let f be complex-valued Function; abs f = (delneg f) + (delpos f)
reconsider fabs = abs f as dom f -defined complex-valued Function ;
reconsider g = (1 / 2) (#) f as dom f -defined complex-valued Function ;
reconsider h = g - g as empty-yielding dom f -defined total Function ;
(delneg f) + (delpos f) =
(((1 / 2) (#) fabs) + ((1 / 2) (#) f)) + ((1 / 2) (#) (fabs - f))
by RFUNCT_1:16
.=
(((1 / 2) (#) fabs) + ((1 / 2) (#) f)) + (((1 / 2) (#) fabs) - ((1 / 2) (#) f))
by RFUNCT_1:18
.=
((((1 / 2) (#) fabs) + ((1 / 2) (#) f)) + ((1 / 2) (#) fabs)) - ((1 / 2) (#) f)
by RFUNCT_1:23
.=
(((1 / 2) (#) f) + (((1 / 2) (#) fabs) + ((1 / 2) (#) fabs))) - ((1 / 2) (#) f)
by RFUNCT_1:8
.=
(((1 / 2) (#) f) - ((1 / 2) (#) f)) + (((1 / 2) (#) fabs) + ((1 / 2) (#) fabs))
by RFUNCT_1:23
.=
(((1 / 2) (#) f) - ((1 / 2) (#) f)) + (((1 / 2) + (1 / 2)) (#) fabs)
by TOPREALC:2
.=
fabs
;
hence
abs f = (delneg f) + (delpos f)
; verum