If centre of a regular hexagon is at origin and one of the vertices on Argand diagram is 1+2i, where `i=sqrt(-1)`, then its perimeter is

The real part of (1-i)^(-i), where i=sqrt(-1) is

If the conjugate of a complex numbers is 1/(i-1) , where i=sqrt(-1) . Then, the complex number is

sqrt((-8-6i)) is equal to (where, i=sqrt(-1)

If z^(4)+1=0,"where"i=sqrt(-1) then z can take the value

The equation z^(2)-i|z-1|^(2)=0, where i=sqrt(-1), has.

If z_1 and bar z_1 represent adjacent vertices of a regular polygon of n sides where centre is origin and if (Im(z))/(Re(z)) = sqrt(2) - 1 , then n is equal to:

If |z-1|=1, where is a point on the argand plane, show that |(z-2)/(z)|= tan (argz), where i=sqrt(-1).

The centre of a square ABCD is at z=0, A is z_(1) . Then, the centroid of /_\ABC is (where, i=sqrt(-1) )

if cos (1-i) = a+ib, where a , b in R and i = sqrt(-1) , then

If one root of the quadratic equation ix^2-2(i+1)x +(2-i)=0,i =sqrt(-1) is 2-i , the other root is