The smallest natural number 'n' for which `n!lt((n+1)/2)^(n)` holds is

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

If n is a natural number then sqrtn is

The variance of first n natural number is:

The sum of all natural numbers 'n' such that 100 lt n lt 200 and HCF (91, n) gt 1 is

The A . M first 'n' natural numbers is

If X""=""{4^n-3n-1"":""n in N}""a n d""Y""=""{9(n-1)"": n in N} , where N is the set of natural numbers, then XuuY is equal to (1) N (2) Y - X (3) X (4) Y

There exists a natural number N which is 50 times its own logarithm to the base 10, then N is divisible by

Let n ge 2 be a natural number and 0 lt theta lt (pi)/(2) , Then, int ((sin^(n)theta - sin theta)^(1/n) cos theta)/(sin^(n+1) theta)d theta is equal to (where C is a constant of integration)

The difference between the sum of squares of first n natural numbers and the sum of first n natural numbers is always divisible by 2.