The value of `(1+i)^6+(1-i)^6` is

The value of (1+i)^5xx(1-i)^5 is

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

Find the value of (3 + 2/i) (i^6 - i^7) (1 + i^11) .

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

Find the value of (3+2/i) ( i^6 - i^7 )(1+ i^11 )

Select the correct answer from the given alternatives. If n is an odd positive integer then the value of 1 + (i)^(2n) + (i)^(4n) + (i)^(6n) is …….. .

Express the following in the form of (a+ib), a,b in R, i= sqrt (-1) State the values of a and b: (1+i) (1-i)^(-1)