%------------------------------------------------------------------------------
% File     : Twee---2.4.2
% Problem  : GEO640+1 : TPTP v8.1.2. Released v7.5.0.
% Transfm  : none
% Format   : tptp:raw
% Command  : parallel-twee %s --tstp --conditional-encoding if --smaller --drop-non-horn --give-up-on-saturation --explain-encoding --formal-proof

% Computer : n016.cluster.edu
% Model    : x86_64 x86_64
% CPU      : Intel(R) Xeon(R) CPU E5-2620 v4 2.10GHz
% Memory   : 8042.1875MB
% OS       : Linux 3.10.0-693.el7.x86_64
% CPULimit : 300s
% WCLimit  : 300s
% DateTime : Wed Aug 30 23:29:39 EDT 2023

% Result   : Theorem 246.10s 31.19s
% Output   : Proof 246.42s
% Verified : 
% SZS Type : -

% Comments : 
%------------------------------------------------------------------------------
%----WARNING: Could not form TPTP format derivation
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% 0.02/0.07  % Problem  : GEO640+1 : TPTP v8.1.2. Released v7.5.0.
% 0.02/0.07  % Command  : parallel-twee %s --tstp --conditional-encoding if --smaller --drop-non-horn --give-up-on-saturation --explain-encoding --formal-proof
% 0.07/0.26  % Computer : n016.cluster.edu
% 0.07/0.26  % Model    : x86_64 x86_64
% 0.07/0.26  % CPU      : Intel(R) Xeon(R) CPU E5-2620 v4 @ 2.10GHz
% 0.07/0.26  % Memory   : 8042.1875MB
% 0.07/0.26  % OS       : Linux 3.10.0-693.el7.x86_64
% 0.07/0.26  % CPULimit : 300
% 0.07/0.26  % WCLimit  : 300
% 0.07/0.26  % DateTime : Tue Aug 29 20:13:46 EDT 2023
% 0.07/0.26  % CPUTime  : 
% 246.10/31.19  Command-line arguments: --no-flatten-goal
% 246.10/31.19  
% 246.10/31.19  % SZS status Theorem
% 246.10/31.19  
% 246.10/31.21  % SZS output start Proof
% 246.10/31.21  Take the following subset of the input axioms:
% 246.42/31.22    fof(exemplo6GDDFULL81109106, conjecture, ![Q4, Q1, Q3, Q0, Q2, P0, P1, P2, P3, P4, O0, O4, O3, O2, O1, M0, M4, M3, M2, M1, NWPNT1, NWPNT2, NWPNT3, NWPNT4, NWPNT5, NWPNT6, NWPNT7, NWPNT8, NWPNT9, NWPNT01]: ((coll(P0, Q4, Q1) & (coll(P0, Q0, Q2) & (coll(P1, Q1, Q3) & (coll(P1, Q0, Q2) & (coll(P2, Q1, Q3) & (coll(P2, Q4, Q2) & (coll(P3, Q3, Q0) & (coll(P3, Q4, Q2) & (coll(P4, Q4, Q1) & (coll(P4, Q3, Q0) & (circle(O0, Q0, P0, P4) & (circle(O4, P4, P3, Q4) & (circle(O3, P3, P2, Q3) & (circle(O2, P1, P2, Q2) & (circle(O1, P1, Q1, P0) & (circle(O0, Q0, M0, NWPNT1) & (circle(O1, Q1, M0, NWPNT2) & (circle(O0, Q0, M4, NWPNT3) & (circle(O4, Q4, M4, NWPNT4) & (circle(O4, Q4, M3, NWPNT5) & (circle(O3, Q3, M3, NWPNT6) & (circle(O3, Q3, M2, NWPNT7) & (circle(O2, Q2, M2, NWPNT8) & (circle(O2, Q2, M1, NWPNT9) & circle(O1, Q1, M1, NWPNT01))))))))))))))))))))))))) => cyclic(M4, M3, M2, M1))).
% 246.42/31.22    fof(ruleD1, axiom, ![B, C, A2]: (coll(A2, B, C) => coll(A2, C, B))).
