Statement-1 : The locus of z , if ` arg((z-1)/(z+1)) = pi/2` is a circle.
and
Statement -2 : ` |(z-2)/(z+2)| = pi/2`, then the locus of z is a circle.

Find the locus of z if arg ((z-1)/(z+1))= pi/4

If Imz((z-1)/(2z+1))=-4 , then locus of z is

If z = x + iy and arg ((z-2)/(z+2))=pi/6, then find the locus of z.

If "Im"(2z+1)/(iz+1)=-2 , then locus of z, is

If z = x + iotay and amp((z-1)/(z+1)) = pi/3 , then locus of z is

What is the locus of z , if amplitude of (z-2-3i) is pi/4?

Statement-1: If z_(1),z_(2) are affixes of two fixed points A and B in the Argand plane and P(z) is a variable point such that "arg" (z-z_(1))/(z-z_(2))=pi/2 , then the locus of z is a circle having z_(1) and z_(2) as the end-points of a diameter. Statement-2 : arg (z_(2)-z_(1))/(z_(1)-z) = angleAPB

The locus of the points z satisfying the condition arg ((z-1)/(z+1))=pi/3 is, a

If log sqrt(3)((|z|^(2)-|z|+1)/(2+|z|))gt2 , then the locus of z is

If arg ((z-(10+6i))/(z-(4+2i)))=(pi)/(4) (where z is a complex number), then the perimeter of the locus of z is