Find the radius and centre of the circle `z bar(z) - (2 + 3i)z - (2 - 3i)bar(z) + 9 = 0 ` where z is a complex number

If (z + 3)/( z - 5i) = ( 1 + 4i)/(2) find the complex number z.

Find the locus of z if Re ((bar(z) + 1)/(bar(z) - i)) = 0.

Number of solutions of the equation z^3+[3(barz)^2]/|z|=0 where z is a complex number is

Identify the locus of z if bar z = bar a +(r^2)/(z-a).

If z_1 + z_2 + z_3 + z_4 = 0 where b_1 in R such that the sum of no two values being zero and b_1 z_1+b_2z_2 +b_3z_3 + b_4z_4 = 0 where z_1,z_2,z_3,z_4 are arbitrary complex numbers such that no three of them are collinear, prove that the four complex numbers would be concyclic if |b_1b_2||z_1-z_2|^2=|b_3b_4||z_3-z_4|^2 .

If z is non zero complex number, such that 2i z^(2) = bar(z), then |z| is

Prove the following properties: Re(z) = (z + bar(z))/(2) and Im(z) = (z - bar(z))/(2i)

The locus of the centre of a circle which touches the circle |z-z_(1)|=a " and "|z-z_(2)|=b externally (z, z_(1)" and "z_(2) are complex numbers) will be