The complex numbers whose real and imaginary parts are integers and satisfy the relation `zbar(Z)^3+z^3bar(Z)=350` forms a rectangle on the Argand plane, the length of whose diagonal is

Complex numbers whose real and imaginary parts x and y are integers and satisfy the equation 3x^(2)-|xy|-2y^(2)+7=0

Given that the complex numbers which satisfy the equation | z z ^3|+| z z^3|=350 form a rectangle in the Argand plane with the length of its diagonal having an integral number of units, then area of rectangle is 48 sq. units if z_1, z_2, z_3, z_4 are vertices of rectangle, then z_1+z_2+z_3+z_4=0 rectangle is symmetrical about the real axis a r g(z_1-z_3)=pi/4or(3pi)/4

The number of unimodular complex numbers z satisfying the equation z^(2)+bar(z)=0 is

Number of imaginary complex numbers satisfying the equation, z^2=bar(z)2^(1-|z|) is (A) 0 (B) 1 (C) 2 (D) 3

Non-real complex number z satisfying the equation z^(3)+2z^(2)+3z+2=0 are

The real part of a complex number z having minimum principal argument and satisfying |z - 5i| le 1 is

Show that complex numbers z_1=-1+5i and z_2=-3+2i on the argand plane.

Find the locus of a complex number z=x+ iy satisfying the relation |2z+3i|<=|2z+5|. Illustrate the locus in Argand plane.