If `z ne 1 ` and `(z^(2))/(z-1)` is real, then the point represented by the complex number `z` lies

If the imaginary part of (2z+1)/(iz+1) is -2 , then the locus of the point representing z in the complex plane is

If z is a complex number then

Represent the complex number z = 1 + i in polar form.

If z=x+iy and x^(2)+y^(2)=1 . Then the argument of the complex, number ((z-1))/((z+1)) is

If z ne 0 and arg z=(pi)/(4) , then

If z ne 0 and Re z=0 then

The area of the triangle on the complex plane formed by the complex number z,-i z and z+i z is

The points representing the complex number z for which |z+3|^(2)-|z-3|^(2)=6 lie on

If (z-1)/(z+1) is purely imaginary, then |z|=

The three vertices of a triangle are represented by the complex numbers 0 , z_(1) and z_(2) . If the triangle is equilateral , then :