The number of solutions of equation `z^(2) + barz = 0` , where `z in C` are

Number of solutions of the equation z^(2)+|z|^(2)=0 is

Solve the equation z^(2)=bar(z) where z=x+iy

The number of integral solutions of equation x+y+z+t=29, when x >= 1, y >= 2, z>=2, 3 and t >= 0 is

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

Let z_(1) and z_(2) be two roots of the equation z^(2)+az+b=0 , z being complex number, assume that the origin z_(1) and z_(2) form an equilateral triangle , then

Let z_1 \and\ z_2 be the roots of the equation z^2+p z+q=0, where the coefficients p \and \q may be complex numbers. Let A \and\ B represent z_1 \and\ z_2 in the complex plane, respectively. If /_A O B=theta!=0 \and \O A=O B ,\where\ O is the origin, prove that p^2=4q"cos"^2(theta//2)dot

Let z be a complex number satisfying the equation z^(2)-(3+i)z+lambda+2i=0, whre lambdain R and suppose the equation has a real root , then find the non -real root.

Find the number of solutions of x + y + z + w = 20 under the following conditions: 1) x,y,z,w are whole number 2) x,y,z,w are natural number

The equation x^(2) + y^(2) + z^(2) = 0 represents

The general solution of the equation tan2thetatantheta=1 for n in Z is, theta=