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

If z!=1 and (z^2)/(z-1) is real, then the point represented by the complex number z lies (1) either on the real axis or on a circle passing through the origin (2) on a circle with centre at the origin (3) either on the real axis or on a circle not passing through the origin (4) on the imaginary axis

If |z|=2, the points representing the complex numbers -1+5z will lie on

If |z|=2 then the points representing the complex number -1+5z will be

If the real part of (z+2)/(z-1) is 4, then show that the locus of he point representing z in the complex plane is a circle.

Let A, B, C represent the complex numbers z_1, z_2, z_3 respectively on the complex plane. If the circumcentre of the triangle ABC lies at the origin, then the orthocentre is represented by the complex number

The point representing the complex number z for which arg (z-2)(z+2)=pi/3 lies on