How do you calculate the average of a set of angles?

I want to calculate the average of a set of angles. For example, I might have several samples from the reading of a compass. The problem of course is how to deal with the wraparound. The same algorithm might be useful for a clockface.

The actual question is more complicated - what do statistics mean on a sphere or in an algebraic space which "wraps round", eg the additive group mod n. The answer may not be unique, eg the average of 359 degrees and 1 degree could be 0 degrees or 180, but statistically 0 looks better.

This is a real programming problem for me and I'm trying to make it not look like just a Math problem.

[Edit: to resolve all the confusion, when I refer to angles you can assume I mean bearings]

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By average angle, I assume your actually want mean bearing. An angle exists between two lines, a bearing is the direction of a single line. In this case, starblue has it right. –  Shane MacLaughlin Jan 29 '09 at 14:29
@Nick Fortescue: can you update your question to be more specific: do you mean angles or a bearing? –  Mitch Wheat Jan 29 '09 at 14:33
I actually wanted something slightly more complicated (but is analogous to bearings) and was trying to simplify to make the question easier, and as usual made it more complicated. I found the answer I wanted at catless.ncl.ac.uk/Risks/7.44.html#subj4. I'll re-edit the qn. –  Nick Fortescue Jan 29 '09 at 14:48
The Risks answer is basically what I'm proposing, except that it may run into trouble when the denominator is 0. –  starblue Jan 29 '09 at 14:54
Interesting article on the meaning of angles: twistedoakstudios.com/blog/?p=938 –  starblue Nov 16 '12 at 14:55

Compute unit vectors from the angles and take the angle of their average.

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That does not work if the vectors cancel each other out. Average could still be meaningful in this case, depending on its exact definition. –  David Hanak Jan 29 '09 at 14:27
@David, the average direction of two bearings 180 degrees out is undefined. This doesn't make starblue's answer wrong, it's just an exceptional case, as occurs in many geomteric problems. –  Shane MacLaughlin Jan 29 '09 at 14:31
@smacl: I agree, if angles represent directions. But if you think of complex numbers, for example, and define average as "what is the argument of c, such that cc == ab", where a and b have a modulus of 1, then the average of 0 and 180 is 90. –  David Hanak Jan 29 '09 at 14:42
–  starblue Dec 16 '10 at 17:11
@PierreBdR: If I take two steps in direction 0deg and one in direction 90deg I will have moved in the direction 26.56 deg relative to where I started. In this sense 26.56 makes much more sense as the average direction of {0,0,90} deg than 30 deg. The algebraic average is just one of many possible averages (see en.wikipedia.org/wiki/Mean )-- and it seems quite irrelevant for the purpose of averaging directions (just as it does for many others). –  Janus Mar 4 '11 at 3:52

I solved the problem with the help of the answer from @David_Hanak. As he states:

The angle that points "between" the two others while staying in the same semicircle, e.g. for 355 and 5, this would be 0, not 180. To do this, you need to check if the difference between the two angles is larger than 180 or not. If so, increment the smaller angle by 360 before using the above formula.

So what I did was calculate the average of all the angles. And then all the angles that are less than this, increase them by 360. Then recalculate the average by adding them all and dividing them by their length.

``````        float angleY = 0f;
int count = eulerAngles.Count;

for (byte i = 0; i < count; i++)
angleY += eulerAngles[i].y;

float averageAngle = angleY / count;

angleY = 0f;
for (byte i = 0; i < count; i++)
{
float angle = eulerAngles[i].y;
if (angle < averageAngle)
angle += 360f;
angleY += angle;
}

angleY = angleY / count;
``````

Works perfectly.

