`5^(2n+2)-24n+25` is divisible by 576

If n is a positive integer then 5^(2n+2)-24n-25 is divisible by

AA n in N, 5^(2n+2) - 24n - 25 is divisible by

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

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

Applying the principle mathematical induction (P.M.I.) show that 5^(2n+2)-24n-25 is always divisible by 576 where n is a natural number.

3^(2n)+24n-1 is divisible by 32 .

If n is a positive integer, show that: 3^(2n)-1+24n-32n^2 is divisible by 512 if ngt2

If n is a positive integer, show that: 3^(2n)-1+24n-32n^2 is divisible by 512 if ngt2

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