Solve the following for z: `z^2-(3-2i)z=(5i-5)`

Solve for z:z^(2)-(3-2i)z+(5i-5)

If z_(1)=2-i, z_(2)=1+ 2i, then find the value of the following : (i) Re((z_(1)*z_(2))/(bar(z)_(2))) (ii) Im (z_(1)*bar(z)_(2))

Solve the equation |z|=z+1+2i

Solve the equation |z|=z+1+2i

Solve the equation |z|+z=2+i

Let z be a complex number satisfying (3+2i) z +(5i-4) bar(z) =-11-7i .Then |z|^(2) is

Solve for z: (2z)/(5) + 6 = z -3

If (1-i) is a root of the equation z^(3)-2(2-i)z^(2)+(4-5i)z-1+3i=0 then find the other two roots.

Let z_(1), z_(2), z_(3) be the roots of iz^(3) + 5z^(2) - z + 5i = 0 , then |z_(1)| + |z_(2)| + |z_(3)| = _____________.