let k, n, x be Nat; :: thesis: ( k > n & x > 1 implies x |^ k > x |^ n )
assume that
A1: k > n and
A2: x > 1 ; :: thesis: x |^ k > x |^ n
consider m being Nat such that
A3: k = n + m by A1, NAT_1:10;
(m + n) - n > n - n by A1, A3, XREAL_1:9;
then (m + 1) - 1 > 1 - 1 ;
then m + 1 > 1 by XREAL_1:9;
then A4: m >= 1 by NAT_1:13;
1 |^ m = 1 ;
then A5: x |^ m > 1 by A2, A4, PREPOWER:10;
A6: x |^ n >= 1 by A2, PREPOWER:11;
x |^ k = (x |^ n) * (x |^ m) by A3, NEWTON:8;
hence x |^ k > x |^ n by A6, A5, XREAL_1:155; :: thesis: verum