The inequality `n! > 3^(n-1)` is true for

If n is +ve integer, 4^n - 3n - 1 is divisible by

Given that t_(n+1) = ^5t_n - 8 , t_1 = 3 , prove by method of induction that t_n = 5^(n-1) + 2

Find n if ^(n)C_(n-3) = 84

If n in N , then 3.5^(2n+1) + 2^(3n+1) is divisible by

For all n in N , n(n + 1) (n + 5) is a multiple of 8

Prove the following by the method of induction for all n in N : (2^(3n) -1) is divisible by 7.

Select and write the correct answer from the given alternatives in each of the following: If i = sqrt(-1) and n is a positive integer, then i^n + i^(n+1) + i^(n+2) + i^(n+3) =

Prove that ((2n)!) / (n!) = 2^n(2n - 1) (2n - 3) ... 5.3.1.

Find the sum of 1^1 n + 2^2 (n - 1) + 3^2 (n - 2) + 4^2 (n -3) ……upto 'n' terms.

By method of induction prove that 1+2+3+...+n = (n(n+1)) /2, for all n in N