I'm looking for a packing algorithm which will reduce an irregular polygon into rectangles and right triangles. The algorithm should attempt to use as few such shapes as possible and should be relatively easy to implement (given the difficulty of the challenge). It should also prefer rectangles over triangles where possible.

If possible, the answer to this question should explain the general heuristics used in the suggested algorithm.

This should run in deterministic time for irregular polygons with less than 100 vertices.

The goal is to produce a "sensible" breakdown of the irregular polygon for a layman.

The first heuristic applied to the solution will determine if the polygon is regular or irregular. In the case of a regular polygon, we will use the approach outlined in my similar post about regular polys: http://stackoverflow.com/questions/3296102/efficient-packing-algorithm-for-regular-polygons

exactalgorithm (fixed point operations), that doesn't run into this sort of problems: flixxy.com/geometric-puzzle-solution-i.jpg. – Mau Jul 23 '10 at 10:06