The number of positive zeros of the polynomial `underset(j=0)overset(n)(Sigma)^n C_r(-1)^r x^r` is

underset(r=0)overset(n)(sum)sin^(2)""(rpi)/(n) is equal to

Prove that underset(r = 0) overset (n)(sum) 3^(r) ""^(n)C_(r) = 4^(n)

The value of underset(r=0)overset(10)sumr^(10)C_(r),3^(r).(-2)^(10-r) is -

If omega is a complex nth root of unity, then underset(r=1)overset(n)(ar+b)omega^(r-1) is equal to

Find the value of underset(r = 0) overset(oo)sum tan^(-1) ((1)/(1 + r + r^(2)))

Prove that underset(rles)(underset(r=0)overset(s)(sum)underset(s=1)overset(n)(sum))""^(n)C_(s) ""^(s)C_(r)=3^(n)-1 .

If n and r are two positive integers such that nger,"then "^(n)C_(r-1)+""^(n)C_(r)=

Let V be the volume of the parallelopied formed by the vectors overset(to)(a) =a_(1) hat(i) +a_(2)hat(j) +a_(3)hat(k) , overset(to)(b) =b_(1)hat(i) +b_(2)hat(j) +b_(3)hat(k) " and " overset(to)(C) =c_(1)hat(i) +c_(2)hat(j) +c_(3)hat(k) If a_(r) , b_(r) , c_(r) where r=1,2,3 are non-negative real numbers and overset(3)underset(r=1)(Sigma) (a_(r)+b_(r)+c_(r))=3L. Show that V le L^(3)