-

Here's a complete C++ solution:

``````#include <cmath>
#include <vector>

double dAngleAvg(const vector<double>& angles) {
double avgSin   = 0.0;
double avgCos   = 0.0;
double conv     = M_PI/180.0;
for (const auto& theta : angles) {
avgSin += sin(theta*conv);
avgCos += cos(theta*conv);
}
avgSin /= (double)angles.size();
avgCos /= (double)angles.size();
double ret = 90.0-atan2(avgCos, avgSin)/conv;
if (ret<0.0) ret += 360.0;
return fmod(ret, 360.0);
}
``````

It takes the angles in the form of a vector of doubles, and returns the average simply as a double. The angles must be in degrees, and of course the average is in degrees as well.

-

Here is the full solution: (the input is an array of bearing in degrees (0-360)

``````public static int getAvarageBearing(int[] arr)
{
double sunSin = 0;
double sunCos = 0;
int counter = 0;

for (double bearing : arr)
{
bearing *= Math.PI/180;

sunSin += Math.sin(bearing);
sunCos += Math.cos(bearing);
counter++;
}

int avBearing = INVALID_ANGLE_VALUE;
if (counter > 0)
{
if (avBearing<0)
avBearing += 360;
}

return avBearing;
}
``````
-

ackb is right that these vector based solutions cannot be considered true averages of angles, they are only an average of the unit vector counterparts. However, ackb's suggested solution does not appear to mathematically sound.

The following is a solution that is mathematically derived from the goal of minimising (angle[i] - avgAngle)^2 (where the difference is corrected if necessary), which makes it a true arithmetic mean of the angles.

First, we need to look at exactly which cases the difference between angles is different to the difference between their normal number counterparts. Consider angles x and y, if y >= x - 180 and y <= x + 180, then we can use the difference (x-y) directly. Otherwise, if the first condition is not met then we must use (y+360) in the calculation instead of y. Corresponding, if the second condition is not met then we must use (y-360) instead of y. Since the equation of the curve we are minimising only changes at the points where these inequalities change from true to false or vice versa, we can separate the full [0,360) range into a set of segments, separated by these points. Then, we only need to find the minimum of each of these segments, and then the minimum of each segment's minimum, which is the average.

Here's an image demonstrating where the problems occur in calculating angle differences. If x lies in the gray area then there will be a problem.

http://i3.photobucket.com/albums/y69/02williamsa6/angle_comparisons.png

To minimise a variable, depending on the curve, we can take the derivative of what we want to minimise and then we find the turning point (which is where the derivative = 0).

Here we will apply the idea of minimise the squared difference to derive the common arithmetic mean formula: sum(a[i])/n. The curve y = sum((a[i]-x)^2) can be minimised in this way:

``````y = sum((a[i]-x)^2)
= sum(a[i]^2 - 2*a[i]*x + x^2)
= sum(a[i]^2) - 2*x*sum(a[i]) + n*x^2

dy\dx = -2*sum(a[i]) + 2*n*x

for dy/dx = 0:
-2*sum(a[i]) + 2*n*x = 0
-> n*x = sum(a[i])
-> x = sum(a[i])/n
``````

Now applying it to curves with our adjusted differences:

b = subset of a where the correct (angular) difference a[i]-x c = subset of a where the correct (angular) difference (a[i]-360)-x cn = size of c d = subset of a where the correct (angular) difference (a[i]+360)-x dn = size of d

``````y = sum((b[i]-x)^2) + sum(((c[i]-360)-b)^2) + sum(((d[i]+360)-c)^2)
= sum(b[i]^2 - 2*b[i]*x + x^2)
+ sum((c[i]-360)^2 - 2*(c[i]-360)*x + x^2)
+ sum((d[i]+360)^2 - 2*(d[i]+360)*x + x^2)
= sum(b[i]^2) - 2*x*sum(b[i])
+ sum((c[i]-360)^2) - 2*x*(sum(c[i]) - 360*cn)
+ sum((d[i]+360)^2) - 2*x*(sum(d[i]) + 360*dn)
+ n*x^2
= sum(b[i]^2) + sum((c[i]-360)^2) + sum((d[i]+360)^2)
- 2*x*(sum(b[i]) + sum(c[i]) + sum(d[i]))
- 2*x*(360*dn - 360*cn)
+ n*x^2
= sum(b[i]^2) + sum((c[i]-360)^2) + sum((d[i]+360)^2)
- 2*x*sum(x[i])
- 2*x*360*(dn - cn)
+ n*x^2

dy/dx = 2*n*x - 2*sum(x[i]) - 2*360*(dn - cn)

for dy/dx = 0:
2*n*x - 2*sum(x[i]) - 2*360*(dn - cn) = 0
n*x = sum(x[i]) + 360*(dn - cn)
x = (sum(x[i]) + 360*(dn - cn))/n
``````

