Number of divisors of `(2^2).(3^3).(5^3).(7^5)` of the form `4n+1, n in N` is:

Number of divisors of 2^2 . 3^3 . 5^3 . 7^5 of the form 4n+1', is (A) 46 (B) 47 (C) 96 (D) none of these

Find the number of divisors of the number 2^(5)3^(5)5^(3)7^(3) of the form (4n+1),n in N uu{0}

The number of divisors of 2^2 cdot 3^3 cdot 5^5 cdot 7^5 of the form 4n + 1, n in N is

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

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

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

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

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 a. 54 b. 55 c. 384 d. 385

" Total number of divisors of "N=3^(5).5^(7)*7^(9)" that are of the form "4k+1" ,is equal to "

Total number of divisors of n=2^(5)xx3^(4)xx5^(10) that are of the form 4 lambda+2. lambda>=1 is