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So a question I often ask myself is:

Is there a way to safety and simply deal with angle wrap with the minimum number of case statements.

Angle wrap occurs when using a particular representation for angle (either 0-360 deg or -180 - 180 deg (or equivalent in radians)) and you wrap over the angle. For example say you have an angle of -170, and you subtract 50 deg. You mathematically add up to -220 but should actually be +140 deg.

Obviously you can check for this using:

if (deg < -180) { 180 - abs(deg + 180); }

or similar. But firstly you need multitudes of checks and secondly it doesn't work if you wrap twice.

I have heard of a good way to get around this using complex number multiplication/subtraction but I have not been able to find any evidence of it.

I would appreciate any methods that are suggested, what sort of things have people come up with to handle this very common problem?

Cheers

Ben

EDIT:

Thankyou @Mystical for your answer but I fear I have not made my purpose clear enough.

What i am trying to do on a larger scale is interpolate between two angles.

For Example, say i have an angle of -170 deg and 160 deg and i want halfway in between them. A common way to do this is ang1 + 0.5(ang2-ang1) but in the example i have provided it will cause the angle to be -5 deg when it should be 175.

If this is not angle wrap let me know but this is the issue i am trying to solve. Now i am led to believe there is a method where you use polar complex numbers to add and subtract (using multiply and divide in complex space) the angles. Does anyone know about this method?

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Are you after performance? Or just the shortest solution that works? –  Mysticial Jul 16 '12 at 4:40
    
Not performance, more like simplicity and ease of reading. (Of course the complex number may not be the case but i would still like to have a look at that). –  Ben Jul 16 '12 at 4:41
    
So you want to normalize an angle to [0, 360)? –  Mysticial Jul 16 '12 at 4:42
    
Well to be honest i would prefer to deal with normalising to [-180, 180) –  Ben Jul 16 '12 at 4:44
1  
With respect to your edit: There's two ways to bisect an angle. And they differ by exactly 180 degrees. The algorithm you have gives one of them. Add/subtract 180 degrees and you get the other one. At this point you should wrap them to [-180,180). You now have two angles, you can pick the "better" of them by seeing which is "closest" to the initial two angles. –  Mysticial Jul 16 '12 at 23:47

3 Answers 3

up vote 24 down vote accepted

For completeness I'll include both [0, 360) and [-180, 180) normalizations.

You will need #include <math.h>.


Normalize to [0,360):

double constrainAngle(double x){
    x = fmod(x,360);
    if (x < 0)
        x += 360;
    return x;
}

Normalize to [-180,180):

double constrainAngle(double x){
    x = fmod(x + 180,360);
    if (x < 0)
        x += 360;
    return x - 180;
}

The pattern should be easy enough to recognize to generalize to radians.


Angle Bisection:

double angleDiff(double a,double b){
    double dif = fmod(b - a + 180,360);
    if (dif < 0)
        dif += 360;
    return dif - 180;
}
double bisectAngle(double a,double b){
    return constrainAngle(a + angleDiff(a,b) * 0.5);
}

This should bisect an angle on the "smaller" side. (warning: not fully tested)

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And if you want ease of reading, you could always just make it an inline function in a header. Something like double constrainAngle(const double x); –  user1118321 Jul 16 '12 at 4:51
    
Good idea, I'll do that in a sec. –  Mysticial Jul 16 '12 at 4:51
1  
This does the wrong thing for negative numbers. (Or numbers less than -180 for the second case) - This is because fmod(x,y) has the same sign as x. –  Michael Anderson Jul 16 '12 at 4:57
    
@MichaelAnderson Oh, you are right. I'll fix that in a min... –  Mysticial Jul 16 '12 at 4:57
    
Hey Mystical, this is a great answer, unfortunately i haven't made my question very good and it does not really answer what i am trying to do. Please read the edit. –  Ben Jul 16 '12 at 23:34

So if figured out a way to effectively do what i want using Mystical's approach to constraining the Angle. Here it is:

enter image description here

This seems to work with any example i can think of.

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Yeah, the equation is the same as mine - assuming the [180,180) version of constrainAngle(). So I think we're done. –  Mysticial Jul 17 '12 at 0:18
    
@Mystical, yep, thanks for your help. –  Ben Jul 17 '12 at 0:38

I find using remainder() (math.h) convenient. To constrain an angle a, to -180,180 its:

remainder( a, 360.0);

and change the 360.0 to 2.O*M_PI for radians

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2  
Requires VS 2013 or C++11 –  Leif Gruenwoldt Mar 22 at 5:39

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