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

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

The smallest positive integer n for which (1+i sqrt(3))^(n / 2) is real is

The smallest positive integer n for which (1+i)^(n) is purely imaginary is

If P(n): 2^(n)ltn! Then the smallest positive integer for which P(n) is true, is

If P(n):2^(n) lt n! Then the smallest positive integer for which P(n) is true if

The least positive integer n for which (sqrt(3)+i)^(n)=(sqrt(3)-i)^(n) is

Let a_(1), a_(2) , a_(3),"………………" be in harmonic progression with a_(1) = 5 and a_(20) = 25 . The least positive integer n for which a_(n) lt 0 is :

If n is a positive integer, then (1+i)^(n)+(1-i)^(n)=

The smallest integer n such that ((1 + i)/(1-i))^(n) = 1 is

The greatest positive integer, which divides (n+1)(n+2)(n+3)(n+4) for all n in N is