let a, b, n be Nat; ( n > 0 & a <> b implies (2 * (a |^ n)) * (b |^ n) < (a |^ (2 * n)) + (b |^ (2 * n)) )
A0:
( (a |^ n) |^ 2 = a |^ (2 * n) & (b |^ n) |^ 2 = b |^ (2 * n) )
by NEWTON:9;
assume
( n > 0 & a <> b )
; (2 * (a |^ n)) * (b |^ n) < (a |^ (2 * n)) + (b |^ (2 * n))
then
( n >= 1 & ( a > b or b > a ) )
by NAT_1:14, XXREAL_0:1;
then
a |^ n <> b |^ n
by PREPOWER:10;
hence
(2 * (a |^ n)) * (b |^ n) < (a |^ (2 * n)) + (b |^ (2 * n))
by A0, Th55; verum