......... is the minimum value of n such that `(1+i)^(2n) = (1 - i)^(2n) . ` Where `n in N`.

Evaluate overset(13) underset(n=1) sum (i^(n)+i^(n+1)) , where n in N .

Let X be the soultion set of the equation A^(x)=-I, where A = [[0 , 1, -1],[4, -3, 4],[3, -3, 4]] and I is the corresponding unit matrix and x subseteq N, the minimum value of sum ( cos ^(x) theta + sin ^(x) theta ) theta in R - { (npi)/2 , n in I } is

Show using mathematical induciton that n!lt ((n+1)/(2))^n . Where n in N and n gt 1 .

For a positive integer n , find the value of (1-i)^(n)(1-(1)/(i))^(n)

1+2+3+…….+(n+1)= ((n+1) (n+2))/(2) , n in N .

Prove that (n!) (n + 2) = [n! + (n + 1)!]

Show that the middle term in the expansion of (1+x)^2n is 1.3.5…(2n-1)/n! 2n.x^n , where n is a positive integer.

The value of sum_(n=0)^(50)i^(2n+n)! (where i=sqrt(-1)) is

Find the integral solution for n_(1)n_(2)=2n_(1)-n_(2), " where " n_(1),n_(2) in "integer" .

If i=sqrt(-1), the number of values of i^(-n) for a different n inI is