The locus of the point representing the complex number z for which `|z+3|^2-|z-3|^2=15` is

The points representing the complex numbers z for which |z+4|^2-|z-4|^2 = 8 lie on

The locus of the point z in the argrand plane for which |z+1|^2+|z-1|^2=4 is a

The locus of a point on the argand plane represented by the complex number z, when z satisfies the condition |{:(z-1+i)/(z+1-i):}|=|Re((z-1+i)/(z+1-i))| is

If a complex number |z ^2-1|=|z|^2+1 , then z lies on :

The complex number z satisfying z^(2) + |z| = 0 is

If the complex number z lies on |z| = 1 then (2)/(z) lies on

It zne1 and z^2/(z-1) is real , then point represent by the complex number z lies

Represent the complex number z=1+isqrt(3) in the polar form.

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