Number of zero's at the ends of ` prod _(n=5)^(30)(n)^(n+1) ` is :

Let n be an odd natural number greater than 1.Then,find the number of zeros at the end of the sum 99^(n)+1.

Let f(x) be a polynomial of degree 2005 with leading coefficient 2006 such that f(n)=n for n=1,2,3,...,2005. The number of zeros at the ends of f(2006)-2006 is

Consider the number N=2016 . Q. Number of cyphers at the end of .^(N)C_(N//2) is

Find the value of prod_(n-2)^(n) (1 - (1)/(n^(2)))

The value of the limit prod_(n=2)^(oo)(1-(1)/(n^(2))) is

Statement-1: The number of zeros at the end of 100! Is, 24. Statement-2: The exponent of prine p in n!, is [(n)/(p)]+[(n)/(p^(2))]+.......+[(n)/(p^(r))] Where r is a natural number such that P^(r)lenltP^(r+1) .

If (1.5)^(30)=k, then the value of sum_((n=2))^(29)(1.5)^(n) is :