If `|(z+i)/(z-i)|=sqrt(3)`, then z lies on a circle whose radius, is

If |(z+i)/(z-i)|=sqrt(3) , then the radius of the circle is

If |z|=sqrt(2) then the point given by 3+4z lies on a circle whose radius is

Locus of complex number satisfying a rg[(z-5+4i)/(z+3-2i)]=(pi)/(4) is the arc or a circle whose radius is 5sqrt(2) whose radius is 5 whose length (of arc) is (15 pi)/(sqrt(2)) whose centre is -2-5i

Locus of complex number satisfying "a r g"[(z-5+4i)/(z+3-2i)]=pi/4 is the arc of a circle whose radius is 5sqrt(2) whose radius is 5 whose length (of arc) is (15pi)/(sqrt(2)) whose centre is -2-5i

Locus of complex number satisfying "a r g"[(z-5+4i)/(z+3-2i)]=pi/4 is the arc of a circle whose radius is 5sqrt(2) whose radius is 5 whose length (of arc) is (15pi)/(sqrt(2)) whose centre is -2-5i

If Re ((z + 2i)/(z+4))= 0 then z lies on a circle with centre :

If Re ((z + 2i)/(z+4))= 0 then z lies on a circle with centre :

Consider two complex numbers z_(1)=-3+2i, and z,=2-3i,z is a complex number such that arg((z-z_(1))/(z-z_(2)))=cos^(-1)((1)/(sqrt(10))) then locus of z is a circle whose radius is

If w= z/(z-i1/3) and |w|=1,then z lies on:

If w=(z)/(z-(1)/(3)i) and |w|=1, then z lies on