let r be real-valued Function; for b1 being complex-valued Function st dom r = dom b1 & ( for c being object st c in dom r holds
r . c = |.(b1 . c).| ) holds
( dom r = dom r & ( for c being object st c in dom r holds
r . c = |.(r . c).| ) )
let h be complex-valued Function; ( dom r = dom h & ( for c being object st c in dom r holds
r . c = |.(h . c).| ) implies ( dom r = dom r & ( for c being object st c in dom r holds
r . c = |.(r . c).| ) ) )
assume that
dom r = dom h
and
A7:
for c being object st c in dom r holds
r . c = |.(h . c).|
; ( dom r = dom r & ( for c being object st c in dom r holds
r . c = |.(r . c).| ) )
thus
dom r = dom r
; for c being object st c in dom r holds
r . c = |.(r . c).|
let c be object ; ( c in dom r implies r . c = |.(r . c).| )
assume A8:
c in dom r
; r . c = |.(r . c).|
hence r . c =
|.|.(h . c).|.|
by A7
.=
|.(r . c).|
by A7, A8
;
verum