The number of odd proper divisors of `3^(p)*6^(q)*15^(r),AA p,q,r, in N`, is

The number of proper divisors of 2^(p)*6^(q)*21^(r),AA p,q,r in N , is

Statement-1: The number of divisors of 10! Is 280. Statement-2: 10!= 2^(p)*3^(q)*5^(r)*7^(s) , where p,q,r,s in N.

Find the total number of proper factors of the number 35700. Also find sum of all these factors sum of the odd proper divisors the number of proper divisors divisible by 10 and the sum of these divisors.

Given that the divisors of n=3^(p)*5^(q)*7^(r) are of of the form 4lamda+1,lamdage0 . Then,

The negation of p^^(q implies ~r) is …….

Let p=2520, x=number of divisors of p which are multiple of 6, y=number of divisors of p which are multiple of 9, then

Show that 3.142678 is a rational number In other words express 3.142678 in the form (p)/(q) where p and q are integer and q ne 0

A is a set containing n elements. A subset P of A is chosen. The set A is reconstructed by replacing the elements of P. A subset Q of A is again chosen, the number of ways of choosing so that (P cup Q) is a proper subset of A, is

lf r, s, t are prime numbers and p, q are the positive integers such that their LCM of p,q is r^2 t^4 s^2, then the numbers of ordered pair of (p, q) is

If n(A) = p and n (B) = q then numbers of non void relations from A to B are (2^(p+q)-1) .