Prove by the method of mathematical induction that, `3^(2n+2) - 8n-9, AA n in N` is divisible by 64.

Using mathemtical induction prove that 3^(2n + 2)- 8n - 9 is divisible by 64 for all n in N .

Prove by the principle of mathematical induction that 2^ n >n for all n∈N.

Prove the following by the principle of mathematical induction: \ 3^(2n+2)-8n-9 is divisible 8 for all n in Ndot

By the principle of mathematical induction prove that 3^(2^(n))-1, is divisible by 2^(n+2)

Prove by the principle of mathematical induction that n<2^n"for all"n in Ndot

Prove the following using principle of mathematical induction. 3^(2n+2)-8n-9 is divisible by 8.

Prove the following by using the principle of mathematical induction for all n in N : 3^(2n+2)-8n-9 is divisible by 8.

Prove by the principle of mathematical induction that: n(n+1)(2n+1) is divisible by 6 for all n in Ndot

Prove by the principle of mathematical induction 4^(n)+ 15n - 1 is divisible 9 for all n in N .

Prove the following by the principle of mathematical induction: \ 5^(2n+2)-24 n-25 is divisible 576 for all n