# Area of intersecting triangles [closed]

I want to solve a question, but it's a little hard and I need some help. The question is:

we have 2 triangles, and we have the coordinates of the vertices like (x1, y1), (x2, y2), (x3, y3), (a1, b1), (a2, b2), (a3, b3). We want to measure the area that two triangles are on each other. It may be 0 or more.

For example, if we have for first triangle (0,0) (3,0) (0,3) and the second (0,0) (3,3) (3,0), the common area will be 2.25.

How should i write a program to solve this?

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## closed as not a real question by Michael Petrotta, harold, Mat, Shawn Chin, Ed HealOct 26 '12 at 16:14

It's difficult to tell what is being asked here. This question is ambiguous, vague, incomplete, overly broad, or rhetorical and cannot be reasonably answered in its current form. For help clarifying this question so that it can be reopened, visit the help center.If this question can be reworded to fit the rules in the help center, please edit the question.

What have you tried? – xxbbcc Oct 26 '12 at 16:06
– harold Oct 26 '12 at 16:07
Smells like someone doesn't want to do their homework. – George Oct 26 '12 at 16:09
it is not home work and i am working on it why are giving negative i don't know i – ZiDoM Oct 26 '12 at 16:14
I expect most of the close votes were the result of two things: 1) your original question had no punctuation, which gave the impression you put no effort into asking the question. 2) You didn't show us what you tried so far, which gave the impression that you put no effort into trying to solve the question. – Kevin Oct 26 '12 at 16:23

The problem of intersecting triangles (and convex polygon in general) is way tougher than it seems, especially if you wanna solve it in linear time with respect to the number of edges involved.

You can consider this page to have an idea of a working algorithm for general convex polygons (the algorithm is based on rotating calipers. Indeed, there's some abstract geometry behind, in particular, the geometric Hanh-Banach theorem).

Consider that once you have the intersection polygon, which is convex, evaluating the area is trivial.

Thus, you have two options:

1. You keep the problem abstract (somehow you consider triangles as convex polygons, and that's it) and a fast solution in C/C++ can be achieved through the GPC library (which is written in C) or, alternatively, for instance, through boost::geometry.

2. You specialize just for triangles: in this case, my advice is to consider this wonderful paper which details topologically the possible ways of intersecting involved, and gives an efficient implementation of the solution.

I have one more thing to say: when you consider your problem with toy triangles (i.e. low skewness, sizes way larger than machine precision) you can still think to implement your own algorithm and play with it. But, when you have to intersect millions of possibly ill-conditioned triangles per second, you'd better rely on a good and fast library.

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If someone is interested I can expand my answer giving reference about the topology of the problem and linked computational issues.. – Acorbe Oct 26 '12 at 16:21
I would. Oh, +1 for the GPC library – lserni Oct 26 '12 at 16:24
if you can it will be very good for me Thanks – ZiDoM Oct 26 '12 at 16:26
@ZiDoM, any further question? – Acorbe Oct 26 '12 at 16:46
@Acorbe i am reading the references you gave me and i like to write the code by myself if i had question i will say thanks because of your answer – ZiDoM Oct 26 '12 at 16:52