test algorithm to decide if point is inside area [duplicate]

here's a geometric problem that I've been unsuccessful to solve:

• we have four points A, B, C, D defining an area
• and two points E, F
• E is within the boundaries of the polygon ABCD
• F is outside the borders

We know the (x, y) coordinates of each point.

(see the figure below)

Determine for any point G (x, y) if G is inside or outside ABCD

Any ideas out there?

• This sounds like math. – nhgrif Nov 6 '13 at 19:33
• Also, as a hint, the fact that this is not a "concave" shape will be a key to solving this puzzle. – BlackVegetable Nov 6 '13 at 19:33
• Step one: find a point that's guaranteed to be outside of the poligon – user3458 Nov 6 '13 at 19:34
• This question appears to be off-topic because it is about math. – Mihai Maruseac Nov 6 '13 at 19:34
• Well, the generalized question is one of the most popular on this site. I wouldn't say it's off-topic, it's just computational geometry. – Zong Nov 6 '13 at 19:34

For your specific problem (quadrilateral - convex), you can do the following:
1) calculate the equations for the 4 sides
2) calculate the intersection of a vertical line which has G on it with each line
3) if you find an even number of intersections, then it is outside
4) if you find an odd number of intersections, then it is inside
5) be careful at the endpoint intersections
6) be careful if G is on one of the sides

• Wait... in both cases it will be even, no? if inside the intersections will happen up and down, if outside up-up or down-down... – adrienlucca.wordpress.com Nov 6 '13 at 19:49
• OK, your answer works if we add that the vertical line is not infinite on both sides, but only starts (and goes up or down), at G – adrienlucca.wordpress.com Nov 6 '13 at 19:59
• I think you got it. Let me know if you need any more help. – No One in Particular Nov 6 '13 at 20:22
• one more case, we can still have Zero intersection, then it's outside... – adrienlucca.wordpress.com Nov 6 '13 at 20:40
• Zero intersections is even. – No One in Particular Nov 6 '13 at 23:32