consider r being Nat such that
A1:
card G = p |^ r
by GROUP_10:def 17;
A2:
card G = (card N) * (index N)
by GROUP_2:147;
A3:
card (G ./. N) = index N
by GROUP_6:27;
reconsider n = card (G ./. N) as Nat ;
n divides p |^ r
by A1, A2, A3, NAT_D:def 3;
then
ex r1 being Nat st
( n = p |^ r1 & r1 <= r )
by Th2;
hence
G ./. N is p -group
; verum