Find the Area bounded by `|argz|lepi/4` and `|z-1|lt|z-3|`.

Find the area bounded by |arg z|<=pi/4 and |z-1|<|z-3|

The area bounded by the curves argz=(pi)/(3) and argz=2(pi)/(3) and arg(z-2-2i sqrt(3))= in the argand plane is (in sq.units)

If z is not purely real then area bounded by curves Img(z+1/z)=0 & |z-1| = 2 is(in square units)-

Area of the region bounded by the curves,|z-4|<=|z-8| and -(pi)/(4)<=arg(z)<=(pi)/(4) (where z is any complex number),is

If z is a complex number such that |z - barz| +|z + barz| = 4 then find the area bounded by the locus of z.

Find the locus of z if arg ((z-1)/(z+1))= pi/4

|z-1| + |z+3|=8 then find |z-4|

If omega is any complex number such that z omega = |z|^2 and |z - barz| + |omega + bar(omega)| = 4 then as omega varies, then the area bounded by the locus of z is

If omega is any complex number such that z omega=|z|^(2) and |z-barz|+|omega+baromega|=4 , then as omega varies, then the area bounded by the locus of z is