% 246.42/31.22    fof(ruleD14, axiom, ![D, B2, C2, A2_2]: (cyclic(A2_2, B2, C2, D) => cyclic(A2_2, B2, D, C2))).
% 246.42/31.22    fof(ruleD15, axiom, ![B2, C2, A2_2, D2]: (cyclic(A2_2, B2, C2, D2) => cyclic(A2_2, C2, B2, D2))).
% 246.42/31.22    fof(ruleD16, axiom, ![B2, C2, A2_2, D2]: (cyclic(A2_2, B2, C2, D2) => cyclic(B2, A2_2, C2, D2))).
% 246.42/31.22    fof(ruleD17, axiom, ![E, B2, C2, A2_2, D2]: ((cyclic(A2_2, B2, C2, D2) & cyclic(A2_2, B2, C2, E)) => cyclic(B2, C2, D2, E))).
% 246.42/31.22    fof(ruleD19, axiom, ![P, Q, U, V, B2, C2, A2_2, D2]: (eqangle(A2_2, B2, C2, D2, P, Q, U, V) => eqangle(C2, D2, A2_2, B2, U, V, P, Q))).
% 246.42/31.22    fof(ruleD2, axiom, ![B2, C2, A2_2]: (coll(A2_2, B2, C2) => coll(B2, A2_2, C2))).
% 246.42/31.22    fof(ruleD39, axiom, ![P5, B2, C2, A2_2, D2, Q5]: (eqangle(A2_2, B2, P5, Q5, C2, D2, P5, Q5) => para(A2_2, B2, C2, D2))).
% 246.42/31.22    fof(ruleD40, axiom, ![P5, B2, C2, A2_2, D2, Q5]: (para(A2_2, B2, C2, D2) => eqangle(A2_2, B2, P5, Q5, C2, D2, P5, Q5))).
% 246.42/31.22    fof(ruleD42b, axiom, ![P5, B2, A2_2, Q5]: ((eqangle(P5, A2_2, P5, B2, Q5, A2_2, Q5, B2) & coll(P5, Q5, B2)) => cyclic(A2_2, B2, P5, Q5))).
% 246.42/31.22    fof(ruleD66, axiom, ![B2, C2, A2_2]: (para(A2_2, B2, A2_2, C2) => coll(A2_2, B2, C2))).
% 246.42/31.22    fof(ruleD8, axiom, ![B2, C2, A2_2, D2]: (perp(A2_2, B2, C2, D2) => perp(C2, D2, A2_2, B2))).
% 246.42/31.22    fof(ruleD9, axiom, ![F, B2, C2, A2_2, D2, E2]: ((perp(A2_2, B2, C2, D2) & perp(C2, D2, E2, F)) => para(A2_2, B2, E2, F))).
% 246.42/31.22    fof(ruleX11, axiom, ![O, B2, C2, A2_2]: ?[P5]: (circle(O, A2_2, B2, C2) => perp(P5, A2_2, A2_2, O))).
% 246.42/31.22  
% 246.42/31.22  Now clausify the problem and encode Horn clauses using encoding 3 of
% 246.42/31.22  http://www.cse.chalmers.se/~nicsma/papers/horn.pdf.
% 246.42/31.22  We repeatedly replace C & s=t => u=v by the two clauses:
% 246.42/31.22    fresh(y, y, x1...xn) = u
% 246.42/31.22    C => fresh(s, t, x1...xn) = v
% 246.42/31.22  where fresh is a fresh function symbol and x1..xn are the free
% 246.42/31.22  variables of u and v.
% 246.42/31.22  A predicate p(X) is encoded as p(X)=true (this is sound, because the
% 246.42/31.22  input problem has no model of domain size 1).
% 246.42/31.22  
% 246.42/31.22  The encoding turns the above axioms into the following unit equations and goals:
% 246.42/31.22  
% 246.42/31.22  Axiom 1 (ruleX11): fresh39(X, X, Y, Z) = true.
% 246.42/31.22  Axiom 2 (exemplo6GDDFULL81109106_10): circle(o4, p4, p3, q4) = true.
