Here, z takes values in the complex plane and Im (z) and Re(z) denote respectively, the imaginary part and thereal part of z. The set of points z satisfying `|z-i|z||=|z+i|z||` is.contained in or equal to

Match the statements in column-I with those I column-II [Note: Here z takes the values in the complex plane and I m(z)a n dR e(z) denote, respectively, the imaginary part and the real part of z ] Column I, Column II: The set of points z satisfying |z-i|z||-|z+i|z||=0 is contained in or equal to, p. an ellipse with eccentricity 4/5 The set of points z satisfying |z+4|+|z-4|=10 is contained in or equal to, q. the set of point z satisfying I m z=0 If |omega|=1, then the set of points z=omega+1//omega is contained in or equal to, r. the set of points z satisfying |I m z|lt=1 , s. the set of points z satisfying |R e z|lt=1 , t. the set of points z satisfying |z|lt=3

The set of points z |z-i|z||=|z+i|z|| is contained in or equal to

If z satisfies the relation |z-i|z||=|z+i|z|| then

The set of points z in the complex plane satisfying |z-i|z||=|z+i|z|| is contained or equal to the set of points z satisfying

The set of points z in the complex plane satisfying |z-i|z||=|z+i|z|| is contained or equal to the set of points z satisfying

If z is a complex number such that Re (z) = Im(z), then

Let z be a complex number of maximum amplitude satisfying |z-3|=Re(z), then |z-3| is equal to