The least positive value of n forwhich `[(i(i+sqrt3))/(1-i^2)]^n` is a positive integer is -

The least positive integral value of n for which ((1+i)/(1-i))^n=1 is

The least positive integer n for which ((1+i sqrt3)/(1-isqrt3))^(n)=1, is

Minimum value of n for which (2i)^n/(1-i)^(n-2) is positive integer

The least positive integral value of n for which ((1-i)/(1+i))^(2n) = 1 is

The least positive integer n, for which ((1+i)^(n))/((1-i)^(n-2)) is positive is

The least positive integer n such that ((2i)/(1+i))^(n) is a positive integer is 16b.8c.4d.2

Using De Moivre's theorem, find the least positive integer n such that ((2i)/(1+i))^(n) is a positive integer.

The least positive integer n such that ((2i)/(1+i))^n is a positive integer is a. 16 b. 8 c. 4 d. 2

What will be the least positive intergal value of n such that ((2i)/(1+i))^(n) be a positive intergal value

Find the least positive integer n for which ((1+i)/(1-i))^n