let Y be non empty set ; :: thesis: for a, b, c being Element of Funcs (Y,BOOLEAN) holds (a 'imp' b) '&' (b 'imp' c) = ((a 'imp' b) '&' (b 'imp' c)) '&' (a 'imp' c)
let a, b, c be Element of Funcs (Y,BOOLEAN); :: thesis: (a 'imp' b) '&' (b 'imp' c) = ((a 'imp' b) '&' (b 'imp' c)) '&' (a 'imp' c)
consider k3 being Function such that
A1: (a 'imp' b) '&' (b 'imp' c) = k3 and
A2: dom k3 = Y and
rng k3 c= BOOLEAN by FUNCT_2:def 2;
consider k4 being Function such that
A3: ((a 'imp' b) '&' (b 'imp' c)) '&' (a 'imp' c) = k4 and
A4: dom k4 = Y and
rng k4 c= BOOLEAN by FUNCT_2:def 2;
for x being Element of Y holds ((a 'imp' b) '&' (b 'imp' c)) . x = (((a 'imp' b) '&' (b 'imp' c)) '&' (a 'imp' c)) . x
proof
let x be Element of Y; :: thesis: ((a 'imp' b) '&' (b 'imp' c)) . x = (((a 'imp' b) '&' (b 'imp' c)) '&' (a 'imp' c)) . x
A5: (((a 'imp' b) '&' (b 'imp' c)) '&' (a 'imp' c)) . x = (((a 'imp' b) '&' (b 'imp' c)) . x) '&' ((a 'imp' c) . x) by MARGREL1:def 20
.= (((a 'imp' b) . x) '&' ((b 'imp' c) . x)) '&' ((a 'imp' c) . x) by MARGREL1:def 20
.= ((('not' (a . x)) 'or' (b . x)) '&' ((b 'imp' c) . x)) '&' ((a 'imp' c) . x) by BVFUNC_1:def 8
.= ((('not' (a . x)) 'or' (b . x)) '&' (('not' (b . x)) 'or' (c . x))) '&' ((a 'imp' c) . x) by BVFUNC_1:def 8
.= ((('not' (a . x)) 'or' (b . x)) '&' (('not' (b . x)) 'or' (c . x))) '&' (('not' (a . x)) 'or' (c . x)) by BVFUNC_1:def 8
.= (((('not' (a . x)) 'or' (b . x)) '&' (('not' (b . x)) 'or' (c . x))) '&' ('not' (a . x))) 'or' (((('not' (a . x)) 'or' (b . x)) '&' (('not' (b . x)) 'or' (c . x))) '&' (c . x)) by XBOOLEAN:8 ;
A6: (('not' (a . x)) 'or' (b . x)) '&' (('not' (b . x)) 'or' (c . x)) = ((a 'imp' b) . x) '&' (('not' (b . x)) 'or' (c . x)) by BVFUNC_1:def 8
.= ((a 'imp' b) . x) '&' ((b 'imp' c) . x) by BVFUNC_1:def 8
.= ((a 'imp' b) '&' (b 'imp' c)) . x by MARGREL1:def 20 ;
A7: ((a 'imp' b) '&' (b 'imp' c)) . x = ((a 'imp' b) . x) '&' ((b 'imp' c) . x) by MARGREL1:def 20
.= (('not' (a . x)) 'or' (b . x)) '&' ((b 'imp' c) . x) by BVFUNC_1:def 8
.= (('not' (a . x)) 'or' (b . x)) '&' (('not' (b . x)) 'or' (c . x)) by BVFUNC_1:def 8 ;
now
per cases ( ( a . x = TRUE & c . x = TRUE ) or ( a . x = TRUE & c . x = FALSE ) or ( a . x = FALSE & c . x = TRUE ) or ( a . x = FALSE & c . x = FALSE ) ) by XBOOLEAN:def 3;
case ( a . x = TRUE & c . x = TRUE ) ; :: thesis: ((a 'imp' b) '&' (b 'imp' c)) . x = (((a 'imp' b) '&' (b 'imp' c)) '&' (a 'imp' c)) . x
then (((a 'imp' b) '&' (b 'imp' c)) '&' (a 'imp' c)) . x = (((('not' (a . x)) 'or' (b . x)) '&' (('not' (b . x)) 'or' (c . x))) '&' FALSE) 'or' (((('not' (a . x)) 'or' (b . x)) '&' (('not' (b . x)) 'or' (c . x))) '&' TRUE) by A5, MARGREL1:11
.= FALSE 'or' (((('not' (a . x)) 'or' (b . x)) '&' (('not' (b . x)) 'or' (c . x))) '&' TRUE) by MARGREL1:13
