TPTP Problem File: SYO885^1.330.100.p
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%------------------------------------------------------------------------------
% File : SYO885^1.330.100 : TPTP v9.0.0. Released v7.5.0.
% Domain : Syntactic
% Problem : Test higher-order unification procedure, 10,30,100
% Version : Biased.
% English :
% Refs : [VBN20] Vukmirovic et al. (2020), Efficient Full Higher-order
% : [Ben21] Bentkamp (2021) Email to Geoff Sutcliffe
% Source : [Ben21]
% Names : solid.3.30.100.p [Ben21]
% Status : Theorem
% Rating : 0.62 v9.0.0, 0.80 v8.2.0, 0.92 v8.1.0, 0.91 v7.5.0
% Syntax : Number of formulae : 32 ( 0 unt; 31 typ; 0 def)
% Number of atoms : 100 ( 100 equ; 0 cnn)
% Maximal formula atoms : 100 ( 100 avg)
% Number of connectives : 3399 ( 0 ~; 0 |; 99 &;3300 @)
% ( 0 <=>; 0 =>; 0 <=; 0 <~>)
% Maximal formula depth : 101 ( 101 avg)
% Number of types : 1 ( 0 usr)
% Number of type conns : 33 ( 33 >; 0 *; 0 +; 0 <<)
% Number of symbols : 32 ( 31 usr; 30 con; 0-30 aty)
% Number of variables : 1 ( 0 ^; 0 !; 1 ?; 1 :)
% SPC : TH0_THM_EQU_NAR
% Comments : Possible solution: F -> ^[X0 : $i,X1 : $i,X2 : $i]: f @ b12 @
% b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @
% b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ X1 @ a0 @ b11 @ a2 @ b8 @
% b18 @ b26 @ b24 @ b14 @ b23
% : Biased because it was desiged for testing features in
% Zipperposition.
%------------------------------------------------------------------------------
thf(a0_type,type,
a0: $i ).
thf(a1_type,type,
a1: $i ).
thf(a2_type,type,
a2: $i ).
thf(b12_type,type,
b12: $i ).
thf(b22_type,type,
b22: $i ).
thf(b5_type,type,
b5: $i ).
thf(b9_type,type,
b9: $i ).
thf(b13_type,type,
b13: $i ).
thf(b25_type,type,
b25: $i ).
thf(b0_type,type,
b0: $i ).
thf(b16_type,type,
b16: $i ).
thf(b19_type,type,
b19: $i ).
thf(b1_type,type,
b1: $i ).
thf(b2_type,type,
b2: $i ).
thf(b15_type,type,
b15: $i ).
thf(b7_type,type,
b7: $i ).
thf(b21_type,type,
b21: $i ).
thf(b10_type,type,
b10: $i ).
thf(b3_type,type,
b3: $i ).
thf(b6_type,type,
b6: $i ).
thf(b4_type,type,
b4: $i ).
thf(b20_type,type,
b20: $i ).
thf(b17_type,type,
b17: $i ).
thf(b11_type,type,
b11: $i ).
thf(b8_type,type,
b8: $i ).
thf(b18_type,type,
b18: $i ).
thf(b26_type,type,
b26: $i ).
thf(b24_type,type,
b24: $i ).
thf(b14_type,type,
b14: $i ).
thf(b23_type,type,
b23: $i ).
thf(f_type,type,
f: $i > $i > $i > $i > $i > $i > $i > $i > $i > $i > $i > $i > $i > $i > $i > $i > $i > $i > $i > $i > $i > $i > $i > $i > $i > $i > $i > $i > $i > $i > $i ).
