Show that the complex number `z ,` satisfying are `(z-1)/(z+1)=pi/4` lies on a circle.

Show that the complex number z, satisfying the condition arg((z-1)/(z+1))=(pi)/(4) lie son a circle.

The complex number z satisfying the condition arg{(z-1)/(z+1)}=(pi)/(4) lies on

The complex number z satisfying |z+1|=|z-1| and arg (z-1)/(z+1)=pi/4 , is

The complex number z satisfying the question |(i -z)/(i+z)|=1 lies on-

Show that the locus of complex variable z satisfying |(z-2)/(z+2)|=2 is a circle find the equation of the circle?

The complex number z satisfying the equation |z-i|=|z+1|=1

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 |z-i|=|z+1|=1 is

The number of complex numbers satisfying (1 + i)z = i|z|

The complex no z=x+iy satisfying the condition amp((z-i)/(z+i))=pi/4 lies on