The solutions of the equation `z^4 + 4i z^3 - 6x^2 - 4iz -I =0 ` represent vertices of a convex polygon in the complex plane. The area of the polygon is :

The solutions of the equation z^4 + 4i z^3 - 6z^2 - 4iz -i =0 represent vertices of a convex polygon in the complex plane. The area of the polygon is :

The roots of the equation z^(4) + az^(3) + (12 + 9i)z^(2) + bz = 0 (where a and b are complex numbers) are the vertices of a square. Then The area of the square is

The equation zbarz+(4-3i)z+(4+3i)barz+5=0 represents a circle of radius

The set of values of k for which the equation zbarz+(-3+4i)barz-(3+4i)z+k=0 represents a circle, is

The roots of the equation z^(4) + az^(3) + (12 + 9i)z^(2) + bz = 0 (where a and b are complex numbers) are the vertices of a square. Then The value of |a-b| is

If P(z_(1)),Q(z_(2)),R(z_(3)) " and " S(z_(4)) are four complex numbers representing the vertices of a rhombus taken in order on the complex plane, which one of the following is held good?

The equation 3y+4z=0 represents a

If z = x + yi, omega = (2-iz)/(2z-i) and |omega|=1 , find the locus of z in the complex plane

How many solutions the system of equations ||z + 4 |-|z-3i|| =5 and |z| = 4 has ?

If the imaginary part of (2z+1)//(i z+1) is -2, then find the locus of the point representing in the complex plane.