% 246.42/31.22  Axiom 3 (ruleD1): fresh146(X, X, Y, Z, W) = true.
% 246.42/31.22  Axiom 4 (ruleD2): fresh133(X, X, Y, Z, W) = true.
% 246.42/31.22  Axiom 5 (ruleD66): fresh66(X, X, Y, Z, W) = true.
% 246.42/31.22  Axiom 6 (ruleD14): fresh140(X, X, Y, Z, W, V) = true.
% 246.42/31.22  Axiom 7 (ruleD15): fresh139(X, X, Y, Z, W, V) = true.
% 246.42/31.22  Axiom 8 (ruleD16): fresh138(X, X, Y, Z, W, V) = true.
% 246.42/31.22  Axiom 9 (ruleD17): fresh136(X, X, Y, Z, W, V) = true.
% 246.42/31.22  Axiom 10 (ruleD39): fresh106(X, X, Y, Z, W, V) = true.
% 246.42/31.22  Axiom 11 (ruleD42b): fresh102(X, X, Y, Z, W, V) = cyclic(Y, Z, W, V).
% 246.42/31.22  Axiom 12 (ruleD42b): fresh101(X, X, Y, Z, W, V) = true.
% 246.42/31.22  Axiom 13 (ruleD8): fresh52(X, X, Y, Z, W, V) = true.
% 246.42/31.22  Axiom 14 (ruleD9): fresh50(X, X, Y, Z, W, V) = true.
% 246.42/31.22  Axiom 15 (ruleD17): fresh137(X, X, Y, Z, W, V, U) = cyclic(Z, W, V, U).
% 246.42/31.22  Axiom 16 (ruleD1): fresh146(coll(X, Y, Z), true, X, Y, Z) = coll(X, Z, Y).
% 246.42/31.22  Axiom 17 (ruleD2): fresh133(coll(X, Y, Z), true, X, Y, Z) = coll(Y, X, Z).
% 246.42/31.22  Axiom 18 (ruleD40): fresh104(X, X, Y, Z, W, V, U, T) = true.
% 246.42/31.22  Axiom 19 (ruleD9): fresh51(X, X, Y, Z, W, V, U, T) = para(Y, Z, U, T).
% 246.42/31.22  Axiom 20 (ruleX11): fresh39(circle(X, Y, Z, W), true, Y, X) = perp(p6(Y, X), Y, Y, X).
% 246.42/31.22  Axiom 21 (ruleD66): fresh66(para(X, Y, X, Z), true, X, Y, Z) = coll(X, Y, Z).
% 246.42/31.22  Axiom 22 (ruleD14): fresh140(cyclic(X, Y, Z, W), true, X, Y, Z, W) = cyclic(X, Y, W, Z).
% 246.42/31.22  Axiom 23 (ruleD15): fresh139(cyclic(X, Y, Z, W), true, X, Y, Z, W) = cyclic(X, Z, Y, W).
% 246.42/31.22  Axiom 24 (ruleD16): fresh138(cyclic(X, Y, Z, W), true, X, Y, Z, W) = cyclic(Y, X, Z, W).
% 246.42/31.22  Axiom 25 (ruleD19): fresh134(X, X, Y, Z, W, V, U, T, S, X2) = true.
% 246.42/31.22  Axiom 26 (ruleD8): fresh52(perp(X, Y, Z, W), true, X, Y, Z, W) = perp(Z, W, X, Y).
% 246.42/31.22  Axiom 27 (ruleD17): fresh137(cyclic(X, Y, Z, W), true, X, Y, Z, V, W) = fresh136(cyclic(X, Y, Z, V), true, Y, Z, V, W).
% 246.42/31.22  Axiom 28 (ruleD40): fresh104(para(X, Y, Z, W), true, X, Y, Z, W, V, U) = eqangle(X, Y, V, U, Z, W, V, U).
% 246.42/31.22  Axiom 29 (ruleD9): fresh51(perp(X, Y, Z, W), true, V, U, X, Y, Z, W) = fresh50(perp(V, U, X, Y), true, V, U, Z, W).
