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

Interpet the following equations geometrically on the Argand plane. |z-1|+|z+1|=4

Consider the curves on the Argand plane as " "{:(C_(1):arg(z)=pi/4","),(C_(2):arg(z)=(3pi)/(4)):} and C_(3):arg(z-5-5i)=pi," where " i=sqrt(-1). bb"Statement-1" Area of the region bounded by the curves C_(1),C_(2) " and " C_(3) " is " 25/2 bb"Statement-2" The boundaries of C_(1),C_(2) " and " C_(3) constitute a right isosceles triangle.

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

If arg (z) lt 0 then arg(-z)-arg(z) =.....

Find the equation of the image of the plane x-2y+2z-3=0 in plane x+y+z-1=0.

The solution of the equation |z|-z=1+2i is

Show that the area of the triagle on the argand plane formed by the complex numbers Z, iz and z+iz is (1)/(2)|z|^(2)," where "i=sqrt(-1).

If z and we are two complex numbers such that |zw|=1 and arg(z)-arg(w)=(pi)/(2) then show that barzw=-i

Where does z lie, if |(z-5i)/(z+5i)|=1?

Show that the complex number z, satisfying the condition arg((z-1)/(z+1))=(pi)/(4) lie son a circle.