c,496,f)].
40.66/40.90	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(533,c,497,d)].
40.66/40.90	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(533,c,498,f)].
40.66/40.90	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(533,c,499,d)].
40.66/40.90	534 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(400,b,389,c)].
40.66/40.90	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(534,c,490,c)].
40.66/40.90	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(534,c,492,h)].
40.66/40.90	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(534,c,493,b)].
40.66/40.90	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(534,c,494,f)].
40.66/40.90	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(534,c,495,f)].
40.66/40.90	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(534,c,496,f)].
40.66/40.90	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(534,c,497,d)].
42.68/42.86	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(534,c,498,f)].
42.68/42.86	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(534,c,499,d)].
42.68/42.86	535 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(400,b,390,c)].
42.68/42.86	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(535,c,490,c)].
42.68/42.86	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(535,c,492,h)].
42.68/42.86	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(535,c,493,b)].
42.68/42.86	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(535,c,494,f)].
42.68/42.86	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(535,c,495,f)].
42.68/42.86	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(535,c,496,f)].
42.68/42.86	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(535,c,497,d)].
42.68/42.86	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(535,c,498,f)].
42.68/42.86	536 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(401,b,387,c)].
43.96/44.20	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(536,c,490,c)].
43.96/44.20	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(C,relation_field(A)) | C = D | in(ordered_pair(C,D),A) | in(ordered_pair(D,C),A) | -in(D,relation_field(A)) | -relation(A).  [resolve(536,c,492,h)].
43.96/44.20	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(536,c,493,b)].
43.96/44.20	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,C),A) | D = C | -relation(A).  [resolve(536,c,494,f)].
43.96/44.20	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = C | disjoint(fiber(A,f30(A,C)),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(536,c,495,f)].
43.96/44.20	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = C | in(f30(A,C),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(536,c,496,f)].
43.96/44.20	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(536,c,497,d)].
43.96/44.20	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,E),A) | in(ordered_pair(C,E),A) | -relation(A).  [resolve(536,c,498,f)].
43.96/44.20	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(536,c,499,d)].
43.96/44.20	537 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(401,b,388,c)].
43.96/44.20	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(537,c,490,c)].
45.67/45.87	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(C,relation_field(A)) | C = D | in(ordered_pair(C,D),A) | in(ordered_pair(D,C),A) | -in(D,relation_field(A)) | -relation(A).  [resolve(537,c,492,h)].
45.67/45.87	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(537,c,493,b)].
45.67/45.87	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,C),A) | D = C | -relation(A).  [resolve(537,c,494,f)].
45.67/45.87	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = C | disjoint(fiber(A,f30(A,C)),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(537,c,495,f)].
45.67/45.87	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = C | in(f30(A,C),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(537,c,496,f)].
45.67/45.87	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(537,c,497,d)].
45.67/45.87	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,E),A) | in(ordered_pair(C,E),A) | -relation(A).  [resolve(537,c,498,f)].
45.67/45.87	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(537,c,499,d)].
45.67/45.87	538 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(401,b,389,c)].
45.67/45.87	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(538,c,490,c)].
45.67/45.87	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(C,relation_field(A)) | C = D | in(ordered_pair(C,D),A) | in(ordered_pair(D,C),A) | -in(D,relation_field(A)) | -relation(A).  [resolve(538,c,492,h)].
47.79/47.98	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(538,c,493,b)].
47.79/47.98	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,C),A) | D = C | -relation(A).  [resolve(538,c,494,f)].
47.79/47.98	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = C | disjoint(fiber(A,f30(A,C)),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(538,c,495,f)].
47.79/47.98	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = C | in(f30(A,C),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(538,c,496,f)].
47.79/47.98	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(538,c,497,d)].
47.79/47.98	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,E),A) | in(ordered_pair(C,E),A) | -relation(A).  [resolve(538,c,498,f)].
47.79/47.98	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(538,c,499,d)].
47.79/47.98	539 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(401,b,390,c)].
47.79/47.98	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(539,c,490,c)].
47.79/47.98	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(C,relation_field(A)) | C = D | in(ordered_pair(C,D),A) | in(ordered_pair(D,C),A) | -in(D,relation_field(A)) | -relation(A).  [resolve(539,c,492,h)].
47.79/47.98	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(539,c,493,b)].
49.80/50.01	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,C),A) | D = C | -relation(A).  [resolve(539,c,494,f)].
49.80/50.01	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = C | disjoint(fiber(A,f30(A,C)),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(539,c,495,f)].
49.80/50.01	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = C | in(f30(A,C),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(539,c,496,f)].
49.80/50.01	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(539,c,497,d)].
49.80/50.01	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,E),A) | in(ordered_pair(C,E),A) | -relation(A).  [resolve(539,c,498,f)].
49.80/50.01	540 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(402,b,387,c)].
49.80/50.01	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(540,c,490,c)].
49.80/50.01	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(540,c,492,h)].
49.80/50.01	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(540,c,493,b)].
49.80/50.01	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(540,c,494,f)].
49.80/50.01	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(540,c,495,f)].
49.80/50.01	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(540,c,496,f)].
51.46/51.65	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(540,c,497,d)].
51.46/51.65	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(540,c,498,f)].
51.46/51.65	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(540,c,499,d)].
51.46/51.65	541 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(402,b,388,c)].
51.46/51.65	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(541,c,490,c)].
51.46/51.65	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(541,c,492,h)].
51.46/51.65	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(541,c,493,b)].
51.46/51.65	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(541,c,494,f)].
51.46/51.65	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(541,c,495,f)].
51.46/51.65	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(541,c,496,f)].
51.46/51.65	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(541,c,497,d)].
53.79/54.00	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(541,c,498,f)].
53.79/54.00	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(541,c,499,d)].
53.79/54.00	542 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(402,b,389,c)].
53.79/54.00	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(542,c,490,c)].
53.79/54.00	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(542,c,492,h)].
53.79/54.00	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(542,c,493,b)].
53.79/54.00	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(542,c,494,f)].
53.79/54.00	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(542,c,495,f)].
53.79/54.00	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(542,c,496,f)].
53.79/54.00	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(542,c,497,d)].
53.79/54.00	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(542,c,498,f)].
53.79/54.00	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(542,c,499,d)].
55.36/55.61	543 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(402,b,390,c)].
55.36/55.61	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(543,c,490,c)].
55.36/55.61	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(543,c,492,h)].
55.36/55.61	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(543,c,493,b)].
55.36/55.61	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(543,c,494,f)].
55.36/55.61	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(543,c,495,f)].
55.36/55.61	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(543,c,496,f)].
55.36/55.61	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(543,c,497,d)].
55.36/55.61	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(543,c,498,f)].
55.36/55.61	544 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(403,b,387,c)].
55.36/55.61	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(544,c,490,c)].
56.96/57.17	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(544,c,492,h)].
56.96/57.17	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(544,c,493,b)].
56.96/57.17	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(544,c,494,f)].
56.96/57.17	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(544,c,495,f)].
56.96/57.17	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(544,c,496,f)].
56.96/57.17	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(544,c,498,f)].
56.96/57.17	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(544,c,499,d)].
56.96/57.17	545 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(403,b,388,c)].
56.96/57.17	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(545,c,490,c)].
56.96/57.17	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(545,c,492,h)].
56.96/57.17	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(545,c,493,b)].
56.96/57.17	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(545,c,494,f)].
58.88/59.07	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(545,c,495,f)].
58.88/59.07	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(545,c,496,f)].
58.88/59.07	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(545,c,498,f)].
58.88/59.07	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(545,c,499,d)].
58.88/59.07	546 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(403,b,389,c)].
58.88/59.08	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(546,c,490,c)].
58.88/59.08	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(546,c,492,h)].
58.88/59.08	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(546,c,493,b)].
58.88/59.08	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(546,c,494,f)].
58.88/59.08	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(546,c,495,f)].
58.88/59.08	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(546,c,496,f)].
60.85/61.03	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(546,c,498,f)].
60.85/61.03	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(546,c,499,d)].
60.85/61.03	547 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(403,b,390,c)].
60.85/61.03	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(547,c,490,c)].
60.85/61.03	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(547,c,492,h)].
60.85/61.03	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(547,c,493,b)].
60.85/61.03	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(547,c,494,f)].
60.85/61.03	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(547,c,495,f)].
60.85/61.03	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(547,c,496,f)].
60.85/61.03	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(547,c,498,f)].
60.85/61.03	548 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(404,b,387,c)].
62.07/62.25	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(548,c,490,c)].
62.07/62.25	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(548,c,492,h)].
62.07/62.25	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(548,c,493,b)].
62.07/62.25	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(548,c,494,f)].
62.07/62.25	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(548,c,495,f)].
62.07/62.25	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(548,c,496,f)].
62.07/62.25	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(548,c,497,d)].
62.07/62.25	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(548,c,498,f)].
62.07/62.25	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(548,c,499,d)].
62.07/62.25	549 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(404,b,388,c)].
62.07/62.25	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(549,c,490,c)].
62.07/62.25	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(549,c,492,h)].
62.07/62.25	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(549,c,493,b)].
63.70/63.87	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(549,c,494,f)].
63.70/63.87	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(549,c,495,f)].
63.70/63.87	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(549,c,496,f)].
63.70/63.87	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(549,c,497,d)].
63.70/63.87	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(549,c,498,f)].
63.70/63.87	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(549,c,499,d)].
63.70/63.87	550 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(404,b,389,c)].
63.70/63.87	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(550,c,490,c)].
63.70/63.87	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(550,c,492,h)].
63.70/63.87	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(550,c,493,b)].
63.70/63.87	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(550,c,494,f)].
63.70/63.87	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(550,c,495,f)].
66.02/66.18	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(550,c,496,f)].
66.02/66.18	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(550,c,497,d)].
66.02/66.18	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(550,c,498,f)].
66.02/66.18	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(550,c,499,d)].
66.02/66.18	551 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(404,b,390,c)].
66.02/66.18	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(551,c,490,c)].
66.02/66.18	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(551,c,492,h)].
66.02/66.18	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(551,c,493,b)].
66.02/66.18	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(551,c,494,f)].
66.02/66.18	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(551,c,495,f)].
66.02/66.18	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(551,c,496,f)].
66.02/66.18	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(551,c,497,d)].
66.02/66.18	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(551,c,498,f)].
67.35/67.53	552 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(405,b,387,c)].
67.35/67.53	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(552,c,490,c)].
67.35/67.53	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(C,relation_field(A)) | C = D | in(ordered_pair(C,D),A) | in(ordered_pair(D,C),A) | -in(D,relation_field(A)) | -relation(A).  [resolve(552,c,492,h)].
67.35/67.53	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(552,c,493,b)].
67.35/67.53	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,C),A) | D = C | -relation(A).  [resolve(552,c,494,f)].
67.35/67.53	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = C | disjoint(fiber(A,f30(A,C)),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(552,c,495,f)].
67.35/67.53	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = C | in(f30(A,C),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(552,c,496,f)].
67.35/67.53	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(552,c,497,d)].
67.35/67.53	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,E),A) | in(ordered_pair(C,E),A) | -relation(A).  [resolve(552,c,498,f)].
67.35/67.53	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(552,c,499,d)].
67.35/67.53	553 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(405,b,388,c)].
67.35/67.53	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(553,c,490,c)].
68.97/69.17	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(C,relation_field(A)) | C = D | in(ordered_pair(C,D),A) | in(ordered_pair(D,C),A) | -in(D,relation_field(A)) | -relation(A).  [resolve(553,c,492,h)].
68.97/69.17	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(553,c,493,b)].
68.97/69.17	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,C),A) | D = C | -relation(A).  [resolve(553,c,494,f)].
68.97/69.17	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = C | disjoint(fiber(A,f30(A,C)),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(553,c,495,f)].
68.97/69.17	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = C | in(f30(A,C),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(553,c,496,f)].
68.97/69.17	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(553,c,497,d)].
68.97/69.17	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,E),A) | in(ordered_pair(C,E),A) | -relation(A).  [resolve(553,c,498,f)].
68.97/69.17	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(553,c,499,d)].
68.97/69.17	554 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(405,b,389,c)].
68.97/69.17	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(554,c,490,c)].
68.97/69.17	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(C,relation_field(A)) | C = D | in(ordered_pair(C,D),A) | in(ordered_pair(D,C),A) | -in(D,relation_field(A)) | -relation(A).  [resolve(554,c,492,h)].
71.28/71.51	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(554,c,493,b)].
71.28/71.51	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,C),A) | D = C | -relation(A).  [resolve(554,c,494,f)].
71.28/71.51	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = C | disjoint(fiber(A,f30(A,C)),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(554,c,495,f)].
71.28/71.51	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = C | in(f30(A,C),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(554,c,496,f)].
71.28/71.51	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(554,c,497,d)].
71.28/71.51	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,E),A) | in(ordered_pair(C,E),A) | -relation(A).  [resolve(554,c,498,f)].
71.28/71.51	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(554,c,499,d)].
71.28/71.51	555 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(405,b,390,c)].
71.28/71.51	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(555,c,490,c)].
71.28/71.51	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(C,relation_field(A)) | C = D | in(ordered_pair(C,D),A) | in(ordered_pair(D,C),A) | -in(D,relation_field(A)) | -relation(A).  [resolve(555,c,492,h)].
71.28/71.51	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(555,c,493,b)].
71.28/71.51	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,C),A) | D = C | -relation(A).  [resolve(555,c,494,f)].
73.30/73.49	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = C | disjoint(fiber(A,f30(A,C)),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(555,c,495,f)].
73.30/73.49	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = C | in(f30(A,C),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(555,c,496,f)].
73.30/73.49	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(555,c,497,d)].
73.30/73.49	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,E),A) | in(ordered_pair(C,E),A) | -relation(A).  [resolve(555,c,498,f)].
73.30/73.49	556 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(406,b,387,c)].
73.30/73.49	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(556,c,490,c)].
73.30/73.49	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(556,c,492,h)].
73.30/73.49	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(556,c,493,b)].
73.30/73.49	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(556,c,494,f)].
73.30/73.49	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(556,c,495,f)].
73.30/73.49	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(556,c,496,f)].
73.30/73.49	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(556,c,497,d)].
75.27/75.47	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(556,c,498,f)].
75.27/75.47	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(556,c,499,d)].
75.27/75.47	557 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(406,b,388,c)].
75.27/75.47	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(557,c,490,c)].
75.27/75.47	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(557,c,492,h)].
75.27/75.47	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(557,c,493,b)].
75.27/75.47	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(557,c,494,f)].
75.27/75.47	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(557,c,495,f)].
75.27/75.47	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(557,c,496,f)].
75.27/75.47	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(557,c,497,d)].
75.27/75.47	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(557,c,498,f)].
75.27/75.47	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(557,c,499,d)].
77.11/77.31	558 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(406,b,389,c)].
77.11/77.31	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(558,c,490,c)].
77.11/77.31	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(558,c,492,h)].
77.11/77.31	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(558,c,493,b)].
77.11/77.31	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(558,c,494,f)].
77.11/77.31	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(558,c,495,f)].
77.11/77.31	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(558,c,496,f)].
77.11/77.31	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(558,c,497,d)].
77.11/77.31	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(558,c,498,f)].
77.11/77.31	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(558,c,499,d)].
77.11/77.31	559 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(406,b,390,c)].
77.11/77.31	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(559,c,490,c)].
78.98/79.16	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(559,c,492,h)].
78.98/79.16	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(559,c,493,b)].
78.98/79.16	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(559,c,494,f)].
78.98/79.16	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(559,c,495,f)].
78.98/79.16	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(559,c,496,f)].
78.98/79.16	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(559,c,497,d)].
78.98/79.16	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(559,c,498,f)].
78.98/79.16	560 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(407,b,387,c)].
78.98/79.16	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(560,c,490,c)].
78.98/79.16	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(560,c,492,h)].
78.98/79.16	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(560,c,493,b)].
78.98/79.16	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(560,c,494,f)].
80.87/81.09	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(560,c,495,f)].
80.87/81.09	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(560,c,496,f)].
80.87/81.09	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(560,c,498,f)].
80.87/81.09	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(560,c,499,d)].
80.87/81.09	561 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(407,b,388,c)].
80.87/81.09	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(561,c,490,c)].
80.87/81.09	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(561,c,492,h)].
80.87/81.09	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(561,c,493,b)].
80.87/81.09	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(561,c,494,f)].
80.87/81.09	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(561,c,495,f)].
80.87/81.09	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(561,c,496,f)].
80.87/81.09	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(561,c,498,f)].
82.68/82.91	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(561,c,499,d)].
82.68/82.91	562 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(407,b,389,c)].
82.68/82.91	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(562,c,490,c)].
82.68/82.91	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(562,c,492,h)].
82.68/82.91	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(562,c,493,b)].
82.68/82.91	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(562,c,494,f)].
82.68/82.91	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(562,c,495,f)].
82.68/82.91	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(562,c,496,f)].
82.68/82.91	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(562,c,498,f)].
82.68/82.91	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(562,c,499,d)].
82.68/82.91	563 -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(407,b,390,c)].
82.68/82.91	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(563,c,490,c)].
84.26/84.42	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(563,c,492,h)].
84.26/84.42	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(563,c,493,b)].
84.26/84.42	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(563,c,494,f)].
84.26/84.42	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(563,c,495,f)].
84.26/84.42	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(563,c,496,f)].
84.26/84.42	Derived: -relation(A) | -reflexive(A) | -relation(A) | -is_connected_in(A,relation_field(A)) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(563,c,498,f)].
84.26/84.42	564 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(408,d,387,c)].
84.26/84.42	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(564,e,490,c)].
84.26/84.42	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(564,e,491,b)].
84.26/84.42	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(564,e,492,h)].
84.26/84.42	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(564,e,494,f)].
85.68/85.91	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(564,e,495,f)].
85.68/85.91	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(564,e,496,f)].
85.68/85.91	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(564,e,497,d)].
85.68/85.91	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(564,e,498,f)].
85.68/85.91	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(564,e,499,d)].
85.68/85.91	565 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(408,d,388,c)].
85.68/85.91	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(565,e,490,c)].
85.68/85.91	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(565,e,491,b)].
85.68/85.91	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(565,e,492,h)].
85.68/85.91	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(565,e,494,f)].
85.68/85.91	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(565,e,495,f)].
85.68/85.91	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(565,e,496,f)].
87.62/87.83	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(565,e,497,d)].
87.62/87.83	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(565,e,498,f)].
87.62/87.83	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(565,e,499,d)].
87.62/87.83	566 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(408,d,389,c)].
87.62/87.83	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(566,e,490,c)].
87.62/87.83	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(566,e,491,b)].
87.62/87.83	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(566,e,492,h)].
87.62/87.83	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(566,e,494,f)].
87.62/87.83	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(566,e,495,f)].
87.62/87.83	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(566,e,496,f)].
87.62/87.83	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(566,e,497,d)].
87.62/87.83	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(566,e,498,f)].
89.24/89.44	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(566,e,499,d)].
89.24/89.44	567 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(408,d,390,c)].
89.24/89.44	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(567,e,490,c)].
89.24/89.44	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(567,e,491,b)].
89.24/89.44	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(567,e,492,h)].
89.24/89.44	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(567,e,494,f)].
89.24/89.44	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(567,e,495,f)].
89.24/89.44	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(567,e,496,f)].
89.24/89.44	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(567,e,497,d)].
89.24/89.44	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(567,e,498,f)].
89.24/89.44	568 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(409,d,387,c)].
89.24/89.44	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(568,e,490,c)].
90.77/90.97	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(568,e,491,b)].
90.77/90.97	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(C,relation_field(A)) | C = D | in(ordered_pair(C,D),A) | in(ordered_pair(D,C),A) | -in(D,relation_field(A)) | -relation(A).  [resolve(568,e,492,h)].
90.77/90.97	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,C),A) | D = C | -relation(A).  [resolve(568,e,494,f)].
90.77/90.97	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = C | disjoint(fiber(A,f30(A,C)),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(568,e,495,f)].
90.77/90.97	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = C | in(f30(A,C),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(568,e,496,f)].
90.77/90.97	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(568,e,497,d)].
90.77/90.97	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,E),A) | in(ordered_pair(C,E),A) | -relation(A).  [resolve(568,e,498,f)].
90.77/90.97	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(568,e,499,d)].
90.77/90.97	569 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(409,d,388,c)].
90.77/90.97	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(569,e,490,c)].
90.77/90.97	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(569,e,491,b)].
90.77/90.97	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(C,relation_field(A)) | C = D | in(ordered_pair(C,D),A) | in(ordered_pair(D,C),A) | -in(D,relation_field(A)) | -relation(A).  [resolve(569,e,492,h)].
92.58/92.75	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,C),A) | D = C | -relation(A).  [resolve(569,e,494,f)].
92.58/92.75	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = C | disjoint(fiber(A,f30(A,C)),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(569,e,495,f)].
92.58/92.75	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = C | in(f30(A,C),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(569,e,496,f)].
92.58/92.75	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(569,e,497,d)].
92.58/92.75	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,E),A) | in(ordered_pair(C,E),A) | -relation(A).  [resolve(569,e,498,f)].
92.58/92.75	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(569,e,499,d)].
92.58/92.75	570 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(409,d,389,c)].
92.58/92.75	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(570,e,490,c)].
92.58/92.75	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(570,e,491,b)].
