Is there an easy way to determine if a point inside a triangle? It's 2D not 3D.

In general, the simplest (and quite optimal) algorithm is checking on which side of the halfplane created by the edges the point is. Here's some high quality info in this topic on GameDev, including performance issues. And here's some code to get you started:



Solve the following equation system:
The point



I agree with Andreas Brinck, barycentric coordinates are very convenient for this task. Note that there is no need to solve an equation system every time: just evaluate the analytical solution. Using Andreas' notation, the solution is:
where
Just evaluate EDIT: Note that the above expression for the area assumes that the triangle node numbering is counterclockwise. If the numbering is clockwise, this expression will return a negative area (but with correct magnitude). The test itself ( EDIT 2: For an even better computational efficiency, see coproc's comment below (which makes the point that if the orientation of the triangle nodes (clockwise or counterclockwise) is known beforehand, the division by 


I wrote this code before a final attempt with Google and finding this page, so I thought I'd share it. It is basically an optimized version of Kisielewicz answer. I looked into the Barycentric method also but judging from the Wikipedia article I have a hard time seeing how it is more efficient (I'm guessing there is some deeper equivalence). Anyway, this algorithm has the advantage of not using division; a potential problem is the behavior of the edge detection depending on orientation.
In words, the idea is this: Is the point s to the left of or to the right of both the lines AB and AC? If true, it can't be inside. If false, it is at least inside the "cones" that satisfy the condition. Now since we know that a point inside a trigon (triangle) must be to the same side of AB as BC (and also CA), we check if they differ. If they do, s can't possibly be inside, otherwise s must be inside. Some keywords in the calculations are line halfplanes and the determinant (2x2 cross product). Perhaps a more pedagogical way is probably to think of it as a point being inside iff it's to the same side (left or right) to each of the lines AB, BC and CA. The above way seemed a better fit for some optimization however. 


I wrote a complete article about point in triangle test. It shows the barycentric, parametric and dot product based methods. Then it deals with the accuracy problem occuring when a point lies exactly on one edge (with examples). Finally it exposes a complete new method based on point to edge distance. http://totologic.blogspot.fr/2014/01/accuratepointintriangletest.html Enjoy ! 


C# version of the barycentric method posted by andreasdr and Perro Azul. Note that the area calculation can be avoided if
[edit: accepted suggested modification by @Pierre; see comments] 


A simple way is to:
Two good sites that explain alternatives are: 


What I do is precalculate the three face normals,
then inside/outside for any one side is when a dot product of the side normal and the vertex to point vector, change sign. Repeat for other two (or more) sides. Benefits:



Here is an efficient Python implementation:
and an example output: 


Java version of barycentric method:
The above code will work accurately with integers, assuming no overflows. It will also work with clockwise and anticlockwise triangles. It will not work with collinear triangles (but you can check for that by testing det==0). The barycentric version is fastest if you are going to test different points with the same triangle. The barycentric version is not symmetric in the 3 triangle points, so it is likely to be less consistent than Kornel Kisielewicz's edge halfplane version, because of floating point rounding errors. Credit: I made the above code from Wikipedia's article on barycentric coordinates. 


If you are looking for speed, here is a procedure that might help you. Sort the triangle vertices on their ordinates. This takes at worst three comparisons. Let Y0, Y1, Y2 be the three sorted values. By drawing three horizontals through them you partition the plane into two half planes and two slabs. Let Y be the ordinate of the query point.
Costs two more comparisons. As you see, quick rejection is achieved for points outside of the "bounding slab". Optionally, you can supply a test on the abscissas for quick rejection on the left and on the right ( Eventually you will need to compute the sign of the given point with respect to the two sides of the triangle that delimit the relevant slab (upper or lower). The test has the form:
The complete discussion of If you think that this solution is complex, observe that it mainly involves simple comparisons (some of which can be precomputed), plus 6 subtractions and 4 multiplies in case the bounding box test fails. The latter cost is hard to beat as in the worst case you cannot avoid comparing the test point against two sides (no method in other answers has a lower cost, some make it worse, like 15 subtractions and 6 multiplies, sometimes divisions). UPDATE: Faster with a shear transform As explained just above, you can quickly locate the point inside one of the four horizontal bands delimited by the three vertex ordinates, using two comparisons. You can optionally perform one or two extra X tests to check insideness to the bounding box (dotted lines). Then consider the "shear" transform given by Assuming you precomputed the slope



If you know the coordinates of the three vertices and the coordinates of the specific point, then you can get the area of the complete triangle. Afterwards, calculate the area of the three triangle segments (one point being the point given and the other two being any two vertices of the triangle). Thus, you will get the area of the three triangle segments. If the sum of these areas are equal to the total area (that you got previously), then, the point should be inside the triangle. Otherwise, the point is not inside the triangle. This should work. If there are any issues, let me know. Thank you. 


By using the analytic solution to the barycentric coordinates (pointed out by Andreas Brinck) and:
one can minimize the number of "costy" operations:
(code can be pasted in Perro Azul jsfiddle) Leading to:
This compares quite well with Kornel Kisielewicz solution (25 recalls, 1 storage, 15 substractions, 6 multiplications, 5 comparisons), and might be even better if clockwise/counterclockwise detection is needed (which takes 6 recalls, 1 addition, 2 substractions, 2 multiplications and 1 comparison in itself, using the analytic solution determinant, as pointed out by rhgb). 


There are pesky edge conditions where a point is exactly on the common edge of two adjacent triangles. The point cannot be in both, or neither of the triangles. You need an arbitrary but consistent way of assigning the point. For example, draw a horizontal line through the point. If the line intersects with the other side of the triangle on the right, the point is treated as though it is inside the triangle. If the intersection is on the left, the point is outside. If the line on which the point lies is horizontal, use above/below. If the point is on the common vertex of multiple triangles, use the triangle with whose center the point forms the smallest angle. More fun: three points can be in a straight line (zero degrees), for example (0,0)  (0,10)  (0,5). In a triangulating algorithm, the "ear" (0,10) must be lopped off, the "triangle" generated being the degenerate case of a straight line. 


I needed point in triangle check in "controlable environment" when you're absolutely sure that triangles will be clockwise. So, I took Perro Azul's jsfiddle and modified it as suggested by coproc for such cases; also removed redundant 0.5 and 2 multiplications because they're just cancel each other. http://jsfiddle.net/dog_funtom/H7D7g/ Here is equivalent C# code for Unity:


