let f be Function; for a, b, c, d being set st a <> b holds
( (f +* (a,b --> c,d)) . a = c & (f +* (a,b --> c,d)) . b = d )
let a, b, c, d be set ; ( a <> b implies ( (f +* (a,b --> c,d)) . a = c & (f +* (a,b --> c,d)) . b = d ) )
assume A1:
a <> b
; ( (f +* (a,b --> c,d)) . a = c & (f +* (a,b --> c,d)) . b = d )
set g = a,b --> c,d;
A2:
dom (a,b --> c,d) = {a,b}
by Th65;
then
a in dom (a,b --> c,d)
by TARSKI:def 2;
hence (f +* (a,b --> c,d)) . a =
(a,b --> c,d) . a
by Th14
.=
c
by A1, Th66
;
(f +* (a,b --> c,d)) . b = d
b in dom (a,b --> c,d)
by A2, TARSKI:def 2;
hence (f +* (a,b --> c,d)) . b =
(a,b --> c,d) . b
by Th14
.=
d
by Th66
;
verum