Find the exponent of 3 in 100!

Find the exponent of 80 in 200!.

Let p be a prime number and n be a positive integer then exponent of p in n! is denoted by E_p(n!) and is given by E_p(n!)=[n/p]+[n/(p)^2]+[n/(p)^3]+....[n/(p^k)] where p^kltnltp^(k+1) and [x] denotes the greatest integral part of x if we isolate the power of each prime contained in any number N then N can be written as N=2^(alpha_1).3^(alpha_2).5^(alpha_3).7^(alpha_4) ....where alpha_i are whole numbers the exponent of 7 in ,^100c_50 is

Find the point of maxima and minima for the function 2x^3-9x^2+100

(1+x)(1+x+x^2)(1+x+x^2+x^3)…….(1+x+x^2+…….+x^(100)) when written in the ascending power of x then the highest exponent of x is lambda(1010) then lambda is____

Statement 1: Number of zeros at the end of 50! is equal to 12. Statement 2: Exponent of 2 in 50! is 47.

Statement -I: Number of zeroes at the end of 50! is equal to 12. Statement -II : Exponent of 2 in 50! is 47.

Find (i) the moment of inertia of a rod of mass 100 g and length 100 cm about and axis passing through its centre and perpendicular to its length and (ii) the radius of gyration.

Find the component statements of the following compound statements and check whether they are true or false. 100 is divisible by 3, 11 and 5.

A ball of mass 100g moves with a velocity of 100m*s^(-1) . Find the wavelength of the wave associated with the moving ball.