let S, T be Element of (G ./. N); GROUPP_1:def 3 (S * T) |^ p = (S |^ p) * (T |^ p)
consider a being Element of G such that
A1:
( S = a * N & S = N * a )
by GROUP_6:21;
consider b being Element of G such that
A2:
( T = b * N & T = N * b )
by GROUP_6:21;
A3: S * T =
(@ S) * (@ T)
by GROUP_6:19
.=
(a * b) * N
by A1, A2, GROUP_11:1
;
set c = a * b;
A4: (S * T) |^ p =
((a * b) |^ p) * N
by A3, Th8
.=
((a |^ p) * (b |^ p)) * N
by Def3
.=
((a |^ p) * N) * ((b |^ p) * N)
by GROUP_11:1
;
A5:
S |^ p = (a |^ p) * N
by A1, Th8;
T |^ p = (b |^ p) * N
by A2, Th8;
hence
(S * T) |^ p = (S |^ p) * (T |^ p)
by A4, A5, GROUP_6:def 3; verum