thf(goal,conjecture,
? [F: $i > $i > $i > $i] :
( ( ( F @ a1 @ a2 @ a0 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a2 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a1 @ a0 @ a2 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a0 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a1 @ a2 @ a0 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a2 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a1 @ a2 @ a0 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a2 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a1 @ a0 @ a2 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a0 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a2 @ a1 @ a0 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a1 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a2 @ a1 @ a0 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a1 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a1 @ a0 @ a2 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a0 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a1 @ a0 @ a2 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a0 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a2 @ a1 @ a0 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a1 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a0 @ a2 @ a1 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a2 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a2 @ a0 @ a1 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a0 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a1 @ a0 @ a2 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a0 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a2 @ a1 @ a0 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a1 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a2 @ a0 @ a1 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a0 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a1 @ a2 @ a0 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a2 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a0 @ a1 @ a2 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a1 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a2 @ a0 @ a1 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a0 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a0 @ a1 @ a2 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a1 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a2 @ a0 @ a1 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a0 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a2 @ a1 @ a0 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a1 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a2 @ a1 @ a0 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a1 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a2 @ a1 @ a0 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a1 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a0 @ a1 @ a2 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a1 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a2 @ a0 @ a1 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a0 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a0 @ a1 @ a2 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a1 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a1 @ a2 @ a0 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a2 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a1 @ a0 @ a2 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a0 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a2 @ a0 @ a1 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a0 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a2 @ a1 @ a0 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a1 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a1 @ a0 @ a2 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a0 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a2 @ a1 @ a0 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a1 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a1 @ a2 @ a0 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a2 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a1 @ a2 @ a0 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a2 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a1 @ a2 @ a0 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a2 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a0 @ a2 @ a1 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a2 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a1 @ a2 @ a0 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a2 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a2 @ a1 @ a0 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a1 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a0 @ a1 @ a2 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a1 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a1 @ a0 @ a2 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a0 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a2 @ a0 @ a1 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a0 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a2 @ a1 @ a0 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a1 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a0 @ a1 @ a2 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a1 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a2 @ a0 @ a1 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a0 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a2 @ a0 @ a1 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a0 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a0 @ a1 @ a2 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a1 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a0 @ a1 @ a2 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a1 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a1 @ a2 @ a0 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a2 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a1 @ a2 @ a0 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a2 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a0 @ a1 @ a2 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a1 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a0 @ a1 @ a2 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a1 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a0 @ a1 @ a2 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a1 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a1 @ a2 @ a0 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a2 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a0 @ a2 @ a1 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a2 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a0 @ a1 @ a2 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a1 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a1 @ a0 @ a2 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a0 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a0 @ a1 @ a2 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a1 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a1 @ a0 @ a2 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a0 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a2 @ a1 @ a0 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a1 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a1 @ a0 @ a2 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a0 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a1 @ a2 @ a0 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a2 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a0 @ a1 @ a2 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a1 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a2 @ a1 @ a0 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a1 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a2 @ a0 @ a1 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a0 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a0 @ a1 @ a2 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a1 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a2 @ a1 @ a0 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a1 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a1 @ a0 @ a2 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a0 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a0 @ a2 @ a1 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a2 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a1 @ a2 @ a0 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a2 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a0 @ a1 @ a2 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a1 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a0 @ a1 @ a2 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a1 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a1 @ a2 @ a0 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a2 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a2 @ a0 @ a1 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a0 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a2 @ a1 @ a0 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a1 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a1 @ a2 @ a0 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a2 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a1 @ a0 @ a2 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a0 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a0 @ a1 @ a2 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a1 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a2 @ a0 @ a1 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a0 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a2 @ a1 @ a0 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a1 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a0 @ a2 @ a1 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a2 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a1 @ a0 @ a2 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a0 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a0 @ a1 @ a2 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a1 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a0 @ a2 @ a1 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a2 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a2 @ a1 @ a0 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a1 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a2 @ a0 @ a1 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a0 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a2 @ a1 @ a0 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a1 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a1 @ a0 @ a2 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a0 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a0 @ a2 @ a1 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a2 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a1 @ a2 @ a0 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a2 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a2 @ a0 @ a1 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a0 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a0 @ a1 @ a2 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a1 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a2 @ a1 @ a0 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a1 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a0 @ a1 @ a2 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a1 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a1 @ a0 @ a2 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a0 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a0 @ a2 @ a1 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a2 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a2 @ a0 @ a1 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a0 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a0 @ a1 @ a2 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a1 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a1 @ a2 @ a0 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a2 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a0 @ a2 @ a1 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a2 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) )
& ( ( F @ a1 @ a2 @ a0 )
= ( f @ b12 @ b22 @ b5 @ b9 @ b13 @ b25 @ b0 @ b16 @ b19 @ b1 @ b2 @ b15 @ b7 @ b21 @ b10 @ b3 @ b6 @ b4 @ b20 @ b17 @ a2 @ a0 @ b11 @ a2 @ b8 @ b18 @ b26 @ b24 @ b14 @ b23 ) ) ) ).
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