The greatest positive integer which divides `(n+1)(n+2)(n+3)...(n+r)` for all `ninN` is

The greatest positive integer which divides n(n+1)(n+2)(n+3) for all ninN is

The smallest positive integer 'n' for which ((1+i)/(1-i))^(n)=1 is

The least positive integer n such that ((2i)/(1 + i))^(n) is a positive integer is

Prove that 2 le (1+ (1)/(n))^(n) lt 3 for all n in N .

If n >1 , the value of the positive integer m for which n^m+1 divides a=1+n+n^2+ddot+n^(63) is/are 8 b. 16 c. 32 d. 64

For every positive integer n, prove that 7^(n) – 3^(n) is divisible by 4.

Let m be the smallest positive integer such that the coefficient of x^2 in the expansion of (1+x)^2 + (1 +x)^3 + (1 + x)^4 +........+ (1+x)^49 + (1 + mx)^50 is (3n + 1) .^51C_3 for some positive integer n. Then the value of n is

If n_1, n_2 are positive integers, then (1 + i)^(n_1) + ( 1 + i^3)^(n_1) + (1 + i_5)^(n_2) + (1 + i^7)^(n_2) is real if and only if :