Prove that , `2^(2n)-3n-1` is divisible by 9 for all positive intergral values of n greater than 1 .

3^(2n+2)-8n-9 is divisible by

By the principle of mathematical induction prove that (5^(2n)-1) is always divisible by 24 for all positive integral values of n.

Prove that 2.7^(n)+ 3.5^(n)-5 is divisible by 24 for all n in N

Using binomial theorem for a positive integral index, prove that (2^(3n)-7n-1) is divisble by 49, for any positive integer n.

Show that 9^(n+1)-8n-9 is divisible by 64, where n is a positive integer.

Prove that (n !)! is divisible by (n !)^((n-1)!)

Prove that (n !)^2 < n^n n! < (2n)! , for all positive integers n.

Prove by induction that n(n+1)(2n+1) is divisible by 6 for all ninNN .

Prove that (25)^(n+1)-24n+5735 is divisible by (24)^2 for all n=1,2,...

If p be a natural number, then prove that, p^(n+1)+(p+1)^(2n-1) is divisible by (p^(2)+p+1) for every positive integer n.