For a complex number Z, if the argument ...

For a complex number Z, if the argument of `3+3i and (Z-2) (bar(Z)-1)` are equal, then the maximum distance of Z from the x - axis is equal to (where, `i^(2)=-1`)

Similar Questions

Explore conceptually related problems

For complex number z =3 -2i,z + bar z = 2i Im(z) .

If Z is a complex number the radius of zbar(z)-(2+3i)z-(2-3i)bar(z)+9=0 is equal to

For a complex number Z, if |Z-i|le2 and Z_(1)=5+3i , then the maximum value of |iZ+Z_(1)| is (where, i^(2)=-1 )

If complex number z satisfies the condition |z-2+i|<=1 , then maximum distance of origin from A(4+i(2-z)) is

If z= sqrt3+i , then the argument of z^2 e^(z-i) is equal to :

If Z is a complex number the radius of z bar z - ( 2+3i)z - (2-3i)barz + 9 =0 is equal to

If z=sqrt3+i , then the argument of z^2 e^(z-i) is equal to