let m be non zero even Nat; for a, b being odd Nat st a <> b holds
2 |-count ((a |^ (2 * m)) - (b |^ (2 * m))) = (2 |-count ((a |^ m) - (b |^ m))) + 1
let a, b be odd Nat; ( a <> b implies 2 |-count ((a |^ (2 * m)) - (b |^ (2 * m))) = (2 |-count ((a |^ m) - (b |^ m))) + 1 )
assume A0:
a <> b
; 2 |-count ((a |^ (2 * m)) - (b |^ (2 * m))) = (2 |-count ((a |^ m) - (b |^ m))) + 1
reconsider c = (a |^ m) + (b |^ m) as non zero Nat ;
reconsider d = (a |^ m) - (b |^ m) as non zero Integer by A0, POW1;
( a |^ (2 * m) = (a |^ m) |^ 2 & b |^ (2 * m) = (b |^ m) |^ 2 )
by NEWTON:9;
then
(a |^ (2 * m)) - (b |^ (2 * m)) = ((a |^ m) - (b |^ m)) * ((a |^ m) + (b |^ m))
by NEWTON01:1;
then 2 |-count ((a |^ (2 * m)) - (b |^ (2 * m))) =
(2 |-count c) + (2 |-count d)
by NAT328, INT_2:28
.=
(2 |-count ((a |^ m) - (b |^ m))) + 1
by SC1
;
hence
2 |-count ((a |^ (2 * m)) - (b |^ (2 * m))) = (2 |-count ((a |^ m) - (b |^ m))) + 1
; verum