let A be non empty set ; :: thesis: for f being Element of Funcs A,COMPLEX
for a, b being Complex holds (ComplexFuncAdd A) . ((ComplexFuncExtMult A) . [a,f]),((ComplexFuncExtMult A) . [b,f]) = (ComplexFuncExtMult A) . [(a + b),f]
let f be Element of Funcs A,COMPLEX ; :: thesis: for a, b being Complex holds (ComplexFuncAdd A) . ((ComplexFuncExtMult A) . [a,f]),((ComplexFuncExtMult A) . [b,f]) = (ComplexFuncExtMult A) . [(a + b),f]
let a, b be Complex; :: thesis: (ComplexFuncAdd A) . ((ComplexFuncExtMult A) . [a,f]),((ComplexFuncExtMult A) . [b,f]) = (ComplexFuncExtMult A) . [(a + b),f]
now let x be
Element of
A;
:: thesis: ((ComplexFuncAdd A) . ((ComplexFuncExtMult A) . [a,f]),((ComplexFuncExtMult A) . [b,f])) . x = ((ComplexFuncExtMult A) . [(a + b),f]) . xthus ((ComplexFuncAdd A) . ((ComplexFuncExtMult A) . [a,f]),((ComplexFuncExtMult A) . [b,f])) . x =
(((ComplexFuncExtMult A) . [a,f]) . x) + (((ComplexFuncExtMult A) . [b,f]) . x)
by Th1
.=
(a * (f . x)) + (((ComplexFuncExtMult A) . [b,f]) . x)
by Th6
.=
(a * (f . x)) + (b * (f . x))
by Th6
.=
(a + b) * (f . x)
.=
((ComplexFuncExtMult A) . [(a + b),f]) . x
by Th6
;
:: thesis: verum end;
hence
(ComplexFuncAdd A) . ((ComplexFuncExtMult A) . [a,f]),((ComplexFuncExtMult A) . [b,f]) = (ComplexFuncExtMult A) . [(a + b),f]
by FUNCT_2:113; :: thesis: verum