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

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

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

If z_1, z_2, z_3 are complex numbers such that abs(z_1)= abs(z_2) = abs(z_3) = abs(frac{1}{z_1}+frac{1}{z_2}+frac{1}{z_3}) = 1 , then abs(z_1+z_2+z_3) is

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

If z^2+z+1= 0 where z is a complex number, then the value of (z+frac{1}{z})^2+(z^2+frac{1}{z^2})^2+(z^3+frac{1}{z^3})^2 equals

If z^2+z+1= 0 where z is a complex number, then the value of (z+frac{1}{z})^2+(z^2+frac{1}{z^2})^2+(z^3+frac{1}{z^3})^2+…....+(z^6+frac{1}{z^6})^2 is

The locus of z satisfying the inequality log_0.8abs(z+1) gt log_0.8abs(z-1)

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

If omega is a complex root of the equation z^3 = 1 , then omega+(omega)^[(frac{1}{2}+ frac{3}{8}+frac{9}{32}+frac{27}{128}+…...) is equal to