[" If "m" and "n" are any two odd positive integers with "n

If n and m (ltn) are two positive integers then n(n-1)(n-2)...(n-m) =

If m(gtn) and n be two positive integers then product n(n-1)(n-2)……….(n-m) in the factorial form is

If x and y are positive real numbers and m,n are any positive integers,then (x^(n)y^(m))/((1+x^(2n))(1+y^(2m)))<(1)/(4)

If x and y are positive real numbers and m, n are any positive integers, then prove that (x^n y^m)/((1+x^(2n))(1+y^(2m))) lt 1/4

If x and y are positive real numbers and m, n are any positive integers, then prove that (x^n y^m)/((1+x^(2n))(1+y^(2m))) lt 1/4

If x and y are positive real numbers and m, n are any positive integers, then Prove that (x^n y^m)/((1+x^(2n))(1+y^(2m))) lt =1/4

Find the odd man out: For any two positive integers:

If A is askew symmetric matrix and n is an odd positive integer, then A^(n) is

Use factor theorem to verify that y+a is factor of y^(n)+a^(n) for any odd positive integer n .

Prove that the variance of the first n odd positive integers is the same as the variance of the first n event positive integers.