If `N=2^(3)times3^(5)times5^(7)` then number of divisors of N which are not divisible by 30 is

For N=50400 the number of divisor of N , which are divisible by 6, divisible by

If N=2910600,total number of divisors of N which are divisible by 15 but not divisible by 36.

Consider N=3^(3)*4^(3)*6^(3), then the number of divisors of N, which are perfect cubes,is

Consider the number n=2^(2).3^(3).5^(5).7^(4).11^(3) . Then the number of divisors of n that are perfect cubes are

Number of divisors of 2^(5).3^(2).5^(3) which are divisible by 2 but not divisible by 6 and 8, is 8 (2) 12 (3) 20 (4) 72

If n in N , then 3^(2n)+7 is divisible by

(ii) [(5^(2))^(3)times5^(4)]-:5^(7)

Consider the natural number n=453600. Statement-1: The number of divisors of n is 180. Statement-2: The sum of the divisors of n is ((2^(6)-1)(3^(5)-1)(5^(3)-1)(7^(2)-1))/(48)

The number of positive divisors of 2^(5)3^(6)7^(3) is

If A=2^(7) times 3^(5) and B = 3^(5) times 2^(3) , then what is the value of A times B ?