Sketch the region given by (i) `Arg (z-1-i)>= pi/3`

If the locus of the complex number z given by arg(z+i)-arg(z-i)=(2pi)/(3) is an arc of a circle, then the length of the arc is

If the locus of the complex number z given by arg(z+i)-arg(z-i)=(2pi)/(3) is an arc of a circle, then the length of the arc is

Plot the region represented by (pi)/(3)<=arg((z+1)/(z-1))<=(2 pi)/(3) in the Argand plane.

Find the point of intersection of the curves arg(z-3i)=(3pi)/4 and arg(2z+1-2i)=pi/4.

Interpet the following equations geometrically on the Argand plane. arg(z+i)-arg(z-i)=(pi)/(2)

Find the center of the are represented by arg[(z-3i)/(z-2i+4)]=pi/4

The number of values of z satisfying both theequations Arg(z-1-i)=-(3 pi)/(4) and Arg(z-2-2i)=(pi)/(4) is

Find the point of intersection of the curves arg(z-3i)=(3 pi)/(4) and arg (2z+1-2i)=pi/4

Find the point of intersection of the curves a r g(z-3i)=(3pi)/4 and arg(2z+1-2i)=pi//4.

The center of the arc represented by arg [(z-3i)/(z-2i+4)]=(pi)/(4)