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

If N = 10800, find the(i) the number of divisors of the form 4m +2,(ii) the number of divisors which are multiple of 10(iii) the number of divisors which are multiple of 15.

The number of proper divisors of 1800, which are also divisible by 10, is :

Find the number of divisors of the number N=2^3 .3^5 .5^7 .7^9 which are perfect squares.

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

Ten cards are numbered as multiples of 8 starting from 8. find the probability of drawing a number (a) which is a multiple of 4 (b) which is divisible by 5 (c) which has 3 in its units place (d) which is a perfect square (e) divisible by 3.

In the given graph of y=P(x) , the number of zero is

Total number of divisors of n = 3^5. 5^7. 7^9 that are in the form of 4lambda + 1; lamda >=0 is equal to

Total number of divisors of N=2^(5)*3^(4)*5^(10)*7^(6) that are of the form 4n+2,n ge 1 , is equal to