The number of positive zeros of polynomial `sum_(r=0)^(n ).^nC_r(-1)^rx^r` is ......

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

The value of sum_(r=0)^(3n-1)(-1)^r 6nC_(2r+1)3^r is

Find the sum sum_(r=0)^n^(n+r)C_r .

Find the sum sum_(r=1)^n r^2(^n C_r)/(^n C_(r-1)) .

Find the sum of sum_(r=1)^n(r^n C_r)/(n C_(r-1) .

Consider a G.P. with first term (1+x)^(n) , |x| lt 1 , common ratio (1+x)/(2) and number of terms (n+1) . Let 'S' be sum of all the terms of the G.P. , then sum_(r=0)^(n)"^(n+r)C_(r )((1)/(2))^(r ) equals

Prove that sum_(r=0)^(2n)r(.^(2n)C_r)^2=n^(4n)C_(2n) .

The value of sum_(r=0)^(40) r""^(40)C_(r)""^(30)C_(r) is

The value of sum_(r=0)^n(a+r+a r)(-a)^r is equal to