# Angle between points? [closed]

I have a triangle (A, B, C) and am trying to find the angle between each pair of the three points.

The problem I'm having is the algorithms I can find online are for determining the angle between vectors. Using the vectors I would compute the angle between the vector that goes from (0, 0) to the point I have and that doesn't give me the angles inside the triangle.

Ok, here's some code in python after the method in the wikipedia page and after subtracting the values:

``````import numpy as np
points = np.array([[343.8998, 168.1526], [351.2377, 173.7503], [353.531, 182.72]])

A = points[2] - points[0]
B = points[1] - points[0]
C = points[2] - points[1]

for e1, e2 in ((A, B), (A, C), (B, C)):
num = np.dot(e1, e2)
denom = np.linalg.norm(e1) * np.linalg.norm(e2)
print np.arccos(num/denom) * 180
``````

That gives me 60.2912487814, 60.0951900475 and 120.386438829, so what am I doing wrong?

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How is your triangle represented? 3 pairs of `(x,y)` coordinates? –  Matt Ball Feb 25 '11 at 20:43
Is this actually a programming question? Post some source code, otherwise this belongs on math.stackexchange.com –  Mike Atlas Feb 25 '11 at 20:44
The vector from one point `X` to another point `Y` is `Y-X` –  mokus Feb 25 '11 at 20:44
`B-A` & `C-A` gives two vectors. And dot product between them gives the angles. –  Mahesh Feb 25 '11 at 20:48
only reason this was closed was because you elitists think it's too easy. fine, i'll just go to reddit or somewhere without this crap. –  luct Feb 25 '11 at 21:23

## closed as off topic by Yuriy Faktorovich, Wooble, Matt Ball, ircmaxell, Dan JFeb 25 '11 at 21:07

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Create three vectors, one from v2 to v1 (v2-v1), one from v3 to v1 (v3-v1), and one from v3 to v2 (v3-v2). Once you have these three vectors, you can use the algorithms you already found along with the fact that all the angles will add to 180 degrees.

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Suppose that you want the angle at A. Then you need to find the angle between the vector from A to B and the vector from A to C. The vector from A to B is just B-A. (Subtract the coordinates.)

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I would use the law of cosines, since you can easily calculate the length of each side of the triangle and then solve for each angles individually:

http://en.wikipedia.org/wiki/Law_of_cosines

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Alternatively, if you only know the length of the sides of the triangle, you can use the Law of cosines.

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@Matt Ball That's a pity because vector algebra is fundamental to so many things in development. Specifically, `AB` = `B` - `A` (where `AB` is the vector from A to B and 'A` and `B` are the vectors from a point of origin to the respective points. –  biziclop Feb 25 '11 at 20:48