The maximum value of `abs(z)` when z satisfies the condition `abs(z-frac{2}{z}) = 2`

Find the maximum value of abs(z) when abs(z-frac{3}{z}) = 2 , z being a complex number

The value of abs(z-5) , if z = x+iy is

The complex number z which satisfies the condition |frac{i+z}{i-z}| = 1 lies on.

Show that the complex numbers z, satisfying the condition arg( frac{z-1}{z+1} ) = ( pi )/4 lies on a circle

The complex number z satisfying the equation abs(frac{z-12}{z-8i})=frac{5}{3}, abs(frac{z-4}{z-8}) = 1

If abs(z+1) = z+2 (1+i), then find z

If z=x+iy then abs(frac{z-1}{z+1}) =1 represents

Solve the equation abs(z) = z+1+2i

If abs(z-3+ i) = 4 then, the locus of z is

The inequality abs(z-4) lt abs(z-2) represents the region given by