If `z=x+iy`, then show that `z barz+2(z+barz)+b=0` where `b in R`, represents a circle.

IF (1+i)z=(1-i)z, then show that z=-barz .

Show that |(z-2)/(z-3)|=2 represents a circle. Find the centre of radius.

If the real part of (barz+2)/(barz-1) is 4 then show that the locus of the point representing z in the complex plane is circle.

If iz^(3)+z^(2)-z+i=0 then show that |z|=1.

Fill in the blanks of the following arg(z)+ arg(barz) where (barz ne 0) is.....

If |(z-2)/(z-3)|=2 represents a circle, then find its radius.

If arg(z-1)=arg(z+3i) , then find x-1,y, where z=x+iy

Solve the equation z^2 +|z|=0 , where z is a complex number.

If z=3-2i then show that z^(2)-6z+13=0 Hence find the value of z^(4)-4z^(3)+6z^(2)-4z+17

Let z,z_(0) be two complex numbers. It is given that abs(z)=1 and the numbers z,z_(0),zbar_(0),1 and 0 are represented in an Argand diagram by the points P, P_(0) ,Q,A and the origin, respectively. Show that /_\POP_(0) and /_\AOQ are congruent. Hence, or otherwise, prove that abs(z-z_(0))=abs(zbar(z_(0))-1)=abs(zbar(z_(0))-1) .