Solve the equation `z^(2)+|Z|=0` where z is a complex quantity.

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

Solve the equation z^3= z (z!=0)dot

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

If one root of the equation z^2-a z+a-1= 0 is (1+i), where a is a complex number then find the root.

Solve :z^2+|z|=0 .

Let z be a complex number satisfying the equation z^2-(3+i)z+m+2i=0\ ,where m in Rdot . Suppose the equation has a real root. Then find the value of m

A complex number z satisfies the equation |Z^(2)-9|+|Z^(2)|=41 , then the true statements among the following are

let z_1 and z_2 be roots of the equation z^2+pz+q=0 where the coefficients p and q may be complex numbers let A and B represnts z_1 and z_2 in the complex plane if angleAOB=alpha ne 0 and OA=OB where 0 is the origin prove that p^2=4qcos^2(alpha/2)

In the Argand plane, the distinct roots of 1+z+z^(3)+z^(4)=0 (z is a complex number) represent vertices of