`4^(n) - 3n - 1` is divisible by 9

A) 49^(n) + 16n +1 is divisible by A ( n in N) B) 3^(2n) + 7 is divisible by B ( n in N) C) 4^(n ) - 3n -1 is divisible by C ( n in n) D) 3^( 3n ) - 26 n - 1 is divisible by D (n in N) then the increasing order of A, B, C, D is

If n is a positive integer then 2^(4n) - 15n - 1 is divisible by

Using binomial theorem prove that 50^n - 49n - 1 is divisible by 49^2, AA n in N

AA n in N, 49^(n) + 16n -1 is divisible by

(1+ x)^(n) -nx -1 is divisible by (where n in N )

For every natural number n, 3^(2n+2) - 8n -9 is divisible by

If 10^(n) + 3.4^(n) + x is divisible by 9 for all n in N , then least positive value of 'x' is

Statement -1: For each natural number n, (n+1)^(7) - n^(7) -1 is divisible by 7 . Statement - 2 : For each natural number n, n^(7) - n is divisible by 7.