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I want to find out the clockwise angle between 2 vectors(2D, 3D).

The clasic way with the dot product gives me the inner angle(0-180 degrees) and I need to use some if statements to determine if the result is the angle I need or its complement.

Do you know a direct way of computing clockwise angle?

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Why not use std::atan2()? –  user529758 Dec 28 '12 at 8:53
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How do you define "clockwise angle" for vectors in 3D? –  Martin R Dec 28 '12 at 9:13
    
@H2CO3 This seems the best solution for 2D angles. –  Felics Dec 28 '12 at 9:14
    
@MartinR "clockwise" is a generic term to say I want the angle in a specific "direction", not in the nearest "direction". Nickolay O. specified in his answer a way of describind this "direction" –  Felics Dec 28 '12 at 9:17
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@Felics: "clockwise" is well-defined in 2D, but not in 3D. Checking the z-coordinate of the cross product (as in Nickolay O.'s answer) would mean in 3D: "clockwise for an observer looking from above on the x/y plane." –  Martin R Dec 28 '12 at 9:34

4 Answers 4

up vote 15 down vote accepted

2D case

Just like the dot product is proportional to the cosine of the angle, the determinant is proprortional to its sine. So you can compute the angle like this:

dot = x1*x2 + y1*y2      # dot product
det = x1*y2 - y1*x2      # determinant
angle = atan2(det, dot)  # atan2(y, x) or atan2(sin, cos)

3D case

In 3D, two arbitrarily placed vectors define their own axis of rotation, perpendicular to both. That axis of rotation does not come with a fixed orientation, which means that you cannot uniquely fix the direction of the angle of rotation either. One common convention is to let angles be always positive, and to orient the axis in such a way that it fits a positive angle. In this case, the dot product of the normalized vectors is enough to compute angles.

dot = x1*x2 + y1*y2 + z1*z2
lenSq1 = x1*x1 + y1*y1 + z1*z1
lenSq2 = x2*x2 + y2*y2 + z2*z2
angle = acos(dot/sqrt(lenSq1 * lenSq2))

Plane embedded in 3D

One special case is the case where your vectors are not placed arbitrarily, but lie within a plane with a known normal vector n. Then the axis of rotation will be in direction n as well, and the orientation of n will fix an orientation for that axis. In this case, you can adapt the 2D computation above, including n into the determinant to make its size 3×3.

dot = x1*x2 + y1*y2 + z1*z2
det = x1*y2*zn + x2*yn*z1 + xn*y1*z2 - z1*y2*xn - z2*yn*x1 - zn*y1*x2
angle = atan2(det, dot)

One condition for this to work is that the normal vector n has unit length. If not, you'll have to normalize it.

As triple product

This determinant could also be expressed as the triple product, as @Excrubulent pointed out in a suggested edit.

det = n · (v1 × v2)

This might be easier to implement in some APIs, and gives a different perspective on what's going on here: The cross product is proportional to the sine of the angle, and will lie perpendicular to the plane, hence be a multiple of n. The dot product will therefore basically measure the length of that vector, but with the correct sign attached to it.

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Have an upvote - I can't be bothered figuring out if the other answers are correct or not, yours is the clearest and most readable, so it's the one that helped me. –  Excrubulent Jul 18 '13 at 15:22

To compute angle you just need to call atan2(v1.s_cross(v2), v1.dot(v2)) for 2D case. Where s_cross is scalar analogue of cross production (signed area of parallelogram). For 2D case that would be wedge production. For 3D case you need to define clockwise rotation because from one side of plane clockwise is one direction, from other side of plane is another direction =)

Edit: this is counter clockwise angle, clockwise angle is just opposite

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v1.cross(v2) is a vector, not a scalar and can't be used like this. Nickolay O. describes in his answer how to find out 'direction' of the angle. One way to get 2D angle is: angle = atan2f(v2.x, v2.y) - atan2f(v1.x, v1.y) –  Felics Dec 28 '12 at 9:27
    
@Felics In 2D cross production often means wedge production en.wikipedia.org/wiki/Wedge_product That is signed area of parallelogram. For 2D case that formula is absolutely correct as it dot = |v1||v2|*cos and cross = |v1||v2|sin. That is why atan2 gives correct angle in whole circle range. And as I said for 3d case you need to make some assumptions to have some extension of clockwise orientation –  kassak Dec 28 '12 at 9:35
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@Felics: Note that atan2f has the y-coordinate as first argument, so it should be angle = atan2f(v2.y, v2.x) - atan2f(v1.y, v1.x). –  Martin R Dec 28 '12 at 9:38
    
I made this mistake too =) corrected –  kassak Dec 28 '12 at 9:39
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@kassak: You could replace cross and dot by the explicit formula in the 2D case, that would remove all doubts about cross returning a 3D vector (but that is only a suggestion, which you can ignore). - Otherwise I like this solution, because it requires only one atan2f function call. –  Martin R Dec 28 '12 at 9:45

Scalar (dot) product of two vectors lets you get the cosinus of the angle between them. To get the 'direction' of the angle, you should also calculate the cross product, it will let you check (via z coordinate) is angle is clockwise or not (i.e. should you extract it from 360 degrees or not).

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Even this is correct it is what I want to avoid - to compute some value and determine if the computed value represents my angle or my angle's complement. –  Felics Dec 28 '12 at 9:13
    
Why do you want to avoid additional line of code so badly? –  Nickolay Olshevsky Dec 28 '12 at 10:19
    
I want to know if this is possible:) Why to use some ineficient way of doing things if there is (maybe!) a better way. If there is no better way I will the "standard" thing, but it's always good to ask for better! –  Felics Dec 28 '12 at 13:37
    
Actually, standard ways not always efficient ) –  Nickolay Olshevsky Dec 28 '12 at 19:52
    
@NickolayOlshevsky What do you mean exactly by check via z coordinate, how can I go about doing this? –  Ogen Apr 12 at 14:36

If by "direct way" you mean avoiding the if statement, then I don't think there is a really general solution.

However, if your specific problem would allow loosing some precision in angle discretization and you are ok with loosing some time in type conversions, you can map the [-pi,pi) allowed range of phi angle onto the allowed range of some signed integer type. Then you would get the complementarity for free. However, I didn't really use this trick in practice. Most likely, the expense of float-to-integer and integer-to-float conversions would outweigh any benefit of the directness. It's better to set your priorities on writing autovectorizable or parallelizable code when this angle computation is done a lot.

Also, if your problem details are such that there is a definite more likely outcome for the angle direction, then you can use compilers' builtin functions to supply this information to the compiler, so it can optimize the branching more efficiently. E.g., in case of gcc, that's __builtin_expect function. It's somewhat more handy to use when you wrap it into such likely and unlikely macros (like in linux kernel):

#define likely(x)      __builtin_expect(!!(x), 1)
#define unlikely(x)    __builtin_expect(!!(x), 0)
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