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

Sum of divisors of 2^(5).3^(7).5^(3).7^(2) is :

Total number of 480 that are of the form 4n+2, n ge 0 , is equal to

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

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

Number of odd proper divisors of 3^(p).6^(m).21^(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 number of divisors of the number N=2^3 .3^5 .5^7 .7^9 which are perfect squares.

Number of divisors of the form 4n+2(n ge 0) of integer 240 is :

If A^5=0 such that A^n != I for 1 <= n <= 4 , then (I - A)^-1 is equal to

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.