The points representing the complex number z for which arg `((z-2)/(z+2))=(pi)/(3)` lie on -

Find the locus of the points representing the complex number z for which |z+5|^2-|z-5|^2=10.

If |z|=1, then the point representing the complex number -1+3z will lie on a. a circle b. a parabola c. a straight line d. a hyperbola

If from a point P representing the complex number z_1 on the curve |z|=2 , two tangents are drawn from P to the curve |z|=1 , meeting at points Q(z_2) and R(z_3) , then :

A point P which represents a complex number z, moves such that |z-z_(1)|= |z-z_(2)|, then the locus of P is-

Solve : |z|+z=2+i (z being a complex number)

If z=-i-1 is a complex number,then arg (z) will be

The vertices A,B,C of an isosceles right angled triangle with right angle at C are represented by the complex numbers z_(1) z_(2) and z_(3) respectively. Show that (z_(1)-z_(2))^(2)=2(z_(1)-z_(3))(z_(3)-z_(2)) .

if arg(z+a)=pi/6 and arg(z-a)=(2pi)/3 then

Z is a complex number. If I Z l = 4 and arg(Z)=(5pi)/6 ,then the value of Z is

Let z_(1)=2+3iandz_(2)=3+4i be two points on the complex plane . Then the set of complex number z satisfying |z-z_(1)|^(2)+|z-z_(2)|^(2)=|z_(1)-z_(2)|^(2) represents -