This alone is not quite enough to get the minimum, while it works for normal values, that has an unbounded set, so the result will definitely lie within set's range and is therefore valid. We need the minimum within a range (defined by the segment). If the minimum is less than our segment's lower bound then the minimum of that segment must be at the lower bound (because quadratic curves only have 1 turning point) and if the minimum is greater than our segment's upper bound then the segment's minimum is at the upper bound. After we have the minimum for each segment, we simply find the one that has the lowest value for what we're minimising (sum((b[i]-x)^2) + sum(((c[i]-360)-b)^2) + sum(((d[i]+360)-c)^2)).

Here is an image to the curve, which shows how it changes at the points where x=(a[i]+180)%360. The data set is in question is {65,92,230,320,250}.

http://i3.photobucket.com/albums/y69/02williamsa6/curve.png

Here is an implementation of the algorithm in Java, including some optimisations, its complexity is O(nlogn). It can be reduced to O(n) if you replace the comparison based sort with a non comparison based sort, such as radix sort.

``````static double varnc(double _mean, int _n, double _sumX, double _sumSqrX)
{
return _mean*(_n*_mean - 2*_sumX) + _sumSqrX;
}
//with lower correction
static double varlc(double _mean, int _n, double _sumX, double _sumSqrX, int _nc, double _sumC)
{
return _mean*(_n*_mean - 2*_sumX) + _sumSqrX
+ 2*360*_sumC + _nc*(-2*360*_mean + 360*360);
}
//with upper correction
static double varuc(double _mean, int _n, double _sumX, double _sumSqrX, int _nc, double _sumC)
{
return _mean*(_n*_mean - 2*_sumX) + _sumSqrX
- 2*360*_sumC + _nc*(2*360*_mean + 360*360);
}

static double[] averageAngles(double[] _angles)
{
double sumAngles;
double sumSqrAngles;

double[] lowerAngles;
double[] upperAngles;

{

sumAngles = 0;
sumSqrAngles = 0;
for(double angle : _angles)
{
sumAngles += angle;
sumSqrAngles += angle*angle;
if(angle < 180)
else if(angle > 180)
}

Collections.sort(lowerAngles_);
Collections.sort(upperAngles_,Collections.reverseOrder());

lowerAngles = new double[lowerAngles_.size()];
Iterator<Double> lowerAnglesIter = lowerAngles_.iterator();
for(int i = 0; i < lowerAngles_.size(); i++)
lowerAngles[i] = lowerAnglesIter.next();

upperAngles = new double[upperAngles_.size()];
Iterator<Double> upperAnglesIter = upperAngles_.iterator();
for(int i = 0; i < upperAngles_.size(); i++)
upperAngles[i] = upperAnglesIter.next();
}

double variance = varnc(180,_angles.length,sumAngles,sumSqrAngles);

double lowerBound = 180;
double sumLC = 0;
for(int i = 0; i < lowerAngles.length; i++)
{
//get average for a segment based on minimum
double testAverageAngle = (sumAngles + 360*i)/_angles.length;
//minimum is outside segment range (therefore not directly relevant)
//since it is greater than lowerAngles[i], the minimum for the segment
//must lie on the boundary lowerAngles[i]
if(testAverageAngle > lowerAngles[i]+180)
testAverageAngle = lowerAngles[i];

if(testAverageAngle > lowerBound)
{
double testVariance = varlc(testAverageAngle,_angles.length,sumAngles,sumSqrAngles,i,sumLC);

if(testVariance < variance)
{
averageAngles.clear();
variance = testVariance;
}
else if(testVariance == variance)
}

lowerBound = lowerAngles[i];
sumLC += lowerAngles[i];
}
//Test last segment
{
//get average for a segment based on minimum
double testAverageAngle = (sumAngles + 360*lowerAngles.length)/_angles.length;
//minimum is inside segment range
//we will test average 0 (360) later
if(testAverageAngle < 360 && testAverageAngle > lowerBound)
{
double testVariance = varlc(testAverageAngle,_angles.length,sumAngles,sumSqrAngles,lowerAngles.length,sumLC);

if(testVariance < variance)
{
averageAngles.clear();
variance = testVariance;
}
else if(testVariance == variance)
}
}

double upperBound = 180;
double sumUC = 0;
for(int i = 0; i < upperAngles.length; i++)
{
//get average for a segment based on minimum
double testAverageAngle = (sumAngles - 360*i)/_angles.length;
//minimum is outside segment range (therefore not directly relevant)
//since it is greater than lowerAngles[i], the minimum for the segment
//must lie on the boundary lowerAngles[i]
if(testAverageAngle < upperAngles[i]-180)
testAverageAngle = upperAngles[i];

if(testAverageAngle < upperBound)
{
double testVariance = varuc(testAverageAngle,_angles.length,sumAngles,sumSqrAngles,i,sumUC);

if(testVariance < variance)
{
averageAngles.clear();
variance = testVariance;
}
else if(testVariance == variance)
}

upperBound = upperAngles[i];
sumUC += upperBound;
}
//Test last segment
{
//get average for a segment based on minimum
double testAverageAngle = (sumAngles - 360*upperAngles.length)/_angles.length;
//minimum is inside segment range
//we test average 0 (360) now
if(testAverageAngle < 0)
testAverageAngle = 0;

if(testAverageAngle < upperBound)
{
double testVariance = varuc(testAverageAngle,_angles.length,sumAngles,sumSqrAngles,upperAngles.length,sumUC);

if(testVariance < variance)
{
averageAngles.clear();
variance = testVariance;
}
else if(testVariance == variance)
}
}

double[] averageAngles_ = new double[averageAngles.size()];
Iterator<Double> averageAnglesIter = averageAngles.iterator();
for(int i = 0; i < averageAngles_.length; i++)
averageAngles_[i] = averageAnglesIter.next();

return averageAngles_;
}
``````

