let C be non empty set ; :: thesis: for c being Element of C
for f1, f2 being PartFunc of C,COMPLEX st f1 is total & f2 ^ is total holds
(f1 / f2) /. c = (f1 /. c) * ((f2 /. c) ")
let c be Element of C; :: thesis: for f1, f2 being PartFunc of C,COMPLEX st f1 is total & f2 ^ is total holds
(f1 / f2) /. c = (f1 /. c) * ((f2 /. c) ")
let f1, f2 be PartFunc of C,COMPLEX; :: thesis: ( f1 is total & f2 ^ is total implies (f1 / f2) /. c = (f1 /. c) * ((f2 /. c) ") )
assume that
A1: f1 is total and
A2: f2 ^ is total ; :: thesis: (f1 / f2) /. c = (f1 /. c) * ((f2 /. c) ")
( f2 " {0c} = {} & f2 is total ) by A2, Th61;
then f1 / f2 is total by A1, Th62;
then dom (f1 / f2) = C ;
hence (f1 / f2) /. c = (f1 /. c) * ((f2 /. c) ") by Def1; :: thesis: verum