The locus of any point `P(z)` on argand plane is `arg((z-5i)/(z+5i))=(pi)/(4)`.
Then the length of the arc described by the locus of `P(z)` is

The locus of any point P(z) on argand plane is arg((z-5i)/(z+5i))=(pi)/(4) . Area of the region bounded by the locus of a complex number Z satisfying arg((z+5i)/(z-5i))=+-(pi)/(4)

The locus of any point P(z) on argand plane is arg((z-5i)/(z+5i))=(pi)/(4) . Total number of integral points inside the region bounded by the locus of P(z) and imaginery axis on the argand plane is

Let the locus of any point P(z) in the argand plane is arg((z-5i)/(z+5i))=(pi)/(4) . If O is the origin, then the value of (max.(OP)+min.(OP))/(2) is

If arg ((z-(10+6i))/(z-(4+2i)))=(pi)/(4) (where z is a complex number), then the perimeter of the locus of z is

The locus of the points z satisfying the condition arg ((z-1)/(z+1))=pi/3 is, a

If arg ((z-6-3i)/(z-3-6i))=pi/4 , then maximum value of |z| :

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 P (z) is a variable point in the complex plane such that IM (-1/z)=1/4 , then the value of the perimeter of the locus of P (z) is (use pi=3.14 )

If |z-3+ i|=4 , then the locus of z is

Find the locus of a complex number z such that arg ((z-2)/(z+2))= (pi)/(3)