The arithmetic mean of a set of angles may not agree with your intuitive idea of what the average should be. For example, the arithmetic mean of the set {179,179,0,181,181} is 216 (and 144). The answer you immediately think of is probably 180, however it is well known that the arithmetic mean is heavily affected by edge values. You should also remember that angles are not vectors, as appealing as that may seem when dealing with angles sometimes.

This algorithm does of course also apply to all quantities that obey modular arithmetic (with minimal adjustment), such as the time of day.

I would also like to stress that even though this is a true average of angles, unlike the vector solutions, that does not necessarily mean it is the solution you should be using, the average of the corresponding unit vectors may well be the value you actually should to be using.

-
The Mitsuta method actually gives the starting angle + the average of the rotations from the starting angle. So to get a similar method, accounting for measurement error then you'd need to be looking at the rotations happening and estimate the error for those. I think you would need a distribution for the rotations in order to estimate an error for them. –  Nimble Sep 8 '10 at 9:30

(Just want to share my viewpoint from Estimation Theory or Statistical Inference)

Nimble's trial is to get the MMSE^ estimate of a set of angles, but it's one of choices to find an "averaged" direction; one can also find an MMAE^ estimate, or some other estimate to be the "averaged" direction, and it depends on your metric quantifying error of direction; or more generally in estimation theory, the definition of cost function.

