If `omega = z//[z-(1//3)i] and |omega| = 1`, then find the locus of z.

If |z-3i|=|z+3i| , then find the locus of z.

If w=(z)/(z-((1)/(3))i) and |w|=1, then find the locus of z and |w|=1, then find the

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

If omega is any complex number such that z omega = |z|^2 and |z - barz| + |omega + bar(omega)| = 4 then as omega varies, then the area bounded by the locus of z is

If omega is any complex number such that z omega=|z|^(2) and |z-barz|+|omega+baromega|=4 , then as omega varies, then the area bounded by the locus of z is

If complex number z lies on the curve |z-(-1+i)|=1, then find the locus of the complex number w=(z+i)/(1-i),i=sqrt(-1)1

If z is a complex number satisfying the equation |z-(1+i)|^(2)=2 and omega=(2)/(z), then the locus traced by omega' in the complex plane is

Let z_(1) and z_(2) be two given complex numbers. The locus of z such that {:("Column -I", " Column -II"),( "(A) " |z-z_(1)|+|z-z_(2)| = " constant =k, where " k ne|z_(1)-z_(2)|, " (p) Circle with " z_(1) and z_(2) " as the vertices of diameter"),("(B)" |z-z_(1)|- |z-z_(2)|= " k where " k ne |z_(1)-z_(2)| ," (q) Circle "),("(C)"arg((z-z_(1))/(z-z_(2)))=+- pi/2 , " (r) Hyperbola "),("(D) If "omega" lies on " |omega| = 1 " then " 2007/omega " lies on " , " (s) Ellipse"):}