% 246.42/31.22  Axiom 30 (ruleD39): fresh106(eqangle(X, Y, Z, W, V, U, Z, W), true, X, Y, V, U) = para(X, Y, V, U).
% 246.42/31.22  Axiom 31 (ruleD42b): fresh102(eqangle(X, Y, X, Z, W, Y, W, Z), true, Y, Z, X, W) = fresh101(coll(X, W, Z), true, Y, Z, X, W).
% 246.42/31.22  Axiom 32 (ruleD19): fresh134(eqangle(X, Y, Z, W, V, U, T, S), true, X, Y, Z, W, V, U, T, S) = eqangle(Z, W, X, Y, T, S, V, U).
% 246.42/31.22  
% 246.42/31.22  Lemma 33: perp(p6(p4, o4), p4, p4, o4) = true.
% 246.42/31.22  Proof:
% 246.42/31.22    perp(p6(p4, o4), p4, p4, o4)
% 246.42/31.22  = { by axiom 20 (ruleX11) R->L }
% 246.42/31.22    fresh39(circle(o4, p4, p3, q4), true, p4, o4)
% 246.42/31.22  = { by axiom 2 (exemplo6GDDFULL81109106_10) }
% 246.42/31.22    fresh39(true, true, p4, o4)
% 246.42/31.22  = { by axiom 1 (ruleX11) }
% 246.42/31.22    true
% 246.42/31.22  
% 246.42/31.22  Lemma 34: para(X, Y, X, Y) = true.
% 246.42/31.22  Proof:
% 246.42/31.22    para(X, Y, X, Y)
% 246.42/31.22  = { by axiom 30 (ruleD39) R->L }
% 246.42/31.22    fresh106(eqangle(X, Y, p4, o4, X, Y, p4, o4), true, X, Y, X, Y)
% 246.42/31.22  = { by axiom 32 (ruleD19) R->L }
% 246.42/31.22    fresh106(fresh134(eqangle(p4, o4, X, Y, p4, o4, X, Y), true, p4, o4, X, Y, p4, o4, X, Y), true, X, Y, X, Y)
% 246.42/31.22  = { by axiom 28 (ruleD40) R->L }
% 246.42/31.22    fresh106(fresh134(fresh104(para(p4, o4, p4, o4), true, p4, o4, p4, o4, X, Y), true, p4, o4, X, Y, p4, o4, X, Y), true, X, Y, X, Y)
% 246.42/31.22  = { by axiom 19 (ruleD9) R->L }
% 246.42/31.22    fresh106(fresh134(fresh104(fresh51(true, true, p4, o4, p6(p4, o4), p4, p4, o4), true, p4, o4, p4, o4, X, Y), true, p4, o4, X, Y, p4, o4, X, Y), true, X, Y, X, Y)
% 246.42/31.22  = { by lemma 33 R->L }
% 246.42/31.22    fresh106(fresh134(fresh104(fresh51(perp(p6(p4, o4), p4, p4, o4), true, p4, o4, p6(p4, o4), p4, p4, o4), true, p4, o4, p4, o4, X, Y), true, p4, o4, X, Y, p4, o4, X, Y), true, X, Y, X, Y)
% 246.42/31.22  = { by axiom 29 (ruleD9) }
% 246.42/31.22    fresh106(fresh134(fresh104(fresh50(perp(p4, o4, p6(p4, o4), p4), true, p4, o4, p4, o4), true, p4, o4, p4, o4, X, Y), true, p4, o4, X, Y, p4, o4, X, Y), true, X, Y, X, Y)
% 246.42/31.22  = { by axiom 26 (ruleD8) R->L }
% 246.42/31.22    fresh106(fresh134(fresh104(fresh50(fresh52(perp(p6(p4, o4), p4, p4, o4), true, p6(p4, o4), p4, p4, o4), true, p4, o4, p4, o4), true, p4, o4, p4, o4, X, Y), true, p4, o4, X, Y, p4, o4, X, Y), true, X, Y, X, Y)
% 246.42/31.22  = { by lemma 33 }
% 246.42/31.22    fresh106(fresh134(fresh104(fresh50(fresh52(true, true, p6(p4, o4), p4, p4, o4), true, p4, o4, p4, o4), true, p4, o4, p4, o4, X, Y), true, p4, o4, X, Y, p4, o4, X, Y), true, X, Y, X, Y)