^ MMSE/MMAE corresponds to minimum mean squared/absolute error.

ackb said "The average angle phi_avg should have the property that sum_i|phi_avg-phi_i|^2 becomes minimal...they average something, but not angles"

---- you quantify errors in mean-squared sense and it's one of the mostly common way, however, not the only way. The answer favored by most people here (i.e., sum of the unit vectors and get the angle of the result) is actually one of the reasonable solutions. It is (can be proved) the ML estimator that serves as the "averaged" direction we want, if the directions of the vectors are modeled as von Mises distribution. This distribution is not fancy, and is just a periodically sampled distribution from a 2D Guassian. See Eqn. (2.179) in Bishop's book "Pattern Recognition and Machine Learning". Again, by no means it's the only best one to represent "average" direction, however, it is quite reasonable one that have both good theoretical justification and simple implementation.

Nimble said "ackb is right that these vector based solutions cannot be considered true averages of angles, they are only an average of the unit vector counterparts"

----this is not true. The "unit vector counterparts" reveals the information of the direction of a vector. The angle is a quantity without considering the length of the vector, and the unit vector is something with additional information that the length is 1. You can define your "unit" vector to be of length 2, it does not really matter.

-

In english:

1. Make a second data set with all angles shifted by 180.
2. Take the variance of both data sets.
3. Take the average of the data set with the smallest variance.
4. If this average is from the shifted set then shift the answer again by 180.

In python:

A #numpy NX1 array of angles

``````if np.var(A) < np.var((A-180)%360):
average = np.average(A)

else:
average = (np.average((A-180)%360)+180)%360
``````
-

I'd like to share an method I used with a microcontroller which did not have floating point or trigonometry capabilities. I still needed to "average" 10 raw bearing readings in order to smooth out variations.

1. Check whether the first bearing is the range 270-360 or 0-90 degrees (northern two quadrants)
2. If it is, rotate this and all subsequent readings by 180 degrees, keeping all values in the range 0 <= bearing < 360. Otherwise take the readings as they come.
3. Once 10 readings have been taken calculate the numerical average assuming that there has been no wraparound
4. If the 180 degree rotation had been in effect then rotate the calculated average by 180 degrees to get back to a "true" bearing.

It's not ideal; it can break. I got away with it in this case because the device only rotates very slowly. I'll put it out there in case anyone else finds themselves working under similar restrictions.

-

There's no single "right answer". I recommend reading the book, K. V. Mardia and P. E. Jupp, "Directional Statistics", (Wiley, 1999), for a thorough analysis.

-

This question is examined in detail in the book: "Statistics On Spheres", Geoffrey S. Watson, University of Arkansas Lecture Notes in the Mathematical Sciences, 1983 John Wiley & Sons, Inc. as mentioned at http://catless.ncl.ac.uk/Risks/7.44.html#subj4 by Bruce Karsh.

A good way to estimate an average angle, A, from a set of angle measurements a[i] 0<=i

``````                   sum_i_from_1_to_N sin(a[i])
a = arctangent ---------------------------
sum_i_from_1_to_N cos(a[i])
``````

The method given by starblue is computationally equivalent, but his reasons are clearer and probably programmatically more efficient, and also work well in the zero case, so kudos to him.

The subject is now explored in more detail on Wikipedia, and with other uses, like fractional parts.

-
which is also much the same as the algorithm I posted at the same time as you. You would need to use atan2 rather than a plain atan, though, since otherwise you can't tell which quadrant the answer is in. –  Alnitak Jan 29 '09 at 15:06
You can still end up with some indeterminate answers. Like in the 0, 180 sample. So you still have to check for edge cases. Also, there is usually an atan2 function available which might be faster in your case. –  Loki Jan 29 '09 at 15:24

I have a different method than @Starblue that gives "correct" answers to some of the angles given above. For example:

• angle_avg([350,10])=0
• angle_avg([-90,90,40])=13.333
• angle_avg([350,2])=356

It uses a sum over the differences between consecutive angles. The code (in Matlab):

``````function [avg] = angle_avg(angles)
last = angles(1);
sum = angles(1);
for i=2:length(angles)
diff = mod(angles(i)-angles(i-1)+ 180,360)-180
last = last + diff;
sum = sum + last;
end
avg = mod(sum/length(angles), 360);
end
``````
-
Your code returns different answers for `[-90,90,40]` and `[90,-90,40]`; I don't think a non-commutative average is a very useful one. –  musiphil Mar 4 '13 at 20:24

