(SOLVED) Maximizing volume of a cylinder inscribed in a right circular cone

The question:

Find the dimensions of the right circular cylinder of greatest volume that can be inscribed in a right circular cone of radius R and height H.

I called the radius of cylinder r and the height of the cylinder h. All I've really been able to do is make the relationship that

(H-h)/r = H/R

Apart from that, I am 100% lost. If this had even one number I think I could solve this. Any answers, suggestions, or hints?