Given the complex number z = 2 +3i, represent the complex numbers in Argand diagram.
z, -iz, and z - iz.

Given the complex number z = 3 + 2i , represent the complex number z, iz and z + iz in one Argand diagram. Show that these complex numbers form the veritices of an isosceles right triangle .

Represent the complex number z=1+isqrt(3) in the polar form.

Express the complex number z=(5+i)/(2+3i) in the form a+ib .

Find the correct staements in the following? If P represents the complex number z and if |2z-1|=2|z| then the locus of z .

If z is any complex number, then the points z,iz,-z,-iz

Find the locus of the points representing the complex number z for which |z+5|^2-|z-5|^2=10.

Find the non-zero complex numbers z satisfying z =i z^2dot

The complex number z satisfies z+|z|=2+8i . find the value of |z|-8

Let A(z_1) and (z_2) represent two complex numbers on the complex plane. Suppose the complex slope of the line joining A and B is defined as (z_1-z_2)/(bar z_1-bar z_2) .If the line l_1 , with complex slope omega_1, and l_2 , with complex slope omeg_2 , on the complex plane are perpendicular then prove that omega_1+omega_2=0 .