Like all averages, the answer depends upon the choice of metric. For a given metric M, the average of some angles a_k in [-pi,pi] for k in [1,N] is that angle a_M which minimizes the sum of squared distances d^2_M(a_M,a_k). For a weighted mean, one simply includes in the sum the weights w_k (such that sum_k w_k = 1). That is,

a_M = arg min_x sum_k w_k d^2_M(x,a_k)

Two common choices of metric are the Frobenius and the Riemann metrics. For the Frobenius metric, a direct formula exists that corresponds to the usual notion of average bearing in circular statistics. See "Means and Averaging in the Group of Rotations", Maher Moakher, SIAM Journal on Matrix Analysis and Applications, Volume 24, Issue 1, 2002, for details.

Here's a function for GNU Octave 3.2.4 that does the computation:

``````function ma=meanangleoct(a,w,hp,ntype)
%   ma=meanangleoct(a,w,hp,ntype) returns the average of angles a
%   given weights w and half-period hp using norm type ntype
%   Ref: "Means and Averaging in the Group of Rotations",
%   Maher Moakher, SIAM Journal on Matrix Analysis and Applications,
%   Volume 24, Issue 1, 2002.

if (nargin<1) | (nargin>4), help meanangleoct, return, end
if isempty(a), error('no measurement angles'), end
la=length(a); sa=size(a);
if prod(sa)~=la, error('a must be a vector'); end
if (nargin<4) || isempty(ntype), ntype='F'; end
if ~sum(ntype==['F' 'R']), error('ntype must be F or R'), end
if (nargin<3) || isempty(hp), hp=pi; end
if (nargin<2) || isempty(w), w=1/la+0*a; end
lw=length(w); sw=size(w);
if prod(sw)~=lw, error('w must be a vector'); end
if lw~=la, error('length of w must equal length of a'), end
if sum(w)~=1, warning('resumming weights to unity'), w=w/sum(w); end

a=a(:);     % make column vector
w=w(:);     % make column vector
a=mod(a+hp,2*hp)-hp;    % reduce to central period
a=a/hp*pi;              % scale to half period pi
z=exp(i*a); % U(1) elements

% % NOTA BENE:
% % fminbnd can get hung up near the boundaries.
% % If that happens, shift the input angles a
% % forward by one half period, then shift the
% % resulting mean ma back by one half period.
% X=fminbnd(@meritfcn,-pi,pi,[],z,w,ntype);

% % seems to work better
x0=imag(log(sum(w.*z)));
X=fminbnd(@meritfcn,x0-pi,x0+pi,[],z,w,ntype);

% X=real(X);              % truncate some roundoff
X=mod(X+pi,2*pi)-pi;    % reduce to central period
ma=X*hp/pi;             % scale to half period hp

return
%%%%%%

function d2=meritfcn(x,z,w,ntype)
x=exp(i*x);
if ntype=='F'
y=x-z;
else % ntype=='R'
y=log(x'*z);
end
d2=y'*diag(w)*y;
return
%%%%%%

% %   test script
% %
% % NOTA BENE: meanangleoct(a,[],[],'R') will equal mean(a)
% % when all abs(a-b) < pi/2 for some value b
% %
% na=3, a=sort(mod(randn(1,na)+1,2)-1)*pi;
% da=diff([a a(1)+2*pi]); [mda,ndx]=min(da);
% a=circshift(a,[0 2-ndx])    % so that diff(a(2:3)) is smallest
% A=exp(i*a), B1=expm(a(1)*[0 -1; 1 0]),
% B2=expm(a(2)*[0 -1; 1 0]), B3=expm(a(3)*[0 -1; 1 0]),
% masimpl=[angle(mean(exp(i*a))) mean(a)]
% Bsum=B1+B2+B3; BmeanF=Bsum/sqrt(det(Bsum));
% % this expression for BmeanR should be correct for ordering of a above
% BmeanR=B1*(B1'*B2*(B2'*B3)^(1/2))^(2/3);
% mamtrx=real([[0 1]*logm(BmeanF)*[1 0]' [0 1]*logm(BmeanR)*[1 0]'])
% manorm=[meanangleoct(a,[],[],'F') meanangleoct(a,[],[],'R')]
% polar(a,1+0*a,'b*'), axis square, hold on
% polar(manorm(1),1,'rs'), polar(manorm(2),1,'gd'), hold off

%     Meanangleoct Version 1.0
%     Copyright (C) 2011 Alphawave Research, robjohnson@alphawaveresearch.com
%     Released under GNU GPLv3 -- see file COPYING for more info.
%
%     Meanangle is free software: you can redistribute it and/or modify
%     the Free Software Foundation, either version 3 of the License, or (at
%     your option) any later version.
%
%     Meanangle is distributed in the hope that it will be useful, but
%     WITHOUT ANY WARRANTY; without even the implied warranty of
%     MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE.  See the GNU
%     General Public License for more details.
%
%     You should have received a copy of the GNU General Public License
%     along with this program.  If not, see `http://www.gnu.org/licenses/'.
``````
-

