let m, n be Nat; for a1, b1 being Complex holds ((((a1 |^ m) + (b1 |^ m)) * ((a1 |^ n) - (b1 |^ n))) + (((a1 |^ n) + (b1 |^ n)) * ((a1 |^ m) - (b1 |^ m)))) / 2 = (a1 |^ (m + n)) - (b1 |^ (m + n))
let a1, b1 be Complex; ((((a1 |^ m) + (b1 |^ m)) * ((a1 |^ n) - (b1 |^ n))) + (((a1 |^ n) + (b1 |^ n)) * ((a1 |^ m) - (b1 |^ m)))) / 2 = (a1 |^ (m + n)) - (b1 |^ (m + n))
((((a1 |^ m) + (b1 |^ m)) * ((a1 |^ n) - (b1 |^ n))) + (((a1 |^ n) + (b1 |^ n)) * ((a1 |^ m) - (b1 |^ m)))) / 2 =
(((((a1 |^ m) * (a1 |^ n)) - ((b1 |^ m) * (b1 |^ n))) + ((a1 |^ n) * (a1 |^ m))) - ((b1 |^ n) * (b1 |^ m))) / 2
.=
((((a1 |^ (m + n)) - ((b1 |^ m) * (b1 |^ n))) + ((a1 |^ n) * (a1 |^ m))) - ((b1 |^ n) * (b1 |^ m))) / 2
by NEWTON:8
.=
((((a1 |^ (m + n)) - (b1 |^ (m + n))) + ((a1 |^ n) * (a1 |^ m))) - ((b1 |^ n) * (b1 |^ m))) / 2
by NEWTON:8
.=
((((a1 |^ (m + n)) - (b1 |^ (m + n))) + (a1 |^ (m + n))) - ((b1 |^ n) * (b1 |^ m))) / 2
by NEWTON:8
.=
((((a1 |^ (m + n)) - (b1 |^ (m + n))) + (a1 |^ (n + m))) - (b1 |^ (n + m))) / 2
by NEWTON:8
.=
(a1 |^ (m + n)) - (b1 |^ (m + n))
;
hence
((((a1 |^ m) + (b1 |^ m)) * ((a1 |^ n) - (b1 |^ n))) + (((a1 |^ n) + (b1 |^ n)) * ((a1 |^ m) - (b1 |^ m)))) / 2 = (a1 |^ (m + n)) - (b1 |^ (m + n))
; verum