The centre of circle represented by `|z + 1| = 2 |z - 1|` in the complex plane is

Let z_1 \and\ z_2 be the roots of the equation z^2+p z+q=0, where the coefficients p \and \q may be complex numbers. Let A \and\ B represent z_1 \and\ z_2 in the complex plane, respectively. If /_A O B=theta!=0 \and \O A=O B ,\where\ O is the origin, prove that p^2=4q"cos"^2(theta//2)dot

If the imaginary part of (2z+1)/(iz+1) is -2 , then the locus of the point representing z in the complex plane is

The three vertices of a triangle are represented by the complex numbers 0 , z_(1) and z_(2) . If the triangle is equilateral , then :

If z ne 1 and (z^(2))/(z-1) is real, then the point represented by the complex number z lies

The locus of the centre of a circle which touches the circles |z-z_(1)|=a and |z-z_(2)|=b externally is

The area of the triangle on the complex plane formed by the complex number z,-i z and z+i z is

The equation |z+1-i|=|z-1+i| represents a

Let z_1, z_2 be two complex numbers represented by points on the circle |z_1|= 1 and and |z_2|=2 are then

The number of complex numbers z such that |z-1|=|z+1|=|z-i| equals

Represent the complex number z = 1 + i in polar form.