% 246.42/31.22  = { by axiom 13 (ruleD8) }
% 246.42/31.22    fresh106(fresh134(fresh104(fresh50(true, true, p4, o4, p4, o4), true, p4, o4, p4, o4, X, Y), true, p4, o4, X, Y, p4, o4, X, Y), true, X, Y, X, Y)
% 246.42/31.22  = { by axiom 14 (ruleD9) }
% 246.42/31.22    fresh106(fresh134(fresh104(true, true, p4, o4, p4, o4, X, Y), true, p4, o4, X, Y, p4, o4, X, Y), true, X, Y, X, Y)
% 246.42/31.22  = { by axiom 18 (ruleD40) }
% 246.42/31.22    fresh106(fresh134(true, true, p4, o4, X, Y, p4, o4, X, Y), true, X, Y, X, Y)
% 246.42/31.22  = { by axiom 25 (ruleD19) }
% 246.42/31.22    fresh106(true, true, X, Y, X, Y)
% 246.42/31.22  = { by axiom 10 (ruleD39) }
% 246.42/31.22    true
% 246.42/31.22  
% 246.42/31.22  Lemma 35: cyclic(X, Y, X, Z) = true.
% 246.42/31.22  Proof:
% 246.42/31.22    cyclic(X, Y, X, Z)
% 246.42/31.22  = { by axiom 24 (ruleD16) R->L }
% 246.42/31.22    fresh138(cyclic(Y, X, X, Z), true, Y, X, X, Z)
% 246.42/31.22  = { by axiom 22 (ruleD14) R->L }
% 246.42/31.22    fresh138(fresh140(cyclic(Y, X, Z, X), true, Y, X, Z, X), true, Y, X, X, Z)
% 246.42/31.22  = { by axiom 23 (ruleD15) R->L }
% 246.42/31.22    fresh138(fresh140(fresh139(cyclic(Y, Z, X, X), true, Y, Z, X, X), true, Y, X, Z, X), true, Y, X, X, Z)
% 246.42/31.22  = { by axiom 11 (ruleD42b) R->L }
% 246.42/31.22    fresh138(fresh140(fresh139(fresh102(true, true, Y, Z, X, X), true, Y, Z, X, X), true, Y, X, Z, X), true, Y, X, X, Z)
% 246.42/31.22  = { by axiom 18 (ruleD40) R->L }
% 246.42/31.22    fresh138(fresh140(fresh139(fresh102(fresh104(true, true, X, Y, X, Y, X, Z), true, Y, Z, X, X), true, Y, Z, X, X), true, Y, X, Z, X), true, Y, X, X, Z)
% 246.42/31.22  = { by lemma 34 R->L }
% 246.42/31.22    fresh138(fresh140(fresh139(fresh102(fresh104(para(X, Y, X, Y), true, X, Y, X, Y, X, Z), true, Y, Z, X, X), true, Y, Z, X, X), true, Y, X, Z, X), true, Y, X, X, Z)
% 246.42/31.22  = { by axiom 28 (ruleD40) }
% 246.42/31.22    fresh138(fresh140(fresh139(fresh102(eqangle(X, Y, X, Z, X, Y, X, Z), true, Y, Z, X, X), true, Y, Z, X, X), true, Y, X, Z, X), true, Y, X, X, Z)
% 246.42/31.22  = { by axiom 31 (ruleD42b) }
% 246.42/31.22    fresh138(fresh140(fresh139(fresh101(coll(X, X, Z), true, Y, Z, X, X), true, Y, Z, X, X), true, Y, X, Z, X), true, Y, X, X, Z)
% 246.42/31.22  = { by axiom 16 (ruleD1) R->L }
% 246.42/31.22    fresh138(fresh140(fresh139(fresh101(fresh146(coll(X, Z, X), true, X, Z, X), true, Y, Z, X, X), true, Y, Z, X, X), true, Y, X, Z, X), true, Y, X, X, Z)
% 246.42/31.22  = { by axiom 17 (ruleD2) R->L }
