If `w=z//[z-(1//3)i]a n d|w|=1,` then find the locus of `zdot`

If omega = z//[z-(1//3)i] and |omega| = 1 , 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 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

Let w=[(z-1)/(1+iz)]^(n),n in I, then |w|=1 for

If w=alpha+i beta, where beta!=0 and z!=1 satisfies the condition that ((w-wz)/(1-z)) is a purely real,then the set of values of z is |z|=1,z!=2( b) |z|=1 and z!=1z=z(d) None of these

ABCD is a rhombus in the argand plane.If the affixes of the vertices are z_(1),z_(2),z_(3),z_(4) respectively and /_CBA=(pi)/(3) then find the value of z_(1)+omega z_(2)+omega^(2)z_(3) where omega is a complex cube root of the unity

Let z and w be non - zero complex numbers such that zw=|z^(2)| and |z-barz|+|w+barw|=4. If w varies, then the perimeter of the locus of z is