.= FALSE 'or' ((('not' (a . x)) 'or' (b . x)) '&' (('not' (b . x)) 'or' (c . x))) by MARGREL1:14
.= ((a 'imp' b) '&' (b 'imp' c)) . x by A6, BINARITH:3 ;
hence ((a 'imp' b) '&' (b 'imp' c)) . x = (((a 'imp' b) '&' (b 'imp' c)) '&' (a 'imp' c)) . x ; :: thesis: verum
end;
case A8: ( a . x = TRUE & c . x = FALSE ) ; :: thesis: ((a 'imp' b) '&' (b 'imp' c)) . x = (((a 'imp' b) '&' (b 'imp' c)) '&' (a 'imp' c)) . x
then A9: ((a 'imp' b) '&' (b 'imp' c)) . x = (FALSE 'or' (b . x)) '&' (('not' (b . x)) 'or' FALSE) by A7, MARGREL1:11
.= (FALSE 'or' (b . x)) '&' ('not' (b . x)) by BINARITH:3
.= (b . x) '&' ('not' (b . x)) by BINARITH:3
.= FALSE by XBOOLEAN:138 ;
(((a 'imp' b) '&' (b 'imp' c)) '&' (a 'imp' c)) . x = (((('not' (a . x)) 'or' (b . x)) '&' (('not' (b . x)) 'or' (c . x))) '&' FALSE) 'or' (((('not' (a . x)) 'or' (b . x)) '&' (('not' (b . x)) 'or' (c . x))) '&' FALSE) by A5, A8, MARGREL1:11
.= FALSE by MARGREL1:13 ;
hence ((a 'imp' b) '&' (b 'imp' c)) . x = (((a 'imp' b) '&' (b 'imp' c)) '&' (a 'imp' c)) . x by A9; :: thesis: verum
end;
case ( a . x = FALSE & c . x = TRUE ) ; :: thesis: ((a 'imp' b) '&' (b 'imp' c)) . x = (((a 'imp' b) '&' (b 'imp' c)) '&' (a 'imp' c)) . x
then (((a 'imp' b) '&' (b 'imp' c)) '&' (a 'imp' c)) . x = (((('not' (a . x)) 'or' (b . x)) '&' (('not' (b . x)) 'or' (c . x))) '&' TRUE) 'or' (((('not' (a . x)) 'or' (b . x)) '&' (('not' (b . x)) 'or' (c . x))) '&' TRUE) by A5, MARGREL1:11
.= ((a 'imp' b) '&' (b 'imp' c)) . x by A6, MARGREL1:14 ;
hence ((a 'imp' b) '&' (b 'imp' c)) . x = (((a 'imp' b) '&' (b 'imp' c)) '&' (a 'imp' c)) . x ; :: thesis: verum
end;
case ( a . x = FALSE & c . x = FALSE ) ; :: thesis: ((a 'imp' b) '&' (b 'imp' c)) . x = (((a 'imp' b) '&' (b 'imp' c)) '&' (a 'imp' c)) . x
then (((a 'imp' b) '&' (b 'imp' c)) '&' (a 'imp' c)) . x = (TRUE '&' ((('not' (a . x)) 'or' (b . x)) '&' (('not' (b . x)) 'or' (c . x)))) 'or' (FALSE '&' ((('not' (a . x)) 'or' (b . x)) '&' (('not' (b . x)) 'or' (c . x)))) by A5, MARGREL1:11
.= ((('not' (a . x)) 'or' (b . x)) '&' (('not' (b . x)) 'or' (c . x))) 'or' (FALSE '&' ((('not' (a . x)) 'or' (b . x)) '&' (('not' (b . x)) 'or' (c . x)))) by MARGREL1:14
.= ((('not' (a . x)) 'or' (b . x)) '&' (('not' (b . x)) 'or' (c . x))) 'or' FALSE by MARGREL1:13
.= ((a 'imp' b) '&' (b 'imp' c)) . x by A6, BINARITH:3 ;
hence ((a 'imp' b) '&' (b 'imp' c)) . x = (((a 'imp' b) '&' (b 'imp' c)) '&' (a 'imp' c)) . x ; :: thesis: verum
end;
end;
end;
hence ((a 'imp' b) '&' (b 'imp' c)) . x = (((a 'imp' b) '&' (b 'imp' c)) '&' (a 'imp' c)) . x ; :: thesis: verum
end;
then for u being set st u in Y holds
k3 . u = k4 . u by A1, A3;
hence (a 'imp' b) '&' (b 'imp' c) = ((a 'imp' b) '&' (b 'imp' c)) '&' (a 'imp' c) by A1, A2, A3, A4, FUNCT_1:2; :: thesis: verum