let a, b, c be real positive number ; ( (a + b) + c = 1 implies (1 / a) - 1 = (b + c) / a )
assume
(a + b) + c = 1
; (1 / a) - 1 = (b + c) / a
then (1 / a) - 1 =
((a + (b + c)) / a) - 1
.=
((a / a) + ((b + c) / a)) - 1
by XCMPLX_1:62
.=
(1 + ((b + c) / a)) - 1
by XCMPLX_1:60
;
hence
(1 / a) - 1 = (b + c) / a
; verum