92.58/92.75	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(C,relation_field(A)) | C = D | in(ordered_pair(C,D),A) | in(ordered_pair(D,C),A) | -in(D,relation_field(A)) | -relation(A).  [resolve(570,e,492,h)].
92.58/92.75	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,C),A) | D = C | -relation(A).  [resolve(570,e,494,f)].
94.82/95.00	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = C | disjoint(fiber(A,f30(A,C)),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(570,e,495,f)].
94.82/95.00	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = C | in(f30(A,C),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(570,e,496,f)].
94.82/95.00	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(570,e,497,d)].
94.82/95.00	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,E),A) | in(ordered_pair(C,E),A) | -relation(A).  [resolve(570,e,498,f)].
94.82/95.00	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(570,e,499,d)].
94.82/95.00	571 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(409,d,390,c)].
94.82/95.00	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(571,e,490,c)].
94.82/95.00	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(571,e,491,b)].
94.82/95.00	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(C,relation_field(A)) | C = D | in(ordered_pair(C,D),A) | in(ordered_pair(D,C),A) | -in(D,relation_field(A)) | -relation(A).  [resolve(571,e,492,h)].
94.82/95.00	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,C),A) | D = C | -relation(A).  [resolve(571,e,494,f)].
94.82/95.00	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = C | disjoint(fiber(A,f30(A,C)),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(571,e,495,f)].
96.48/96.73	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = C | in(f30(A,C),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(571,e,496,f)].
96.48/96.73	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(571,e,497,d)].
96.48/96.73	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,E),A) | in(ordered_pair(C,E),A) | -relation(A).  [resolve(571,e,498,f)].
96.48/96.73	572 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(410,d,387,c)].
96.48/96.73	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(572,e,490,c)].
96.48/96.73	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(572,e,491,b)].
96.48/96.73	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(572,e,492,h)].
96.48/96.73	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(572,e,494,f)].
96.48/96.73	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(572,e,495,f)].
96.48/96.73	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(572,e,496,f)].
96.48/96.73	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(572,e,497,d)].
98.53/98.71	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(572,e,498,f)].
98.53/98.71	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(572,e,499,d)].
98.53/98.71	573 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(410,d,388,c)].
98.53/98.71	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(573,e,490,c)].
98.53/98.71	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(573,e,491,b)].
98.53/98.71	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(573,e,492,h)].
98.53/98.71	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(573,e,494,f)].
98.53/98.71	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(573,e,495,f)].
98.53/98.71	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(573,e,496,f)].
98.53/98.71	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(573,e,497,d)].
98.53/98.71	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(573,e,498,f)].
98.53/98.71	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(573,e,499,d)].
100.37/100.56	574 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(410,d,389,c)].
100.37/100.56	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(574,e,490,c)].
100.37/100.56	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(574,e,491,b)].
100.37/100.56	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(574,e,492,h)].
100.37/100.56	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(574,e,494,f)].
100.37/100.56	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(574,e,495,f)].
100.37/100.56	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(574,e,496,f)].
100.37/100.56	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(574,e,497,d)].
100.37/100.56	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(574,e,498,f)].
100.37/100.56	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(574,e,499,d)].
100.37/100.56	575 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(410,d,390,c)].
100.37/100.56	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(575,e,490,c)].
102.09/102.29	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(575,e,491,b)].
102.09/102.29	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(575,e,492,h)].
102.09/102.29	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(575,e,494,f)].
102.09/102.29	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(575,e,495,f)].
102.09/102.29	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(575,e,496,f)].
102.09/102.29	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(575,e,497,d)].
102.09/102.29	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(575,e,498,f)].
102.09/102.29	576 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(411,d,387,c)].
102.09/102.29	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(576,e,490,c)].
102.09/102.29	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(576,e,491,b)].
102.09/102.29	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(576,e,492,h)].
103.67/103.88	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(576,e,494,f)].
103.67/103.88	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(576,e,495,f)].
103.67/103.88	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(576,e,496,f)].
103.67/103.88	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(576,e,498,f)].
103.67/103.88	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(576,e,499,d)].
103.67/103.88	577 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(411,d,388,c)].
103.67/103.88	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(577,e,490,c)].
103.67/103.88	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(577,e,491,b)].
103.67/103.88	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(577,e,492,h)].
103.67/103.88	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(577,e,494,f)].
103.67/103.88	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(577,e,495,f)].
105.69/105.89	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(577,e,496,f)].
105.69/105.89	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(577,e,498,f)].
105.69/105.89	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(577,e,499,d)].
105.69/105.89	578 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(411,d,389,c)].
105.69/105.89	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(578,e,490,c)].
105.69/105.89	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(578,e,491,b)].
105.69/105.89	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(578,e,492,h)].
105.69/105.89	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(578,e,494,f)].
105.69/105.89	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(578,e,495,f)].
105.69/105.89	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(578,e,496,f)].
105.69/105.89	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(578,e,498,f)].
107.34/107.52	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(578,e,499,d)].
107.34/107.52	579 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(411,d,390,c)].
107.34/107.52	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(579,e,490,c)].
107.34/107.52	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(579,e,491,b)].
107.34/107.52	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(579,e,492,h)].
107.34/107.52	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(579,e,494,f)].
107.34/107.52	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(579,e,495,f)].
107.34/107.52	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(579,e,496,f)].
107.34/107.52	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(579,e,498,f)].
107.34/107.52	580 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(412,d,387,c)].
107.34/107.52	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(580,e,490,c)].
107.34/107.52	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(580,e,491,b)].
109.24/109.45	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(580,e,492,h)].
109.24/109.45	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(580,e,493,b)].
109.24/109.45	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(580,e,494,f)].
109.24/109.45	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(580,e,495,f)].
109.24/109.45	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(580,e,496,f)].
109.24/109.45	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(580,e,497,d)].
109.24/109.45	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(580,e,498,f)].
109.24/109.45	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(580,e,499,d)].
109.24/109.45	581 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(412,d,388,c)].
109.24/109.45	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(581,e,490,c)].
109.24/109.45	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(581,e,491,b)].
109.24/109.45	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(581,e,492,h)].
111.71/111.92	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(581,e,493,b)].
111.71/111.92	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(581,e,494,f)].
111.71/111.92	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(581,e,495,f)].
111.71/111.92	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(581,e,496,f)].
111.71/111.92	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(581,e,497,d)].
111.71/111.92	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(581,e,498,f)].
111.71/111.92	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(581,e,499,d)].
111.71/111.92	582 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(412,d,389,c)].
111.71/111.92	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(582,e,490,c)].
111.71/111.92	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(582,e,491,b)].
111.71/111.92	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(582,e,492,h)].
111.71/111.92	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(582,e,493,b)].
111.71/111.92	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(582,e,494,f)].
114.42/114.66	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(582,e,495,f)].
114.42/114.66	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(582,e,496,f)].
114.42/114.66	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(582,e,497,d)].
114.42/114.66	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(582,e,498,f)].
114.42/114.66	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(582,e,499,d)].
114.42/114.66	583 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(412,d,390,c)].
114.42/114.66	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(583,e,490,c)].
114.42/114.66	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(583,e,491,b)].
114.42/114.66	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(583,e,492,h)].
114.42/114.66	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(583,e,493,b)].
114.42/114.66	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(583,e,494,f)].
114.42/114.66	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(583,e,495,f)].
116.81/117.03	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(583,e,496,f)].
116.81/117.03	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(583,e,497,d)].
116.81/117.03	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(583,e,498,f)].
116.81/117.03	584 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(413,d,387,c)].
116.81/117.03	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(584,e,490,c)].
116.81/117.03	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(584,e,491,b)].
116.81/117.03	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(C,relation_field(A)) | C = D | in(ordered_pair(C,D),A) | in(ordered_pair(D,C),A) | -in(D,relation_field(A)) | -relation(A).  [resolve(584,e,492,h)].
116.81/117.03	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(584,e,493,b)].
116.81/117.03	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,C),A) | D = C | -relation(A).  [resolve(584,e,494,f)].
116.81/117.03	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = C | disjoint(fiber(A,f30(A,C)),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(584,e,495,f)].
116.81/117.03	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = C | in(f30(A,C),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(584,e,496,f)].
119.14/119.31	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(584,e,497,d)].
119.14/119.31	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,E),A) | in(ordered_pair(C,E),A) | -relation(A).  [resolve(584,e,498,f)].
119.14/119.31	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(584,e,499,d)].
119.14/119.31	585 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(413,d,388,c)].
119.14/119.31	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(585,e,490,c)].
119.14/119.31	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(585,e,491,b)].
119.14/119.31	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(C,relation_field(A)) | C = D | in(ordered_pair(C,D),A) | in(ordered_pair(D,C),A) | -in(D,relation_field(A)) | -relation(A).  [resolve(585,e,492,h)].
119.14/119.31	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(585,e,493,b)].
119.14/119.31	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,C),A) | D = C | -relation(A).  [resolve(585,e,494,f)].
119.14/119.31	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = C | disjoint(fiber(A,f30(A,C)),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(585,e,495,f)].
119.14/119.31	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = C | in(f30(A,C),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(585,e,496,f)].
119.14/119.31	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(585,e,497,d)].
122.21/122.41	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,E),A) | in(ordered_pair(C,E),A) | -relation(A).  [resolve(585,e,498,f)].
122.21/122.41	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(585,e,499,d)].
122.21/122.41	586 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(413,d,389,c)].
122.21/122.41	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(586,e,490,c)].
122.21/122.41	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(586,e,491,b)].
122.21/122.41	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(C,relation_field(A)) | C = D | in(ordered_pair(C,D),A) | in(ordered_pair(D,C),A) | -in(D,relation_field(A)) | -relation(A).  [resolve(586,e,492,h)].
122.21/122.41	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(586,e,493,b)].
122.21/122.41	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,C),A) | D = C | -relation(A).  [resolve(586,e,494,f)].
122.21/122.41	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = C | disjoint(fiber(A,f30(A,C)),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(586,e,495,f)].
122.21/122.41	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = C | in(f30(A,C),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(586,e,496,f)].
122.21/122.41	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(586,e,497,d)].
122.21/122.41	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,E),A) | in(ordered_pair(C,E),A) | -relation(A).  [resolve(586,e,498,f)].
125.05/125.31	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(586,e,499,d)].
125.05/125.31	587 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(413,d,390,c)].
125.05/125.31	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(587,e,490,c)].
125.05/125.31	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(587,e,491,b)].
125.05/125.31	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(C,relation_field(A)) | C = D | in(ordered_pair(C,D),A) | in(ordered_pair(D,C),A) | -in(D,relation_field(A)) | -relation(A).  [resolve(587,e,492,h)].
125.05/125.31	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(587,e,493,b)].
125.05/125.31	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,C),A) | D = C | -relation(A).  [resolve(587,e,494,f)].
