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

If z and omega are two non-zero complex numbers such that |zomega|=1 and arg(z)-arg(omega)=pi/2 , then barzomega is equal to

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

If z and w are two non-zero complex numbers such that z=-w.

If omega is a complex number such that |omega|=r!=1 , and z=omega+1/omega , then locus of z is a conic. The distance between the foci of conic is 2 (b) 2(sqrt(2)-1) (c) 3 (d) 4

Let z and omega be two non-zero complex numbers, such that |z|=|omega| and "arg"(z)+"arg"(omega)=pi . Then, z equals

Let z and omega be two non zero complex numbers such that |z|=|omega| and argz+argomega=pi , then z equals (A) omega (B) -omega (C) baromega (D) -baromega

Let z and omega be two non zero complex numbers such that |z|=|omega| and argz+argomega=pi, then z equals (A) omega (B) -omega (C) baromega (D) -baromega

If z and w are two complex number such that |z w|=1 and a rg(z)-a rg(w)=pi/2 , then show that barz w=-i

Let Z and w be two complex number such that |zw|=1 and arg(z)−arg(w)=pi//2 then

Let z,w be complex numbers such that barz+ibarw=0 and arg zw=pi Then argz equals