# 2D geometry: how to check if a point is inside an angle

i have the following geometrical issue in 2D:

i have a point from which i cast an infinite angle (2D-cone) which is given by a direction and an angle. (the point and the direction form a vector and to each side half of the angle forms the 2D-cone)

now i want to check if another point in 2D is inside this cone or outside.

how can this be achieved? thanks!

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in which language? –  erenon Jul 22 '09 at 17:52
Isn't a cone 3d? –  Daniel A. White Jul 22 '09 at 17:53
Language shouldn't matter; I believe it's the algorithm the OP is looking for. –  Paul Sonier Jul 22 '09 at 17:53
And yes, that's a good point Daniel, what's with the "point in 2D"? –  Paul Sonier Jul 22 '09 at 17:54
Cone is perfectly OK for 2D too. However you can also use "sector" for 2D. –  EFraim Jul 22 '09 at 18:00
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Calculate the vector from the center of the cone to the query point. Normalize the vector to be of length 1, Take the center vector of the cone and normalize this as well to the length of 1.
Now take the dot product between the vectors. The dot product between two normalized vectors is the cosinus of the angle between them. Take the arccos (`acos` in most languages) of the dot product and you'll get the angle. compare this angle to the cone's angle (half angle in your description). if its lower, then point in question is inside the cone.

This works in 2D and 3D.

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thanks, actually that is what i did all the time, but i just didnt think it is finished, cause i didnt realize where the actual position of the point is taken into account. now it makes sense. thanks! –  clamp Jul 22 '09 at 18:03

Calculate the angle of the direction using arctg of the direction. Substract the origin from the checked point. Calculate its angle (again via arctg of a normalized vector), and check if it lies within angle boundaries.

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