125.05/125.31	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = C | disjoint(fiber(A,f30(A,C)),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(587,e,495,f)].
125.05/125.31	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = C | in(f30(A,C),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(587,e,496,f)].
125.05/125.31	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(587,e,497,d)].
125.05/125.31	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,E),A) | in(ordered_pair(C,E),A) | -relation(A).  [resolve(587,e,498,f)].
127.14/127.36	588 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(414,d,387,c)].
127.14/127.36	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(588,e,490,c)].
127.14/127.36	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(588,e,491,b)].
127.14/127.36	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(588,e,492,h)].
127.14/127.36	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(588,e,493,b)].
127.14/127.36	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(588,e,494,f)].
127.14/127.36	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(588,e,495,f)].
127.14/127.36	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(588,e,496,f)].
127.14/127.36	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(588,e,497,d)].
127.14/127.36	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(588,e,498,f)].
127.14/127.36	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(588,e,499,d)].
127.14/127.36	589 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(414,d,388,c)].
129.55/129.72	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(589,e,490,c)].
129.55/129.72	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(589,e,491,b)].
129.55/129.72	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(589,e,492,h)].
129.55/129.72	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(589,e,493,b)].
129.55/129.72	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(589,e,494,f)].
129.55/129.72	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(589,e,495,f)].
129.55/129.72	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(589,e,496,f)].
129.55/129.72	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(589,e,497,d)].
129.55/129.72	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(589,e,498,f)].
129.55/129.72	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(589,e,499,d)].
129.55/129.72	590 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(414,d,389,c)].
129.55/129.72	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(590,e,490,c)].
132.25/132.49	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(590,e,491,b)].
132.25/132.49	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(590,e,492,h)].
132.25/132.49	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(590,e,493,b)].
132.25/132.49	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(590,e,494,f)].
132.25/132.49	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(590,e,495,f)].
132.25/132.49	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(590,e,496,f)].
132.25/132.49	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(590,e,497,d)].
132.25/132.49	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(590,e,498,f)].
132.25/132.49	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(590,e,499,d)].
132.25/132.49	591 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(414,d,390,c)].
132.25/132.49	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(591,e,490,c)].
132.25/132.49	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(591,e,491,b)].
134.74/134.92	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(591,e,492,h)].
134.74/134.92	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(591,e,493,b)].
134.74/134.92	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(591,e,494,f)].
134.74/134.92	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(591,e,495,f)].
134.74/134.92	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(591,e,496,f)].
134.74/134.92	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(591,e,497,d)].
134.74/134.92	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(591,e,498,f)].
134.74/134.92	592 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(415,d,387,c)].
134.74/134.92	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(592,e,490,c)].
134.74/134.92	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(592,e,491,b)].
134.74/134.92	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(592,e,492,h)].
137.04/137.26	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(592,e,493,b)].
137.04/137.26	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(592,e,494,f)].
137.04/137.26	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(592,e,495,f)].
137.04/137.26	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(592,e,496,f)].
137.04/137.26	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(592,e,498,f)].
137.04/137.26	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(592,e,499,d)].
137.04/137.26	593 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(415,d,388,c)].
137.04/137.26	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(593,e,490,c)].
137.04/137.26	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(593,e,491,b)].
137.04/137.26	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(593,e,492,h)].
137.04/137.26	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(593,e,493,b)].
137.04/137.26	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(593,e,494,f)].
139.53/139.71	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(593,e,495,f)].
139.53/139.71	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(593,e,496,f)].
139.53/139.71	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(593,e,498,f)].
139.53/139.71	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(593,e,499,d)].
139.53/139.71	594 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(415,d,389,c)].
139.53/139.71	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(594,e,490,c)].
139.53/139.71	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(594,e,491,b)].
139.53/139.71	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(594,e,492,h)].
139.53/139.71	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(594,e,493,b)].
139.53/139.71	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(594,e,494,f)].
139.53/139.71	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(594,e,495,f)].
142.73/142.89	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(594,e,496,f)].
142.73/142.89	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(594,e,498,f)].
142.73/142.89	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(594,e,499,d)].
142.73/142.89	595 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(415,d,390,c)].
142.73/142.89	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(595,e,490,c)].
142.73/142.89	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(595,e,491,b)].
142.73/142.89	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(595,e,492,h)].
142.73/142.89	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(595,e,493,b)].
142.73/142.89	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(595,e,494,f)].
142.73/142.89	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(595,e,495,f)].
142.73/142.89	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(595,e,496,f)].
142.73/142.89	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(595,e,498,f)].
144.54/144.72	596 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(416,d,387,c)].
144.54/144.72	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(596,e,490,c)].
144.54/144.72	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(596,e,491,b)].
144.54/144.72	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(596,e,492,h)].
144.54/144.72	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(596,e,493,b)].
144.54/144.72	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(596,e,494,f)].
144.54/144.72	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(596,e,495,f)].
144.54/144.72	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(596,e,496,f)].
144.54/144.72	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(596,e,497,d)].
144.54/144.72	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(596,e,498,f)].
144.54/144.72	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(596,e,499,d)].
144.54/144.72	597 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(416,d,388,c)].
146.74/146.92	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(597,e,490,c)].
146.74/146.92	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(597,e,491,b)].
146.74/146.92	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(597,e,492,h)].
146.74/146.92	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(597,e,493,b)].
146.74/146.92	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(597,e,494,f)].
146.74/146.92	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(597,e,495,f)].
146.74/146.92	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(597,e,496,f)].
146.74/146.92	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(597,e,497,d)].
146.74/146.92	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(597,e,498,f)].
146.74/146.92	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(597,e,499,d)].
146.74/146.92	598 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(416,d,389,c)].
146.74/146.92	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(598,e,490,c)].
146.74/146.92	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(598,e,491,b)].
149.36/149.59	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(598,e,492,h)].
149.36/149.59	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(598,e,493,b)].
149.36/149.59	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(598,e,494,f)].
149.36/149.59	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(598,e,495,f)].
149.36/149.59	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(598,e,496,f)].
149.36/149.59	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(598,e,497,d)].
149.36/149.59	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(598,e,498,f)].
149.36/149.59	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(598,e,499,d)].
149.36/149.59	599 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(416,d,390,c)].
149.36/149.59	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(599,e,490,c)].
149.36/149.59	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(599,e,491,b)].
149.36/149.59	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(599,e,492,h)].
151.77/151.99	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(599,e,493,b)].
151.77/151.99	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(599,e,494,f)].
151.77/151.99	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(599,e,495,f)].
151.77/151.99	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(599,e,496,f)].
151.77/151.99	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(599,e,497,d)].
151.77/151.99	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(599,e,498,f)].
151.77/151.99	600 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(417,d,387,c)].
151.77/151.99	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(600,e,490,c)].
151.77/151.99	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(600,e,491,b)].
151.77/151.99	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(C,relation_field(A)) | C = D | in(ordered_pair(C,D),A) | in(ordered_pair(D,C),A) | -in(D,relation_field(A)) | -relation(A).  [resolve(600,e,492,h)].
151.77/151.99	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(600,e,493,b)].
151.77/151.99	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,C),A) | D = C | -relation(A).  [resolve(600,e,494,f)].
154.04/154.26	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = C | disjoint(fiber(A,f30(A,C)),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(600,e,495,f)].
154.04/154.26	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = C | in(f30(A,C),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(600,e,496,f)].
154.04/154.26	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(600,e,497,d)].
154.04/154.26	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,E),A) | in(ordered_pair(C,E),A) | -relation(A).  [resolve(600,e,498,f)].
154.04/154.26	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(600,e,499,d)].
154.04/154.26	601 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(417,d,388,c)].
154.04/154.26	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(601,e,490,c)].
154.04/154.26	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(601,e,491,b)].
154.04/154.26	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(C,relation_field(A)) | C = D | in(ordered_pair(C,D),A) | in(ordered_pair(D,C),A) | -in(D,relation_field(A)) | -relation(A).  [resolve(601,e,492,h)].
154.04/154.26	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(601,e,493,b)].
154.04/154.26	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,C),A) | D = C | -relation(A).  [resolve(601,e,494,f)].
156.95/157.16	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = C | disjoint(fiber(A,f30(A,C)),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(601,e,495,f)].
156.95/157.16	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = C | in(f30(A,C),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(601,e,496,f)].
156.95/157.16	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(601,e,497,d)].
156.95/157.16	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,E),A) | in(ordered_pair(C,E),A) | -relation(A).  [resolve(601,e,498,f)].
156.95/157.16	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(601,e,499,d)].
156.95/157.16	602 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(417,d,389,c)].
156.95/157.16	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(602,e,490,c)].
156.95/157.16	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(602,e,491,b)].
156.95/157.16	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(C,relation_field(A)) | C = D | in(ordered_pair(C,D),A) | in(ordered_pair(D,C),A) | -in(D,relation_field(A)) | -relation(A).  [resolve(602,e,492,h)].
156.95/157.16	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(602,e,493,b)].
156.95/157.16	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,C),A) | D = C | -relation(A).  [resolve(602,e,494,f)].
156.95/157.16	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = C | disjoint(fiber(A,f30(A,C)),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(602,e,495,f)].
159.95/160.14	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = C | in(f30(A,C),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(602,e,496,f)].
159.95/160.14	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(602,e,497,d)].
159.95/160.14	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,E),A) | in(ordered_pair(C,E),A) | -relation(A).  [resolve(602,e,498,f)].
159.95/160.14	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(602,e,499,d)].
159.95/160.14	603 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(417,d,390,c)].
159.95/160.14	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(603,e,490,c)].
159.95/160.14	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(603,e,491,b)].
159.95/160.14	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(C,relation_field(A)) | C = D | in(ordered_pair(C,D),A) | in(ordered_pair(D,C),A) | -in(D,relation_field(A)) | -relation(A).  [resolve(603,e,492,h)].
159.95/160.14	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(603,e,493,b)].
159.95/160.14	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,C),A) | D = C | -relation(A).  [resolve(603,e,494,f)].
159.95/160.14	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = C | disjoint(fiber(A,f30(A,C)),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(603,e,495,f)].
162.65/162.81	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = C | in(f30(A,C),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(603,e,496,f)].
162.65/162.81	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(603,e,497,d)].
162.65/162.81	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,E),A) | in(ordered_pair(C,E),A) | -relation(A).  [resolve(603,e,498,f)].
162.65/162.81	604 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(418,d,387,c)].
162.65/162.81	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(604,e,490,c)].
162.65/162.81	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(604,e,491,b)].
162.65/162.81	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(604,e,492,h)].
162.65/162.81	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(604,e,493,b)].
162.65/162.81	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(604,e,494,f)].
162.65/162.81	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(604,e,495,f)].
162.65/162.81	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(604,e,496,f)].
162.65/162.81	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(604,e,497,d)].
