let a be Integer; for m, n being Nat st m >= n holds
a |^ n divides a |^ m
let m, n be Nat; ( m >= n implies a |^ n divides a |^ m )
A1:
( |.(a |^ n).| = |.a.| |^ n & |.(a |^ m).| = |.a.| |^ m )
by TAYLOR_2:1;
assume
m >= n
; a |^ n divides a |^ m
hence
a |^ n divides a |^ m
by INT_2:16, A1, NEWTON:89; verum