Let `z=(sqrt3/2)-(i/2)` then the smallest positive integer `n` such that `(z^(95)+i^(67))^(94)=z^n` is

Let z=(sqrt(3)/2)-(i/2) Then the smallest positive integer n such that (z^(95)+i^(67))^(94)=z^(n) is

"Let "z=(sqrt(3)/2)-(i/2)" Then the smallest positive integer n such that "(z^(95)+i^(67))^(94)=z^(n)" is (A)12 (B)10 (C)9 (D) 2"

If z = 1/2 (sqrt(3) - i) and the least positive integral value of n such that (z^(101) +i^(109))^(106) = z^(n) is k, then the value of 2/5 k is equal to

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

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

If a is a positive integer,z=a+2i and z|z|-az+1=0 then

The least positive integer n such that ((2i)^n)/((1-i)^(n-2)),i=sqrt(-1) , is a positive integer,is ______