I spent a while trying to phrase the question correctly, honestly I did. Anyway, let me try and explain.

I have edges defined as lines between two nodes like:

(5,6) = line goes from node 5 to node 6.

The nodes represent positions in xy space, so node 5 might be at x=1, y=11, though I guess this doesn't matter much.

So if I have 3 edges (5,6) (6,7) (7,5), I can make a triangle with those edges (at least I think I can)

And if I have edges (1,2) (2,11) (11,65) (65,700546) ( 700546,1) I can make another polygon with 5 edges ( again, I think...)

But, if I only have edges (0,1) (1,2) (2,3) I cannot make a polygon ( it's a line with 3 segments).

Also, if I have edges (0,1) (1,2) (2,3) (3,1) this would form a line segment with a triangle attached to it.

So, my question is basically, how do I identify which line segments form polygons? I'm guessing the algorithm is something like "if I can get back where I started, without visiting the same place twice(except the last point), I am a polygon, if I have at least 3 line segments". Which sounds quite similar to the travelling salesman problem with which I had so much fun doing statistics at college.

Please can someone put me on the right track here?

Also, to the Homework Police: I have not done homework for a lo-o-ong time. This is supposed to be for fun(!)