`10^n+3(4^(n+2))+5` is divisible by `(n in N)`

Statement P (n) : 10^(n) + 3(4^(n+2))+5 is divisible by n = ........

Prove the following by using the principle of mathematical induction for all n in N 10^n + 3.4^(n+2) + 5 is divisible by 9.

If 10^n + 3.4^(n+2) + k is divisible by 9 , for all n in N , then the least positive integral value of k is

n^7-n is divisible:

3^(2n)+24n-1 is divisible;

Prove the following by using the principle of mathematical induction for all n in N x^(2n) - y^(2n) is divisible by x + y .

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

Statement -1 for all natural numbers n , 2.7^(n)+3.5^(n)-5 is divisible by 24. Statement -2 if f(x) is divisible by x, then f(x+1)-f(x) is divisible by x+1,forall x in N .

Prove the statement by the principle of mathematical induction : 3^(2n) - 1 is divisible by 8, for all natural number n.

Prove by induction that the integer next greater than (3+sqrt(5))^n is divisible by 2^n for all n in N .