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Is there a way I can calculate the actual angle between two 3D Vectors in Unity? Vector3.Angle gives the shortest angle between the two vectors. I want to know the actual angle calculated in clockwise fashion.

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What do you mean by the shortest angle? There's only one angle between two vectors. The angle is usually calculated by (conceptually) moving from the first vector in an arc toward the second vector. – snibbets Oct 30 '13 at 7:09
I do not want the angle calculated by moving the first vector in clockwise or anticlockwise direction towards a Vector. In the implementation of Vector3.Angle, I get 90 degrees if Vector 2 is 90 degrees clockwise from Vector 1 or even if it is 270 degrees. I want it to return 270 degrees. – shaveenk Oct 30 '13 at 7:22
Answer that I just posted (and deleted) two seconds ago is obviously wrong, but I think that you'll definetly end up using dot product of these two vectors. – Max Yankov Oct 30 '13 at 9:09
By the way, what exactly do you mean by "clockwise"? From what point to you want to look at these vectors and determine if they are clockwise or counterclockwise? – Max Yankov Oct 30 '13 at 9:14
And what if from the point of view of the said point in space these vectors happen to project into one line? For example, if you want to determine "clockwiseness" of the vectors by looking from a point of (0,+9001,0), what about that lie in X-Y plane? – Max Yankov Oct 30 '13 at 9:15

2 Answers 2

up vote 13 down vote accepted

This should be what you need. a and b are the vectors for which you want to calculate an angle, n would be the normal of your plane to determine what you would call "clockwise/counterclockwise"

float SignedAngleBetween(Vector3 a, Vector3 b, Vector3 n){
    // angle in [0,180]
    float angle = Vector3.Angle(a,b);
    float sign = Mathf.Sign(Vector3.Dot(n,Vector3.Cross(a,b)));

    // angle in [-179,180]
    float signed_angle = angle * sign;

    // angle in [0,360] (not used but included here for completeness)
    //float angle360 =  (signed_angle + 180) % 360;

    return signed_angle;

For simplicity I reuse Vector3.Angle and then calculate the sign from the magnitude of the angle between plane normal n and the cross product (perpendicular vector) of a and b.

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Can you provide a usage example of the method please? – Ash Blue Nov 28 '14 at 23:58

Try to use Vector3.Angle(targetDir, forward);

Since you want the shortest angle between them, then if the value returned is more than 180 degrees, just subtract 360 degrees with this value.

Check out

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As mentioned in the comment above, I am not looking for the shortest angle, but the angle considering the vectors' order. – shaveenk Oct 30 '13 at 7:27
Ok here's an idea: Check which quadrant the vector is in. For example, if the x component is positive and y component is negative, then that's in the 4th quadrant. Do it with your 2 vectors, and you will have an idea of their orientation relative to each other. Now, if both vectors happen to be within the same quadrant, just compute the angle between each of your vector to another vector, say the vector that lies between quadrant 1 and 4. From these angles, you should be able to determine their relative orientations. – aaa Oct 30 '13 at 7:49
I tried the same. This works partially but the same issue arises within the quadrant if I try comparing the Angle between the Vectors. A slight change to the last step though gives us a solution but it is still not convenient. Instead of checking the angle between a Vector and an arbitrary vector in that quadrant, you can compare the x components of the two Vectors within two quadrants. You still need to make sure both vectors are in the same quadrant halves else it won't work correctly. – shaveenk Oct 30 '13 at 13:51
If you look at the documentation, Vector3.Angle says: "The angle returned is always the acute angle... never greater than 180 degrees". So this answer is not only answering a question the OP didn't ask, it contains misleading or wrong information too. – Byte56 May 20 '14 at 17:09

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