I would go the vector way using complex numbers. My example is in Python, which has built-in complex numbers:

``````import cmath # complex math

def average_angle(list_of_angles):

# make a new list of vectors
vectors= [cmath.rect(1, angle) # length 1 for each vector
for angle in list_of_angles]

vector_sum= sum(vectors)

# no need to average, we don't care for the modulus
return cmath.phase(vector_sum)
``````

Note that Python does not need to build a temporary new list of vectors, all of the above can be done in one step; I just chose this way to approximate pseudo-code applicable to other languages too.

-

FOR THE SPECIAL CASE OF TWO ANGLES:

The answer ( (a + b) mod 360 ) / 2 is WRONG. For angles 350 and 2, the closest point is 356, not 176.

The unit vector and trig solutions may be too expensive.

What I've got from a little tinkering is:

``````diff = ( ( a - b + 180 + 360 ) mod 360 ) - 180
angle = (360 + b + ( diff / 2 ) ) mod 360
``````
• 0, 180 -> 90 (two answers for this: this equation takes the clockwise answer from a)
• 180, 0 -> 270 (see above)
• 180, 1 -> 90.5
• 1, 180 -> 90.5
• 20, 350 -> 5
• 350, 20 -> 5 (all following examples reverse properly too)
• 10, 20 -> 15
• 350, 2 -> 356
• 359, 0 -> 359.5
• 180, 180 -> 180
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This could further be optimized by the use of BAMS: stackoverflow.com/questions/1048945/… –  darron Jul 21 '09 at 13:58
Not bad. The first line computes the relative angle of a with respect to b in the range [-180, 179], the second computes the middle angle from that. I'd use b + diff/2 instead of a - diff/2 for clarity. –  starblue Jul 21 '09 at 14:42
Try it with 20 and 210 and you should get 295 NOT 115 !!! –  Stécy Jul 21 '09 at 14:42
Am I missing something? I DO get 295. –  darron Jul 21 '09 at 15:00
Ah.. I get it. Matlab's mod operator wraps -10 to 350. I'll change the code. It's a simple additional 360. –  darron Jul 21 '09 at 15:02

The average angle phi_avg should have the property that sum_i|phi_avg-phi_i|^2 becomes minimal, where the difference has to be in [-Pi, Pi) (because it might be shorter to go the other way around!). This is easily achieved by normalizing all input values to [0, 2Pi), keeping a running average phi_run and choosing normalizing |phi_i-phi_run| to [-Pi,Pi) (by adding or subtractin 2Pi). Most suggestions above do something else that does not have that minimal property, i.e., they average something, but not angles.

