The locus of `z=x+iy` satisfying `|(z-i)/(z+i)|=2`

The locus of z=x+iy satisfying |(z-i)/(z+i)|=1

The locus of z=x+iy satisfying |(z-i)/(z+i)|=3 then find the radious of the circle

The locus of the point z satisfying are ((z-1)/(z+1))=k (where I is non-zero) is a-

If z is complex number, then the locus of z satisfying the condition |2z-1|=|z-1| is (a)perpendicular bisector of line segment joining 1/2 and 1 (b)circle (c)parabola (d)none of the above curves

The complex numbers z=x+iy which satisfy the equation |(z-5i)/(z+5i)|=1 lie on (a) The x-axis (b) The straight line y=5 (c) A circle passing through the origin (d) Non of these

Let z_(1)=2+3iandz_(2)=3+4i be two points on the complex plane . Then the set of complex number z satisfying |z-z_(1)|^(2)+|z-z_(2)|^(2)=|z_(1)-z_(2)|^(2) represents -

If z=x+iy (x, y in R, x !=-1/2) , the number of values of z satisfying |z|^n=z^2|z|^(n-2)+z |z|^(n-2)+1. (n in N, n>1) is

The number of complex numbers z satisfying |z-3-i|=|z-9-i|a n d|z-3+3i|=3 are a. one b. two c. four d. none of these

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

Let z_1=2+3i and z_2=3+4i be two points on the complex plane then the set of complex numbers z satisfying abs(z-z_1)^2+abs(z-z_2)^2=abs(z_1-z_2)^2 represents