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

Show that abs(frac{z-2}{z-3}) =2, represents a circle find its centre and radius

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

If z=x+iy and abs(z - zi) = 1, then,

If abs(z)= 1 and omega = frac{z-1}{z+1} (where z != -1 ), the Re(omega) is

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

If frac{2z_1}{3z_2} is a purely imaginary number, then abs(frac{z_1-z_2}{z_1+z_2}) =

Let z1 be a complex number with abs(z_1)=1 and z2 be any complex number, then abs(frac{z_1-z_2}{1-z_1barz_2}) =

If z_1 = 1-i and z_2 = 2+4i , then im[frac{z_1z_2}{z_1} =

If frac{abs(z-2)}{abs(z-3)} = 2 represents a circle, then its radius is equal to

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