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Alnitak has the right solution. Nick Fortescue's solution is functionally the same.

For the special case of where

( sum(x_component) = 0.0 && sum(y_component) = 0.0 ) // e.g. 2 angles of 10. and 190. degrees ea.

use 0.0 degrees as the sum

Computationally you have to test for this case since atan2(0. , 0.) is undefined and will generate an error.

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on glibc 'atan2' is defined for (0, 0) - the result is 0 –  Alnitak Jan 31 '09 at 10:40

I see the problem - for example, if you have a 45' angle and a 315' angle, the "natural" average would be 180', but the value you want is actually 0'.

I think Starblue is onto something. Just calculate the (x, y) cartesian coordinates for each angle, and add those resulting vectors together. The angular offset of the final vector should be your required result.

``````x = y = 0
foreach angle {
x += cos(angle)
y += sin(angle)
}
average_angle = atan2(y, x)
``````

I'm ignoring for now that a compass heading starts at north, and goes clockwise, whereas "normal" cartesian coordinates start with zero along the X axis, and then go anti-clockwise. The maths should work out the same way regardless.

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Your maths library probably uses Radians for angles. Remember to convert. –  Martin Beckett Nov 27 '09 at 23:51
Maybe it's too late at night, but using this logic, I get an average angle of 341.8947... instead of 342 for angles of [ 320, 330, 340, 350, 10, ]. Anyone see my typo? –  Alex Robinson Jul 3 '14 at 12:15
@AlexRobinson it's not a typo, it's because the final angle is simply the eventual angle obtained by taking a set of steps of each of those angles individually. –  Alnitak Jul 3 '14 at 12:30

Let's represent these angles with points on the circumference of the circle.

Can we assume that all these points fall on the same half of the circle? (Otherwise, there is no obvious way to define the "average angle". Think of two points on the diameter, e.g. 0 deg and 180 deg --- is the average 90 deg or 270 deg? What happens when we have 3 or more evenly spread out points?)

With this assumption, we pick an arbitrary point on that semicircle as the "origin", and measure the given set of angles with respect to this origin (call this the "relative angle"). Note that the relative angle has an absolute value strictly less than 180 deg. Finally, take the mean of these relative angles to get the desired average angle (relative to our origin of course).

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Here's an idea: build the average iteratively by always calculating the average of the angles that are closest together, keeping a weight.

Another idea: find the largest gap between the given angles. Find the point that bisects it, and then pick the opposite point on the circle as the reference zero to calculate the average from.

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I don't recommend my answer, but instead starblue's highly ranked answer. The key observation there is to think of the center of the compass as the 0,0 point. –  John with waffle Feb 19 '09 at 12:57

You have to define average more accurately. For the specific case of two angles, I can think of two different scenarios:

1. The "true" average, i.e. (a + b) / 2 % 360.
2. The angle that points "between" the two others while staying in the same semicircle, e.g. for 355 and 5, this would be 0, not 180. To do this, you need to check if the difference between the two angles is larger than 180 or not. If so, increment the smaller angle by 360 before using the above formula.

I don't see how the second alternative can be generalized for the case of more than two angles, though.

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While the question refers to angles, it is better thought of as mean direction, and is a common navigation issue. –  Shane MacLaughlin Jan 29 '09 at 14:33
Good points, David. For instance, what is the average of a 180º angle and a 540º angle? Is it 360º or 180º? –  Baltimark Jan 29 '09 at 14:35
@Baltimark, I guess it depends on what you are doing. If its navigation, probably the latter. If it's a fancy snowboarding jump, maybe the former ;) –  Shane MacLaughlin Jan 29 '09 at 14:39
So the "true" average of 1 and 359 is (360 / 2) % 360 = 180?? I think not. –  Die in Sente Feb 1 '09 at 18:00
@Die in Sente: numerically speaking, definitely. For example, if angles represent turns, not directions, then the average of 359 and 1 is surely 180. It's all a matter of interpretation. –  David Hanak Feb 1 '09 at 18:57