If n is an odd positive integer then the value of (1+`i^(2n)`+`i^(4n)`+`i^(6n)`) ?

If n is any positive integer, then the value of frac{i^(4n+1)-i^(4n-1)}{2} equals

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

If m, n, p, q are four consecutive integers, then the value of ( i^m + i^n + i^p + i^q ) is

If n is a positive integer then (frac{1+i}{1-i})^(4n+1) =

If n is a positive integer, then the number of terms in the expansion of (x + a)^n is

Select and write the correct answer from the given alternatives in each of the following: If i = sqrt(-1) and n is a positive integer, then i^n + i^(n+1) + i^(n+2) + i^(n+3) =

If i^2 = -1 , then the value of sum_(n=1)^200 i^n is

If n is an odd integer, i= sqrt -1 then [ (1 + i)^(6n) + (1 - i)^(6n) ] is equal to

The smallest positive integer n for which (1+i)^(2n) = (1-i)^(2n) is