Let `3-i` and `2+i` be affixes of two points A and B in the Argand plane and P represents the complex number `z=x+iy`. Then, the locus of the P if `|z-3+i|=|z-2-i|`, is

In the Argand plane |(z-i)/(z+i)| = 4 represents a

Two points P and Q in the argand plane represent the complex numbers z and 3z+2+u . If |z|=2 , then Q moves on the circle, whose centre and radius are (here, i^(2)=-1 )

The complex numbers z = x + iy which satisfy the equation |(z-5i)/(z+5i)|=1 , lie on

If z=x+iy and if the point p in the argand plane represents z ,then the locus of z satisfying Im (z^(2))=4

The locus of the points representing the complex numbers z for which |z|-2=|z-i|-|z+5i|=0 , is

Let z in C, the set of complex numbers. Thenthe equation,2|z+3i|-|z-i|=0 represents :

If |z-1-i|=1 , then the locus of a point represented by the complex number 5(z-i)-6 is

Let z_1=3 and z_2=7 represent two points A and B respectively on complex plane . Let the curve C_1 be the locus of pint P(z) satisfying |z-z_1|^2 + |z-z_2|^2 =10 and the curve C_2 be the locus of point P(z) satisfying |z-z_1|^2 + |z-z_2|^2 =16 The locus of point from which tangents drawn to C_1 and C_2 are perpendicular , is :