let a, b be odd Integer; for m being odd Nat holds 2 |-count ((a |^ m) + (b |^ m)) = 2 |-count (a + b)
let m be odd Nat; 2 |-count ((a |^ m) + (b |^ m)) = 2 |-count (a + b)
reconsider c = - b as odd Integer ;
reconsider n = (m - 1) / 2 as Nat ;
2 |-count ((a |^ m) + ((- c) |^ m)) =
2 |-count ((a |^ ((2 * n) + 1)) + (- (c |^ ((2 * n) + 1))))
by POWER:2
.=
2 |-count ((a |^ ((2 * n) + 1)) - (c |^ ((2 * n) + 1)))
.=
2 |-count (a - (- b))
by Odd
;
hence
2 |-count ((a |^ m) + (b |^ m)) = 2 |-count (a + b)
; verum