I have a cubic-Bezier curve defined as A, B, C, D. Where A is the start, B and C are control points, and D is the end. I understand how to find the position at any value t, where 0 <= t <= 1, and that concept in general since it just uses a handful of calls to a linear interpolation function that result in the curve. (Can be visualized easily here on wikipedia just below the heading Higher-order curves)

I am now looking to find a point on the curve that is closest to some point in space, P. Google has led me to multiple discussions, but none of them trigger the neurons in my brain to go "ooh!" Actually, to be quite honest they all fly right over my head. My math knowledge must be a little more limited than I'd like, and falls to pieces when derivatives are mentioned.

Here are some of the places Google has led me:

stackoverflow.com (close but I don't understand it)

Among others including an implementation in ActionScript that I can't seem to dig up again, I know I found it in a answer/comment somewhere around here...

Does anyone have the knowledge and patience to help this information click into my brain? I am considering doing the "close enough" approach and using the closest point on a line, and just iterating over the curve in very small steps. This will be slow, and accuracy will be lost. In my particular situation the accuracy is less of a concern than the speed, however, I feel there is a way to have both...

Thanks in advance.