165.35/165.56	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(604,e,498,f)].
165.35/165.56	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(604,e,499,d)].
165.35/165.56	605 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(418,d,388,c)].
165.35/165.56	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(605,e,490,c)].
165.35/165.56	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(605,e,491,b)].
165.35/165.56	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(605,e,492,h)].
165.35/165.56	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(605,e,493,b)].
165.35/165.56	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(605,e,494,f)].
165.35/165.56	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(605,e,495,f)].
165.35/165.56	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(605,e,496,f)].
165.35/165.56	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(605,e,497,d)].
165.35/165.56	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(605,e,498,f)].
168.43/168.60	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(605,e,499,d)].
168.43/168.60	606 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(418,d,389,c)].
168.43/168.60	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(606,e,490,c)].
168.43/168.60	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(606,e,491,b)].
168.43/168.60	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(606,e,492,h)].
168.43/168.60	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(606,e,493,b)].
168.43/168.60	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(606,e,494,f)].
168.43/168.60	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(606,e,495,f)].
168.43/168.60	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(606,e,496,f)].
168.43/168.60	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(606,e,497,d)].
168.43/168.60	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(606,e,498,f)].
168.43/168.60	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(606,e,499,d)].
170.86/171.04	607 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(418,d,390,c)].
170.86/171.04	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(607,e,490,c)].
170.86/171.04	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(607,e,491,b)].
170.86/171.04	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(607,e,492,h)].
170.86/171.04	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(607,e,493,b)].
170.86/171.04	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(607,e,494,f)].
170.86/171.04	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(607,e,495,f)].
170.86/171.04	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(607,e,496,f)].
170.86/171.04	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(607,e,497,d)].
170.86/171.04	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(607,e,498,f)].
170.86/171.04	608 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(419,d,387,c)].
170.86/171.04	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(608,e,490,c)].
172.83/173.04	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(608,e,491,b)].
172.83/173.04	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(608,e,492,h)].
172.83/173.04	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(608,e,493,b)].
172.83/173.04	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(608,e,494,f)].
172.83/173.04	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(608,e,495,f)].
172.83/173.04	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(608,e,496,f)].
172.83/173.04	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(608,e,498,f)].
172.83/173.04	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(608,e,499,d)].
172.83/173.04	609 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(419,d,388,c)].
172.83/173.04	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(609,e,490,c)].
172.83/173.04	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(609,e,491,b)].
175.37/175.61	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(609,e,492,h)].
175.37/175.61	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(609,e,493,b)].
175.37/175.61	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(609,e,494,f)].
175.37/175.61	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(609,e,495,f)].
175.37/175.61	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(609,e,496,f)].
175.37/175.61	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(609,e,498,f)].
175.37/175.61	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(609,e,499,d)].
175.37/175.61	610 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(419,d,389,c)].
175.37/175.61	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(610,e,490,c)].
175.37/175.61	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(610,e,491,b)].
175.37/175.61	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(610,e,492,h)].
175.37/175.61	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(610,e,493,b)].
178.16/178.38	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(610,e,494,f)].
178.16/178.38	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(610,e,495,f)].
178.16/178.38	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(610,e,496,f)].
178.16/178.38	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(610,e,498,f)].
178.16/178.38	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(610,e,499,d)].
178.16/178.38	611 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(419,d,390,c)].
178.16/178.38	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(611,e,490,c)].
178.16/178.38	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(611,e,491,b)].
178.16/178.38	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(611,e,492,h)].
178.16/178.38	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(611,e,493,b)].
178.16/178.38	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(611,e,494,f)].
180.86/181.06	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(611,e,495,f)].
180.86/181.06	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(611,e,496,f)].
180.86/181.06	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(611,e,498,f)].
180.86/181.06	612 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(420,d,387,c)].
180.86/181.06	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(612,e,490,c)].
180.86/181.06	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(612,e,491,b)].
180.86/181.06	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(612,e,492,h)].
180.86/181.06	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(612,e,493,b)].
180.86/181.06	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(612,e,494,f)].
180.86/181.06	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(612,e,495,f)].
180.86/181.06	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(612,e,496,f)].
180.86/181.06	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(612,e,497,d)].
180.86/181.06	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(612,e,498,f)].
183.16/183.38	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(612,e,499,d)].
183.16/183.38	613 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(420,d,388,c)].
183.16/183.38	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(613,e,490,c)].
183.16/183.38	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(613,e,491,b)].
183.16/183.38	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(613,e,492,h)].
183.16/183.38	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(613,e,493,b)].
183.16/183.38	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(613,e,494,f)].
183.16/183.38	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(613,e,495,f)].
183.16/183.38	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(613,e,496,f)].
183.16/183.38	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(613,e,497,d)].
183.16/183.38	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(613,e,498,f)].
183.16/183.38	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(613,e,499,d)].
183.16/183.38	614 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(420,d,389,c)].
185.65/185.84	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(614,e,490,c)].
185.65/185.84	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(614,e,491,b)].
185.65/185.84	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(614,e,492,h)].
185.65/185.84	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(614,e,493,b)].
185.65/185.84	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(614,e,494,f)].
185.65/185.84	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(614,e,495,f)].
185.65/185.84	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(614,e,496,f)].
185.65/185.84	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(614,e,497,d)].
185.65/185.84	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(614,e,498,f)].
185.65/185.84	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(614,e,499,d)].
185.65/185.84	615 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(420,d,390,c)].
185.65/185.84	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(615,e,490,c)].
185.65/185.84	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(615,e,491,b)].
188.22/188.40	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(615,e,492,h)].
188.22/188.40	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(615,e,493,b)].
188.22/188.40	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(615,e,494,f)].
188.22/188.40	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(615,e,495,f)].
188.22/188.40	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(615,e,496,f)].
188.22/188.40	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(615,e,497,d)].
188.22/188.40	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(615,e,498,f)].
188.22/188.40	616 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(421,d,387,c)].
188.22/188.40	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(616,e,490,c)].
188.22/188.40	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(616,e,491,b)].
188.22/188.40	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(C,relation_field(A)) | C = D | in(ordered_pair(C,D),A) | in(ordered_pair(D,C),A) | -in(D,relation_field(A)) | -relation(A).  [resolve(616,e,492,h)].
188.22/188.40	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(616,e,493,b)].
188.22/188.40	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,C),A) | D = C | -relation(A).  [resolve(616,e,494,f)].
190.76/190.96	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = C | disjoint(fiber(A,f30(A,C)),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(616,e,495,f)].
190.76/190.96	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = C | in(f30(A,C),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(616,e,496,f)].
190.76/190.96	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(616,e,497,d)].
190.76/190.96	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,E),A) | in(ordered_pair(C,E),A) | -relation(A).  [resolve(616,e,498,f)].
190.76/190.96	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(616,e,499,d)].
190.76/190.96	617 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(421,d,388,c)].
190.76/190.96	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(617,e,490,c)].
190.76/190.96	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(617,e,491,b)].
190.76/190.96	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(C,relation_field(A)) | C = D | in(ordered_pair(C,D),A) | in(ordered_pair(D,C),A) | -in(D,relation_field(A)) | -relation(A).  [resolve(617,e,492,h)].
190.76/190.96	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(617,e,493,b)].
190.76/190.96	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,C),A) | D = C | -relation(A).  [resolve(617,e,494,f)].
190.76/190.96	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = C | disjoint(fiber(A,f30(A,C)),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(617,e,495,f)].
193.66/193.88	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = C | in(f30(A,C),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(617,e,496,f)].
193.66/193.88	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(617,e,497,d)].
193.66/193.88	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,E),A) | in(ordered_pair(C,E),A) | -relation(A).  [resolve(617,e,498,f)].
193.66/193.88	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(617,e,499,d)].
193.66/193.88	618 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(421,d,389,c)].
193.66/193.88	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(618,e,490,c)].
193.66/193.88	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(618,e,491,b)].
193.66/193.88	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(C,relation_field(A)) | C = D | in(ordered_pair(C,D),A) | in(ordered_pair(D,C),A) | -in(D,relation_field(A)) | -relation(A).  [resolve(618,e,492,h)].
193.66/193.88	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(618,e,493,b)].
193.66/193.88	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,C),A) | D = C | -relation(A).  [resolve(618,e,494,f)].
193.66/193.88	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = C | disjoint(fiber(A,f30(A,C)),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(618,e,495,f)].
193.66/193.88	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = C | in(f30(A,C),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(618,e,496,f)].
196.96/197.15	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(618,e,497,d)].
196.96/197.15	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,E),A) | in(ordered_pair(C,E),A) | -relation(A).  [resolve(618,e,498,f)].
196.96/197.15	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(618,e,499,d)].
196.96/197.15	619 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(421,d,390,c)].
196.96/197.15	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(619,e,490,c)].
196.96/197.15	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(619,e,491,b)].
196.96/197.15	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(C,relation_field(A)) | C = D | in(ordered_pair(C,D),A) | in(ordered_pair(D,C),A) | -in(D,relation_field(A)) | -relation(A).  [resolve(619,e,492,h)].
196.96/197.15	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(619,e,493,b)].
196.96/197.15	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,C),A) | D = C | -relation(A).  [resolve(619,e,494,f)].
196.96/197.15	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = C | disjoint(fiber(A,f30(A,C)),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(619,e,495,f)].
196.96/197.15	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = C | in(f30(A,C),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(619,e,496,f)].
196.96/197.15	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(619,e,497,d)].
199.63/199.79	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,E),A) | in(ordered_pair(C,E),A) | -relation(A).  [resolve(619,e,498,f)].
199.63/199.79	620 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(422,d,387,c)].
199.63/199.79	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(620,e,490,c)].
199.63/199.79	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(620,e,491,b)].
199.63/199.79	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(620,e,492,h)].
199.63/199.79	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(620,e,493,b)].
199.63/199.79	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(620,e,494,f)].
199.63/199.79	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(620,e,495,f)].
199.63/199.79	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(620,e,496,f)].
199.63/199.79	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(620,e,497,d)].
199.63/199.79	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(620,e,498,f)].
199.63/199.79	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(620,e,499,d)].
202.06/202.24	621 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(422,d,388,c)].
202.06/202.24	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(621,e,490,c)].
202.06/202.24	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(621,e,491,b)].
202.06/202.24	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(621,e,492,h)].
202.06/202.24	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(621,e,493,b)].
202.06/202.24	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(621,e,494,f)].
202.06/202.24	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(621,e,495,f)].
202.06/202.24	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(621,e,496,f)].
202.06/202.24	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(621,e,497,d)].
202.06/202.24	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(621,e,498,f)].
202.06/202.24	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(621,e,499,d)].
202.06/202.24	622 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(422,d,389,c)].
202.06/202.24	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(622,e,490,c)].
204.85/205.05	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(622,e,491,b)].
