let a, b be odd Nat; for m being even Nat holds 2 |-count ((a |^ m) + (b |^ m)) = 1
let m be even Nat; 2 |-count ((a |^ m) + (b |^ m)) = 1
A1: 4 =
2 * 2
.=
2 |^ 2
by NEWTON:81
;
4 divides (a |^ m) - (b |^ m)
by NEWTON02:65;
then A2:
not 2 |^ (1 + 1) divides (a |^ m) + (b |^ m)
by A1, NEWTON02:58;
(a |^ m) + (b |^ m) is even
;
then
2 |^ 1 divides (a |^ m) + (b |^ m)
;
hence
2 |-count ((a |^ m) + (b |^ m)) = 1
by A2, NAT_3:def 7; verum