In the complex plane, z and β£zβ£ are vectors of equal length, and z+β£zβ£=2+8i is their vector sum. So 0,z,2+8i, and β£zβ£ form the vertices of a rhombus, as in the figure. The diagonals of a rhombus bisect each other and are perpendicular. The diagonal from 0 to 2+8i has slope 4 and midpoint 1+4i. Thus the diagonal from z to β£zβ£ passes through 1+4i with slope β1/4. Therefore this diagonal intersects the real axis at x=17. Since β£zβ£ is on the real axis, we conclude that β£zβ£=17 and β£zβ£2=289.