204.85/205.05	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(622,e,492,h)].
204.85/205.05	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(622,e,493,b)].
204.85/205.05	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(622,e,494,f)].
204.85/205.05	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(622,e,495,f)].
204.85/205.05	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(622,e,496,f)].
204.85/205.05	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(622,e,497,d)].
204.85/205.05	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(622,e,498,f)].
204.85/205.05	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(622,e,499,d)].
204.85/205.05	623 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(422,d,390,c)].
204.85/205.05	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(623,e,490,c)].
204.85/205.05	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(623,e,491,b)].
207.47/207.68	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(623,e,492,h)].
207.47/207.68	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(623,e,493,b)].
207.47/207.68	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(623,e,494,f)].
207.47/207.68	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(623,e,495,f)].
207.47/207.68	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(623,e,496,f)].
207.47/207.68	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(623,e,497,d)].
207.47/207.68	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(623,e,498,f)].
207.47/207.68	624 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(423,d,387,c)].
207.47/207.68	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(624,e,490,c)].
207.47/207.68	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(624,e,491,b)].
207.47/207.68	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(624,e,492,h)].
207.47/207.68	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(624,e,493,b)].
210.04/210.23	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(624,e,494,f)].
210.04/210.23	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(624,e,495,f)].
210.04/210.23	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(624,e,496,f)].
210.04/210.23	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(624,e,498,f)].
210.04/210.23	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(624,e,499,d)].
210.04/210.23	625 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(423,d,388,c)].
210.04/210.23	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(625,e,490,c)].
210.04/210.23	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(625,e,491,b)].
210.04/210.23	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(625,e,492,h)].
210.04/210.23	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(625,e,493,b)].
210.04/210.23	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(625,e,494,f)].
210.04/210.23	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(625,e,495,f)].
213.34/213.57	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(625,e,496,f)].
213.34/213.57	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(625,e,498,f)].
213.34/213.57	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(625,e,499,d)].
213.34/213.57	626 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(423,d,389,c)].
213.34/213.57	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(626,e,490,c)].
213.34/213.57	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(626,e,491,b)].
213.34/213.57	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(626,e,492,h)].
213.34/213.57	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(626,e,493,b)].
213.34/213.57	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(626,e,494,f)].
213.34/213.57	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(626,e,495,f)].
213.34/213.57	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(626,e,496,f)].
213.34/213.57	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(626,e,498,f)].
213.34/213.57	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(626,e,499,d)].
215.42/215.62	627 -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(423,d,390,c)].
215.42/215.62	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(627,e,490,c)].
215.42/215.62	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(627,e,491,b)].
215.42/215.62	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(627,e,492,h)].
215.42/215.62	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(627,e,493,b)].
215.42/215.62	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(627,e,494,f)].
215.42/215.62	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(627,e,495,f)].
215.42/215.62	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(627,e,496,f)].
215.42/215.62	Derived: -relation(A) | in(f97(A),relation_field(A)) | -relation(A) | -reflexive(A) | -relation(A) | f78(A) != f77(A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(627,e,498,f)].
215.42/215.62	628 -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(424,d,387,c)].
215.42/215.62	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(628,e,490,c)].
215.42/215.62	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(628,e,491,b)].
216.74/216.91	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(628,e,492,h)].
216.74/216.91	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(628,e,494,f)].
216.74/216.91	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(628,e,495,f)].
216.74/216.91	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(628,e,496,f)].
216.74/216.91	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(628,e,497,d)].
216.74/216.91	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(628,e,498,f)].
216.74/216.91	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(628,e,499,d)].
216.74/216.91	629 -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(424,d,388,c)].
216.74/216.91	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(629,e,490,c)].
216.74/216.91	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(629,e,491,b)].
216.74/216.91	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(629,e,492,h)].
216.74/216.91	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(629,e,494,f)].
218.55/218.72	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(629,e,495,f)].
218.55/218.72	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(629,e,496,f)].
218.55/218.72	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(629,e,497,d)].
218.55/218.72	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(629,e,498,f)].
218.55/218.72	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(629,e,499,d)].
218.55/218.72	630 -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(424,d,389,c)].
218.55/218.72	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(630,e,490,c)].
218.55/218.72	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(630,e,491,b)].
218.55/218.72	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(630,e,492,h)].
218.55/218.72	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(630,e,494,f)].
218.55/218.72	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(630,e,495,f)].
218.55/218.72	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(630,e,496,f)].
218.55/218.72	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(630,e,497,d)].
220.36/220.55	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(630,e,498,f)].
220.36/220.55	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(630,e,499,d)].
220.36/220.55	631 -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(424,d,390,c)].
220.36/220.55	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(631,e,490,c)].
220.36/220.55	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(631,e,491,b)].
220.36/220.55	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(631,e,492,h)].
220.36/220.55	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(631,e,494,f)].
220.36/220.55	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(631,e,495,f)].
220.36/220.55	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(631,e,496,f)].
220.36/220.55	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(631,e,497,d)].
220.36/220.55	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(631,e,498,f)].
220.36/220.55	632 -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(425,d,387,c)].
221.65/221.87	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(632,e,490,c)].
221.65/221.87	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(632,e,491,b)].
221.65/221.87	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(C,relation_field(A)) | C = D | in(ordered_pair(C,D),A) | in(ordered_pair(D,C),A) | -in(D,relation_field(A)) | -relation(A).  [resolve(632,e,492,h)].
221.65/221.87	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,C),A) | D = C | -relation(A).  [resolve(632,e,494,f)].
221.65/221.87	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = C | disjoint(fiber(A,f30(A,C)),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(632,e,495,f)].
221.65/221.87	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = C | in(f30(A,C),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(632,e,496,f)].
221.65/221.87	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(632,e,497,d)].
221.65/221.87	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,E),A) | in(ordered_pair(C,E),A) | -relation(A).  [resolve(632,e,498,f)].
221.65/221.87	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(632,e,499,d)].
221.65/221.87	633 -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(425,d,388,c)].
221.65/221.87	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(633,e,490,c)].
221.65/221.87	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(633,e,491,b)].
223.36/223.53	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(C,relation_field(A)) | C = D | in(ordered_pair(C,D),A) | in(ordered_pair(D,C),A) | -in(D,relation_field(A)) | -relation(A).  [resolve(633,e,492,h)].
223.36/223.53	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,C),A) | D = C | -relation(A).  [resolve(633,e,494,f)].
223.36/223.53	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = C | disjoint(fiber(A,f30(A,C)),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(633,e,495,f)].
223.36/223.53	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = C | in(f30(A,C),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(633,e,496,f)].
223.36/223.53	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(633,e,497,d)].
223.36/223.53	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,E),A) | in(ordered_pair(C,E),A) | -relation(A).  [resolve(633,e,498,f)].
223.36/223.53	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(633,e,499,d)].
223.36/223.53	634 -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(425,d,389,c)].
223.36/223.53	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(634,e,490,c)].
223.36/223.53	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(634,e,491,b)].
223.36/223.53	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(C,relation_field(A)) | C = D | in(ordered_pair(C,D),A) | in(ordered_pair(D,C),A) | -in(D,relation_field(A)) | -relation(A).  [resolve(634,e,492,h)].
225.75/225.92	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,C),A) | D = C | -relation(A).  [resolve(634,e,494,f)].
225.75/225.92	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = C | disjoint(fiber(A,f30(A,C)),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(634,e,495,f)].
225.75/225.92	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = C | in(f30(A,C),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(634,e,496,f)].
225.75/225.92	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(634,e,497,d)].
225.75/225.92	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,E),A) | in(ordered_pair(C,E),A) | -relation(A).  [resolve(634,e,498,f)].
225.75/225.92	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(634,e,499,d)].
225.75/225.92	635 -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(425,d,390,c)].
225.75/225.92	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(635,e,490,c)].
225.75/225.92	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(635,e,491,b)].
225.75/225.92	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(C,relation_field(A)) | C = D | in(ordered_pair(C,D),A) | in(ordered_pair(D,C),A) | -in(D,relation_field(A)) | -relation(A).  [resolve(635,e,492,h)].
225.75/225.92	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,C),A) | D = C | -relation(A).  [resolve(635,e,494,f)].
225.75/225.92	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = C | disjoint(fiber(A,f30(A,C)),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(635,e,495,f)].
227.66/227.85	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = C | in(f30(A,C),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(635,e,496,f)].
227.66/227.85	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(635,e,497,d)].
227.66/227.85	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,E),A) | in(ordered_pair(C,E),A) | -relation(A).  [resolve(635,e,498,f)].
227.66/227.85	636 -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(426,d,387,c)].
227.66/227.85	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(636,e,490,c)].
227.66/227.85	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(636,e,491,b)].
227.66/227.85	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(636,e,492,h)].
227.66/227.85	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(636,e,494,f)].
227.66/227.85	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(636,e,495,f)].
227.66/227.85	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(636,e,496,f)].
227.66/227.85	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(636,e,497,d)].
227.66/227.85	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(636,e,498,f)].
229.32/229.49	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(636,e,499,d)].
229.32/229.49	637 -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(426,d,388,c)].
229.32/229.49	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(637,e,490,c)].
229.32/229.49	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(637,e,491,b)].
229.32/229.49	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(637,e,492,h)].
229.32/229.49	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(637,e,494,f)].
229.32/229.49	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(637,e,495,f)].
229.32/229.49	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(637,e,496,f)].
229.32/229.49	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(637,e,497,d)].
229.32/229.49	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(637,e,498,f)].
229.32/229.49	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(637,e,499,d)].
229.32/229.49	638 -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(426,d,389,c)].
231.16/231.38	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(638,e,490,c)].
231.16/231.38	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(638,e,491,b)].
231.16/231.38	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(638,e,492,h)].
231.16/231.38	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(638,e,494,f)].
231.16/231.38	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(638,e,495,f)].
231.16/231.38	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(638,e,496,f)].
231.16/231.38	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(638,e,497,d)].
231.16/231.38	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(638,e,498,f)].
231.16/231.38	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(638,e,499,d)].
231.16/231.38	639 -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(426,d,390,c)].
231.16/231.38	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(639,e,490,c)].
231.16/231.38	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(639,e,491,b)].
232.95/233.11	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(639,e,492,h)].
232.95/233.11	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(639,e,494,f)].
232.95/233.11	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(639,e,495,f)].
232.95/233.11	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(639,e,496,f)].
232.95/233.11	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(639,e,497,d)].
232.95/233.11	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(639,e,498,f)].
232.95/233.11	640 -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(427,d,387,c)].
232.95/233.11	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(640,e,490,c)].
232.95/233.11	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(640,e,491,b)].
232.95/233.11	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(640,e,492,h)].
232.95/233.11	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(640,e,494,f)].
234.77/234.95	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(640,e,495,f)].