% 246.42/31.22    fresh138(fresh140(fresh139(fresh101(fresh146(fresh133(coll(Z, X, X), true, Z, X, X), true, X, Z, X), true, Y, Z, X, X), true, Y, Z, X, X), true, Y, X, Z, X), true, Y, X, X, Z)
% 246.42/31.22  = { by axiom 21 (ruleD66) R->L }
% 246.42/31.22    fresh138(fresh140(fresh139(fresh101(fresh146(fresh133(fresh66(para(Z, X, Z, X), true, Z, X, X), true, Z, X, X), true, X, Z, X), true, Y, Z, X, X), true, Y, Z, X, X), true, Y, X, Z, X), true, Y, X, X, Z)
% 246.42/31.22  = { by lemma 34 }
% 246.42/31.22    fresh138(fresh140(fresh139(fresh101(fresh146(fresh133(fresh66(true, true, Z, X, X), true, Z, X, X), true, X, Z, X), true, Y, Z, X, X), true, Y, Z, X, X), true, Y, X, Z, X), true, Y, X, X, Z)
% 246.42/31.22  = { by axiom 5 (ruleD66) }
% 246.42/31.22    fresh138(fresh140(fresh139(fresh101(fresh146(fresh133(true, true, Z, X, X), true, X, Z, X), true, Y, Z, X, X), true, Y, Z, X, X), true, Y, X, Z, X), true, Y, X, X, Z)
% 246.42/31.22  = { by axiom 4 (ruleD2) }
% 246.42/31.22    fresh138(fresh140(fresh139(fresh101(fresh146(true, true, X, Z, X), true, Y, Z, X, X), true, Y, Z, X, X), true, Y, X, Z, X), true, Y, X, X, Z)
% 246.42/31.22  = { by axiom 3 (ruleD1) }
% 246.42/31.22    fresh138(fresh140(fresh139(fresh101(true, true, Y, Z, X, X), true, Y, Z, X, X), true, Y, X, Z, X), true, Y, X, X, Z)
% 246.42/31.22  = { by axiom 12 (ruleD42b) }
% 246.42/31.22    fresh138(fresh140(fresh139(true, true, Y, Z, X, X), true, Y, X, Z, X), true, Y, X, X, Z)
% 246.42/31.22  = { by axiom 7 (ruleD15) }
% 246.42/31.22    fresh138(fresh140(true, true, Y, X, Z, X), true, Y, X, X, Z)
% 246.42/31.22  = { by axiom 6 (ruleD14) }
% 246.42/31.22    fresh138(true, true, Y, X, X, Z)
% 246.42/31.22  = { by axiom 8 (ruleD16) }
% 246.42/31.22    true
% 246.42/31.22  
% 246.42/31.22  Goal 1 (exemplo6GDDFULL81109106_25): cyclic(m4, m3, m2, m1) = true.
% 246.42/31.22  Proof:
% 246.42/31.22    cyclic(m4, m3, m2, m1)
% 246.42/31.22  = { by axiom 15 (ruleD17) R->L }
% 246.42/31.22    fresh137(true, true, m3, m4, m3, m2, m1)
% 246.42/31.22  = { by lemma 35 R->L }
% 246.42/31.22    fresh137(cyclic(m3, m4, m3, m1), true, m3, m4, m3, m2, m1)
% 246.42/31.22  = { by axiom 27 (ruleD17) }
% 246.42/31.22    fresh136(cyclic(m3, m4, m3, m2), true, m4, m3, m2, m1)
% 246.42/31.22  = { by lemma 35 }
% 246.42/31.22    fresh136(true, true, m4, m3, m2, m1)
% 246.42/31.22  = { by axiom 9 (ruleD17) }
% 246.42/31.22    true
% 246.42/31.22  % SZS output end Proof
% 246.42/31.22  
% 246.42/31.22  RESULT: Theorem (the conjecture is true).
%------------------------------------------------------------------------------