If `I = sqrt(-1)`, then`1+i^2+i^3-i^6+i^8` is equal to

sqrt(-8-6i) =

(-sqrt3+i)^53 , where i^2 = -1 , is equal to

(1+i)^10 , where i^2=-1 , is equal to

If I=int(dx)/sqrt((1-x)(x-2)) , then I is equal to

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

The number frac{(1-i)^3}{1-i^3} is equal to

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) =

(1+i)^8 + (1-i)^8 =

The value of (i^18+(frac{1}{i})^25)^3 is equal to