234.77/234.95	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(640,e,496,f)].
234.77/234.95	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(640,e,498,f)].
234.77/234.95	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(640,e,499,d)].
234.77/234.95	641 -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(427,d,388,c)].
234.77/234.95	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(641,e,490,c)].
234.77/234.95	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(641,e,491,b)].
234.77/234.95	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(641,e,492,h)].
234.77/234.95	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(641,e,494,f)].
234.77/234.95	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(641,e,495,f)].
234.77/234.95	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(641,e,496,f)].
234.77/234.95	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(641,e,498,f)].
236.55/236.71	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(641,e,499,d)].
236.55/236.71	642 -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(427,d,389,c)].
236.55/236.71	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(642,e,490,c)].
236.55/236.71	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(642,e,491,b)].
236.55/236.71	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(642,e,492,h)].
236.55/236.71	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(642,e,494,f)].
236.55/236.71	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(642,e,495,f)].
236.55/236.71	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(642,e,496,f)].
236.55/236.71	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(642,e,498,f)].
236.55/236.71	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(642,e,499,d)].
236.55/236.71	643 -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(427,d,390,c)].
236.55/236.71	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(643,e,490,c)].
238.24/238.41	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(643,e,491,b)].
238.24/238.41	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(643,e,492,h)].
238.24/238.41	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(643,e,494,f)].
238.24/238.41	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(643,e,495,f)].
238.24/238.41	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(643,e,496,f)].
238.24/238.41	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | -is_antisymmetric_in(A,relation_field(A)) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(643,e,498,f)].
238.24/238.41	644 -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(428,d,387,c)].
238.24/238.41	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(644,e,490,c)].
238.24/238.41	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(644,e,491,b)].
238.24/238.41	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(644,e,492,h)].
238.24/238.41	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(644,e,493,b)].
238.24/238.41	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(644,e,494,f)].
240.47/240.71	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(644,e,495,f)].
240.47/240.71	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(644,e,496,f)].
240.47/240.71	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(644,e,497,d)].
240.47/240.71	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(644,e,498,f)].
240.47/240.71	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(644,e,499,d)].
240.47/240.71	645 -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(428,d,388,c)].
240.47/240.71	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(645,e,490,c)].
240.47/240.71	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(645,e,491,b)].
240.47/240.71	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(645,e,492,h)].
240.47/240.71	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(645,e,493,b)].
240.47/240.71	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(645,e,494,f)].
240.47/240.71	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(645,e,495,f)].
240.47/240.71	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(645,e,496,f)].
242.86/243.08	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(645,e,497,d)].
242.86/243.08	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(645,e,498,f)].
242.86/243.08	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(645,e,499,d)].
242.86/243.08	646 -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(428,d,389,c)].
242.86/243.08	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(646,e,490,c)].
242.86/243.08	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(646,e,491,b)].
242.86/243.08	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(646,e,492,h)].
242.86/243.08	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(646,e,493,b)].
242.86/243.08	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(646,e,494,f)].
242.86/243.08	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(646,e,495,f)].
242.86/243.08	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(646,e,496,f)].
242.86/243.08	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(646,e,497,d)].
245.56/245.80	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(646,e,498,f)].
245.56/245.80	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(646,e,499,d)].
245.56/245.80	647 -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(428,d,390,c)].
245.56/245.80	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(647,e,490,c)].
245.56/245.80	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(647,e,491,b)].
245.56/245.80	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(647,e,492,h)].
245.56/245.80	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(647,e,493,b)].
245.56/245.80	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(647,e,494,f)].
245.56/245.80	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(647,e,495,f)].
245.56/245.80	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(647,e,496,f)].
245.56/245.80	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(647,e,497,d)].
245.56/245.80	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(647,e,498,f)].
245.56/245.80	648 -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(429,d,387,c)].
247.64/247.80	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(648,e,490,c)].
247.64/247.80	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(648,e,491,b)].
247.64/247.80	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(C,relation_field(A)) | C = D | in(ordered_pair(C,D),A) | in(ordered_pair(D,C),A) | -in(D,relation_field(A)) | -relation(A).  [resolve(648,e,492,h)].
247.64/247.80	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(648,e,493,b)].
247.64/247.80	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,C),A) | D = C | -relation(A).  [resolve(648,e,494,f)].
247.64/247.80	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = C | disjoint(fiber(A,f30(A,C)),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(648,e,495,f)].
247.64/247.80	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = C | in(f30(A,C),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(648,e,496,f)].
247.64/247.80	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(648,e,497,d)].
247.64/247.80	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,E),A) | in(ordered_pair(C,E),A) | -relation(A).  [resolve(648,e,498,f)].
247.64/247.80	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(648,e,499,d)].
247.64/247.80	649 -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(429,d,388,c)].
247.64/247.80	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(649,e,490,c)].
249.93/250.16	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(649,e,491,b)].
249.93/250.16	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(C,relation_field(A)) | C = D | in(ordered_pair(C,D),A) | in(ordered_pair(D,C),A) | -in(D,relation_field(A)) | -relation(A).  [resolve(649,e,492,h)].
249.93/250.16	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(649,e,493,b)].
249.93/250.16	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,C),A) | D = C | -relation(A).  [resolve(649,e,494,f)].
249.93/250.16	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = C | disjoint(fiber(A,f30(A,C)),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(649,e,495,f)].
249.93/250.16	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = C | in(f30(A,C),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(649,e,496,f)].
249.93/250.16	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(649,e,497,d)].
249.93/250.16	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,E),A) | in(ordered_pair(C,E),A) | -relation(A).  [resolve(649,e,498,f)].
249.93/250.16	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(649,e,499,d)].
249.93/250.16	650 -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(429,d,389,c)].
249.93/250.16	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(650,e,490,c)].
249.93/250.16	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(650,e,491,b)].
252.93/253.10	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(C,relation_field(A)) | C = D | in(ordered_pair(C,D),A) | in(ordered_pair(D,C),A) | -in(D,relation_field(A)) | -relation(A).  [resolve(650,e,492,h)].
252.93/253.10	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(650,e,493,b)].
252.93/253.10	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,C),A) | D = C | -relation(A).  [resolve(650,e,494,f)].
252.93/253.10	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = C | disjoint(fiber(A,f30(A,C)),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(650,e,495,f)].
252.93/253.10	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = C | in(f30(A,C),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(650,e,496,f)].
252.93/253.10	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(650,e,497,d)].
252.93/253.10	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,E),A) | in(ordered_pair(C,E),A) | -relation(A).  [resolve(650,e,498,f)].
252.93/253.10	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(650,e,499,d)].
252.93/253.10	651 -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(429,d,390,c)].
252.93/253.10	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(651,e,490,c)].
252.93/253.10	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(651,e,491,b)].
252.93/253.10	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(C,relation_field(A)) | C = D | in(ordered_pair(C,D),A) | in(ordered_pair(D,C),A) | -in(D,relation_field(A)) | -relation(A).  [resolve(651,e,492,h)].
255.46/255.69	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(651,e,493,b)].
255.46/255.69	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,C),A) | D = C | -relation(A).  [resolve(651,e,494,f)].
255.46/255.69	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = C | disjoint(fiber(A,f30(A,C)),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(651,e,495,f)].
255.46/255.69	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = C | in(f30(A,C),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(651,e,496,f)].
255.46/255.69	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(651,e,497,d)].
255.46/255.69	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,E),A) | in(ordered_pair(C,E),A) | -relation(A).  [resolve(651,e,498,f)].
255.46/255.69	652 -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(430,d,387,c)].
255.46/255.69	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(652,e,490,c)].
255.46/255.69	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(652,e,491,b)].
255.46/255.69	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(652,e,492,h)].
255.46/255.69	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(652,e,493,b)].
255.46/255.69	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(652,e,494,f)].
257.84/258.07	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(652,e,495,f)].
257.84/258.07	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(652,e,496,f)].
257.84/258.07	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(652,e,497,d)].
257.84/258.07	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(652,e,498,f)].
257.84/258.07	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(652,e,499,d)].
257.84/258.07	653 -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(430,d,388,c)].
257.84/258.07	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(653,e,490,c)].
257.84/258.07	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(653,e,491,b)].
257.84/258.07	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(653,e,492,h)].
257.84/258.07	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(653,e,493,b)].
257.84/258.07	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(653,e,494,f)].
257.84/258.07	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(653,e,495,f)].
260.55/260.77	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(653,e,496,f)].
260.55/260.77	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(653,e,497,d)].
260.55/260.77	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(653,e,498,f)].
260.67/260.86	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(653,e,499,d)].
260.67/260.86	654 -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(430,d,389,c)].
260.67/260.86	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(654,e,490,c)].
260.67/260.86	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(654,e,491,b)].
260.67/260.86	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(654,e,492,h)].
260.67/260.86	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(654,e,493,b)].
260.67/260.86	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(654,e,494,f)].
260.67/260.86	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(654,e,495,f)].
260.67/260.86	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(654,e,496,f)].
263.97/264.17	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(654,e,497,d)].
263.97/264.17	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(654,e,498,f)].
263.97/264.17	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(654,e,499,d)].
263.97/264.17	655 -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(430,d,390,c)].
263.97/264.17	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(655,e,490,c)].
263.97/264.17	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(655,e,491,b)].
263.97/264.17	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(655,e,492,h)].
263.97/264.17	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(655,e,493,b)].
263.97/264.17	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(655,e,494,f)].
263.97/264.17	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(655,e,495,f)].
263.97/264.17	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(655,e,496,f)].
263.97/264.17	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(655,e,497,d)].
263.97/264.17	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(655,e,498,f)].
265.76/265.98	656 -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(431,d,387,c)].
265.76/265.98	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(656,e,490,c)].
265.76/265.98	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(656,e,491,b)].
265.76/265.98	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(656,e,492,h)].
265.76/265.98	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(656,e,493,b)].
265.76/265.98	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(656,e,494,f)].
265.76/265.98	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(656,e,495,f)].
265.76/265.98	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(656,e,496,f)].
265.76/265.98	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(656,e,498,f)].
265.76/265.98	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(656,e,499,d)].
265.76/265.98	657 -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(431,d,388,c)].
265.76/265.98	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(657,e,490,c)].
268.04/268.26	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(657,e,491,b)].
268.04/268.26	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(657,e,492,h)].
268.04/268.26	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(657,e,493,b)].
268.04/268.26	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(657,e,494,f)].
268.04/268.26	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(657,e,495,f)].
268.04/268.26	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(657,e,496,f)].
268.04/268.26	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(657,e,498,f)].
268.04/268.26	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(657,e,499,d)].
268.04/268.26	658 -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(431,d,389,c)].
268.04/268.26	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(658,e,490,c)].
268.04/268.26	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(658,e,491,b)].
268.04/268.26	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(658,e,492,h)].
270.87/271.04	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(658,e,493,b)].
