The number of divisors of 12780 which are of the form `(4k + 2), k in W` is

The number of divisors of the form (4n+2) of the integer 240 is

The number of divisors of the form (4n+2) of the integer 240 is

The number of divisors of the form 4K + 2 , K ge 0 of the integers 240 is

The number of divisors of the form 4K + 2 , K ge 0 of the integers 240 is

The number of divisors of the form 4n + 2 ( nge 0) of 240 is

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

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.

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.

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.