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

2^m3^n5^p is a divisor of 2^10 cdot 3^8 cdot 5^7 if m, n and p are all whole number such that 0 le m le 10, 0 le n le 8 and 0 le p le 7 . also, (2^0 + 2^1 +.........+2^10)(3^0 + 3^1 +.......+3^8)(5^0+5^1+....+5^7) = sum of all the divisors of 2^10 cdot 3^8 cdot 5^7 The sum of odd divisors (ne 1) of 10800 is

2^m3^n5^p is a divisor of 2^10 cdot 3^8 cdot 5^7 if m, n and p are all whole number such that 0 le m le 10, 0 le n le 8 and 0 le p le 7 . also, (2^0 + 2^1 +.........+2^10)(3^0 + 3^1 +.......+3^8)(5^0+5^1+....+5^7) = sum of all the divisors of 2^10 cdot 3^8 cdot 5^7 The number of proper divisors of 16200 is

If N is the number of positive integral solutions of x_1 cdot x_2 cdot x_3 cdot x_4 = 770 , then

Number of divisors of the form 4n+2(nge0) of the integer 240 is

The number of even divisor of the number N=12600=2^3 3^2 5^2 7 is a. 72 b. 54 c. 18 d. none of these

Find the number of solution for sin 5theta cdot cos 3theta = sin 9theta cos 7theta in [0, pi/2]

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

The general solution of the equation, 2cos 2x=3 cdot 2 cos^2 x-4 is

A cricket ball of mass 0.5 kg, moving at 30 m cdot s^(-1) , hits a bat perpendicularly and rebounces with a velocity of 20 m cdot s^(-1) . Impulse of the force exerted by the ball on the bat is

If f(x) = cos x cdot cos 2x cdot cos 4x cdot cos 8x cdot cos 16x," then find "f'((pi)/(4)).