let m be Nat; :: thesis: (2 |^ (3 + m)) + (2 |^ (3 + m)) < 3 |^ (3 + m)
A4: (2 |^ (2 + 1)) + (2 |^ (2 + 1)) = 2 * (2 |^ (2 + 1))
.= 2 * (2 * (2 |^ 2)) by NEWTON:6
.= 2 * ((2 * 2) * 2) by NEWTON:81 ;
A5: 3 |^ (2 + 1) = 3 * (3 |^ 2) by NEWTON:6
.= (3 * 3) * 3 by NEWTON:81 ;
A6: ( 2 |^ (3 + m) = (2 |^ 3) * (2 |^ m) & 3 |^ (3 + m) = (3 |^ 3) * (3 |^ m) ) by NEWTON:8;
2 |^ m <= 3 |^ m by Lm3a;
then A7: ((2 |^ 3) + (2 |^ 3)) * (2 |^ m) <= ((2 |^ 3) + (2 |^ 3)) * (3 |^ m) by XREAL_1:64;
3 |^ m > 0 by PREPOWER:6;
then ((2 |^ 3) + (2 |^ 3)) * (3 |^ m) < (3 |^ 3) * (3 |^ m) by A4, A5, XREAL_1:68;
hence (2 |^ (3 + m)) + (2 |^ (3 + m)) < 3 |^ (3 + m) by XXREAL_0:2, A6, A7; :: thesis: verum