Compute the angle of a triangle when 3 points are given [closed]

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i have 3 Points ((x,y), (x', y'), (x'', y'')) and i want to find the angle in the 3 points i also need to get a point when having the angle and 2 other points (but that shouldn't be a problem)

if it helps - i am working with c#

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Do you want the code? – user231089 Jul 16 '11 at 19:08
you can use the fact that xy = |x||y|cos(x^y) (x, y -- vectors, xy -- their scalar product) – Vlad Jul 16 '11 at 19:10
This reads like homework, also try it and when you run into issues come to SO with code, we are not your code monkey factory. – zellio Jul 16 '11 at 19:10
stackoverflow.com/questions/4879961/…; Look at that question – Quantic Programming Jul 16 '11 at 19:10
ye, some code would help :/ – n3rdpr0gr4mm3r Jul 16 '11 at 19:20

closed as off topic by Michael Petrotta, Eric Lippert, Jeff Mercado, Tim Cooper, brian d foyJul 17 '11 at 3:49

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For a general, non right angle triangle, you need what is known as the Law of Cosines. This allows you to calculate the internal angles at each corner of the triangle given the lengths of each side. You can calculate the length of each side using the Pythagorean equality.

The second part of your question is not clearly specified.

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 i have a non right triangle - i know 3 points - 2 points are fixed and 1 point is the direction where one object is flying to. so i calculate the angle between this 3 points. i need to hit the object which moves to the direction that is given (everything has the same speed - so i only have to look that the angle is below 90 degrees). so i can say that alpha and beta have to be the same angle. when i have the angle i only need to calculate the point in which i have to shot my 3rd object. – n3rdpr0gr4mm3r Jul 17 '11 at 0:37 and this makes me mad; this is what i actually have:
//just to make it shorter double angle = Math.Acos(dotprod / Math.Sqrt(len1sq * len2sq)); len1sq = Math.Sqrt(len1sq); len1sq = (int)len1sq; int newX = 0, newY = 0; if (b.x > a.x) { newX = b.x - (int)len1sq; } if (b.x < a.x) { newX = b.x + (int)len1sq; } if (b.y > a.y) { newY = b.y - (int)len1sq; } if (b.y < a.y) { newY = b.y + (int)len1sq; } return new Point(newX, newY); – n3rdpr0gr4mm3r Jul 17 '11 at 0:42

cos A = ( b^2 + c^2 - a^2 ) / ( 2 bc )

cos B = ( a^2 + c^2 - b^2 ) / ( 2 ac )

cos C = ( a^2 + b^2 - c^2 ) / ( 2 ab )

then take the arccos on each of the values you get to find the angle.

Study trig, do research, and convert the above equations to code.

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 why do you repeat the formula 3 times? Once is enough. – David Heffernan Jul 16 '11 at 20:00

Well, the simplest would be to use the scalar product:

``````double dotprod = (x'' - x)*(x' - x) + (y'' - y)*(y' - y);
double len1 = sqrt((x' - x) * (x' - x) + (y' - y) * (y' - y));
double len2 = sqrt((x'' - x) * (x'' - x) + (y'' - y) * (y'' - y));
double angle = acos(dotprod/(len1*len2));
``````

This should be faster than using the law of cosines.

Edit:
We can omit one `sqrt` if doing this way:

``````double dotprod = (x'' - x)*(x' - x) + (y'' - y)*(y' - y);
double len1squared = (x' - x) * (x' - x) + (y' - y) * (y' - y);
double len2squared = (x'' - x) * (x'' - x) + (y'' - y) * (y'' - y);
double angle = acos(dotprod/sqrt(len1squared*len2squared));
``````

This calculation is basically the same as @David's.

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 whats the 'middle' point in this formular? because i have 2 endpoints and 1 point in the middle – n3rdpr0gr4mm3r Jul 16 '11 at 20:18 It won't be faster. The `sqrt` calls will hurt. You don't do those with law of cosine. If you were concerned about speed you would re-write this with just a single call to `sqrt`, but even so law of cosines will be faster. Final point, could you explain the justification behind this method. Otherwise it just looks like magic to OP. – David Heffernan Jul 16 '11 at 20:20 The angle is measured at `(x, y)`. – Vlad Jul 16 '11 at 20:20 @David: how are you going to calculate `2bc` for the law of cosines without `sqrt`? – Vlad Jul 16 '11 at 20:21 @Vlad Ah, got me there! One sqrt is enough though. My guess is that this magic formula you produce is equivalent to law of cosines since len1*len2 appears to be no more than `bc`, and then there's the `acos`. – David Heffernan Jul 16 '11 at 20:23
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