let n, m be Nat; ( m mod 2 = 0 implies (n |^ (m div 2)) ^2 = n |^ m )
assume A1:
m mod 2 = 0
; (n |^ (m div 2)) ^2 = n |^ m
(n |^ (m div 2)) ^2 =
n |^ ((m div 2) + (m div 2))
by NEWTON:8
.=
n |^ ((m + m) div 2)
by A1, NAT_D:19
.=
n |^ ((2 * m) div 2)
.=
n |^ m
;
hence
(n |^ (m div 2)) ^2 = n |^ m
; verum