If the roots of `(z-1)^n=i(z+1)^n` are plotted in ten Argand plane, then prove that they are collinear.

If the roots of (z-1)^(n)=i(z+1)^(n) are plotted in an Argand plane,then prove that they are collinear.

If z^4= (z-1)^4 then the roots are represented in the Argand plane by the points that are

If the roots of (z-1)^(n)=2w(z+1)^(n) (where n>=3o* w complex cube root of unity are plotted in argand plane,these roots lie on

If the points z_(1),z_(2),z_(3) are the vertices of an equilateral triangle in the Argand plane, then which one of the following is not correct?

Prove that the equations , |(z-1)/(z+1)| = constant and amp ((z-1)/(z+1)) = constant on the argand plane represent the equations of the circle wich are orthogonal .

If |z-1|=1, where is a point on the argand plane, show that (z-2)/(z)=i tan (argz),where i=sqrt(-1).

The roots of the equation z^(n)=(z+3)^(n)

if |(1-iz)/(z-i)|=1 prove that the locus of the variable point z in the Argand plane is the real axis.

If |z+3i|+|z-i|=8 , then the locus of z, in the Argand plane, is