Show that for any positive integer `3^(2n+2)-8n-9` is divisible by 64 .

Prove by mathematical induction that for any positive integer n , 3^(2n)-1 is always divisible by 8 .

Show that if nge1 is an integer, then 9^(n+1)-8n-9 is divisible by 64.

For any positive integer n,3^(2n)+7 is divisible by 8 . Prove by mathematical induction .

If ninNN , then by principle of mathematical induction prove that, 3^(2n+2)-8n-9 is divisible by 64.

Prove that by mathematical induction : 3^(2n+ 2) - 8n - 9 is divisible by 64 where n in N.

P(n):11^(n+2)+1^(2n+1) where n is a positive integer p(n) is divisible by -

For ninN , n^3+2n is divisible by

By ........in "Principle of Mathematical Induction" prove that for all n in N 3^(2n+2)-8n-9 is divisible 64

If n (> 1)is a positive integer, then show that 2^(2n)- 3n - 1 is divisible by 9.

By using mathematical induction prove that 3^(2n)-8n-1 is divisible by 64 when n is an integer.