Find the locus of the point z for which arg`((z-i+3)/(z+3i-1))^(2)=pi`

The locus z if Re (z+1)= |z-1| is

The locus of z such that arg [(1-2i) z-2+5i]=pi/4 is a

If |z|=1 and z ne +- 1 , then one of the possible values of arg(z)- arg (z+1)- arg (z-1) , is

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

Find the equation of the plane through the point (1,2,3) and perpendicular to the plane x-y+z=2 and 2x+y-3z=5

The modulus of the complex number z such that |z+3-i| = 1 and arg(z) = pi is equal to

If z ^(2) + z + 1 = 0, where z is a complex number, then the value of (z + (1)/(z)) ^(2) + (z ^(2) + (1)/( z ^(2))) ^(2) + (z ^(3) + (1)/(z ^(3))) ^(2) +...( z ^(6) + (1)/(z ^(6)) )^(2) is

Let z _(1) = 1 + i sqrt3 and z _(2) = 1 + i, then arg ((z _(1))/( z _(2))) is