# What's the best way to calculate a 3D (or n-D) centroid?

As part of a project at work I have to calculate the centroid of a set of points in 3D space. Right now I'm doing it in a way that seems simple but naive -- by taking the average of each set of points, as in:

``````centroid = average(x), average(y), average(z)
``````

where `x`, `y` and `z` are arrays of floating-point numbers. I seem to recall that there is a way to get a more accurate centroid, but I haven't found a simple algorithm for doing so. Anyone have any ideas or suggestions? I'm using Python for this, but I can adapt examples from other languages.

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Nope, that is the only formula for the centroid of a collection of points. See Wikipedia: http://en.wikipedia.org/wiki/Centroid

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You vaguely mention "a way to get a more accurate centroid". Maybe you're talking about a centroid that isn't affected by outliers. For example, the average household income in the USA is probably very high, because a small number of very rich people skew the average; they are the "outliers". For that reason, statisticians use the median instead. One way to obtain the median is to sort the values, then pick the value halfway down the list.

Maybe you're looking for something like this, but for 2D or 3D points. The problem is, in 2D and higher, you can't sort. There's no natural order. Nevertheless, there are ways to get rid of outliers.

One way is to find the convex hull of the points. The convex hull has all the points on the "outside" of the set of points. If you do this, and throw out the points that are on the hull, you'll be throwing out the outliers, and the points that remain will give a more "representative" centroid. You can even repeat this process several times, and the result is kind like peeling an onion. In fact, it's called "convex hull peeling".

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So if I understand this correctly, if the centroid is like the mean of a linear set, does convex hull peeling get you the point analogous to the median? –  Marcel Levy Sep 17 '08 at 23:37

you can use increase accuracy summation - Kahan summation - was that what you had in mind?

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No, I'm not looking to get a more accurate sum before averaging, if that's what you mean. I was just wondering if I was calculating the centroid correctly. Thanks, though -- I hadn't even heard of this. –  Marcel Levy Sep 16 '08 at 23:14

Yes that is the correct formula.

If you have a large number of points you can exploit the symmetry of the problem (be it cylindrical, spherical, mirror). Otherwise, you can borrow from statistics and average a random number of the points and just have a bit of error.

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Specifically, the mean of a random subset of points is an unbiased estimator of the mean of the whole group. –  Gregg Lind Mar 22 '10 at 0:19

Potentially more efficient: if you're calculating this multiple times, you can speed this up quite a bit by keeping two standing variables

``````N  # number of points
sums = dict(x=0,y=0,z=0)  # sums of the locations for each point
``````

then changing N and sums whenever points are created or destroyed. This changes things from O(N) to O(1) for calculations at the cost of more work every time a point is created, moves, or is destroyed.

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