270.87/271.04	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(658,e,494,f)].
270.87/271.04	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(658,e,495,f)].
271.04/271.24	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(658,e,496,f)].
271.04/271.24	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(658,e,498,f)].
271.04/271.24	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(658,e,499,d)].
271.04/271.24	659 -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(431,d,390,c)].
271.04/271.24	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(659,e,490,c)].
271.04/271.24	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(659,e,491,b)].
271.04/271.24	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(659,e,492,h)].
271.04/271.24	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(659,e,493,b)].
271.04/271.24	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(659,e,494,f)].
273.07/273.28	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(659,e,495,f)].
273.07/273.28	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(659,e,496,f)].
273.07/273.28	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f77(A),f78(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(659,e,498,f)].
273.07/273.28	660 -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(432,d,387,c)].
273.07/273.28	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(660,e,490,c)].
273.07/273.28	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(660,e,491,b)].
273.07/273.28	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(660,e,492,h)].
273.07/273.28	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(660,e,493,b)].
273.07/273.28	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(660,e,494,f)].
273.07/273.28	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(660,e,495,f)].
273.07/273.28	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(660,e,496,f)].
273.07/273.28	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(660,e,497,d)].
275.65/275.84	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(660,e,498,f)].
275.65/275.84	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(660,e,499,d)].
275.65/275.84	661 -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(432,d,388,c)].
275.65/275.84	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(661,e,490,c)].
275.65/275.84	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(661,e,491,b)].
275.65/275.84	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(661,e,492,h)].
275.65/275.84	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(661,e,493,b)].
275.65/275.84	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(661,e,494,f)].
275.65/275.84	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(661,e,495,f)].
275.65/275.84	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(661,e,496,f)].
275.65/275.84	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(661,e,497,d)].
275.65/275.84	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(661,e,498,f)].
275.65/275.84	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(661,e,499,d)].
277.98/278.19	662 -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(432,d,389,c)].
277.98/278.19	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(662,e,490,c)].
277.98/278.19	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(662,e,491,b)].
277.98/278.19	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(662,e,492,h)].
277.98/278.19	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(662,e,493,b)].
277.98/278.19	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(662,e,494,f)].
277.98/278.19	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(662,e,495,f)].
277.98/278.19	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(662,e,496,f)].
277.98/278.19	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(662,e,497,d)].
277.98/278.19	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(662,e,498,f)].
277.98/278.19	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(662,e,499,d)].
277.98/278.19	663 -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(432,d,390,c)].
277.98/278.19	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(663,e,490,c)].
280.26/280.41	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(663,e,491,b)].
280.26/280.41	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(663,e,492,h)].
280.26/280.41	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(663,e,493,b)].
280.26/280.41	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(663,e,494,f)].
280.26/280.41	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(663,e,495,f)].
280.26/280.41	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(663,e,496,f)].
280.26/280.41	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(663,e,497,d)].
280.26/280.41	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | empty_set != f29(A) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(663,e,498,f)].
280.26/280.41	664 -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(433,d,387,c)].
280.26/280.41	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(664,e,490,c)].
280.26/280.41	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(664,e,491,b)].
280.26/280.41	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(C,relation_field(A)) | C = D | in(ordered_pair(C,D),A) | in(ordered_pair(D,C),A) | -in(D,relation_field(A)) | -relation(A).  [resolve(664,e,492,h)].
282.55/282.70	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(664,e,493,b)].
282.55/282.70	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,C),A) | D = C | -relation(A).  [resolve(664,e,494,f)].
282.55/282.70	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = C | disjoint(fiber(A,f30(A,C)),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(664,e,495,f)].
282.55/282.70	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = C | in(f30(A,C),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(664,e,496,f)].
282.55/282.70	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(664,e,497,d)].
282.55/282.70	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,E),A) | in(ordered_pair(C,E),A) | -relation(A).  [resolve(664,e,498,f)].
282.55/282.70	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(664,e,499,d)].
282.55/282.70	665 -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(433,d,388,c)].
282.55/282.70	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(665,e,490,c)].
282.55/282.70	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(665,e,491,b)].
282.55/282.70	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(C,relation_field(A)) | C = D | in(ordered_pair(C,D),A) | in(ordered_pair(D,C),A) | -in(D,relation_field(A)) | -relation(A).  [resolve(665,e,492,h)].
282.55/282.70	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(665,e,493,b)].
285.25/285.41	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,C),A) | D = C | -relation(A).  [resolve(665,e,494,f)].
285.25/285.41	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = C | disjoint(fiber(A,f30(A,C)),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(665,e,495,f)].
285.25/285.41	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = C | in(f30(A,C),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(665,e,496,f)].
285.25/285.41	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(665,e,497,d)].
285.25/285.41	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,E),A) | in(ordered_pair(C,E),A) | -relation(A).  [resolve(665,e,498,f)].
285.25/285.41	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(665,e,499,d)].
285.25/285.41	666 -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(433,d,389,c)].
285.25/285.41	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(666,e,490,c)].
285.25/285.41	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(666,e,491,b)].
285.25/285.41	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(C,relation_field(A)) | C = D | in(ordered_pair(C,D),A) | in(ordered_pair(D,C),A) | -in(D,relation_field(A)) | -relation(A).  [resolve(666,e,492,h)].
285.25/285.41	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(666,e,493,b)].
285.25/285.41	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,C),A) | D = C | -relation(A).  [resolve(666,e,494,f)].
288.47/288.62	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = C | disjoint(fiber(A,f30(A,C)),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(666,e,495,f)].
288.47/288.62	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = C | in(f30(A,C),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(666,e,496,f)].
288.47/288.62	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(666,e,497,d)].
288.47/288.62	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,E),A) | in(ordered_pair(C,E),A) | -relation(A).  [resolve(666,e,498,f)].
288.47/288.62	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(666,e,499,d)].
288.47/288.62	667 -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(433,d,390,c)].
288.47/288.62	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(667,e,490,c)].
288.47/288.62	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(667,e,491,b)].
288.47/288.62	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(C,relation_field(A)) | C = D | in(ordered_pair(C,D),A) | in(ordered_pair(D,C),A) | -in(D,relation_field(A)) | -relation(A).  [resolve(667,e,492,h)].
288.47/288.62	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(667,e,493,b)].
288.47/288.62	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,C),A) | D = C | -relation(A).  [resolve(667,e,494,f)].
288.47/288.62	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = C | disjoint(fiber(A,f30(A,C)),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(667,e,495,f)].
290.97/291.19	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = C | in(f30(A,C),C) | -subset(C,relation_field(A)) | -relation(A).  [resolve(667,e,496,f)].
290.97/291.19	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(667,e,497,d)].
290.97/291.19	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -disjoint(fiber(A,B),f29(A)) | -in(B,f29(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(C,D),A) | -in(ordered_pair(D,E),A) | in(ordered_pair(C,E),A) | -relation(A).  [resolve(667,e,498,f)].
290.97/291.19	668 -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(434,d,387,c)].
290.97/291.19	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(668,e,490,c)].
290.97/291.19	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(668,e,491,b)].
290.97/291.19	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(668,e,492,h)].
290.97/291.19	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(668,e,493,b)].
290.97/291.19	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(668,e,494,f)].
290.97/291.19	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(668,e,495,f)].
290.97/291.19	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(668,e,496,f)].
290.97/291.19	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(668,e,497,d)].
293.66/293.84	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(668,e,498,f)].
293.66/293.84	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(668,e,499,d)].
293.66/293.84	669 -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A).  [resolve(434,d,388,c)].
293.66/293.84	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(669,e,490,c)].
293.66/293.84	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(669,e,491,b)].
293.66/293.84	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(669,e,492,h)].
293.66/293.84	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(669,e,493,b)].
293.66/293.84	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(669,e,494,f)].
293.66/293.84	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(669,e,495,f)].
293.66/293.84	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(669,e,496,f)].
293.66/293.84	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(669,e,497,d)].
293.66/293.84	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(669,e,498,f)].
296.57/296.78	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | in(ordered_pair(f40(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(669,e,499,d)].
296.57/296.78	670 -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A).  [resolve(434,d,389,c)].
296.57/296.78	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(670,e,490,c)].
296.57/296.78	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(670,e,491,b)].
296.57/296.78	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(670,e,492,h)].
296.57/296.78	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(670,e,493,b)].
296.57/296.78	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(670,e,494,f)].
296.57/296.78	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(670,e,495,f)].
296.57/296.78	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(670,e,496,f)].
296.57/296.78	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(670,e,497,d)].
296.57/296.78	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(670,e,498,f)].
296.57/296.78	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -in(ordered_pair(f39(A),f41(A)),A) | -relation(A) | is_transitive_in(A,relation_field(A)) | -relation(A).  [resolve(670,e,499,d)].
296.57/296.78	671 -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)).  [resolve(434,d,390,c)].
299.06/299.22	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(671,e,490,c)].
299.06/299.22	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -relation(A) | is_connected_in(A,relation_field(A)).  [resolve(671,e,491,b)].
299.06/299.22	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(B,relation_field(A)) | B = C | in(ordered_pair(B,C),A) | in(ordered_pair(C,B),A) | -in(C,relation_field(A)) | -relation(A).  [resolve(671,e,492,h)].
299.06/299.22	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -relation(A) | is_antisymmetric_in(A,relation_field(A)).  [resolve(671,e,493,b)].
299.06/299.22	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,B),A) | C = B | -relation(A).  [resolve(671,e,494,f)].
299.06/299.22	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | disjoint(fiber(A,f30(A,B)),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(671,e,495,f)].
299.06/299.22	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | empty_set = B | in(f30(A,B),B) | -subset(B,relation_field(A)) | -relation(A).  [resolve(671,e,496,f)].
299.06/299.22	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | is_well_founded_in(A,relation_field(A)) | -relation(A).  [resolve(671,e,497,d)].
299.06/299.22	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | subset(f29(A),relation_field(A)) | -relation(A) | -is_transitive_in(A,relation_field(A)) | -relation(A) | -in(ordered_pair(B,C),A) | -in(ordered_pair(C,D),A) | in(ordered_pair(B,D),A) | -relation(A).  [resolve(671,e,498,f)].
299.06/299.22	672 -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | well_ordering(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A).  [resolve(435,d,387,c)].
299.06/299.22	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_founded_in(A,relation_field(A)) | -relation(A) | in(ordered_pair(f39(A),f40(A)),A) | -relation(A) | well_orders(A,relation_field(A)).  [resolve(672,e,490,c)].
299.06/299.22	Derived: -relation(A) | f97(A) != f96(A) | -relation(A) | -reflexive(A) | -relation(A) | in(ordered_pair(f78(A),f77(A)),A) | -relation(A) | -is_well_foundedCputime limit exceeded (core dumped)
300.07/300.23	EOF