The limit of `underset(n=1)overset(1000)sum(-1)^(n)x^(n)" as "x to oo`

The value of underset(n=1)overset(13)sum(i^(n)+i^(n-1)),=i=sqrt(-1) is -

The sum of the series underset(n+1)overset(oo)sumsin((n!pi)/(720)) is -

Let alpha,beta denote the cube roots of unity other then 1 and let s=underset(n=0)overset(302)sum(-1)^(n)((alpha)/(beta))^(n) . Then the value of s is -

Prove that, underset(n=1)overset(oo)sum cot^(-1)(2n^(2))=(pi)/(4)

i^(2)=-1,"then"underset(n=0)overset(225)sumi^(n) is -

Let alpha ,beta denote the cube roots of unity other than 1 and alpha ne beta let S=underset(n=0)overset302sum(-1)^n(alpha/beta)^n then the value of S is

The limit of sum_(n=1)^1000(-1)^n x^n as xrarrinfty

If S_(n)=underset(k=1)overset(4n)sum(-1)^((k(k+1))/(2)).k^(2) then the possible values of s_(n) are-

Prove that underset(r=1)overset(n)sum "tan"^(-1)(2r)/(r^(4)+r^(2)+2)="tan"^(-1)(n^(2)+n+1)-(pi)/(4)